English Mathspeak Neutral Fences tests.

English Mathspeak Neutral Fences tests. Locale: en, Style: Verbose.

0	$\| a \|$	StartAbsoluteValue a EndAbsoluteValue
1	$｜ a ｜$	StartAbsoluteValue a EndAbsoluteValue
2	$¦ a ¦$	StartAbsoluteValue a EndAbsoluteValue
3	$∥ a ∥$	StartMetric a EndMetric
4	$⦀ a ⦀$	StartMetric a EndMetric
5	$⫴ a ⫴$	StartMetric a EndMetric
6	$‖ a ‖$	StartMetric a EndMetric
7	$｜ a ‖$	vertical bar a double vertical bar
8	$∥ a ‖$	parallel to a double vertical bar
9	$｜ a ¦$	vertical bar a broken vertical bar
10	$⦀ a ‖$	triple vertical bar a double vertical bar
11	$a ｜ b$	a vertical bar b
12	$a \| b$	a vertical bar b
13	$a ¦ b$	a broken vertical bar b
14	$a ‖ b$	a double vertical bar b
15	$a ∥ b$	a parallel to b
16	$a ⦀ b$	a triple vertical bar b
17	$f ｜ g$	f vertical bar g
18	$f \| g$	f vertical bar g
19	$f ¦ g$	f broken vertical bar g
20	$f ‖ g$	f double vertical bar g
21	$f ∥ g$	f parallel to g
22	$f ⦀ g$	f triple vertical bar g
23	$\sin ⦀ g$	sine triple vertical bar g
24	$f \| a \|$	f StartAbsoluteValue a EndAbsoluteValue
25	$g \| a \|$	g StartAbsoluteValue a EndAbsoluteValue
26	$h \| a \|$	h StartAbsoluteValue a EndAbsoluteValue
27	$r \| a \|$	r StartAbsoluteValue a EndAbsoluteValue
28	$\sin \| a \|$	sine StartAbsoluteValue a EndAbsoluteValue
29	$\sum \| a \|$	sigma summation StartAbsoluteValue a EndAbsoluteValue
30	$f ‖ a ‖$	f StartMetric a EndMetric
31	$g ‖ a ‖$	g StartMetric a EndMetric
32	$h ‖ a ‖$	h StartMetric a EndMetric
33	$r ‖ a ‖$	r StartMetric a EndMetric
34	$\sin ‖ a ‖$	sine StartMetric a EndMetric
35	$\sum ‖ a ‖$	sigma summation StartMetric a EndMetric

English Mathspeak Neutral Fences tests. Locale: en, Style: Superbrief.

0	$\| a \|$	AbsoluteValue a EndAbsoluteValue
1	$｜ a ｜$	AbsoluteValue a EndAbsoluteValue
2	$¦ a ¦$	AbsoluteValue a EndAbsoluteValue
3	$∥ a ∥$	Metric a EndMetric
4	$⦀ a ⦀$	Metric a EndMetric
5	$⫴ a ⫴$	Metric a EndMetric
6	$‖ a ‖$	Metric a EndMetric
7	$｜ a ‖$	vertical bar a double vertical bar
8	$∥ a ‖$	parallel to a double vertical bar
9	$｜ a ¦$	vertical bar a broken vertical bar
10	$⦀ a ‖$	triple vertical bar a double vertical bar
11	$a ｜ b$	a vertical bar b
12	$a \| b$	a vertical bar b
13	$a ¦ b$	a broken vertical bar b
14	$a ‖ b$	a double vertical bar b
15	$a ∥ b$	a parallel to b
16	$a ⦀ b$	a triple vertical bar b
17	$f \| a \|$	f AbsoluteValue a EndAbsoluteValue
18	$g \| a \|$	g AbsoluteValue a EndAbsoluteValue
19	$h \| a \|$	h AbsoluteValue a EndAbsoluteValue
20	$r \| a \|$	r AbsoluteValue a EndAbsoluteValue
21	$\sin \| a \|$	sine AbsoluteValue a EndAbsoluteValue
22	$\sum \| a \|$	sigma summation AbsoluteValue a EndAbsoluteValue
23	$f ‖ a ‖$	f Metric a EndMetric
24	$g ‖ a ‖$	g Metric a EndMetric
25	$h ‖ a ‖$	h Metric a EndMetric
26	$r ‖ a ‖$	r Metric a EndMetric
27	$\sin ‖ a ‖$	sine Metric a EndMetric
28	$\sum ‖ a ‖$	sigma summation Metric a EndMetric
29	$f ｜ g$	f vertical bar g
30	$f \| g$	f vertical bar g
31	$f ¦ g$	f broken vertical bar g
32	$f ‖ g$	f double vertical bar g
33	$f ∥ g$	f parallel to g
34	$f ⦀ g$	f triple vertical bar g
35	$\sin ⦀ g$	sine triple vertical bar g

English Mathspeak Roots tests. Locale: en, Style: Verbose.

0	$\sqrt{a}$	StartRoot a EndRoot
1	$\sqrt[2]{a}$	RootIndex 2 StartRoot a EndRoot
2	$\sqrt{\sqrt{a}}$	NestedStartRoot StartRoot a EndRoot NestedEndRoot
3	$\sqrt{\sqrt{\sqrt{\sqrt{a}}}}$	Nested3StartRoot NestedTwiceStartRoot NestedStartRoot StartRoot a EndRoot NestedEndRoot NestedTwiceEndRoot Nested3EndRoot
4	$\sqrt[1]{a}$	RootIndex 1 StartRoot a EndRoot
5	$\sqrt[2]{a}$	RootIndex 2 StartRoot a EndRoot
6	$\sqrt[3]{a}$	RootIndex 3 StartRoot a EndRoot
7	$\sqrt[4]{a}$	RootIndex 4 StartRoot a EndRoot
8	$\sqrt[5]{a}$	RootIndex 5 StartRoot a EndRoot
9	$\sqrt[6]{a}$	RootIndex 6 StartRoot a EndRoot
10	$\sqrt[7]{a}$	RootIndex 7 StartRoot a EndRoot
11	$\sqrt[8]{a}$	RootIndex 8 StartRoot a EndRoot
12	$\sqrt[9]{a}$	RootIndex 9 StartRoot a EndRoot
13	$\sqrt[10]{a}$	RootIndex 10 StartRoot a EndRoot
14	$\sqrt[11]{a}$	RootIndex 11 StartRoot a EndRoot
15	$\sqrt[1]{\sqrt[1]{a}}$	NestedRootIndex 1 NestedStartRoot RootIndex 1 StartRoot a EndRoot NestedEndRoot
16	$\sqrt[2]{\sqrt[2]{a}}$	NestedRootIndex 2 NestedStartRoot RootIndex 2 StartRoot a EndRoot NestedEndRoot
17	$\sqrt[3]{\sqrt[3]{a}}$	NestedRootIndex 3 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
18	$\sqrt[4]{\sqrt[4]{a}}$	NestedRootIndex 4 NestedStartRoot RootIndex 4 StartRoot a EndRoot NestedEndRoot
19	$\sqrt[5]{\sqrt[5]{a}}$	NestedRootIndex 5 NestedStartRoot RootIndex 5 StartRoot a EndRoot NestedEndRoot
20	$\sqrt[6]{\sqrt[6]{a}}$	NestedRootIndex 6 NestedStartRoot RootIndex 6 StartRoot a EndRoot NestedEndRoot
21	$\sqrt[7]{\sqrt[7]{a}}$	NestedRootIndex 7 NestedStartRoot RootIndex 7 StartRoot a EndRoot NestedEndRoot
22	$\sqrt[8]{\sqrt[8]{a}}$	NestedRootIndex 8 NestedStartRoot RootIndex 8 StartRoot a EndRoot NestedEndRoot
23	$\sqrt[9]{\sqrt[9]{a}}$	NestedRootIndex 9 NestedStartRoot RootIndex 9 StartRoot a EndRoot NestedEndRoot
24	$\sqrt[10]{\sqrt[10]{a}}$	NestedRootIndex 10 NestedStartRoot RootIndex 10 StartRoot a EndRoot NestedEndRoot
25	$\sqrt[11]{\sqrt[11]{a}}$	NestedRootIndex 11 NestedStartRoot RootIndex 11 StartRoot a EndRoot NestedEndRoot
26	$\sqrt[1]{\sqrt[3]{a}}$	NestedRootIndex 1 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
27	$\sqrt[2]{\sqrt[3]{a}}$	NestedRootIndex 2 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
28	$\sqrt[3]{\sqrt[3]{a}}$	NestedRootIndex 3 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
29	$\sqrt[4]{\sqrt[3]{a}}$	NestedRootIndex 4 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
30	$\sqrt[5]{\sqrt[3]{a}}$	NestedRootIndex 5 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
31	$\sqrt[6]{\sqrt[3]{a}}$	NestedRootIndex 6 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
32	$\sqrt[7]{\sqrt[3]{a}}$	NestedRootIndex 7 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
33	$\sqrt[8]{\sqrt[3]{a}}$	NestedRootIndex 8 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
34	$\sqrt[9]{\sqrt[3]{a}}$	NestedRootIndex 9 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
35	$\sqrt[10]{\sqrt[3]{a}}$	NestedRootIndex 10 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
36	$\sqrt[11]{\sqrt[3]{a}}$	NestedRootIndex 11 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
37	$\sqrt[2]{\sqrt[3]{\sqrt[4]{\sqrt[5]{a}}}}$	Nested3RootIndex 2 Nested3StartRoot NestedTwiceRootIndex 3 NestedTwiceStartRoot NestedRootIndex 4 NestedStartRoot RootIndex 5 StartRoot a EndRoot NestedEndRoot NestedTwiceEndRoot Nested3EndRoot
38	$\sqrt[2]{\sqrt[3]{\sqrt[2]{\sqrt[3]{a}}}}$	Nested3RootIndex 2 Nested3StartRoot NestedTwiceRootIndex 3 NestedTwiceStartRoot NestedRootIndex 2 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot NestedTwiceEndRoot Nested3EndRoot
39	$\sqrt[2]{\sqrt[3]{\sqrt{\sqrt[3]{\sqrt{a}}}}}$	Nested4RootIndex 2 Nested4StartRoot Nested3RootIndex 3 Nested3StartRoot NestedTwiceStartRoot NestedRootIndex 3 NestedStartRoot StartRoot a EndRoot NestedEndRoot NestedTwiceEndRoot Nested3EndRoot Nested4EndRoot

English Mathspeak Roots tests. Locale: en, Style: Brief.

0	$\sqrt{a}$	StartRoot a EndRoot
1	$\sqrt[2]{a}$	RootIndex 2 StartRoot a EndRoot
2	$\sqrt{\sqrt{a}}$	NestStartRoot StartRoot a EndRoot NestEndRoot
3	$\sqrt{\sqrt{\sqrt{\sqrt{a}}}}$	Nest3StartRoot NestTwiceStartRoot NestStartRoot StartRoot a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot
4	$\sqrt[1]{a}$	RootIndex 1 StartRoot a EndRoot
5	$\sqrt[2]{a}$	RootIndex 2 StartRoot a EndRoot
6	$\sqrt[3]{a}$	RootIndex 3 StartRoot a EndRoot
7	$\sqrt[4]{a}$	RootIndex 4 StartRoot a EndRoot
8	$\sqrt[5]{a}$	RootIndex 5 StartRoot a EndRoot
9	$\sqrt[6]{a}$	RootIndex 6 StartRoot a EndRoot
10	$\sqrt[7]{a}$	RootIndex 7 StartRoot a EndRoot
11	$\sqrt[8]{a}$	RootIndex 8 StartRoot a EndRoot
12	$\sqrt[9]{a}$	RootIndex 9 StartRoot a EndRoot
13	$\sqrt[10]{a}$	RootIndex 10 StartRoot a EndRoot
14	$\sqrt[11]{a}$	RootIndex 11 StartRoot a EndRoot
15	$\sqrt[1]{\sqrt[1]{a}}$	NestRootIndex 1 NestStartRoot RootIndex 1 StartRoot a EndRoot NestEndRoot
16	$\sqrt[2]{\sqrt[2]{a}}$	NestRootIndex 2 NestStartRoot RootIndex 2 StartRoot a EndRoot NestEndRoot
17	$\sqrt[3]{\sqrt[3]{a}}$	NestRootIndex 3 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
18	$\sqrt[4]{\sqrt[4]{a}}$	NestRootIndex 4 NestStartRoot RootIndex 4 StartRoot a EndRoot NestEndRoot
19	$\sqrt[5]{\sqrt[5]{a}}$	NestRootIndex 5 NestStartRoot RootIndex 5 StartRoot a EndRoot NestEndRoot
20	$\sqrt[6]{\sqrt[6]{a}}$	NestRootIndex 6 NestStartRoot RootIndex 6 StartRoot a EndRoot NestEndRoot
21	$\sqrt[7]{\sqrt[7]{a}}$	NestRootIndex 7 NestStartRoot RootIndex 7 StartRoot a EndRoot NestEndRoot
22	$\sqrt[8]{\sqrt[8]{a}}$	NestRootIndex 8 NestStartRoot RootIndex 8 StartRoot a EndRoot NestEndRoot
23	$\sqrt[9]{\sqrt[9]{a}}$	NestRootIndex 9 NestStartRoot RootIndex 9 StartRoot a EndRoot NestEndRoot
24	$\sqrt[10]{\sqrt[10]{a}}$	NestRootIndex 10 NestStartRoot RootIndex 10 StartRoot a EndRoot NestEndRoot
25	$\sqrt[11]{\sqrt[11]{a}}$	NestRootIndex 11 NestStartRoot RootIndex 11 StartRoot a EndRoot NestEndRoot
26	$\sqrt[1]{\sqrt[3]{a}}$	NestRootIndex 1 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
27	$\sqrt[2]{\sqrt[3]{a}}$	NestRootIndex 2 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
28	$\sqrt[3]{\sqrt[3]{a}}$	NestRootIndex 3 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
29	$\sqrt[4]{\sqrt[3]{a}}$	NestRootIndex 4 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
30	$\sqrt[5]{\sqrt[3]{a}}$	NestRootIndex 5 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
31	$\sqrt[6]{\sqrt[3]{a}}$	NestRootIndex 6 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
32	$\sqrt[7]{\sqrt[3]{a}}$	NestRootIndex 7 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
33	$\sqrt[8]{\sqrt[3]{a}}$	NestRootIndex 8 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
34	$\sqrt[9]{\sqrt[3]{a}}$	NestRootIndex 9 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
35	$\sqrt[10]{\sqrt[3]{a}}$	NestRootIndex 10 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
36	$\sqrt[11]{\sqrt[3]{a}}$	NestRootIndex 11 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
37	$\sqrt[2]{\sqrt[3]{\sqrt[4]{\sqrt[5]{a}}}}$	Nest3RootIndex 2 Nest3StartRoot NestTwiceRootIndex 3 NestTwiceStartRoot NestRootIndex 4 NestStartRoot RootIndex 5 StartRoot a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot
38	$\sqrt[2]{\sqrt[3]{\sqrt[2]{\sqrt[3]{a}}}}$	Nest3RootIndex 2 Nest3StartRoot NestTwiceRootIndex 3 NestTwiceStartRoot NestRootIndex 2 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot
39	$\sqrt[2]{\sqrt[3]{\sqrt{\sqrt[3]{\sqrt{a}}}}}$	Nest4RootIndex 2 Nest4StartRoot Nest3RootIndex 3 Nest3StartRoot NestTwiceStartRoot NestRootIndex 3 NestStartRoot StartRoot a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot Nest4EndRoot

English Mathspeak Roots tests. Locale: en, Style: Superbrief.

0	$\sqrt{a}$	Root a EndRoot
1	$\sqrt[2]{a}$	Index 2 Root a EndRoot
2	$\sqrt{\sqrt{a}}$	NestRoot Root a EndRoot NestEndRoot
3	$\sqrt{\sqrt{\sqrt{\sqrt{a}}}}$	Nest3Root NestTwiceRoot NestRoot Root a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot
4	$\sqrt[1]{a}$	Index 1 Root a EndRoot
5	$\sqrt[2]{a}$	Index 2 Root a EndRoot
6	$\sqrt[3]{a}$	Index 3 Root a EndRoot
7	$\sqrt[4]{a}$	Index 4 Root a EndRoot
8	$\sqrt[5]{a}$	Index 5 Root a EndRoot
9	$\sqrt[6]{a}$	Index 6 Root a EndRoot
10	$\sqrt[7]{a}$	Index 7 Root a EndRoot
11	$\sqrt[8]{a}$	Index 8 Root a EndRoot
12	$\sqrt[9]{a}$	Index 9 Root a EndRoot
13	$\sqrt[10]{a}$	Index 10 Root a EndRoot
14	$\sqrt[11]{a}$	Index 11 Root a EndRoot
15	$\sqrt[1]{\sqrt[1]{a}}$	NestIndex 1 NestRoot Index 1 Root a EndRoot NestEndRoot
16	$\sqrt[2]{\sqrt[2]{a}}$	NestIndex 2 NestRoot Index 2 Root a EndRoot NestEndRoot
17	$\sqrt[3]{\sqrt[3]{a}}$	NestIndex 3 NestRoot Index 3 Root a EndRoot NestEndRoot
18	$\sqrt[4]{\sqrt[4]{a}}$	NestIndex 4 NestRoot Index 4 Root a EndRoot NestEndRoot
19	$\sqrt[5]{\sqrt[5]{a}}$	NestIndex 5 NestRoot Index 5 Root a EndRoot NestEndRoot
20	$\sqrt[6]{\sqrt[6]{a}}$	NestIndex 6 NestRoot Index 6 Root a EndRoot NestEndRoot
21	$\sqrt[7]{\sqrt[7]{a}}$	NestIndex 7 NestRoot Index 7 Root a EndRoot NestEndRoot
22	$\sqrt[8]{\sqrt[8]{a}}$	NestIndex 8 NestRoot Index 8 Root a EndRoot NestEndRoot
23	$\sqrt[9]{\sqrt[9]{a}}$	NestIndex 9 NestRoot Index 9 Root a EndRoot NestEndRoot
24	$\sqrt[10]{\sqrt[10]{a}}$	NestIndex 10 NestRoot Index 10 Root a EndRoot NestEndRoot
25	$\sqrt[11]{\sqrt[11]{a}}$	NestIndex 11 NestRoot Index 11 Root a EndRoot NestEndRoot
26	$\sqrt[1]{\sqrt[3]{a}}$	NestIndex 1 NestRoot Index 3 Root a EndRoot NestEndRoot
27	$\sqrt[2]{\sqrt[3]{a}}$	NestIndex 2 NestRoot Index 3 Root a EndRoot NestEndRoot
28	$\sqrt[3]{\sqrt[3]{a}}$	NestIndex 3 NestRoot Index 3 Root a EndRoot NestEndRoot
29	$\sqrt[4]{\sqrt[3]{a}}$	NestIndex 4 NestRoot Index 3 Root a EndRoot NestEndRoot
30	$\sqrt[5]{\sqrt[3]{a}}$	NestIndex 5 NestRoot Index 3 Root a EndRoot NestEndRoot
31	$\sqrt[6]{\sqrt[3]{a}}$	NestIndex 6 NestRoot Index 3 Root a EndRoot NestEndRoot
32	$\sqrt[7]{\sqrt[3]{a}}$	NestIndex 7 NestRoot Index 3 Root a EndRoot NestEndRoot
33	$\sqrt[8]{\sqrt[3]{a}}$	NestIndex 8 NestRoot Index 3 Root a EndRoot NestEndRoot
34	$\sqrt[9]{\sqrt[3]{a}}$	NestIndex 9 NestRoot Index 3 Root a EndRoot NestEndRoot
35	$\sqrt[10]{\sqrt[3]{a}}$	NestIndex 10 NestRoot Index 3 Root a EndRoot NestEndRoot
36	$\sqrt[11]{\sqrt[3]{a}}$	NestIndex 11 NestRoot Index 3 Root a EndRoot NestEndRoot
37	$\sqrt[2]{\sqrt[3]{\sqrt[4]{\sqrt[5]{a}}}}$	Nest3Index 2 Nest3Root NestTwiceIndex 3 NestTwiceRoot NestIndex 4 NestRoot Index 5 Root a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot
38	$\sqrt[2]{\sqrt[3]{\sqrt[2]{\sqrt[3]{a}}}}$	Nest3Index 2 Nest3Root NestTwiceIndex 3 NestTwiceRoot NestIndex 2 NestRoot Index 3 Root a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot
39	$\sqrt[2]{\sqrt[3]{\sqrt{\sqrt[3]{\sqrt{a}}}}}$	Nest4Index 2 Nest4Root Nest3Index 3 Nest3Root NestTwiceRoot NestIndex 3 NestRoot Root a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot Nest4EndRoot

English Mathspeak Tensor tests. Locale: en, Style: Verbose.

0	${}_{a}^{b}x_{c}^{d}$	Subscript a Superscript b Baseline x Subscript c Superscript d
1	${}_{a}^{b}x_{c}$	Subscript a Superscript b Baseline x Subscript c
2	${}_{a}^{b}x^{d}$	Subscript a Superscript b Baseline x Superscript d
3	${}_{a}^{b}x^{d} r$	Subscript a Superscript b Baseline x Superscript d Baseline r
4	$\sqrt{{}_{a}^{b}x^{d}} r$	StartRoot Subscript a Superscript b Baseline x Superscript d Baseline EndRoot r
5	$\sqrt{{}_{a}^{b}x^{d} r}$	StartRoot Subscript a Superscript b Baseline x Superscript d Baseline r EndRoot
6	$\frac{1}{{}_{a}^{b}x^{d}} r$	StartFraction 1 Over Subscript a Superscript b Baseline x Superscript d Baseline EndFraction r
7	$\frac{1}{{}_{a}^{b}x^{d} r}$	StartFraction 1 Over Subscript a Superscript b Baseline x Superscript d Baseline r EndFraction
8	${}_{a}^{b}x$	Subscript a Superscript b Baseline x
9	${}_{a}^{b}x r$	Subscript a Superscript b Baseline x r
10	$\sqrt{{}_{a}^{b}x} r$	StartRoot Subscript a Superscript b Baseline x EndRoot r
11	$\sqrt{{}_{a}^{b}x r}$	StartRoot Subscript a Superscript b Baseline x r EndRoot
12	$\frac{1}{{}_{a}^{b}x} r$	StartFraction 1 Over Subscript a Superscript b Baseline x EndFraction r
13	$\frac{1}{{}_{a}^{b}x r}$	StartFraction 1 Over Subscript a Superscript b Baseline x r EndFraction
14	${}_{a}^{b}x_{c} r$	Subscript a Superscript b Baseline x Subscript c Baseline r
15	${}_{a}^{b}x_{c}^{d} r$	Subscript a Superscript b Baseline x Subscript c Superscript d Baseline r
16	$\sqrt{{}_{a}^{b}x_{c}^{d}}$	StartRoot Subscript a Superscript b Baseline x Subscript c Superscript d EndRoot
17	$\sqrt{{}_{a}^{b}x_{c}^{d}} r$	StartRoot Subscript a Superscript b Baseline x Subscript c Superscript d Baseline EndRoot r
18	$\sqrt{{}_{a}^{b}x_{c}^{d} r}$	StartRoot Subscript a Superscript b Baseline x Subscript c Superscript d Baseline r EndRoot
19	$\frac{1}{{}_{a}^{b}x_{c}^{d}}$	StartFraction 1 Over Subscript a Superscript b Baseline x Subscript c Superscript d EndFraction
20	$\frac{1}{{}_{a}^{b}x_{c}^{d}} r$	StartFraction 1 Over Subscript a Superscript b Baseline x Subscript c Superscript d Baseline EndFraction r
21	$\frac{1}{{}_{a}^{b}x_{c}^{d} r}$	StartFraction 1 Over Subscript a Superscript b Baseline x Subscript c Superscript d Baseline r EndFraction
22	${}^{b}x$	Superscript b Baseline x
23	${}^{b}x r$	Superscript b Baseline x r
24	$\sqrt{{}^{b}x} r$	StartRoot Superscript b Baseline x EndRoot r
25	$\sqrt{{}^{b}x r}$	StartRoot Superscript b Baseline x r EndRoot
26	$\frac{1}{{}^{b}x} r$	StartFraction 1 Over Superscript b Baseline x EndFraction r
27	$\frac{1}{{}^{b}x r}$	StartFraction 1 Over Superscript b Baseline x r EndFraction
28	${}^{b}x^{d}$	Superscript b Baseline x Superscript d
29	${}^{b}x^{d} r$	Superscript b Baseline x Superscript d Baseline r
30	$\sqrt{{}^{b}x^{d}} r$	StartRoot Superscript b Baseline x Superscript d Baseline EndRoot r
31	$\sqrt{{}^{b}x^{d} r}$	StartRoot Superscript b Baseline x Superscript d Baseline r EndRoot
32	$\frac{1}{{}^{b}x^{d}} r$	StartFraction 1 Over Superscript b Baseline x Superscript d Baseline EndFraction r
33	$\frac{1}{{}^{b}x^{d} r}$	StartFraction 1 Over Superscript b Baseline x Superscript d Baseline r EndFraction
34	${}^{b}x_{c}$	Superscript b Baseline x Subscript c
35	${}^{b}x_{c} r$	Superscript b Baseline x Subscript c Baseline r
36	$\sqrt{{}^{b}x_{c}} r$	StartRoot Superscript b Baseline x Subscript c Baseline EndRoot r
37	$\sqrt{{}^{b}x_{c} r}$	StartRoot Superscript b Baseline x Subscript c Baseline r EndRoot
38	$\frac{1}{{}^{b}x_{c}} r$	StartFraction 1 Over Superscript b Baseline x Subscript c Baseline EndFraction r
39	$\frac{1}{{}^{b}x_{c} r}$	StartFraction 1 Over Superscript b Baseline x Subscript c Baseline r EndFraction
40	${}^{b}x_{c}^{d}$	Superscript b Baseline x Subscript c Superscript d
41	${}^{b}x_{c}^{d} r$	Superscript b Baseline x Subscript c Superscript d Baseline r
42	$\sqrt{{}^{b}x_{c}^{d}} r$	StartRoot Superscript b Baseline x Subscript c Superscript d Baseline EndRoot r
43	$\sqrt{{}^{b}x_{c}^{d} r}$	StartRoot Superscript b Baseline x Subscript c Superscript d Baseline r EndRoot
44	$\frac{1}{{}^{b}x_{c}^{d}} r$	StartFraction 1 Over Superscript b Baseline x Subscript c Superscript d Baseline EndFraction r
45	$\frac{1}{{}^{b}x_{c}^{d} r}$	StartFraction 1 Over Superscript b Baseline x Subscript c Superscript d Baseline r EndFraction
46	${}_{a}x$	Subscript a Baseline x
47	${}_{a}x r$	Subscript a Baseline x r
48	$\sqrt{{}_{a}x} r$	StartRoot Subscript a Baseline x EndRoot r
49	$\sqrt{{}_{a}x r}$	StartRoot Subscript a Baseline x r EndRoot
50	$\frac{1}{{}_{a}x} r$	StartFraction 1 Over Subscript a Baseline x EndFraction r
51	$\frac{1}{{}_{a}x r}$	StartFraction 1 Over Subscript a Baseline x r EndFraction
52	${}_{a}x^{d}$	Subscript a Baseline x Superscript d
53	${}_{a}x^{d} r$	Subscript a Baseline x Superscript d Baseline r
54	$\sqrt{{}_{a}x^{d}} r$	StartRoot Subscript a Baseline x Superscript d Baseline EndRoot r
55	$\sqrt{{}_{a}x^{d} r}$	StartRoot Subscript a Baseline x Superscript d Baseline r EndRoot
56	$\frac{1}{{}_{a}x^{d}} r$	StartFraction 1 Over Subscript a Baseline x Superscript d Baseline EndFraction r
57	$\frac{1}{{}_{a}x^{d} r}$	StartFraction 1 Over Subscript a Baseline x Superscript d Baseline r EndFraction
58	${}_{a}x_{c}$	Subscript a Baseline x Subscript c
59	${}_{a}x_{c} r$	Subscript a Baseline x Subscript c Baseline r
60	$\sqrt{{}_{a}x_{c}} r$	StartRoot Subscript a Baseline x Subscript c Baseline EndRoot r
61	$\sqrt{{}_{a}x_{c} r}$	StartRoot Subscript a Baseline x Subscript c Baseline r EndRoot
62	$\frac{1}{{}_{a}x_{c}} r$	StartFraction 1 Over Subscript a Baseline x Subscript c Baseline EndFraction r
63	$\frac{1}{{}_{a}x_{c} r}$	StartFraction 1 Over Subscript a Baseline x Subscript c Baseline r EndFraction
64	${}_{a}x_{c}^{d}$	Subscript a Baseline x Subscript c Superscript d
65	${}_{a}x_{c}^{d} r$	Subscript a Baseline x Subscript c Superscript d Baseline r
66	$\sqrt{{}_{a}x_{c}^{d}} r$	StartRoot Subscript a Baseline x Subscript c Superscript d Baseline EndRoot r
67	$\sqrt{{}_{a}x_{c}^{d} r}$	StartRoot Subscript a Baseline x Subscript c Superscript d Baseline r EndRoot
68	$\frac{1}{{}_{a}x_{c}^{d}} r$	StartFraction 1 Over Subscript a Baseline x Subscript c Superscript d Baseline EndFraction r
69	$\frac{1}{{}_{a}x_{c}^{d} r}$	StartFraction 1 Over Subscript a Baseline x Subscript c Superscript d Baseline r EndFraction
70	${}_{a}^{b}x_{c^{l}}$	Subscript a Superscript b Baseline x Subscript c Sub Superscript l
71	${}_{a}^{b}x_{c_{l}}^{d}$	Subscript a Superscript b Baseline x Subscript c Sub Subscript l Superscript d
72	${}_{a}^{b}x_{c_{l^{k}}}^{d}_{e}$	Subscript a Superscript b Baseline x Subscript c Sub Subscript l Sub Sub Superscript k Subscript e Superscript d
73	${}_{a}^{b}x_{c^{l}}^{d}$	Subscript a Superscript b Baseline x Subscript c Sub Superscript l Superscript d
74	${}_{a}^{b}x_{c k^{l}}^{d}$	Subscript a Superscript b Baseline x Subscript c k Sub Superscript l Superscript d
75	${}_{a}^{b}x_{c}^{d} {}_{a}^{b}x_{c}^{d}$	Subscript a Superscript b Baseline x Subscript c Superscript d Baseline Subscript a Superscript b Baseline x Subscript c Superscript d

English Mathspeak Tensor tests. Locale: en, Style: Brief.

0	${}_{a}^{b}x_{c}^{d}$	Sub a Sup b Base x Sub c Sup d
1	${}_{a}^{b}x_{c}$	Sub a Sup b Base x Sub c
2	${}_{a}^{b}x^{d}$	Sub a Sup b Base x Sup d
3	${}_{a}^{b}x^{d} r$	Sub a Sup b Base x Sup d Base r
4	$\sqrt{{}_{a}^{b}x^{d}} r$	StartRoot Sub a Sup b Base x Sup d Base EndRoot r
5	$\sqrt{{}_{a}^{b}x^{d} r}$	StartRoot Sub a Sup b Base x Sup d Base r EndRoot
6	$\frac{1}{{}_{a}^{b}x^{d}} r$	StartFrac 1 Over Sub a Sup b Base x Sup d Base EndFrac r
7	$\frac{1}{{}_{a}^{b}x^{d} r}$	StartFrac 1 Over Sub a Sup b Base x Sup d Base r EndFrac
8	${}_{a}^{b}x$	Sub a Sup b Base x
9	${}_{a}^{b}x r$	Sub a Sup b Base x r
10	$\sqrt{{}_{a}^{b}x} r$	StartRoot Sub a Sup b Base x EndRoot r
11	$\sqrt{{}_{a}^{b}x r}$	StartRoot Sub a Sup b Base x r EndRoot
12	$\frac{1}{{}_{a}^{b}x} r$	StartFrac 1 Over Sub a Sup b Base x EndFrac r
13	$\frac{1}{{}_{a}^{b}x r}$	StartFrac 1 Over Sub a Sup b Base x r EndFrac
14	${}_{a}^{b}x_{c} r$	Sub a Sup b Base x Sub c Base r
15	${}_{a}^{b}x_{c}^{d} r$	Sub a Sup b Base x Sub c Sup d Base r
16	$\sqrt{{}_{a}^{b}x_{c}^{d}}$	StartRoot Sub a Sup b Base x Sub c Sup d EndRoot
17	$\sqrt{{}_{a}^{b}x_{c}^{d}} r$	StartRoot Sub a Sup b Base x Sub c Sup d Base EndRoot r
18	$\sqrt{{}_{a}^{b}x_{c}^{d} r}$	StartRoot Sub a Sup b Base x Sub c Sup d Base r EndRoot
19	$\frac{1}{{}_{a}^{b}x_{c}^{d}}$	StartFrac 1 Over Sub a Sup b Base x Sub c Sup d EndFrac
20	$\frac{1}{{}_{a}^{b}x_{c}^{d}} r$	StartFrac 1 Over Sub a Sup b Base x Sub c Sup d Base EndFrac r
21	$\frac{1}{{}_{a}^{b}x_{c}^{d} r}$	StartFrac 1 Over Sub a Sup b Base x Sub c Sup d Base r EndFrac
22	${}^{b}x$	Sup b Base x
23	${}^{b}x r$	Sup b Base x r
24	$\sqrt{{}^{b}x} r$	StartRoot Sup b Base x EndRoot r
25	$\sqrt{{}^{b}x r}$	StartRoot Sup b Base x r EndRoot
26	$\frac{1}{{}^{b}x} r$	StartFrac 1 Over Sup b Base x EndFrac r
27	$\frac{1}{{}^{b}x r}$	StartFrac 1 Over Sup b Base x r EndFrac
28	${}^{b}x^{d}$	Sup b Base x Sup d
29	${}^{b}x^{d} r$	Sup b Base x Sup d Base r
30	$\sqrt{{}^{b}x^{d}} r$	StartRoot Sup b Base x Sup d Base EndRoot r
31	$\sqrt{{}^{b}x^{d} r}$	StartRoot Sup b Base x Sup d Base r EndRoot
32	$\frac{1}{{}^{b}x^{d}} r$	StartFrac 1 Over Sup b Base x Sup d Base EndFrac r
33	$\frac{1}{{}^{b}x^{d} r}$	StartFrac 1 Over Sup b Base x Sup d Base r EndFrac
34	${}^{b}x_{c}$	Sup b Base x Sub c
35	${}^{b}x_{c} r$	Sup b Base x Sub c Base r
36	$\sqrt{{}^{b}x_{c}} r$	StartRoot Sup b Base x Sub c Base EndRoot r
37	$\sqrt{{}^{b}x_{c} r}$	StartRoot Sup b Base x Sub c Base r EndRoot
38	$\frac{1}{{}^{b}x_{c}} r$	StartFrac 1 Over Sup b Base x Sub c Base EndFrac r
39	$\frac{1}{{}^{b}x_{c} r}$	StartFrac 1 Over Sup b Base x Sub c Base r EndFrac
40	${}^{b}x_{c}^{d}$	Sup b Base x Sub c Sup d
41	${}^{b}x_{c}^{d} r$	Sup b Base x Sub c Sup d Base r
42	$\sqrt{{}^{b}x_{c}^{d}} r$	StartRoot Sup b Base x Sub c Sup d Base EndRoot r
43	$\sqrt{{}^{b}x_{c}^{d} r}$	StartRoot Sup b Base x Sub c Sup d Base r EndRoot
44	$\frac{1}{{}^{b}x_{c}^{d}} r$	StartFrac 1 Over Sup b Base x Sub c Sup d Base EndFrac r
45	$\frac{1}{{}^{b}x_{c}^{d} r}$	StartFrac 1 Over Sup b Base x Sub c Sup d Base r EndFrac
46	${}_{a}x$	Sub a Base x
47	${}_{a}x r$	Sub a Base x r
48	$\sqrt{{}_{a}x} r$	StartRoot Sub a Base x EndRoot r
49	$\sqrt{{}_{a}x r}$	StartRoot Sub a Base x r EndRoot
50	$\frac{1}{{}_{a}x} r$	StartFrac 1 Over Sub a Base x EndFrac r
51	$\frac{1}{{}_{a}x r}$	StartFrac 1 Over Sub a Base x r EndFrac
52	${}_{a}x^{d}$	Sub a Base x Sup d
53	${}_{a}x^{d} r$	Sub a Base x Sup d Base r
54	$\sqrt{{}_{a}x^{d}} r$	StartRoot Sub a Base x Sup d Base EndRoot r
55	$\sqrt{{}_{a}x^{d} r}$	StartRoot Sub a Base x Sup d Base r EndRoot
56	$\frac{1}{{}_{a}x^{d}} r$	StartFrac 1 Over Sub a Base x Sup d Base EndFrac r
57	$\frac{1}{{}_{a}x^{d} r}$	StartFrac 1 Over Sub a Base x Sup d Base r EndFrac
58	${}_{a}x_{c}$	Sub a Base x Sub c
59	${}_{a}x_{c} r$	Sub a Base x Sub c Base r
60	$\sqrt{{}_{a}x_{c}} r$	StartRoot Sub a Base x Sub c Base EndRoot r
61	$\sqrt{{}_{a}x_{c} r}$	StartRoot Sub a Base x Sub c Base r EndRoot
62	$\frac{1}{{}_{a}x_{c}} r$	StartFrac 1 Over Sub a Base x Sub c Base EndFrac r
63	$\frac{1}{{}_{a}x_{c} r}$	StartFrac 1 Over Sub a Base x Sub c Base r EndFrac
64	${}_{a}x_{c}^{d}$	Sub a Base x Sub c Sup d
65	${}_{a}x_{c}^{d} r$	Sub a Base x Sub c Sup d Base r
66	$\sqrt{{}_{a}x_{c}^{d}} r$	StartRoot Sub a Base x Sub c Sup d Base EndRoot r
67	$\sqrt{{}_{a}x_{c}^{d} r}$	StartRoot Sub a Base x Sub c Sup d Base r EndRoot
68	$\frac{1}{{}_{a}x_{c}^{d}} r$	StartFrac 1 Over Sub a Base x Sub c Sup d Base EndFrac r
69	$\frac{1}{{}_{a}x_{c}^{d} r}$	StartFrac 1 Over Sub a Base x Sub c Sup d Base r EndFrac
70	${}_{a}^{b}x_{c^{l}}$	Sub a Sup b Base x Sub c Sub Sup l
71	${}_{a}^{b}x_{c_{l}}^{d}$	Sub a Sup b Base x Sub c Sub Sub l Sup d
72	${}_{a}^{b}x_{c_{l^{k}}}^{d}_{e}$	Sub a Sup b Base x Sub c Sub Sub l Sub Sub Sup k Sub e Sup d
73	${}_{a}^{b}x_{c^{l}}^{d}$	Sub a Sup b Base x Sub c Sub Sup l Sup d
74	${}_{a}^{b}x_{c k^{l}}^{d}$	Sub a Sup b Base x Sub c k Sub Sup l Sup d
75	${}_{a}^{b}x_{c}^{d} {}_{a}^{b}x_{c}^{d}$	Sub a Sup b Base x Sub c Sup d Base Sub a Sup b Base x Sub c Sup d

English Mathspeak Tensor tests. Locale: en, Style: Superbrief.

0	${}_{a}^{b}x_{c}^{d}$	Sub a Sup b Base x Sub c Sup d
1	${}_{a}^{b}x_{c}$	Sub a Sup b Base x Sub c
2	${}_{a}^{b}x^{d}$	Sub a Sup b Base x Sup d
3	${}_{a}^{b}x^{d} r$	Sub a Sup b Base x Sup d Base r
4	$\sqrt{{}_{a}^{b}x^{d}} r$	Root Sub a Sup b Base x Sup d Base EndRoot r
5	$\sqrt{{}_{a}^{b}x^{d} r}$	Root Sub a Sup b Base x Sup d Base r EndRoot
6	$\frac{1}{{}_{a}^{b}x^{d}} r$	Frac 1 Over Sub a Sup b Base x Sup d Base EndFrac r
7	$\frac{1}{{}_{a}^{b}x^{d} r}$	Frac 1 Over Sub a Sup b Base x Sup d Base r EndFrac
8	${}_{a}^{b}x$	Sub a Sup b Base x
9	${}_{a}^{b}x r$	Sub a Sup b Base x r
10	$\sqrt{{}_{a}^{b}x} r$	Root Sub a Sup b Base x EndRoot r
11	$\sqrt{{}_{a}^{b}x r}$	Root Sub a Sup b Base x r EndRoot
12	$\frac{1}{{}_{a}^{b}x} r$	Frac 1 Over Sub a Sup b Base x EndFrac r
13	$\frac{1}{{}_{a}^{b}x r}$	Frac 1 Over Sub a Sup b Base x r EndFrac
14	${}_{a}^{b}x_{c} r$	Sub a Sup b Base x Sub c Base r
15	${}_{a}^{b}x_{c}^{d} r$	Sub a Sup b Base x Sub c Sup d Base r
16	$\sqrt{{}_{a}^{b}x_{c}^{d}}$	Root Sub a Sup b Base x Sub c Sup d EndRoot
17	$\sqrt{{}_{a}^{b}x_{c}^{d}} r$	Root Sub a Sup b Base x Sub c Sup d Base EndRoot r
18	$\sqrt{{}_{a}^{b}x_{c}^{d} r}$	Root Sub a Sup b Base x Sub c Sup d Base r EndRoot
19	$\frac{1}{{}_{a}^{b}x_{c}^{d}}$	Frac 1 Over Sub a Sup b Base x Sub c Sup d EndFrac
20	$\frac{1}{{}_{a}^{b}x_{c}^{d}} r$	Frac 1 Over Sub a Sup b Base x Sub c Sup d Base EndFrac r
21	$\frac{1}{{}_{a}^{b}x_{c}^{d} r}$	Frac 1 Over Sub a Sup b Base x Sub c Sup d Base r EndFrac
22	${}^{b}x$	Sup b Base x
23	${}^{b}x r$	Sup b Base x r
24	$\sqrt{{}^{b}x} r$	Root Sup b Base x EndRoot r
25	$\sqrt{{}^{b}x r}$	Root Sup b Base x r EndRoot
26	$\frac{1}{{}^{b}x} r$	Frac 1 Over Sup b Base x EndFrac r
27	$\frac{1}{{}^{b}x r}$	Frac 1 Over Sup b Base x r EndFrac
28	${}^{b}x^{d}$	Sup b Base x Sup d
29	${}^{b}x^{d} r$	Sup b Base x Sup d Base r
30	$\sqrt{{}^{b}x^{d}} r$	Root Sup b Base x Sup d Base EndRoot r
31	$\sqrt{{}^{b}x^{d} r}$	Root Sup b Base x Sup d Base r EndRoot
32	$\frac{1}{{}^{b}x^{d}} r$	Frac 1 Over Sup b Base x Sup d Base EndFrac r
33	$\frac{1}{{}^{b}x^{d} r}$	Frac 1 Over Sup b Base x Sup d Base r EndFrac
34	${}^{b}x_{c}$	Sup b Base x Sub c
35	${}^{b}x_{c} r$	Sup b Base x Sub c Base r
36	$\sqrt{{}^{b}x_{c}} r$	Root Sup b Base x Sub c Base EndRoot r
37	$\sqrt{{}^{b}x_{c} r}$	Root Sup b Base x Sub c Base r EndRoot
38	$\frac{1}{{}^{b}x_{c}} r$	Frac 1 Over Sup b Base x Sub c Base EndFrac r
39	$\frac{1}{{}^{b}x_{c} r}$	Frac 1 Over Sup b Base x Sub c Base r EndFrac
40	${}^{b}x_{c}^{d}$	Sup b Base x Sub c Sup d
41	${}^{b}x_{c}^{d} r$	Sup b Base x Sub c Sup d Base r
42	$\sqrt{{}^{b}x_{c}^{d}} r$	Root Sup b Base x Sub c Sup d Base EndRoot r
43	$\sqrt{{}^{b}x_{c}^{d} r}$	Root Sup b Base x Sub c Sup d Base r EndRoot
44	$\frac{1}{{}^{b}x_{c}^{d}} r$	Frac 1 Over Sup b Base x Sub c Sup d Base EndFrac r
45	$\frac{1}{{}^{b}x_{c}^{d} r}$	Frac 1 Over Sup b Base x Sub c Sup d Base r EndFrac
46	${}_{a}x$	Sub a Base x
47	${}_{a}x r$	Sub a Base x r
48	$\sqrt{{}_{a}x} r$	Root Sub a Base x EndRoot r
49	$\sqrt{{}_{a}x r}$	Root Sub a Base x r EndRoot
50	$\frac{1}{{}_{a}x} r$	Frac 1 Over Sub a Base x EndFrac r
51	$\frac{1}{{}_{a}x r}$	Frac 1 Over Sub a Base x r EndFrac
52	${}_{a}x^{d}$	Sub a Base x Sup d
53	${}_{a}x^{d} r$	Sub a Base x Sup d Base r
54	$\sqrt{{}_{a}x^{d}} r$	Root Sub a Base x Sup d Base EndRoot r
55	$\sqrt{{}_{a}x^{d} r}$	Root Sub a Base x Sup d Base r EndRoot
56	$\frac{1}{{}_{a}x^{d}} r$	Frac 1 Over Sub a Base x Sup d Base EndFrac r
57	$\frac{1}{{}_{a}x^{d} r}$	Frac 1 Over Sub a Base x Sup d Base r EndFrac
58	${}_{a}x_{c}$	Sub a Base x Sub c
59	${}_{a}x_{c} r$	Sub a Base x Sub c Base r
60	$\sqrt{{}_{a}x_{c}} r$	Root Sub a Base x Sub c Base EndRoot r
61	$\sqrt{{}_{a}x_{c} r}$	Root Sub a Base x Sub c Base r EndRoot
62	$\frac{1}{{}_{a}x_{c}} r$	Frac 1 Over Sub a Base x Sub c Base EndFrac r
63	$\frac{1}{{}_{a}x_{c} r}$	Frac 1 Over Sub a Base x Sub c Base r EndFrac
64	${}_{a}x_{c}^{d}$	Sub a Base x Sub c Sup d
65	${}_{a}x_{c}^{d} r$	Sub a Base x Sub c Sup d Base r
66	$\sqrt{{}_{a}x_{c}^{d}} r$	Root Sub a Base x Sub c Sup d Base EndRoot r
67	$\sqrt{{}_{a}x_{c}^{d} r}$	Root Sub a Base x Sub c Sup d Base r EndRoot
68	$\frac{1}{{}_{a}x_{c}^{d}} r$	Frac 1 Over Sub a Base x Sub c Sup d Base EndFrac r
69	$\frac{1}{{}_{a}x_{c}^{d} r}$	Frac 1 Over Sub a Base x Sub c Sup d Base r EndFrac
70	${}_{a}^{b}x_{c^{l}}$	Sub a Sup b Base x Sub c Sub Sup l
71	${}_{a}^{b}x_{c_{l}}^{d}$	Sub a Sup b Base x Sub c Sub Sub l Sup d
72	${}_{a}^{b}x_{c_{l^{k}}}^{d}_{e}$	Sub a Sup b Base x Sub c Sub Sub l Sub Sub Sup k Sub e Sup d
73	${}_{a}^{b}x_{c^{l}}^{d}$	Sub a Sup b Base x Sub c Sub Sup l Sup d
74	${}_{a}^{b}x_{c k^{l}}^{d}$	Sub a Sup b Base x Sub c k Sub Sup l Sup d
75	${}_{a}^{b}x_{c}^{d} {}_{a}^{b}x_{c}^{d}$	Sub a Sup b Base x Sub c Sup d Base Sub a Sup b Base x Sub c Sup d

English Mathspeak tests. Locale: en, Style: Verbose.

0	$π \approx 3.14159$	pi almost equals 3.14159
1	$102 + 2,214 + 15 = 2,331$	102 plus 2,214 plus 15 equals 2,331
2	$59 \times 0 = 0$	59 times 0 equals 0
3	$3 - - 2$	3 minus negative 2
4	$- y$	negative y
5	$- 32$	negative 32
6	$t2e4$	Number t 2 e 4
7	$#FF0000$	Number number sign F F 0 0 0 0
8	$0x15FF + 0x2B01 = 0x4100$	Number 0 x 1 5 F F plus Number 0 x 2 B 0 1 equals Number 0 x 4 1 0 0
9	$I, II, III, IV, V .$	upper I comma UpperWord I I comma UpperWord I I I comma UpperWord I V comma upper V period
10	$d = \sqrt{{(X - x)}^{2} - {(Y - y)}^{2}}$	d equals StartRoot left parenthesis upper X minus x right parenthesis squared minus left parenthesis upper Y minus y right parenthesis squared EndRoot
11	$If A \to B and B \to C then A \to C .$	If upper A right arrow upper B and upper B right arrow upper C then upper A right arrow upper C period
12	$[x]$	bold left bracket x bold right bracket
13	$\oint E \cdot d l = - \frac{d Φ B}{d t}$	contour integral upper E dot d bold l equals minus StartFraction d upper Phi upper B Over d t EndFraction
14	$- \frac{1}{b}$	minus StartFraction 1 Over b EndFraction
15	$- \frac{a}{b}$	minus StartFraction a Over b EndFraction
16	$- 3 \frac{1}{2}$	negative 3 and one half
17	$Uppercase ({α, β, γ, δ, ϵ, φ}) = {Α, Β, Γ, Δ, Ε, Φ}$	Uppercase left parenthesis StartSet alpha comma beta comma gamma comma delta comma epsilon comma phi EndSet right parenthesis equals StartSet upper Alpha comma upper Beta comma upper Gamma comma upper Delta comma upper Epsilon comma upper Phi EndSet
18	$y - 1$	y minus 1
19	$(1 -to- 1)$	left parenthesis 1 hyphen to hyphen 1 right parenthesis
20	$- 1$	negative 1
21	$The Fibonacci numbers are: {0, 1, 1, 2, 3, 5, 8, \dots}$	The Fibonacci numbers are colon StartSet 0 comma 1 comma 1 comma 2 comma 3 comma 5 comma 8 comma ellipsis EndSet
22	$\| 4 - 7 \| = 3$	StartAbsoluteValue 4 minus 7 EndAbsoluteValue equals 3
23	$\|a \pm \|b - c\|\| \neq \|a\| \pm \|b - c\|$	StartAbsoluteValue a plus or minus StartAbsoluteValue b minus c EndAbsoluteValue EndAbsoluteValue not equals StartAbsoluteValue a EndAbsoluteValue plus or minus StartAbsoluteValue b minus c EndAbsoluteValue
24	$\frac{1}{x}$	StartFraction 1 Over x EndFraction
25	$a - \frac{b + c}{d - e} \times f$	a minus StartFraction b plus c Over d minus e EndFraction times f
26	$\frac{\frac{x}{y}}{z} \neq \frac{x}{\frac{y}{z}}$	StartStartFraction StartFraction x Over y EndFraction OverOver z EndEndFraction not equals StartStartFraction x OverOver StartFraction y Over z EndFraction EndEndFraction
27	$\frac{\frac{(1 - x) \frac{d}{d x} (2 x) - 2 x \frac{d}{d x} (1 - x)}{{(1 - x)}^{2}}}{1 + {(\frac{2 x}{1 - x})}^{2}}$	StartStartStartFraction StartStartFraction left parenthesis 1 minus x right parenthesis StartFraction d Over d x EndFraction left parenthesis 2 x right parenthesis minus 2 x StartFraction d Over d x EndFraction left parenthesis 1 minus x right parenthesis OverOver left parenthesis 1 minus x right parenthesis squared EndEndFraction OverOverOver 1 plus left parenthesis StartFraction 2 x Over 1 minus x EndFraction right parenthesis squared EndEndEndFraction
28	$a_{0} + \frac{1}{a_{1} + \frac{1}{a_{2} + \frac{1}{\dots + \frac{1}{a_{n}}}}}$	a 0 plus StartStartStartStartFraction 1 OverOverOverOver a 1 plus StartStartStartFraction 1 OverOverOver a 2 plus StartStartFraction 1 OverOver ellipsis plus StartFraction 1 Over a Subscript n Baseline EndFraction EndEndFraction EndEndEndFraction EndEndEndEndFraction
29	$\frac{1}{2} + \frac{2}{2} + \frac{3}{2} + \frac{4}{2} + \dots = \sum_{n = 1}^{\infty} \frac{n}{2}$	one half plus two halves plus three halves plus four halves plus ellipsis equals sigma summation Underscript n equals 1 Overscript infinity Endscripts StartFraction n Over 2 EndFraction
30	$\frac{20}{5} \times \frac{1}{100} = \frac{1}{25}$	StartFraction 20 Over 5 EndFraction times StartFraction 1 Over 100 EndFraction equals one twenty fifth
31	$\frac{\frac{3}{5}}{8} = \frac{3}{5} \times \frac{1}{8}$	StartFraction three fifths Over 8 EndFraction equals three fifths times one eighth
32	$3 \frac{5}{8} = \frac{29}{8}$	3 and five eighths equals StartFraction 29 Over 8 EndFraction
33	$a_{0} + \frac{b_{1}}{a_{1} + \frac{b_{2}}{a_{2} + \frac{b_{3}}{a_{3} + \dots}}} = a_{0} + \frac{b_{1}}{a_{1}} + \frac{b_{2}}{a_{2}} + \dots$	a 0 plus ContinuedFraction b 1 Over a 1 plus StartFraction b 2 Over a 2 plus StartFraction b 3 Over a 3 plus ellipsis equals a 0 plus StartFraction b 1 Over a 1 EndFraction plus StartFraction b 2 Over a 2 EndFraction plus ellipsis
34	$x^{3} + 6 x^{2} - x = 30$	x cubed plus 6 x squared minus x equals 30
35	$\frac{d^{2} y}{d x^{2}} + (a x^{2} + b x + c) y = 0$	StartFraction d squared y Over d x squared EndFraction plus left parenthesis a x squared plus b x plus c right parenthesis y equals 0
36	$x^{\frac{1}{2}}$	x Superscript one half
37	$x_{n}$	x Subscript n
38	$x^{a}$	x Superscript a
39	$x^{m + n}$	x Superscript m plus n
40	$T_{n - 1} + 5 = 0$	upper T Subscript n minus 1 Baseline plus 5 equals 0
41	$x^{m + n} = x^{m} x^{n}$	x Superscript m plus n Baseline equals x Superscript m Baseline x Superscript n
42	$x^{a_{n} + a_{n - 1}}$	x Superscript a Super Subscript n Superscript plus a Super Subscript n minus 1
43	$x^{a_{b}}$	x Superscript a Super Subscript b
44	$x_{a^{b}}$	x Subscript a Sub Superscript b
45	$y^{a^{b_{c}}} \neq y^{a^{b} c}$	y Superscript a Super Superscript b Super Super Subscript c Baseline not equals y Superscript a Super Superscript b Superscript c
46	$y^{a^{_{c} b}}$	y Superscript a Super Super Subscript c Super Superscript b
47	$y^{a^{_{c}}}$	y Superscript a Super Super Subscript c
48	$y_{a_{^{c}}}$	y Subscript a Sub Sub Superscript c
49	$y_{a_{^{c} b}}$	y Subscript a Sub Sub Superscript c Sub Subscript b
50	$x^{a^{b}}$	x Superscript a Super Superscript b
51	$x_{a_{b}}$	x Subscript a Sub Subscript b
52	$T^{(x^{a} + y^{b})}$	upper T Superscript left parenthesis x Super Superscript a Superscript plus y Super Superscript b Superscript right parenthesis
53	$x_{1}$	x 1
54	$x_{- 1}$	x Subscript negative 1
55	$x_{10,000}$	x 10,000
56	$x_{1.3}$	x 1.3
57	$4 Fe + 3 O_{2} \to 2 {Fe}_{2} O_{3}$	4 upper F e plus 3 upper O 2 right arrow 2 upper F e 2 upper O 3
58	$a_{2, 3}$	a Subscript 2 comma 3
59	$T_{n_{1} + n_{0}}$	upper T Subscript n 1 plus n 0
60	${log}_{2} (x) = \frac{{log}_{10} (x)}{{log}_{10} (2)}$	log Subscript 2 Baseline left parenthesis x right parenthesis equals StartFraction log Subscript 10 Baseline left parenthesis x right parenthesis Over log Subscript 10 Baseline left parenthesis 2 right parenthesis EndFraction
61	$Φ_{5}$	upper Phi 5
62	$ln x = \int_{1}^{x} \frac{d t}{t}$	ln x equals integral Subscript 1 Superscript x Baseline StartFraction d t Over t EndFraction
63	$$ n 2 = 2 * $ n + 1;$	dollar sign n Baseline 2 equals 2 asterisk dollar sign n plus 1 semicolon
64	$n 2$	n Baseline bold 2
65	${}_{c d}^{a b}x_{e f}^{g h}$	Subscript c d Superscript a b Baseline x Subscript e f Superscript g h
66	${}_{c}^{a}_{d}^{b}x_{e}^{g}_{f}^{h}$	Subscript c d Superscript a b Baseline x Subscript e f Superscript g h
67	$T_{0}^{2}$	upper T 0 squared
68	${T_{0}}^{2}$	upper T 0 squared
69	$T_{0}^{3}$	upper T 0 cubed
70	${T_{0}}^{3}$	upper T 0 cubed
71	$T_{n - 1}^{2}$	upper T Subscript n minus 1 Superscript 2
72	$x^{'}$	x prime
73	$f^{'''} (y) = \frac{d f^{''} (y)}{d y}$	f triple prime left parenthesis y right parenthesis equals StartFraction d f double prime left parenthesis y right parenthesis Over d y EndFraction
74	$ρ^{'} = ρ_{+}^{'} + ρ_{-}^{'}$	rho prime equals rho prime Subscript plus Baseline plus rho prime Subscript minus
75	$x_{10}^{'}$	x prime 10
76	$T_{n}^{'}$	upper T prime Subscript n
77	$[\begin{matrix} x^{n} & y^{n} & z^{n} \\ x^{n + 1} & y^{n + 1} & z^{n + 1} \end{matrix}]$	Start 2 By 3 Matrix 1st Row 1st Column x Superscript n 2nd Column y Superscript n 3rd Column z Superscript n 2nd Row 1st Column x Superscript n plus 1 2nd Column y Superscript n plus 1 3rd Column z Superscript n plus 1 EndMatrix
78	${x_{a}}^{b}$	x Subscript a Baseline Superscript b
79	${x^{b}}_{a}$	x Superscript b Baseline Subscript a
80	${log}^{4}^{b} x$	log Superscript 4 Superscript b Baseline x
81	$T_{n}_{a} y$	upper T Subscript n Subscript a Baseline y
82	$\sqrt{2}$	StartRoot 2 EndRoot
83	$\sqrt{m + n}$	StartRoot m plus n EndRoot
84	$\sqrt[m + n]{x + y}$	RootIndex m plus n StartRoot x plus y EndRoot
85	$\sqrt[n]{x^{m}} = {(\sqrt[n]{x})}^{m} = x^{\frac{m}{n}}, x > 0$	RootIndex n StartRoot x Superscript m Baseline EndRoot equals left parenthesis RootIndex n StartRoot x EndRoot right parenthesis Superscript m Baseline equals x Superscript StartFraction m Over n EndFraction Baseline comma x greater than 0
86	$\sqrt[3]{x} = x^{\frac{1}{3}}$	RootIndex 3 StartRoot x EndRoot equals x Superscript one third
87	$\sqrt{\sqrt{x + 1} + \sqrt{y + 1}}$	NestedStartRoot StartRoot x plus 1 EndRoot plus StartRoot y plus 1 EndRoot NestedEndRoot
88	$\sqrt[n]{\sqrt[m]{x}} = \sqrt[m]{\sqrt[n]{x}}$	NestedRootIndex n NestedStartRoot RootIndex m StartRoot x EndRoot NestedEndRoot equals NestedRootIndex m NestedStartRoot RootIndex n StartRoot x EndRoot NestedEndRoot
89	$x^{e - 2} = \sqrt{x \sqrt[3]{x \sqrt[4]{x \sqrt[5]{x \dots}}}}, x \in ℝ$	x Superscript e minus 2 Baseline equals Nested3StartRoot x NestedTwiceRootIndex 3 NestedTwiceStartRoot x NestedRootIndex 4 NestedStartRoot x RootIndex 5 StartRoot x ellipsis EndRoot NestedEndRoot NestedTwiceEndRoot Nested3EndRoot comma x element of double struck upper R
90	$\frac{2}{π} = \frac{\sqrt{2}}{2} \frac{\sqrt{2 + \sqrt{2}}}{2} \frac{\sqrt{2 + \sqrt{2 + \sqrt{2}}}}{2} \dots$	StartFraction 2 Over pi EndFraction equals StartFraction StartRoot 2 EndRoot Over 2 EndFraction StartFraction NestedStartRoot 2 plus StartRoot 2 EndRoot NestedEndRoot Over 2 EndFraction StartFraction NestedTwiceStartRoot 2 plus NestedStartRoot 2 plus StartRoot 2 EndRoot NestedEndRoot NestedTwiceEndRoot Over 2 EndFraction ellipsis
91	$\frac{5 x y}{2 y} = \frac{5}{2} x$	StartFraction 5 x CrossOut y EndCrossOut Over 2 CrossOut y EndCrossOut EndFraction equals five halves x
92	$\frac{12}{18} = \frac{\overset{2}{12}}{\underset{3}{18}} = \frac{2}{3}$	StartFraction 12 Over 18 EndFraction equals StartFraction CrossOut 12 With 2 EndCrossOut Over CrossOut 18 With 3 EndCrossOut EndFraction equals two thirds
93	$\frac{12}{18} = \frac{\underset{12}{2}}{\overset{18}{3}} = \frac{2}{3}$	StartFraction 12 Over 18 EndFraction equals StartFraction CrossOut 12 With 2 EndCrossOut Over CrossOut 18 With 3 EndCrossOut EndFraction equals two thirds
94	$\ddot{x}$	ModifyingAbove x With two dots
95	$\vec{x + y}$	ModifyingAbove x plus y With right arrow
96	$\hat{x}$	ModifyingAbove x With caret
97	$\underset{˙}{x}$	ModifyingBelow x With dot
98	$\tilde{x}$	x overtilde
99	$\bar{x}$	x overbar
100	$\underset{˜}{y}$	y undertilde
101	$\bar{\bar{x}}$	x overbar overbar
102	$\underline{\underline{\bar{\bar{y}}}}$	y overbar overbar underbar underbar
103	$\underset{*}{\underline{a + b}}$	ModifyingBelow Below ModifyingBelow a plus b With bar With asterisk
104	$\bar{\tilde{x + y}}$	ModifyingAbove Above ModifyingAbove x plus y With tilde With bar
105	$\sum_{n = 1}^{\infty} a_{n}$	sigma summation Underscript n equals 1 Overscript infinity Endscripts a Subscript n
106	$\underset{b = 3}{\underset{a = 5}{\underline{x + y}}}$	ModifyingBelow x plus y With bar Underscript a equals 5 UnderUnderscript b equals 3 Endscripts
107	$\overset{m = 2}{\overset{n = 1}{\bar{x + y}}}$	ModifyingAbove x plus y With bar Overscript n equals 1 OverOverscript m equals 2 Endscripts
108	${log}_{b} x$	log Subscript b Baseline x
109	$cos y$	cosine y
110	$sin x$	sine x
111	$\frac{60 mi}{hr} \times \frac{5,280 ft}{1 mi} \times \frac{1 hr}{60 \min} = \frac{5,280 ft}{\min}$	StartFraction 60 CrossOut miles EndCrossOut Over CrossOut hours EndCrossOut EndFraction times StartFraction 5,280 feet Over 1 CrossOut miles EndCrossOut EndFraction times StartFraction 1 CrossOut hours EndCrossOut Over 60 minutes EndFraction equals StartFraction 5,280 feet Over minutes EndFraction
112	$1 J = 1 kg \cdot m^{2} \cdot s^{- 2}$	1 joules equals 1 kilograms dot meters squared dot seconds Superscript negative 2
113	$m m = 100 m cm = \frac{m}{1,000} km$	m meters equals 100 m centimeters equals StartFraction m Over 1,000 EndFraction kilometers
114	$1 mi \approx 1.6 km$	1 miles almost equals 1.6 kilometers
115	$1 in = 2.54 cm$	1 inches equals 2.54 centimeters
116	$\begin{matrix} H_{2} & + & F_{2} & \to & 2 H F \\ hydrogen & fluorine & hydrogen fluoride \end{matrix}$	StartLayout 1st Row 1st Column upper H 2 2nd Column plus 3rd Column upper F 2 4th Column right arrow 5th Column 2 upper H upper F 2nd Row 1st Column hydrogen 2nd Column Blank 3rd Column fluorine 4th Column Blank 5th Column hydrogen fluoride EndLayout
117	$x = \{\begin{matrix} y < 0 & 0 \\ y \geq 0 & 2 y \end{matrix}$	x equals StartLayout Enlarged left brace 1st Row 1st Column y less than 0 2nd Column 0 2nd Row 1st Column y greater than or equals 0 2nd Column 2 y EndLayout
118	$[\begin{matrix} x + a & x + b & x + c \\ y + a & y + b & y + c \\ z + a & z + b & z + c \end{matrix}]$	Start 3 By 3 Matrix 1st Row 1st Column x plus a 2nd Column x plus b 3rd Column x plus c 2nd Row 1st Column y plus a 2nd Column y plus b 3rd Column y plus c 3rd Row 1st Column z plus a 2nd Column z plus b 3rd Column z plus c EndMatrix
119	$\|\begin{matrix} a + 1 & b \\ c & d \end{matrix}\| = (a + 1) d - b c$	Start 2 By 2 Determinant 1st Row 1st Column a plus 1 2nd Column b 2nd Row 1st Column c 2nd Column d EndDeterminant equals left parenthesis a plus 1 right parenthesis d minus b c
120	$\|\begin{matrix} a & b \\ c & d \end{matrix}\| = a d - b c$	Start 2 By 2 Determinant 1st Row a b 2nd Row c d EndDeterminant equals a d minus b c
121	$(\begin{matrix} x \\ y \end{matrix})$	StartBinomialOrMatrix x Choose y EndBinomialOrMatrix

English Mathspeak tests. Locale: en, Style: Brief.

0	$π \approx 3.14159$	pi almost equals 3.14159
1	$102 + 2,214 + 15 = 2,331$	102 plus 2,214 plus 15 equals 2,331
2	$59 \times 0 = 0$	59 times 0 equals 0
3	$3 - - 2$	3 minus negative 2
4	$- y$	negative y
5	$- 32$	negative 32
6	$t2e4$	Num t 2 e 4
7	$#FF0000$	Num num sign F F 0 0 0 0
8	$0x15FF + 0x2B01 = 0x4100$	Num 0 x 1 5 F F plus Num 0 x 2 B 0 1 equals Num 0 x 4 1 0 0
9	$I, II, III, IV, V .$	upper I comma UpperWord I I comma UpperWord I I I comma UpperWord I V comma upper V period
10	$d = \sqrt{{(X - x)}^{2} - {(Y - y)}^{2}}$	d equals StartRoot left p'ren upper X minus x right p'ren squared minus left p'ren upper Y minus y right p'ren squared EndRoot
11	$If A \to B and B \to C then A \to C .$	If upper A right arrow upper B and upper B right arrow upper C then upper A right arrow upper C period
12	$[x]$	bold left brack x bold right brack
13	$\oint E \cdot d l = - \frac{d Φ B}{d t}$	contour integral upper E dot d bold l equals minus StartFrac d upper Phi upper B Over d t EndFrac
14	$Uppercase ({α, β, γ, δ, ϵ, φ}) = {Α, Β, Γ, Δ, Ε, Φ}$	Uppercase left p'ren StartSet alpha comma beta comma gamma comma delta comma epsilon comma phi EndSet right p'ren equals StartSet upper Alpha comma upper Beta comma upper Gamma comma upper Delta comma upper Epsilon comma upper Phi EndSet
15	$y - 1$	y minus 1
16	$(1 -to- 1)$	left p'ren 1 hyphen to hyphen 1 right p'ren
17	$- 1$	negative 1
18	$The Fibonacci numbers are: {0, 1, 1, 2, 3, 5, 8, \dots}$	The Fibonacci numbers are colon StartSet 0 comma 1 comma 1 comma 2 comma 3 comma 5 comma 8 comma ellipsis EndSet
19	$\| 4 - 7 \| = 3$	StartAbsoluteValue 4 minus 7 EndAbsoluteValue equals 3
20	$\|a \pm \|b - c\|\| \neq \|a\| \pm \|b - c\|$	StartAbsoluteValue a plus or minus StartAbsoluteValue b minus c EndAbsoluteValue EndAbsoluteValue not equals StartAbsoluteValue a EndAbsoluteValue plus or minus StartAbsoluteValue b minus c EndAbsoluteValue
21	$\frac{1}{x}$	StartFrac 1 Over x EndFrac
22	$a - \frac{b + c}{d - e} \times f$	a minus StartFrac b plus c Over d minus e EndFrac times f
23	$\frac{\frac{x}{y}}{z} \neq \frac{x}{\frac{y}{z}}$	StartStartFrac StartFrac x Over y EndFrac OverOver z EndEndFrac not equals StartStartFrac x OverOver StartFrac y Over z EndFrac EndEndFrac
24	$\frac{\frac{(1 - x) \frac{d}{d x} (2 x) - 2 x \frac{d}{d x} (1 - x)}{{(1 - x)}^{2}}}{1 + {(\frac{2 x}{1 - x})}^{2}}$	StartStartStartFrac StartStartFrac left p'ren 1 minus x right p'ren StartFrac d Over d x EndFrac left p'ren 2 x right p'ren minus 2 x StartFrac d Over d x EndFrac left p'ren 1 minus x right p'ren OverOver left p'ren 1 minus x right p'ren squared EndEndFrac OverOverOver 1 plus left p'ren StartFrac 2 x Over 1 minus x EndFrac right p'ren squared EndEndEndFrac
25	$a_{0} + \frac{1}{a_{1} + \frac{1}{a_{2} + \frac{1}{\dots + \frac{1}{a_{n}}}}}$	a 0 plus StartStartStartStartFrac 1 OverOverOverOver a 1 plus StartStartStartFrac 1 OverOverOver a 2 plus StartStartFrac 1 OverOver ellipsis plus StartFrac 1 Over a Sub n Base EndFrac EndEndFrac EndEndEndFrac EndEndEndEndFrac
26	$\frac{1}{2} + \frac{2}{2} + \frac{3}{2} + \frac{4}{2} + \dots = \sum_{n = 1}^{\infty} \frac{n}{2}$	one half plus two halves plus three halves plus four halves plus ellipsis equals sigma summation Underscript n equals 1 Overscript infinity Endscripts StartFrac n Over 2 EndFrac
27	$\frac{20}{5} \times \frac{1}{100} = \frac{1}{25}$	StartFrac 20 Over 5 EndFrac times StartFrac 1 Over 100 EndFrac equals one twenty fifth
28	$\frac{\frac{3}{5}}{8} = \frac{3}{5} \times \frac{1}{8}$	StartFrac three fifths Over 8 EndFrac equals three fifths times one eighth
29	$3 \frac{5}{8} = \frac{29}{8}$	3 and five eighths equals StartFrac 29 Over 8 EndFrac
30	$a_{0} + \frac{b_{1}}{a_{1} + \frac{b_{2}}{a_{2} + \frac{b_{3}}{a_{3} + \dots}}} = a_{0} + \frac{b_{1}}{a_{1}} + \frac{b_{2}}{a_{2}} + \dots$	a 0 plus ContinuedFrac b 1 Over a 1 plus StartFrac b 2 Over a 2 plus StartFrac b 3 Over a 3 plus ellipsis equals a 0 plus StartFrac b 1 Over a 1 EndFrac plus StartFrac b 2 Over a 2 EndFrac plus ellipsis
31	$x^{3} + 6 x^{2} - x = 30$	x cubed plus 6 x squared minus x equals 30
32	$\frac{d^{2} y}{d x^{2}} + (a x^{2} + b x + c) y = 0$	StartFrac d squared y Over d x squared EndFrac plus left p'ren a x squared plus b x plus c right p'ren y equals 0
33	$x^{\frac{1}{2}}$	x Sup one half
34	$x_{n}$	x Sub n
35	$x^{a}$	x Sup a
36	$x^{m + n}$	x Sup m plus n
37	$T_{n - 1} + 5 = 0$	upper T Sub n minus 1 Base plus 5 equals 0
38	$x^{m + n} = x^{m} x^{n}$	x Sup m plus n Base equals x Sup m Base x Sup n
39	$x^{a_{n} + a_{n - 1}}$	x Sup a Sup Sub n Sup plus a Sup Sub n minus 1
40	$x^{a_{b}}$	x Sup a Sup Sub b
41	$x_{a^{b}}$	x Sub a Sub Sup b
42	$y^{a^{b_{c}}} \neq y^{a^{b} c}$	y Sup a Sup Sup b Sup Sup Sub c Base not equals y Sup a Sup Sup b Sup c
43	$y^{a^{_{c} b}}$	y Sup a Sup Sup Sub c Sup Sup b
44	$y^{a^{_{c}}}$	y Sup a Sup Sup Sub c
45	$y_{a_{^{c}}}$	y Sub a Sub Sub Sup c
46	$y_{a_{^{c} b}}$	y Sub a Sub Sub Sup c Sub Sub b
47	$x^{a^{b}}$	x Sup a Sup Sup b
48	$x_{a_{b}}$	x Sub a Sub Sub b
49	$T^{(x^{a} + y^{b})}$	upper T Sup left p'ren x Sup Sup a Sup plus y Sup Sup b Sup right p'ren
50	$x_{1}$	x 1
51	$x_{- 1}$	x Sub negative 1
52	$x_{10,000}$	x 10,000
53	$x_{1.3}$	x 1.3
54	$4 Fe + 3 O_{2} \to 2 {Fe}_{2} O_{3}$	4 upper F e plus 3 upper O 2 right arrow 2 upper F e 2 upper O 3
55	$a_{2, 3}$	a Sub 2 comma 3
56	$T_{n_{1} + n_{0}}$	upper T Sub n 1 plus n 0
57	${log}_{2} (x) = \frac{{log}_{10} (x)}{{log}_{10} (2)}$	log Sub 2 Base left p'ren x right p'ren equals StartFrac log Sub 10 Base left p'ren x right p'ren Over log Sub 10 Base left p'ren 2 right p'ren EndFrac
58	$Φ_{5}$	upper Phi 5
59	$ln x = \int_{1}^{x} \frac{d t}{t}$	ln x equals integral Sub 1 Sup x Base StartFrac d t Over t EndFrac
60	$$ n 2 = 2 * $ n + 1;$	dollar sign n Base 2 equals 2 asterisk dollar sign n plus 1 semicolon
61	$n 2$	n Base bold 2
62	${}_{c d}^{a b}x_{e f}^{g h}$	Sub c d Sup a b Base x Sub e f Sup g h
63	${}_{c}^{a}_{d}^{b}x_{e}^{g}_{f}^{h}$	Sub c d Sup a b Base x Sub e f Sup g h
64	$T_{0}^{2}$	upper T 0 squared
65	${T_{0}}^{2}$	upper T 0 squared
66	$T_{0}^{3}$	upper T 0 cubed
67	${T_{0}}^{3}$	upper T 0 cubed
68	$T_{n - 1}^{2}$	upper T Sub n minus 1 Sup 2
69	$x^{'}$	x prime
70	$f^{'''} (y) = \frac{d f^{''} (y)}{d y}$	f triple prime left p'ren y right p'ren equals StartFrac d f double prime left p'ren y right p'ren Over d y EndFrac
71	$ρ^{'} = ρ_{+}^{'} + ρ_{-}^{'}$	rho prime equals rho prime Sub plus Base plus rho prime Sub minus
72	$x_{10}^{'}$	x prime 10
73	$T_{n}^{'}$	upper T prime Sub n
74	$[\begin{matrix} x^{n} & y^{n} & z^{n} \\ x^{n + 1} & y^{n + 1} & z^{n + 1} \end{matrix}]$	Start 2 By 3 Matrix 1st Row 1st Column x Sup n 2nd Column y Sup n 3rd Column z Sup n 2nd Row 1st Column x Sup n plus 1 2nd Column y Sup n plus 1 3rd Column z Sup n plus 1 EndMatrix
75	${x_{a}}^{b}$	x Sub a Base Sup b
76	${x^{b}}_{a}$	x Sup b Base Sub a
77	${log}^{4}^{b} x$	log Sup 4 Sup b Base x
78	$T_{n}_{a} y$	upper T Sub n Sub a Base y
79	$\sqrt{2}$	StartRoot 2 EndRoot
80	$\sqrt{m + n}$	StartRoot m plus n EndRoot
81	$\sqrt[m + n]{x + y}$	RootIndex m plus n StartRoot x plus y EndRoot
82	$\sqrt[n]{x^{m}} = {(\sqrt[n]{x})}^{m} = x^{\frac{m}{n}}, x > 0$	RootIndex n StartRoot x Sup m Base EndRoot equals left p'ren RootIndex n StartRoot x EndRoot right p'ren Sup m Base equals x Sup StartFrac m Over n EndFrac Base comma x greater than 0
83	$\sqrt[3]{x} = x^{\frac{1}{3}}$	RootIndex 3 StartRoot x EndRoot equals x Sup one third
84	$\sqrt{\sqrt{x + 1} + \sqrt{y + 1}}$	NestStartRoot StartRoot x plus 1 EndRoot plus StartRoot y plus 1 EndRoot NestEndRoot
85	$\sqrt[n]{\sqrt[m]{x}} = \sqrt[m]{\sqrt[n]{x}}$	NestRootIndex n NestStartRoot RootIndex m StartRoot x EndRoot NestEndRoot equals NestRootIndex m NestStartRoot RootIndex n StartRoot x EndRoot NestEndRoot
86	$x^{e - 2} = \sqrt{x \sqrt[3]{x \sqrt[4]{x \sqrt[5]{x \dots}}}}, x \in ℝ$	x Sup e minus 2 Base equals Nest3StartRoot x NestTwiceRootIndex 3 NestTwiceStartRoot x NestRootIndex 4 NestStartRoot x RootIndex 5 StartRoot x ellipsis EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot comma x element of double struck upper R
87	$\frac{2}{π} = \frac{\sqrt{2}}{2} \frac{\sqrt{2 + \sqrt{2}}}{2} \frac{\sqrt{2 + \sqrt{2 + \sqrt{2}}}}{2} \dots$	StartFrac 2 Over pi EndFrac equals StartFrac StartRoot 2 EndRoot Over 2 EndFrac StartFrac NestStartRoot 2 plus StartRoot 2 EndRoot NestEndRoot Over 2 EndFrac StartFrac NestTwiceStartRoot 2 plus NestStartRoot 2 plus StartRoot 2 EndRoot NestEndRoot NestTwiceEndRoot Over 2 EndFrac ellipsis
88	$\frac{5 x y}{2 y} = \frac{5}{2} x$	StartFrac 5 x CrossOut y EndCrossOut Over 2 CrossOut y EndCrossOut EndFrac equals five halves x
89	$\frac{12}{18} = \frac{\overset{2}{12}}{\underset{3}{18}} = \frac{2}{3}$	StartFrac 12 Over 18 EndFrac equals StartFrac CrossOut 12 With 2 EndCrossOut Over CrossOut 18 With 3 EndCrossOut EndFrac equals two thirds
90	$\frac{12}{18} = \frac{\underset{12}{2}}{\overset{18}{3}} = \frac{2}{3}$	StartFrac 12 Over 18 EndFrac equals StartFrac CrossOut 12 With 2 EndCrossOut Over CrossOut 18 With 3 EndCrossOut EndFrac equals two thirds
91	$\ddot{x}$	ModAbove x With two dots
92	$\vec{x + y}$	ModAbove x plus y With right arrow
93	$\hat{x}$	ModAbove x With caret
94	$\underset{˙}{x}$	ModBelow x With dot
95	$\tilde{x}$	x overtilde
96	$\bar{x}$	x overbar
97	$\underset{˜}{y}$	y undertilde
98	$\bar{\bar{x}}$	x overbar overbar
99	$\underline{\underline{\bar{\bar{y}}}}$	y overbar overbar underbar underbar
100	$\underset{*}{\underline{a + b}}$	ModBelow Below ModBelow a plus b With bar With asterisk
101	$\bar{\tilde{x + y}}$	ModAbove Above ModAbove x plus y With tilde With bar
102	$\sum_{n = 1}^{\infty} a_{n}$	sigma summation Underscript n equals 1 Overscript infinity Endscripts a Sub n
103	$\underset{b = 3}{\underset{a = 5}{\underline{x + y}}}$	ModBelow x plus y With bar Underscript a equals 5 UnderUnderscript b equals 3 Endscripts
104	$\overset{m = 2}{\overset{n = 1}{\bar{x + y}}}$	ModAbove x plus y With bar Overscript n equals 1 OverOverscript m equals 2 Endscripts
105	${log}_{b} x$	log Sub b Base x
106	$cos y$	cosine y
107	$sin x$	sine x
108	$\frac{60 mi}{hr} \times \frac{5,280 ft}{1 mi} \times \frac{1 hr}{60 \min} = \frac{5,280 ft}{\min}$	StartFrac 60 CrossOut miles EndCrossOut Over CrossOut hours EndCrossOut EndFrac times StartFrac 5,280 feet Over 1 CrossOut miles EndCrossOut EndFrac times StartFrac 1 CrossOut hours EndCrossOut Over 60 minutes EndFrac equals StartFrac 5,280 feet Over minutes EndFrac
109	$1 J = 1 kg \cdot m^{2} \cdot s^{- 2}$	1 joules equals 1 kilograms dot meters squared dot seconds Sup negative 2
110	$m m = 100 m cm = \frac{m}{1,000} km$	m meters equals 100 m centimeters equals StartFrac m Over 1,000 EndFrac kilometers
111	$1 mi \approx 1.6 km$	1 miles almost equals 1.6 kilometers
112	$1 in = 2.54 cm$	1 inches equals 2.54 centimeters
113	$\begin{matrix} H_{2} & + & F_{2} & \to & 2 H F \\ hydrogen & fluorine & hydrogen fluoride \end{matrix}$	StartLayout 1st Row 1st Column upper H 2 2nd Column plus 3rd Column upper F 2 4th Column right arrow 5th Column 2 upper H upper F 2nd Row 1st Column hydrogen 2nd Column Blank 3rd Column fluorine 4th Column Blank 5th Column hydrogen fluoride EndLayout
114	$x = \{\begin{matrix} y < 0 & 0 \\ y \geq 0 & 2 y \end{matrix}$	x equals StartLayout Enlarged left brace 1st Row 1st Column y less than 0 2nd Column 0 2nd Row 1st Column y greater than or equals 0 2nd Column 2 y EndLayout
115	$[\begin{matrix} x + a & x + b & x + c \\ y + a & y + b & y + c \\ z + a & z + b & z + c \end{matrix}]$	Start 3 By 3 Matrix 1st Row 1st Column x plus a 2nd Column x plus b 3rd Column x plus c 2nd Row 1st Column y plus a 2nd Column y plus b 3rd Column y plus c 3rd Row 1st Column z plus a 2nd Column z plus b 3rd Column z plus c EndMatrix
116	$\|\begin{matrix} a + 1 & b \\ c & d \end{matrix}\| = (a + 1) d - b c$	Start 2 By 2 Determinant 1st Row 1st Column a plus 1 2nd Column b 2nd Row 1st Column c 2nd Column d EndDeterminant equals left p'ren a plus 1 right p'ren d minus b c
117	$\|\begin{matrix} a & b \\ c & d \end{matrix}\| = a d - b c$	Start 2 By 2 Determinant 1st Row a b 2nd Row c d EndDeterminant equals a d minus b c
118	$(\begin{matrix} x \\ y \end{matrix})$	StartBinomialOrMatrix x Choose y EndBinomialOrMatrix

English Mathspeak tests. Locale: en, Style: Superbrief.

0	$π \approx 3.14159$	pi almost equals 3.14159
1	$102 + 2,214 + 15 = 2,331$	102 plus 2,214 plus 15 equals 2,331
2	$59 \times 0 = 0$	59 times 0 equals 0
3	$3 - - 2$	3 minus negative 2
4	$- y$	negative y
5	$- 32$	negative 32
6	$t2e4$	Num t 2 e 4
7	$#FF0000$	Num num sign F F 0 0 0 0
8	$0x15FF + 0x2B01 = 0x4100$	Num 0 x 1 5 F F plus Num 0 x 2 B 0 1 equals Num 0 x 4 1 0 0
9	$I, II, III, IV, V .$	upper I comma UpperWord I I comma UpperWord I I I comma UpperWord I V comma upper V period
10	$d = \sqrt{{(X - x)}^{2} - {(Y - y)}^{2}}$	d equals Root L p'ren upper X minus x R p'ren squared minus L p'ren upper Y minus y R p'ren squared EndRoot
11	$If A \to B and B \to C then A \to C .$	If upper A R arrow upper B and upper B R arrow upper C then upper A R arrow upper C period
12	$[x]$	bold L brack x bold R brack
13	$\oint E \cdot d l = - \frac{d Φ B}{d t}$	contour integral upper E dot d bold l equals minus Frac d upper Phi upper B Over d t EndFrac
14	$Uppercase ({α, β, γ, δ, ϵ, φ}) = {Α, Β, Γ, Δ, Ε, Φ}$	Uppercase L p'ren Set alpha comma beta comma gamma comma delta comma epsilon comma phi EndSet R p'ren equals Set upper Alpha comma upper Beta comma upper Gamma comma upper Delta comma upper Epsilon comma upper Phi EndSet
15	$y - 1$	y minus 1
16	$(1 -to- 1)$	L p'ren 1 hyphen to hyphen 1 R p'ren
17	$- 1$	negative 1
18	$The Fibonacci numbers are: {0, 1, 1, 2, 3, 5, 8, \dots}$	The Fibonacci numbers are colon Set 0 comma 1 comma 1 comma 2 comma 3 comma 5 comma 8 comma ellipsis EndSet
19	$\| 4 - 7 \| = 3$	AbsoluteValue 4 minus 7 EndAbsoluteValue equals 3
20	$\|a \pm \|b - c\|\| \neq \|a\| \pm \|b - c\|$	AbsoluteValue a plus or minus AbsoluteValue b minus c EndAbsoluteValue EndAbsoluteValue not equals AbsoluteValue a EndAbsoluteValue plus or minus AbsoluteValue b minus c EndAbsoluteValue
21	$\frac{1}{x}$	Frac 1 Over x EndFrac
22	$a - \frac{b + c}{d - e} \times f$	a minus Frac b plus c Over d minus e EndFrac times f
23	$\frac{\frac{x}{y}}{z} \neq \frac{x}{\frac{y}{z}}$	NestFrac Frac x Over y EndFrac NestOver z NestEndFrac not equals NestFrac x NestOver Frac y Over z EndFrac NestEndFrac
24	$\frac{\frac{(1 - x) \frac{d}{d x} (2 x) - 2 x \frac{d}{d x} (1 - x)}{{(1 - x)}^{2}}}{1 + {(\frac{2 x}{1 - x})}^{2}}$	NestTwiceFrac NestFrac L p'ren 1 minus x R p'ren Frac d Over d x EndFrac L p'ren 2 x R p'ren minus 2 x Frac d Over d x EndFrac L p'ren 1 minus x R p'ren NestOver L p'ren 1 minus x R p'ren squared NestEndFrac NestTwiceOver 1 plus L p'ren Frac 2 x Over 1 minus x EndFrac R p'ren squared NestTwiceEndFrac
25	$a_{0} + \frac{1}{a_{1} + \frac{1}{a_{2} + \frac{1}{\dots + \frac{1}{a_{n}}}}}$	a 0 plus Nest3Frac 1 Nest3Over a 1 plus NestTwiceFrac 1 NestTwiceOver a 2 plus NestFrac 1 NestOver ellipsis plus Frac 1 Over a Sub n Base EndFrac NestEndFrac NestTwiceEndFrac Nest3EndFrac
26	$\frac{1}{2} + \frac{2}{2} + \frac{3}{2} + \frac{4}{2} + \dots = \sum_{n = 1}^{\infty} \frac{n}{2}$	one half plus two halves plus three halves plus four halves plus ellipsis equals sigma summation Underscript n equals 1 Overscript infinity Endscripts Frac n Over 2 EndFrac
27	$\frac{20}{5} \times \frac{1}{100} = \frac{1}{25}$	Frac 20 Over 5 EndFrac times Frac 1 Over 100 EndFrac equals one twenty fifth
28	$\frac{\frac{3}{5}}{8} = \frac{3}{5} \times \frac{1}{8}$	Frac three fifths Over 8 EndFrac equals three fifths times one eighth
29	$3 \frac{5}{8} = \frac{29}{8}$	3 and five eighths equals Frac 29 Over 8 EndFrac
30	$a_{0} + \frac{b_{1}}{a_{1} + \frac{b_{2}}{a_{2} + \frac{b_{3}}{a_{3} + \dots}}} = a_{0} + \frac{b_{1}}{a_{1}} + \frac{b_{2}}{a_{2}} + \dots$	a 0 plus ContinuedFrac b 1 Over a 1 plus Frac b 2 Over a 2 plus Frac b 3 Over a 3 plus ellipsis equals a 0 plus Frac b 1 Over a 1 EndFrac plus Frac b 2 Over a 2 EndFrac plus ellipsis
31	$x^{3} + 6 x^{2} - x = 30$	x cubed plus 6 x squared minus x equals 30
32	$\frac{d^{2} y}{d x^{2}} + (a x^{2} + b x + c) y = 0$	Frac d squared y Over d x squared EndFrac plus L p'ren a x squared plus b x plus c R p'ren y equals 0
33	$x^{\frac{1}{2}}$	x Sup one half
34	$x_{n}$	x Sub n
35	$x^{a}$	x Sup a
36	$x^{m + n}$	x Sup m plus n
37	$T_{n - 1} + 5 = 0$	upper T Sub n minus 1 Base plus 5 equals 0
38	$x^{m + n} = x^{m} x^{n}$	x Sup m plus n Base equals x Sup m Base x Sup n
39	$x^{a_{n} + a_{n - 1}}$	x Sup a Sup Sub n Sup plus a Sup Sub n minus 1
40	$x^{a_{b}}$	x Sup a Sup Sub b
41	$x_{a^{b}}$	x Sub a Sub Sup b
42	$y^{a^{b_{c}}} \neq y^{a^{b} c}$	y Sup a Sup Sup b Sup Sup Sub c Base not equals y Sup a Sup Sup b Sup c
43	$y^{a^{_{c} b}}$	y Sup a Sup Sup Sub c Sup Sup b
44	$y^{a^{_{c}}}$	y Sup a Sup Sup Sub c
45	$y_{a_{^{c}}}$	y Sub a Sub Sub Sup c
46	$y_{a_{^{c} b}}$	y Sub a Sub Sub Sup c Sub Sub b
47	$x^{a^{b}}$	x Sup a Sup Sup b
48	$x_{a_{b}}$	x Sub a Sub Sub b
49	$T^{(x^{a} + y^{b})}$	upper T Sup L p'ren x Sup Sup a Sup plus y Sup Sup b Sup R p'ren
50	$x_{1}$	x 1
51	$x_{- 1}$	x Sub negative 1
52	$x_{10,000}$	x 10,000
53	$x_{1.3}$	x 1.3
54	$4 Fe + 3 O_{2} \to 2 {Fe}_{2} O_{3}$	4 upper F e plus 3 upper O 2 R arrow 2 upper F e 2 upper O 3
55	$a_{2, 3}$	a Sub 2 comma 3
56	$T_{n_{1} + n_{0}}$	upper T Sub n 1 plus n 0
57	${log}_{2} (x) = \frac{{log}_{10} (x)}{{log}_{10} (2)}$	log Sub 2 Base L p'ren x R p'ren equals Frac log Sub 10 Base L p'ren x R p'ren Over log Sub 10 Base L p'ren 2 R p'ren EndFrac
58	$Φ_{5}$	upper Phi 5
59	$ln x = \int_{1}^{x} \frac{d t}{t}$	ln x equals integral Sub 1 Sup x Base Frac d t Over t EndFrac
60	$$ n 2 = 2 * $ n + 1;$	dollar sign n Base 2 equals 2 asterisk dollar sign n plus 1 semicolon
61	$n 2$	n Base bold 2
62	${}_{c d}^{a b}x_{e f}^{g h}$	Sub c d Sup a b Base x Sub e f Sup g h
63	${}_{c}^{a}_{d}^{b}x_{e}^{g}_{f}^{h}$	Sub c d Sup a b Base x Sub e f Sup g h
64	$T_{0}^{2}$	upper T 0 squared
65	${T_{0}}^{2}$	upper T 0 squared
66	$T_{0}^{3}$	upper T 0 cubed
67	${T_{0}}^{3}$	upper T 0 cubed
68	$T_{n - 1}^{2}$	upper T Sub n minus 1 Sup 2
69	$x^{'}$	x prime
70	$f^{'''} (y) = \frac{d f^{''} (y)}{d y}$	f triple prime L p'ren y R p'ren equals Frac d f double prime L p'ren y R p'ren Over d y EndFrac
71	$ρ^{'} = ρ_{+}^{'} + ρ_{-}^{'}$	rho prime equals rho prime Sub plus Base plus rho prime Sub minus
72	$x_{10}^{'}$	x prime 10
73	$T_{n}^{'}$	upper T prime Sub n
74	$[\begin{matrix} x^{n} & y^{n} & z^{n} \\ x^{n + 1} & y^{n + 1} & z^{n + 1} \end{matrix}]$	2 By 3 Matrix 1st Row 1st Column x Sup n 2nd Column y Sup n 3rd Column z Sup n 2nd Row 1st Column x Sup n plus 1 2nd Column y Sup n plus 1 3rd Column z Sup n plus 1 EndMatrix
75	${x_{a}}^{b}$	x Sub a Base Sup b
76	${x^{b}}_{a}$	x Sup b Base Sub a
77	${log}^{4}^{b} x$	log Sup 4 Sup b Base x
78	$T_{n}_{a} y$	upper T Sub n Sub a Base y
79	$\sqrt{2}$	Root 2 EndRoot
80	$\sqrt{m + n}$	Root m plus n EndRoot
81	$\sqrt[m + n]{x + y}$	Index m plus n Root x plus y EndRoot
82	$\sqrt[n]{x^{m}} = {(\sqrt[n]{x})}^{m} = x^{\frac{m}{n}}, x > 0$	Index n Root x Sup m Base EndRoot equals L p'ren Index n Root x EndRoot R p'ren Sup m Base equals x Sup Frac m Over n EndFrac Base comma x greater than 0
83	$\sqrt[3]{x} = x^{\frac{1}{3}}$	Index 3 Root x EndRoot equals x Sup one third
84	$\sqrt{\sqrt{x + 1} + \sqrt{y + 1}}$	NestRoot Root x plus 1 EndRoot plus Root y plus 1 EndRoot NestEndRoot
85	$\sqrt[n]{\sqrt[m]{x}} = \sqrt[m]{\sqrt[n]{x}}$	NestIndex n NestRoot Index m Root x EndRoot NestEndRoot equals NestIndex m NestRoot Index n Root x EndRoot NestEndRoot
86	$x^{e - 2} = \sqrt{x \sqrt[3]{x \sqrt[4]{x \sqrt[5]{x \dots}}}}, x \in ℝ$	x Sup e minus 2 Base equals Nest3Root x NestTwiceIndex 3 NestTwiceRoot x NestIndex 4 NestRoot x Index 5 Root x ellipsis EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot comma x element of double struck upper R
87	$\frac{2}{π} = \frac{\sqrt{2}}{2} \frac{\sqrt{2 + \sqrt{2}}}{2} \frac{\sqrt{2 + \sqrt{2 + \sqrt{2}}}}{2} \dots$	Frac 2 Over pi EndFrac equals Frac Root 2 EndRoot Over 2 EndFrac Frac NestRoot 2 plus Root 2 EndRoot NestEndRoot Over 2 EndFrac Frac NestTwiceRoot 2 plus NestRoot 2 plus Root 2 EndRoot NestEndRoot NestTwiceEndRoot Over 2 EndFrac ellipsis
88	$\frac{5 x y}{2 y} = \frac{5}{2} x$	Frac 5 x CrossOut y EndCrossOut Over 2 CrossOut y EndCrossOut EndFrac equals five halves x
89	$\frac{12}{18} = \frac{\overset{2}{12}}{\underset{3}{18}} = \frac{2}{3}$	Frac 12 Over 18 EndFrac equals Frac CrossOut 12 With 2 EndCrossOut Over CrossOut 18 With 3 EndCrossOut EndFrac equals two thirds
90	$\frac{12}{18} = \frac{\underset{12}{2}}{\overset{18}{3}} = \frac{2}{3}$	Frac 12 Over 18 EndFrac equals Frac CrossOut 12 With 2 EndCrossOut Over CrossOut 18 With 3 EndCrossOut EndFrac equals two thirds
91	$\ddot{x}$	ModAbove x With two dots
92	$\vec{x + y}$	ModAbove x plus y With R arrow
93	$\hat{x}$	ModAbove x With caret
94	$\underset{˙}{x}$	ModBelow x With dot
95	$\tilde{x}$	x overtilde
96	$\bar{x}$	x overbar
97	$\underset{˜}{y}$	y undertilde
98	$\bar{\bar{x}}$	x overbar overbar
99	$\underline{\underline{\bar{\bar{y}}}}$	y overbar overbar underbar underbar
100	$\underset{*}{\underline{a + b}}$	ModBelow Below ModBelow a plus b With bar With asterisk
101	$\bar{\tilde{x + y}}$	ModAbove Above ModAbove x plus y With tilde With bar
102	$\sum_{n = 1}^{\infty} a_{n}$	sigma summation Underscript n equals 1 Overscript infinity Endscripts a Sub n
103	$\underset{b = 3}{\underset{a = 5}{\underline{x + y}}}$	ModBelow x plus y With bar Underscript a equals 5 UnderUnderscript b equals 3 Endscripts
104	$\overset{m = 2}{\overset{n = 1}{\bar{x + y}}}$	ModAbove x plus y With bar Overscript n equals 1 OverOverscript m equals 2 Endscripts
105	${log}_{b} x$	log Sub b Base x
106	$cos y$	cosine y
107	$sin x$	sine x
108	$\frac{60 mi}{hr} \times \frac{5,280 ft}{1 mi} \times \frac{1 hr}{60 \min} = \frac{5,280 ft}{\min}$	Frac 60 CrossOut miles EndCrossOut Over CrossOut hours EndCrossOut EndFrac times Frac 5,280 feet Over 1 CrossOut miles EndCrossOut EndFrac times Frac 1 CrossOut hours EndCrossOut Over 60 minutes EndFrac equals Frac 5,280 feet Over minutes EndFrac
109	$1 J = 1 kg \cdot m^{2} \cdot s^{- 2}$	1 joules equals 1 kilograms dot meters squared dot seconds Sup negative 2
110	$m m = 100 m cm = \frac{m}{1,000} km$	m meters equals 100 m centimeters equals Frac m Over 1,000 EndFrac kilometers
111	$1 mi \approx 1.6 km$	1 miles almost equals 1.6 kilometers
112	$1 in = 2.54 cm$	1 inches equals 2.54 centimeters
113	$\begin{matrix} H_{2} & + & F_{2} & \to & 2 H F \\ hydrogen & fluorine & hydrogen fluoride \end{matrix}$	Layout 1st Row 1st Column upper H 2 2nd Column plus 3rd Column upper F 2 4th Column R arrow 5th Column 2 upper H upper F 2nd Row 1st Column hydrogen 2nd Column Blank 3rd Column fluorine 4th Column Blank 5th Column hydrogen fluoride EndLayout
114	$x = \{\begin{matrix} y < 0 & 0 \\ y \geq 0 & 2 y \end{matrix}$	x equals Layout Enlarged L brace 1st Row 1st Column y less than 0 2nd Column 0 2nd Row 1st Column y greater than or equals 0 2nd Column 2 y EndLayout
115	$[\begin{matrix} x + a & x + b & x + c \\ y + a & y + b & y + c \\ z + a & z + b & z + c \end{matrix}]$	3 By 3 Matrix 1st Row 1st Column x plus a 2nd Column x plus b 3rd Column x plus c 2nd Row 1st Column y plus a 2nd Column y plus b 3rd Column y plus c 3rd Row 1st Column z plus a 2nd Column z plus b 3rd Column z plus c EndMatrix
116	$\|\begin{matrix} a + 1 & b \\ c & d \end{matrix}\| = (a + 1) d - b c$	2 By 2 Determinant 1st Row 1st Column a plus 1 2nd Column b 2nd Row 1st Column c 2nd Column d EndDeterminant equals L p'ren a plus 1 R p'ren d minus b c
117	$\|\begin{matrix} a & b \\ c & d \end{matrix}\| = a d - b c$	2 By 2 Determinant 1st Row a b 2nd Row c d EndDeterminant equals a d minus b c
118	$(\begin{matrix} x \\ y \end{matrix})$	BinomialOrMatrix x Choose y EndBinomialOrMatrix

English Mathspeak Units tests. Locale: en, Style: Verbose.

0	${in}^{2}$	inches squared
1	$s^{2}$	seconds squared
2	$m^{2}$	meters squared
3	${in}^{3}$	inches cubed
4	$s^{3}$	seconds cubed
5	$m^{3}$	meters cubed
6	${in}^{- 1}$	inches Superscript negative 1
7	${in}^{- 1} {mm}^{- 1}$	inches Superscript negative 1 Baseline millimeters Superscript negative 1
8	$\frac{in}{mm}$	StartFraction inches Over millimeters EndFraction
9	$km$	kilometers
10	$A$	amperes
11	$Ω$	ohms
12	$kΩ$	kilohms
13	$°C$	Celsius
14	$\min \min$	min minutes
15	$3 km$	3 kilometers
16	$km + s$	kilometers plus seconds
17	${km}^{2}$	kilometers squared
18	$m^{3}$	meters cubed
19	${km}^{4}$	kilometers Superscript 4
20	$m^{- 1}$	meters Superscript negative 1
21	$s m^{- 1}$	seconds meters Superscript negative 1
22	${\frac{s}{m}}^{- 1}$	StartFraction seconds Over meters EndFraction Superscript negative 1
23	${\frac{s}{m}}^{- 1}$	StartFraction seconds Over meters EndFraction Superscript negative 1
24	$3 m^{- 1}$	3 meters Superscript negative 1
25	$\frac{km}{h}$	StartFraction kilometers Over hours EndFraction
26	$N \frac{km}{h}$	Newtons StartFraction kilometers Over hours EndFraction
27	$\frac{m}{km}$	StartFraction m Over kilometers EndFraction
28	$3 km h$	3 kilometers hours
29	$s 3 m km h$	seconds 3 m kilometers hours
30	$km s^{2} 3 m km h$	kilometers seconds squared 3 m kilometers hours
31	$3 m km h \frac{N}{s^{2}}$	3 m kilometers hours StartFraction upper N Over seconds squared EndFraction
32	$3 m km h \frac{N}{s^{2}}$	3 m kilometers hours StartFraction Newtons Over seconds squared EndFraction
33	$4 mm$	4 millimeters
34	$1 mm$	1 millimeters
35	$4 mm$	4 millimeters
36	$1 mm$	1 millimeters
37	$m s$	meters seconds
38	$m s$	m seconds
39	$m s$	meters s
40	$m s$	meters seconds
41	$m s$	m seconds
42	$m s$	meters s
43	$m s l$	meters seconds liters
44	$63360 in = 63360 in. = 63360^{″} = 63360 inches = 5280 ft = 5280 ft. = 5280^{'} = 5280 feet = 1760 yd = 1760 yd. = 1760 yards = 1 mi = 1 mi. = 1 mile$	63360 inches equals 63360 inches equals 63360 double prime equals 63360 inches equals 5280 feet equals 5280 feet equals 5280 prime equals 5280 feet equals 1760 yards equals 1760 yards equals 1760 yards equals 1 miles equals 1 miles equals 1 mile
45	$8000 li = 8000 li. = 8000 links = 320 rd = 320 rd. = 320 rods = 80 ch = 80 ch. = 80 chains = 8 fur = 8 fur. = 8 furlongs = 1 mi = 1 mi. = 1 mile$	8000 links equals 8000 links equals 8000 links equals 320 rods equals 320 rods equals 320 rods equals 80 chains equals 80 chains equals 80 chains equals 8 furlongs equals 8 furlongs equals 8 furlongs equals 1 miles equals 1 miles equals 1 mile
46	$43560 sq ft = 43560 sq. ft. = 43560 {ft}^{2} = {43560^{'}}^{2} = 43560 square feet = 4840 sq yd = 4840 sq. yd. = 4840 {yd}^{2} = 4840 square yards = 160 sq rd = 160 sq. rd. = 160 {rd}^{2} = 160 square rods = 1 ac = 1 ac. = 1 acre = \frac{1}{640} sq mi = \frac{1}{640} sq. mi. = \frac{1}{640} {mi}^{2} = \frac{1}{640} square miles$	43560 square feet equals 43560 square feet equals 43560 feet squared equals 43560 prime squared equals 43560 square feet equals 4840 square yards equals 4840 square yards equals 4840 yards squared equals 4840 square yards equals 160 square rods equals 160 square rods equals 160 rods squared equals 160 square rods equals 1 acres equals 1 acres equals 1 acre equals StartFraction 1 Over 640 EndFraction square miles equals StartFraction 1 Over 640 EndFraction square miles equals StartFraction 1 Over 640 EndFraction miles squared equals StartFraction 1 Over 640 EndFraction square miles
47	$46656 cu in = 46656 cu. in. = 46656 {in}^{3} = {46656^{″}}^{3} = 46656 cubic inches = 27 cu ft = 27 cu. ft. = 27 {ft}^{3} = {27^{'}}^{3} = 27 cubic feet = 1 cu yd = 1 cu. yd. = 1 {yd}^{3} = 1 cubic yard$	46656 cubic inches equals 46656 cubic inches equals 46656 inches cubed equals 46656 double prime cubed equals 46656 cubic inches equals 27 cubic feet equals 27 cubic feet equals 27 feet cubed equals 27 prime cubed equals 27 cubic feet equals 1 cubic yards equals 1 cubic yards equals 1 yards cubed equals 1 cubic yard
48	$1024 fl dr = 1024 fl. dr. = 1024 fluid drams = 768 tsp = 768 tsp. = 768 teaspoons = 256 Tbsp = 256 Tbsp. = 256 tablespoons = 128 fl oz = 128 fl. oz. = 128 fluid ounces = 16 cp = 16 cp. = 16 cups = 8 pt = 8 pt. = 8 pints = 4 qt = 4 qt. = 4 quarts = 1 gal = 1 gal. = 1 gallon$	1024 fluid drams equals 1024 fluid drams equals 1024 fluid drams equals 768 teaspoons equals 768 teaspoons equals 768 teaspoons equals 256 tablespoons equals 256 tablespoons equals 256 tablespoons equals 128 fluid ounces equals 128 fluid ounces equals 128 fluid ounces equals 16 cups equals 16 cups equals 16 cups equals 8 pints equals 8 pints equals 8 pints equals 4 quarts equals 4 quarts equals 4 quarts equals 1 gallons equals 1 gallons equals 1 gallon
49	$256 dr = 256 dr. = 256 drams = 16 oz = 16 oz. = 16 ounces = 1 # = 1 lb = 1 lb. = 1 pounds = 100 cwt = 100 cwt. = 100 hundredweights = 2000 tons$	256 drams equals 256 drams equals 256 drams equals 16 ounces equals 16 ounces equals 16 ounces equals 1 # equals 1 pounds equals 1 pounds equals 1 pounds equals 100 hundredweights equals 100 hundredweights equals 100 hundredweights equals 2000 tons
50	$63360 in = 63360 in. = 63360^{″} = 63360 inches = 5280 ft = 5280 ft. = 5280^{'} = 5280 feet = 1760 yd = 1760 yd. = 1760 yards = 1 mi = 1 mi. = 1 mile$	63360 inches equals 63360 inches equals 63360 double prime equals 63360 inches equals 5280 feet equals 5280 feet equals 5280 prime equals 5280 feet equals 1760 yards equals 1760 yards equals 1760 yards equals 1 miles equals 1 miles equals 1 mile
51	$1 J = 1 kg \cdot m^{2} \cdot s^{- 2}$	1 joules equals 1 kilograms dot meters squared dot seconds Superscript negative 2
52	$1 J = 1 kg m^{2} s^{- 2}$	1 joules equals 1 kilograms meters squared seconds Superscript negative 2
53	$1 J = 1 \cdot kg \cdot m^{2} \cdot s^{- 2}$	1 joules equals 1 kilograms meters squared seconds Superscript negative 2
54	${in}^{3}$	inches cubed
55	$\frac{km kg s^{2}}{J}$	StartFraction kilometers kilograms seconds squared Over joules EndFraction
56	$\frac{3 km 1 kg s^{2}}{J}$	StartFraction 3 kilometers 1 kilograms seconds squared Over joules EndFraction
57	$\frac{1 km kg s^{2}}{J}$	StartFraction 1 kilometers kilograms seconds squared Over joules EndFraction
58	$\frac{1 km kg s^{2}}{5 J}$	StartFraction 1 kilometers kilograms seconds squared Over 5 joules EndFraction
59	$km$	kilometers
60	$3 km kg s^{2} J$	3 kilometers kilograms seconds squared joules
61	$3 km kg s^{2} J$	3 kilometers kilograms seconds squared joules
62	$3 km 4 kg s^{2} J$	3 kilometers 4 kilograms seconds squared joules
63	$3 km 1 kg s^{2} J$	3 kilometers 1 kilograms seconds squared joules
64	$1 km s + 2 km s + 0 km s + a km s +$	1 kilometers seconds plus 2 kilometers seconds plus 0 kilometers seconds plus a kilometers seconds plus
65	$1 km + 2 km + 0 km + a km$	1 kilometers plus 2 kilometers plus 0 kilometers plus a kilometers
66	$1 \frac{2}{3} kg$	1 and two thirds kilograms
67	$1 \frac{2}{3} kg km$	1 and two thirds kilograms kilometers
68	$1 km 2 kg km$	1 kilometers 2 kilograms kilometers
69	$1 km kg s + 2 km kg s + 0 km kg s + a km kg s +$	1 kilometers kilograms seconds plus 2 kilometers kilograms seconds plus 0 kilometers kilograms seconds plus a kilometers kilograms seconds plus
70	$1 $$	1 dollars
71	$$ 1$	dollars 1
72	$$$	dollars
73	$$$	dollars
74	$2 $$	2 dollars
75	$$ 2$	dollars 2
76	$1 $ + 2 $ + 0 $ + a $$	1 dollars plus 2 dollars plus 0 dollars plus a dollars
77	$1 $ + $ 2 + 0 $ + $ a$	1 dollars plus dollars 2 plus 0 dollars plus dollars a
78	$1 € + 2 € + 0 € + a €$	1 euros plus 2 euros plus 0 euros plus a euros
79	$1 ￡ + 2 ￡ + 0 ￡ + a ￡$	1 pounds plus 2 pounds plus 0 pounds plus a pounds

English Mathspeak Units tests. Locale: en, Style: Brief.

0	${in}^{2}$	inches squared
1	$s^{2}$	seconds squared
2	$m^{2}$	meters squared
3	${in}^{3}$	inches cubed
4	$s^{3}$	seconds cubed
5	$m^{3}$	meters cubed
6	${in}^{- 1}$	inches Sup negative 1
7	${in}^{- 1} {mm}^{- 1}$	inches Sup negative 1 Base millimeters Sup negative 1
8	$\frac{in}{mm}$	StartFrac inches Over millimeters EndFrac

English Mathspeak Units tests. Locale: en, Style: Superbrief.

0	${in}^{2}$	inches squared
1	$s^{2}$	seconds squared
2	$m^{2}$	meters squared
3	${in}^{3}$	inches cubed
4	$s^{3}$	seconds cubed
5	$m^{3}$	meters cubed
6	${in}^{- 1}$	inches Sup negative 1
7	${in}^{- 1} {mm}^{- 1}$	inches Sup negative 1 Base millimeters Sup negative 1
8	$\frac{in}{mm}$	Frac inches Over millimeters EndFrac

English Mathspeak Neutral Fences tests. Locale: en, Style: Verbose.

0	$\| a \|$	StartAbsoluteValue a EndAbsoluteValue
1	$｜ a ｜$	StartAbsoluteValue a EndAbsoluteValue
2	$¦ a ¦$	StartAbsoluteValue a EndAbsoluteValue
3	$∥ a ∥$	StartMetric a EndMetric
4	$⦀ a ⦀$	StartMetric a EndMetric
5	$⫴ a ⫴$	StartMetric a EndMetric
6	$‖ a ‖$	StartMetric a EndMetric
7	$｜ a ‖$	vertical bar a double vertical bar
8	$∥ a ‖$	parallel to a double vertical bar
9	$｜ a ¦$	vertical bar a broken vertical bar
10	$⦀ a ‖$	triple vertical bar a double vertical bar
11	$a ｜ b$	a vertical bar b
12	$a \| b$	a vertical bar b
13	$a ¦ b$	a broken vertical bar b
14	$a ‖ b$	a double vertical bar b
15	$a ∥ b$	a parallel to b
16	$a ⦀ b$	a triple vertical bar b
17	$f ｜ g$	f vertical bar g
18	$f \| g$	f vertical bar g
19	$f ¦ g$	f broken vertical bar g
20	$f ‖ g$	f double vertical bar g
21	$f ∥ g$	f parallel to g
22	$f ⦀ g$	f triple vertical bar g
23	$\sin ⦀ g$	sine triple vertical bar g
24	$f \| a \|$	f StartAbsoluteValue a EndAbsoluteValue
25	$g \| a \|$	g StartAbsoluteValue a EndAbsoluteValue
26	$h \| a \|$	h StartAbsoluteValue a EndAbsoluteValue
27	$r \| a \|$	r StartAbsoluteValue a EndAbsoluteValue
28	$\sin \| a \|$	sine StartAbsoluteValue a EndAbsoluteValue
29	$\sum \| a \|$	sigma summation StartAbsoluteValue a EndAbsoluteValue
30	$f ‖ a ‖$	f StartMetric a EndMetric
31	$g ‖ a ‖$	g StartMetric a EndMetric
32	$h ‖ a ‖$	h StartMetric a EndMetric
33	$r ‖ a ‖$	r StartMetric a EndMetric
34	$\sin ‖ a ‖$	sine StartMetric a EndMetric
35	$\sum ‖ a ‖$	sigma summation StartMetric a EndMetric

English Mathspeak Neutral Fences tests. Locale: en, Style: Superbrief.

0	$\| a \|$	AbsoluteValue a EndAbsoluteValue
1	$｜ a ｜$	AbsoluteValue a EndAbsoluteValue
2	$¦ a ¦$	AbsoluteValue a EndAbsoluteValue
3	$∥ a ∥$	Metric a EndMetric
4	$⦀ a ⦀$	Metric a EndMetric
5	$⫴ a ⫴$	Metric a EndMetric
6	$‖ a ‖$	Metric a EndMetric
7	$｜ a ‖$	vertical bar a double vertical bar
8	$∥ a ‖$	parallel to a double vertical bar
9	$｜ a ¦$	vertical bar a broken vertical bar
10	$⦀ a ‖$	triple vertical bar a double vertical bar
11	$a ｜ b$	a vertical bar b
12	$a \| b$	a vertical bar b
13	$a ¦ b$	a broken vertical bar b
14	$a ‖ b$	a double vertical bar b
15	$a ∥ b$	a parallel to b
16	$a ⦀ b$	a triple vertical bar b
17	$f \| a \|$	f AbsoluteValue a EndAbsoluteValue
18	$g \| a \|$	g AbsoluteValue a EndAbsoluteValue
19	$h \| a \|$	h AbsoluteValue a EndAbsoluteValue
20	$r \| a \|$	r AbsoluteValue a EndAbsoluteValue
21	$\sin \| a \|$	sine AbsoluteValue a EndAbsoluteValue
22	$\sum \| a \|$	sigma summation AbsoluteValue a EndAbsoluteValue
23	$f ‖ a ‖$	f Metric a EndMetric
24	$g ‖ a ‖$	g Metric a EndMetric
25	$h ‖ a ‖$	h Metric a EndMetric
26	$r ‖ a ‖$	r Metric a EndMetric
27	$\sin ‖ a ‖$	sine Metric a EndMetric
28	$\sum ‖ a ‖$	sigma summation Metric a EndMetric
29	$f ｜ g$	f vertical bar g
30	$f \| g$	f vertical bar g
31	$f ¦ g$	f broken vertical bar g
32	$f ‖ g$	f double vertical bar g
33	$f ∥ g$	f parallel to g
34	$f ⦀ g$	f triple vertical bar g
35	$\sin ⦀ g$	sine triple vertical bar g

English Mathspeak Roots tests. Locale: en, Style: Verbose.

0	$\sqrt{a}$	StartRoot a EndRoot
1	$\sqrt[2]{a}$	RootIndex 2 StartRoot a EndRoot
2	$\sqrt{\sqrt{a}}$	NestedStartRoot StartRoot a EndRoot NestedEndRoot
3	$\sqrt{\sqrt{\sqrt{\sqrt{a}}}}$	Nested3StartRoot NestedTwiceStartRoot NestedStartRoot StartRoot a EndRoot NestedEndRoot NestedTwiceEndRoot Nested3EndRoot
4	$\sqrt[1]{a}$	RootIndex 1 StartRoot a EndRoot
5	$\sqrt[2]{a}$	RootIndex 2 StartRoot a EndRoot
6	$\sqrt[3]{a}$	RootIndex 3 StartRoot a EndRoot
7	$\sqrt[4]{a}$	RootIndex 4 StartRoot a EndRoot
8	$\sqrt[5]{a}$	RootIndex 5 StartRoot a EndRoot
9	$\sqrt[6]{a}$	RootIndex 6 StartRoot a EndRoot
10	$\sqrt[7]{a}$	RootIndex 7 StartRoot a EndRoot
11	$\sqrt[8]{a}$	RootIndex 8 StartRoot a EndRoot
12	$\sqrt[9]{a}$	RootIndex 9 StartRoot a EndRoot
13	$\sqrt[10]{a}$	RootIndex 10 StartRoot a EndRoot
14	$\sqrt[11]{a}$	RootIndex 11 StartRoot a EndRoot
15	$\sqrt[1]{\sqrt[1]{a}}$	NestedRootIndex 1 NestedStartRoot RootIndex 1 StartRoot a EndRoot NestedEndRoot
16	$\sqrt[2]{\sqrt[2]{a}}$	NestedRootIndex 2 NestedStartRoot RootIndex 2 StartRoot a EndRoot NestedEndRoot
17	$\sqrt[3]{\sqrt[3]{a}}$	NestedRootIndex 3 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
18	$\sqrt[4]{\sqrt[4]{a}}$	NestedRootIndex 4 NestedStartRoot RootIndex 4 StartRoot a EndRoot NestedEndRoot
19	$\sqrt[5]{\sqrt[5]{a}}$	NestedRootIndex 5 NestedStartRoot RootIndex 5 StartRoot a EndRoot NestedEndRoot
20	$\sqrt[6]{\sqrt[6]{a}}$	NestedRootIndex 6 NestedStartRoot RootIndex 6 StartRoot a EndRoot NestedEndRoot
21	$\sqrt[7]{\sqrt[7]{a}}$	NestedRootIndex 7 NestedStartRoot RootIndex 7 StartRoot a EndRoot NestedEndRoot
22	$\sqrt[8]{\sqrt[8]{a}}$	NestedRootIndex 8 NestedStartRoot RootIndex 8 StartRoot a EndRoot NestedEndRoot
23	$\sqrt[9]{\sqrt[9]{a}}$	NestedRootIndex 9 NestedStartRoot RootIndex 9 StartRoot a EndRoot NestedEndRoot
24	$\sqrt[10]{\sqrt[10]{a}}$	NestedRootIndex 10 NestedStartRoot RootIndex 10 StartRoot a EndRoot NestedEndRoot
25	$\sqrt[11]{\sqrt[11]{a}}$	NestedRootIndex 11 NestedStartRoot RootIndex 11 StartRoot a EndRoot NestedEndRoot
26	$\sqrt[1]{\sqrt[3]{a}}$	NestedRootIndex 1 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
27	$\sqrt[2]{\sqrt[3]{a}}$	NestedRootIndex 2 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
28	$\sqrt[3]{\sqrt[3]{a}}$	NestedRootIndex 3 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
29	$\sqrt[4]{\sqrt[3]{a}}$	NestedRootIndex 4 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
30	$\sqrt[5]{\sqrt[3]{a}}$	NestedRootIndex 5 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
31	$\sqrt[6]{\sqrt[3]{a}}$	NestedRootIndex 6 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
32	$\sqrt[7]{\sqrt[3]{a}}$	NestedRootIndex 7 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
33	$\sqrt[8]{\sqrt[3]{a}}$	NestedRootIndex 8 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
34	$\sqrt[9]{\sqrt[3]{a}}$	NestedRootIndex 9 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
35	$\sqrt[10]{\sqrt[3]{a}}$	NestedRootIndex 10 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
36	$\sqrt[11]{\sqrt[3]{a}}$	NestedRootIndex 11 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot
37	$\sqrt[2]{\sqrt[3]{\sqrt[4]{\sqrt[5]{a}}}}$	Nested3RootIndex 2 Nested3StartRoot NestedTwiceRootIndex 3 NestedTwiceStartRoot NestedRootIndex 4 NestedStartRoot RootIndex 5 StartRoot a EndRoot NestedEndRoot NestedTwiceEndRoot Nested3EndRoot
38	$\sqrt[2]{\sqrt[3]{\sqrt[2]{\sqrt[3]{a}}}}$	Nested3RootIndex 2 Nested3StartRoot NestedTwiceRootIndex 3 NestedTwiceStartRoot NestedRootIndex 2 NestedStartRoot RootIndex 3 StartRoot a EndRoot NestedEndRoot NestedTwiceEndRoot Nested3EndRoot
39	$\sqrt[2]{\sqrt[3]{\sqrt{\sqrt[3]{\sqrt{a}}}}}$	Nested4RootIndex 2 Nested4StartRoot Nested3RootIndex 3 Nested3StartRoot NestedTwiceStartRoot NestedRootIndex 3 NestedStartRoot StartRoot a EndRoot NestedEndRoot NestedTwiceEndRoot Nested3EndRoot Nested4EndRoot

English Mathspeak Roots tests. Locale: en, Style: Brief.

0	$\sqrt{a}$	StartRoot a EndRoot
1	$\sqrt[2]{a}$	RootIndex 2 StartRoot a EndRoot
2	$\sqrt{\sqrt{a}}$	NestStartRoot StartRoot a EndRoot NestEndRoot
3	$\sqrt{\sqrt{\sqrt{\sqrt{a}}}}$	Nest3StartRoot NestTwiceStartRoot NestStartRoot StartRoot a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot
4	$\sqrt[1]{a}$	RootIndex 1 StartRoot a EndRoot
5	$\sqrt[2]{a}$	RootIndex 2 StartRoot a EndRoot
6	$\sqrt[3]{a}$	RootIndex 3 StartRoot a EndRoot
7	$\sqrt[4]{a}$	RootIndex 4 StartRoot a EndRoot
8	$\sqrt[5]{a}$	RootIndex 5 StartRoot a EndRoot
9	$\sqrt[6]{a}$	RootIndex 6 StartRoot a EndRoot
10	$\sqrt[7]{a}$	RootIndex 7 StartRoot a EndRoot
11	$\sqrt[8]{a}$	RootIndex 8 StartRoot a EndRoot
12	$\sqrt[9]{a}$	RootIndex 9 StartRoot a EndRoot
13	$\sqrt[10]{a}$	RootIndex 10 StartRoot a EndRoot
14	$\sqrt[11]{a}$	RootIndex 11 StartRoot a EndRoot
15	$\sqrt[1]{\sqrt[1]{a}}$	NestRootIndex 1 NestStartRoot RootIndex 1 StartRoot a EndRoot NestEndRoot
16	$\sqrt[2]{\sqrt[2]{a}}$	NestRootIndex 2 NestStartRoot RootIndex 2 StartRoot a EndRoot NestEndRoot
17	$\sqrt[3]{\sqrt[3]{a}}$	NestRootIndex 3 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
18	$\sqrt[4]{\sqrt[4]{a}}$	NestRootIndex 4 NestStartRoot RootIndex 4 StartRoot a EndRoot NestEndRoot
19	$\sqrt[5]{\sqrt[5]{a}}$	NestRootIndex 5 NestStartRoot RootIndex 5 StartRoot a EndRoot NestEndRoot
20	$\sqrt[6]{\sqrt[6]{a}}$	NestRootIndex 6 NestStartRoot RootIndex 6 StartRoot a EndRoot NestEndRoot
21	$\sqrt[7]{\sqrt[7]{a}}$	NestRootIndex 7 NestStartRoot RootIndex 7 StartRoot a EndRoot NestEndRoot
22	$\sqrt[8]{\sqrt[8]{a}}$	NestRootIndex 8 NestStartRoot RootIndex 8 StartRoot a EndRoot NestEndRoot
23	$\sqrt[9]{\sqrt[9]{a}}$	NestRootIndex 9 NestStartRoot RootIndex 9 StartRoot a EndRoot NestEndRoot
24	$\sqrt[10]{\sqrt[10]{a}}$	NestRootIndex 10 NestStartRoot RootIndex 10 StartRoot a EndRoot NestEndRoot
25	$\sqrt[11]{\sqrt[11]{a}}$	NestRootIndex 11 NestStartRoot RootIndex 11 StartRoot a EndRoot NestEndRoot
26	$\sqrt[1]{\sqrt[3]{a}}$	NestRootIndex 1 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
27	$\sqrt[2]{\sqrt[3]{a}}$	NestRootIndex 2 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
28	$\sqrt[3]{\sqrt[3]{a}}$	NestRootIndex 3 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
29	$\sqrt[4]{\sqrt[3]{a}}$	NestRootIndex 4 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
30	$\sqrt[5]{\sqrt[3]{a}}$	NestRootIndex 5 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
31	$\sqrt[6]{\sqrt[3]{a}}$	NestRootIndex 6 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
32	$\sqrt[7]{\sqrt[3]{a}}$	NestRootIndex 7 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
33	$\sqrt[8]{\sqrt[3]{a}}$	NestRootIndex 8 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
34	$\sqrt[9]{\sqrt[3]{a}}$	NestRootIndex 9 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
35	$\sqrt[10]{\sqrt[3]{a}}$	NestRootIndex 10 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
36	$\sqrt[11]{\sqrt[3]{a}}$	NestRootIndex 11 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot
37	$\sqrt[2]{\sqrt[3]{\sqrt[4]{\sqrt[5]{a}}}}$	Nest3RootIndex 2 Nest3StartRoot NestTwiceRootIndex 3 NestTwiceStartRoot NestRootIndex 4 NestStartRoot RootIndex 5 StartRoot a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot
38	$\sqrt[2]{\sqrt[3]{\sqrt[2]{\sqrt[3]{a}}}}$	Nest3RootIndex 2 Nest3StartRoot NestTwiceRootIndex 3 NestTwiceStartRoot NestRootIndex 2 NestStartRoot RootIndex 3 StartRoot a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot
39	$\sqrt[2]{\sqrt[3]{\sqrt{\sqrt[3]{\sqrt{a}}}}}$	Nest4RootIndex 2 Nest4StartRoot Nest3RootIndex 3 Nest3StartRoot NestTwiceStartRoot NestRootIndex 3 NestStartRoot StartRoot a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot Nest4EndRoot

English Mathspeak Roots tests. Locale: en, Style: Superbrief.

0	$\sqrt{a}$	Root a EndRoot
1	$\sqrt[2]{a}$	Index 2 Root a EndRoot
2	$\sqrt{\sqrt{a}}$	NestRoot Root a EndRoot NestEndRoot
3	$\sqrt{\sqrt{\sqrt{\sqrt{a}}}}$	Nest3Root NestTwiceRoot NestRoot Root a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot
4	$\sqrt[1]{a}$	Index 1 Root a EndRoot
5	$\sqrt[2]{a}$	Index 2 Root a EndRoot
6	$\sqrt[3]{a}$	Index 3 Root a EndRoot
7	$\sqrt[4]{a}$	Index 4 Root a EndRoot
8	$\sqrt[5]{a}$	Index 5 Root a EndRoot
9	$\sqrt[6]{a}$	Index 6 Root a EndRoot
10	$\sqrt[7]{a}$	Index 7 Root a EndRoot
11	$\sqrt[8]{a}$	Index 8 Root a EndRoot
12	$\sqrt[9]{a}$	Index 9 Root a EndRoot
13	$\sqrt[10]{a}$	Index 10 Root a EndRoot
14	$\sqrt[11]{a}$	Index 11 Root a EndRoot
15	$\sqrt[1]{\sqrt[1]{a}}$	NestIndex 1 NestRoot Index 1 Root a EndRoot NestEndRoot
16	$\sqrt[2]{\sqrt[2]{a}}$	NestIndex 2 NestRoot Index 2 Root a EndRoot NestEndRoot
17	$\sqrt[3]{\sqrt[3]{a}}$	NestIndex 3 NestRoot Index 3 Root a EndRoot NestEndRoot
18	$\sqrt[4]{\sqrt[4]{a}}$	NestIndex 4 NestRoot Index 4 Root a EndRoot NestEndRoot
19	$\sqrt[5]{\sqrt[5]{a}}$	NestIndex 5 NestRoot Index 5 Root a EndRoot NestEndRoot
20	$\sqrt[6]{\sqrt[6]{a}}$	NestIndex 6 NestRoot Index 6 Root a EndRoot NestEndRoot
21	$\sqrt[7]{\sqrt[7]{a}}$	NestIndex 7 NestRoot Index 7 Root a EndRoot NestEndRoot
22	$\sqrt[8]{\sqrt[8]{a}}$	NestIndex 8 NestRoot Index 8 Root a EndRoot NestEndRoot
23	$\sqrt[9]{\sqrt[9]{a}}$	NestIndex 9 NestRoot Index 9 Root a EndRoot NestEndRoot
24	$\sqrt[10]{\sqrt[10]{a}}$	NestIndex 10 NestRoot Index 10 Root a EndRoot NestEndRoot
25	$\sqrt[11]{\sqrt[11]{a}}$	NestIndex 11 NestRoot Index 11 Root a EndRoot NestEndRoot
26	$\sqrt[1]{\sqrt[3]{a}}$	NestIndex 1 NestRoot Index 3 Root a EndRoot NestEndRoot
27	$\sqrt[2]{\sqrt[3]{a}}$	NestIndex 2 NestRoot Index 3 Root a EndRoot NestEndRoot
28	$\sqrt[3]{\sqrt[3]{a}}$	NestIndex 3 NestRoot Index 3 Root a EndRoot NestEndRoot
29	$\sqrt[4]{\sqrt[3]{a}}$	NestIndex 4 NestRoot Index 3 Root a EndRoot NestEndRoot
30	$\sqrt[5]{\sqrt[3]{a}}$	NestIndex 5 NestRoot Index 3 Root a EndRoot NestEndRoot
31	$\sqrt[6]{\sqrt[3]{a}}$	NestIndex 6 NestRoot Index 3 Root a EndRoot NestEndRoot
32	$\sqrt[7]{\sqrt[3]{a}}$	NestIndex 7 NestRoot Index 3 Root a EndRoot NestEndRoot
33	$\sqrt[8]{\sqrt[3]{a}}$	NestIndex 8 NestRoot Index 3 Root a EndRoot NestEndRoot
34	$\sqrt[9]{\sqrt[3]{a}}$	NestIndex 9 NestRoot Index 3 Root a EndRoot NestEndRoot
35	$\sqrt[10]{\sqrt[3]{a}}$	NestIndex 10 NestRoot Index 3 Root a EndRoot NestEndRoot
36	$\sqrt[11]{\sqrt[3]{a}}$	NestIndex 11 NestRoot Index 3 Root a EndRoot NestEndRoot
37	$\sqrt[2]{\sqrt[3]{\sqrt[4]{\sqrt[5]{a}}}}$	Nest3Index 2 Nest3Root NestTwiceIndex 3 NestTwiceRoot NestIndex 4 NestRoot Index 5 Root a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot
38	$\sqrt[2]{\sqrt[3]{\sqrt[2]{\sqrt[3]{a}}}}$	Nest3Index 2 Nest3Root NestTwiceIndex 3 NestTwiceRoot NestIndex 2 NestRoot Index 3 Root a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot
39	$\sqrt[2]{\sqrt[3]{\sqrt{\sqrt[3]{\sqrt{a}}}}}$	Nest4Index 2 Nest4Root Nest3Index 3 Nest3Root NestTwiceRoot NestIndex 3 NestRoot Root a EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot Nest4EndRoot

English Mathspeak Tensor tests. Locale: en, Style: Verbose.

0	${}_{a}^{b}x_{c}^{d}$	Subscript a Superscript b Baseline x Subscript c Superscript d
1	${}_{a}^{b}x_{c}$	Subscript a Superscript b Baseline x Subscript c
2	${}_{a}^{b}x^{d}$	Subscript a Superscript b Baseline x Superscript d
3	${}_{a}^{b}x^{d} r$	Subscript a Superscript b Baseline x Superscript d Baseline r
4	$\sqrt{{}_{a}^{b}x^{d}} r$	StartRoot Subscript a Superscript b Baseline x Superscript d Baseline EndRoot r
5	$\sqrt{{}_{a}^{b}x^{d} r}$	StartRoot Subscript a Superscript b Baseline x Superscript d Baseline r EndRoot
6	$\frac{1}{{}_{a}^{b}x^{d}} r$	StartFraction 1 Over Subscript a Superscript b Baseline x Superscript d Baseline EndFraction r
7	$\frac{1}{{}_{a}^{b}x^{d} r}$	StartFraction 1 Over Subscript a Superscript b Baseline x Superscript d Baseline r EndFraction
8	${}_{a}^{b}x$	Subscript a Superscript b Baseline x
9	${}_{a}^{b}x r$	Subscript a Superscript b Baseline x r
10	$\sqrt{{}_{a}^{b}x} r$	StartRoot Subscript a Superscript b Baseline x EndRoot r
11	$\sqrt{{}_{a}^{b}x r}$	StartRoot Subscript a Superscript b Baseline x r EndRoot
12	$\frac{1}{{}_{a}^{b}x} r$	StartFraction 1 Over Subscript a Superscript b Baseline x EndFraction r
13	$\frac{1}{{}_{a}^{b}x r}$	StartFraction 1 Over Subscript a Superscript b Baseline x r EndFraction
14	${}_{a}^{b}x_{c} r$	Subscript a Superscript b Baseline x Subscript c Baseline r
15	${}_{a}^{b}x_{c}^{d} r$	Subscript a Superscript b Baseline x Subscript c Superscript d Baseline r
16	$\sqrt{{}_{a}^{b}x_{c}^{d}}$	StartRoot Subscript a Superscript b Baseline x Subscript c Superscript d EndRoot
17	$\sqrt{{}_{a}^{b}x_{c}^{d}} r$	StartRoot Subscript a Superscript b Baseline x Subscript c Superscript d Baseline EndRoot r
18	$\sqrt{{}_{a}^{b}x_{c}^{d} r}$	StartRoot Subscript a Superscript b Baseline x Subscript c Superscript d Baseline r EndRoot
19	$\frac{1}{{}_{a}^{b}x_{c}^{d}}$	StartFraction 1 Over Subscript a Superscript b Baseline x Subscript c Superscript d EndFraction
20	$\frac{1}{{}_{a}^{b}x_{c}^{d}} r$	StartFraction 1 Over Subscript a Superscript b Baseline x Subscript c Superscript d Baseline EndFraction r
21	$\frac{1}{{}_{a}^{b}x_{c}^{d} r}$	StartFraction 1 Over Subscript a Superscript b Baseline x Subscript c Superscript d Baseline r EndFraction
22	${}^{b}x$	Superscript b Baseline x
23	${}^{b}x r$	Superscript b Baseline x r
24	$\sqrt{{}^{b}x} r$	StartRoot Superscript b Baseline x EndRoot r
25	$\sqrt{{}^{b}x r}$	StartRoot Superscript b Baseline x r EndRoot
26	$\frac{1}{{}^{b}x} r$	StartFraction 1 Over Superscript b Baseline x EndFraction r
27	$\frac{1}{{}^{b}x r}$	StartFraction 1 Over Superscript b Baseline x r EndFraction
28	${}^{b}x^{d}$	Superscript b Baseline x Superscript d
29	${}^{b}x^{d} r$	Superscript b Baseline x Superscript d Baseline r
30	$\sqrt{{}^{b}x^{d}} r$	StartRoot Superscript b Baseline x Superscript d Baseline EndRoot r
31	$\sqrt{{}^{b}x^{d} r}$	StartRoot Superscript b Baseline x Superscript d Baseline r EndRoot
32	$\frac{1}{{}^{b}x^{d}} r$	StartFraction 1 Over Superscript b Baseline x Superscript d Baseline EndFraction r
33	$\frac{1}{{}^{b}x^{d} r}$	StartFraction 1 Over Superscript b Baseline x Superscript d Baseline r EndFraction
34	${}^{b}x_{c}$	Superscript b Baseline x Subscript c
35	${}^{b}x_{c} r$	Superscript b Baseline x Subscript c Baseline r
36	$\sqrt{{}^{b}x_{c}} r$	StartRoot Superscript b Baseline x Subscript c Baseline EndRoot r
37	$\sqrt{{}^{b}x_{c} r}$	StartRoot Superscript b Baseline x Subscript c Baseline r EndRoot
38	$\frac{1}{{}^{b}x_{c}} r$	StartFraction 1 Over Superscript b Baseline x Subscript c Baseline EndFraction r
39	$\frac{1}{{}^{b}x_{c} r}$	StartFraction 1 Over Superscript b Baseline x Subscript c Baseline r EndFraction
40	${}^{b}x_{c}^{d}$	Superscript b Baseline x Subscript c Superscript d
41	${}^{b}x_{c}^{d} r$	Superscript b Baseline x Subscript c Superscript d Baseline r
42	$\sqrt{{}^{b}x_{c}^{d}} r$	StartRoot Superscript b Baseline x Subscript c Superscript d Baseline EndRoot r
43	$\sqrt{{}^{b}x_{c}^{d} r}$	StartRoot Superscript b Baseline x Subscript c Superscript d Baseline r EndRoot
44	$\frac{1}{{}^{b}x_{c}^{d}} r$	StartFraction 1 Over Superscript b Baseline x Subscript c Superscript d Baseline EndFraction r
45	$\frac{1}{{}^{b}x_{c}^{d} r}$	StartFraction 1 Over Superscript b Baseline x Subscript c Superscript d Baseline r EndFraction
46	${}_{a}x$	Subscript a Baseline x
47	${}_{a}x r$	Subscript a Baseline x r
48	$\sqrt{{}_{a}x} r$	StartRoot Subscript a Baseline x EndRoot r
49	$\sqrt{{}_{a}x r}$	StartRoot Subscript a Baseline x r EndRoot
50	$\frac{1}{{}_{a}x} r$	StartFraction 1 Over Subscript a Baseline x EndFraction r
51	$\frac{1}{{}_{a}x r}$	StartFraction 1 Over Subscript a Baseline x r EndFraction
52	${}_{a}x^{d}$	Subscript a Baseline x Superscript d
53	${}_{a}x^{d} r$	Subscript a Baseline x Superscript d Baseline r
54	$\sqrt{{}_{a}x^{d}} r$	StartRoot Subscript a Baseline x Superscript d Baseline EndRoot r
55	$\sqrt{{}_{a}x^{d} r}$	StartRoot Subscript a Baseline x Superscript d Baseline r EndRoot
56	$\frac{1}{{}_{a}x^{d}} r$	StartFraction 1 Over Subscript a Baseline x Superscript d Baseline EndFraction r
57	$\frac{1}{{}_{a}x^{d} r}$	StartFraction 1 Over Subscript a Baseline x Superscript d Baseline r EndFraction
58	${}_{a}x_{c}$	Subscript a Baseline x Subscript c
59	${}_{a}x_{c} r$	Subscript a Baseline x Subscript c Baseline r
60	$\sqrt{{}_{a}x_{c}} r$	StartRoot Subscript a Baseline x Subscript c Baseline EndRoot r
61	$\sqrt{{}_{a}x_{c} r}$	StartRoot Subscript a Baseline x Subscript c Baseline r EndRoot
62	$\frac{1}{{}_{a}x_{c}} r$	StartFraction 1 Over Subscript a Baseline x Subscript c Baseline EndFraction r
63	$\frac{1}{{}_{a}x_{c} r}$	StartFraction 1 Over Subscript a Baseline x Subscript c Baseline r EndFraction
64	${}_{a}x_{c}^{d}$	Subscript a Baseline x Subscript c Superscript d
65	${}_{a}x_{c}^{d} r$	Subscript a Baseline x Subscript c Superscript d Baseline r
66	$\sqrt{{}_{a}x_{c}^{d}} r$	StartRoot Subscript a Baseline x Subscript c Superscript d Baseline EndRoot r
67	$\sqrt{{}_{a}x_{c}^{d} r}$	StartRoot Subscript a Baseline x Subscript c Superscript d Baseline r EndRoot
68	$\frac{1}{{}_{a}x_{c}^{d}} r$	StartFraction 1 Over Subscript a Baseline x Subscript c Superscript d Baseline EndFraction r
69	$\frac{1}{{}_{a}x_{c}^{d} r}$	StartFraction 1 Over Subscript a Baseline x Subscript c Superscript d Baseline r EndFraction
70	${}_{a}^{b}x_{c^{l}}$	Subscript a Superscript b Baseline x Subscript c Sub Superscript l
71	${}_{a}^{b}x_{c_{l}}^{d}$	Subscript a Superscript b Baseline x Subscript c Sub Subscript l Superscript d
72	${}_{a}^{b}x_{c_{l^{k}}}^{d}_{e}$	Subscript a Superscript b Baseline x Subscript c Sub Subscript l Sub Sub Superscript k Subscript e Superscript d
73	${}_{a}^{b}x_{c^{l}}^{d}$	Subscript a Superscript b Baseline x Subscript c Sub Superscript l Superscript d
74	${}_{a}^{b}x_{c k^{l}}^{d}$	Subscript a Superscript b Baseline x Subscript c k Sub Superscript l Superscript d
75	${}_{a}^{b}x_{c}^{d} {}_{a}^{b}x_{c}^{d}$	Subscript a Superscript b Baseline x Subscript c Superscript d Baseline Subscript a Superscript b Baseline x Subscript c Superscript d

English Mathspeak Tensor tests. Locale: en, Style: Brief.

0	${}_{a}^{b}x_{c}^{d}$	Sub a Sup b Base x Sub c Sup d
1	${}_{a}^{b}x_{c}$	Sub a Sup b Base x Sub c
2	${}_{a}^{b}x^{d}$	Sub a Sup b Base x Sup d
3	${}_{a}^{b}x^{d} r$	Sub a Sup b Base x Sup d Base r
4	$\sqrt{{}_{a}^{b}x^{d}} r$	StartRoot Sub a Sup b Base x Sup d Base EndRoot r
5	$\sqrt{{}_{a}^{b}x^{d} r}$	StartRoot Sub a Sup b Base x Sup d Base r EndRoot
6	$\frac{1}{{}_{a}^{b}x^{d}} r$	StartFrac 1 Over Sub a Sup b Base x Sup d Base EndFrac r
7	$\frac{1}{{}_{a}^{b}x^{d} r}$	StartFrac 1 Over Sub a Sup b Base x Sup d Base r EndFrac
8	${}_{a}^{b}x$	Sub a Sup b Base x
9	${}_{a}^{b}x r$	Sub a Sup b Base x r
10	$\sqrt{{}_{a}^{b}x} r$	StartRoot Sub a Sup b Base x EndRoot r
11	$\sqrt{{}_{a}^{b}x r}$	StartRoot Sub a Sup b Base x r EndRoot
12	$\frac{1}{{}_{a}^{b}x} r$	StartFrac 1 Over Sub a Sup b Base x EndFrac r
13	$\frac{1}{{}_{a}^{b}x r}$	StartFrac 1 Over Sub a Sup b Base x r EndFrac
14	${}_{a}^{b}x_{c} r$	Sub a Sup b Base x Sub c Base r
15	${}_{a}^{b}x_{c}^{d} r$	Sub a Sup b Base x Sub c Sup d Base r
16	$\sqrt{{}_{a}^{b}x_{c}^{d}}$	StartRoot Sub a Sup b Base x Sub c Sup d EndRoot
17	$\sqrt{{}_{a}^{b}x_{c}^{d}} r$	StartRoot Sub a Sup b Base x Sub c Sup d Base EndRoot r
18	$\sqrt{{}_{a}^{b}x_{c}^{d} r}$	StartRoot Sub a Sup b Base x Sub c Sup d Base r EndRoot
19	$\frac{1}{{}_{a}^{b}x_{c}^{d}}$	StartFrac 1 Over Sub a Sup b Base x Sub c Sup d EndFrac
20	$\frac{1}{{}_{a}^{b}x_{c}^{d}} r$	StartFrac 1 Over Sub a Sup b Base x Sub c Sup d Base EndFrac r
21	$\frac{1}{{}_{a}^{b}x_{c}^{d} r}$	StartFrac 1 Over Sub a Sup b Base x Sub c Sup d Base r EndFrac
22	${}^{b}x$	Sup b Base x
23	${}^{b}x r$	Sup b Base x r
24	$\sqrt{{}^{b}x} r$	StartRoot Sup b Base x EndRoot r
25	$\sqrt{{}^{b}x r}$	StartRoot Sup b Base x r EndRoot
26	$\frac{1}{{}^{b}x} r$	StartFrac 1 Over Sup b Base x EndFrac r
27	$\frac{1}{{}^{b}x r}$	StartFrac 1 Over Sup b Base x r EndFrac
28	${}^{b}x^{d}$	Sup b Base x Sup d
29	${}^{b}x^{d} r$	Sup b Base x Sup d Base r
30	$\sqrt{{}^{b}x^{d}} r$	StartRoot Sup b Base x Sup d Base EndRoot r
31	$\sqrt{{}^{b}x^{d} r}$	StartRoot Sup b Base x Sup d Base r EndRoot
32	$\frac{1}{{}^{b}x^{d}} r$	StartFrac 1 Over Sup b Base x Sup d Base EndFrac r
33	$\frac{1}{{}^{b}x^{d} r}$	StartFrac 1 Over Sup b Base x Sup d Base r EndFrac
34	${}^{b}x_{c}$	Sup b Base x Sub c
35	${}^{b}x_{c} r$	Sup b Base x Sub c Base r
36	$\sqrt{{}^{b}x_{c}} r$	StartRoot Sup b Base x Sub c Base EndRoot r
37	$\sqrt{{}^{b}x_{c} r}$	StartRoot Sup b Base x Sub c Base r EndRoot
38	$\frac{1}{{}^{b}x_{c}} r$	StartFrac 1 Over Sup b Base x Sub c Base EndFrac r
39	$\frac{1}{{}^{b}x_{c} r}$	StartFrac 1 Over Sup b Base x Sub c Base r EndFrac
40	${}^{b}x_{c}^{d}$	Sup b Base x Sub c Sup d
41	${}^{b}x_{c}^{d} r$	Sup b Base x Sub c Sup d Base r
42	$\sqrt{{}^{b}x_{c}^{d}} r$	StartRoot Sup b Base x Sub c Sup d Base EndRoot r
43	$\sqrt{{}^{b}x_{c}^{d} r}$	StartRoot Sup b Base x Sub c Sup d Base r EndRoot
44	$\frac{1}{{}^{b}x_{c}^{d}} r$	StartFrac 1 Over Sup b Base x Sub c Sup d Base EndFrac r
45	$\frac{1}{{}^{b}x_{c}^{d} r}$	StartFrac 1 Over Sup b Base x Sub c Sup d Base r EndFrac
46	${}_{a}x$	Sub a Base x
47	${}_{a}x r$	Sub a Base x r
48	$\sqrt{{}_{a}x} r$	StartRoot Sub a Base x EndRoot r
49	$\sqrt{{}_{a}x r}$	StartRoot Sub a Base x r EndRoot
50	$\frac{1}{{}_{a}x} r$	StartFrac 1 Over Sub a Base x EndFrac r
51	$\frac{1}{{}_{a}x r}$	StartFrac 1 Over Sub a Base x r EndFrac
52	${}_{a}x^{d}$	Sub a Base x Sup d
53	${}_{a}x^{d} r$	Sub a Base x Sup d Base r
54	$\sqrt{{}_{a}x^{d}} r$	StartRoot Sub a Base x Sup d Base EndRoot r
55	$\sqrt{{}_{a}x^{d} r}$	StartRoot Sub a Base x Sup d Base r EndRoot
56	$\frac{1}{{}_{a}x^{d}} r$	StartFrac 1 Over Sub a Base x Sup d Base EndFrac r
57	$\frac{1}{{}_{a}x^{d} r}$	StartFrac 1 Over Sub a Base x Sup d Base r EndFrac
58	${}_{a}x_{c}$	Sub a Base x Sub c
59	${}_{a}x_{c} r$	Sub a Base x Sub c Base r
60	$\sqrt{{}_{a}x_{c}} r$	StartRoot Sub a Base x Sub c Base EndRoot r
61	$\sqrt{{}_{a}x_{c} r}$	StartRoot Sub a Base x Sub c Base r EndRoot
62	$\frac{1}{{}_{a}x_{c}} r$	StartFrac 1 Over Sub a Base x Sub c Base EndFrac r
63	$\frac{1}{{}_{a}x_{c} r}$	StartFrac 1 Over Sub a Base x Sub c Base r EndFrac
64	${}_{a}x_{c}^{d}$	Sub a Base x Sub c Sup d
65	${}_{a}x_{c}^{d} r$	Sub a Base x Sub c Sup d Base r
66	$\sqrt{{}_{a}x_{c}^{d}} r$	StartRoot Sub a Base x Sub c Sup d Base EndRoot r
67	$\sqrt{{}_{a}x_{c}^{d} r}$	StartRoot Sub a Base x Sub c Sup d Base r EndRoot
68	$\frac{1}{{}_{a}x_{c}^{d}} r$	StartFrac 1 Over Sub a Base x Sub c Sup d Base EndFrac r
69	$\frac{1}{{}_{a}x_{c}^{d} r}$	StartFrac 1 Over Sub a Base x Sub c Sup d Base r EndFrac
70	${}_{a}^{b}x_{c^{l}}$	Sub a Sup b Base x Sub c Sub Sup l
71	${}_{a}^{b}x_{c_{l}}^{d}$	Sub a Sup b Base x Sub c Sub Sub l Sup d
72	${}_{a}^{b}x_{c_{l^{k}}}^{d}_{e}$	Sub a Sup b Base x Sub c Sub Sub l Sub Sub Sup k Sub e Sup d
73	${}_{a}^{b}x_{c^{l}}^{d}$	Sub a Sup b Base x Sub c Sub Sup l Sup d
74	${}_{a}^{b}x_{c k^{l}}^{d}$	Sub a Sup b Base x Sub c k Sub Sup l Sup d
75	${}_{a}^{b}x_{c}^{d} {}_{a}^{b}x_{c}^{d}$	Sub a Sup b Base x Sub c Sup d Base Sub a Sup b Base x Sub c Sup d

English Mathspeak Tensor tests. Locale: en, Style: Superbrief.

0	${}_{a}^{b}x_{c}^{d}$	Sub a Sup b Base x Sub c Sup d
1	${}_{a}^{b}x_{c}$	Sub a Sup b Base x Sub c
2	${}_{a}^{b}x^{d}$	Sub a Sup b Base x Sup d
3	${}_{a}^{b}x^{d} r$	Sub a Sup b Base x Sup d Base r
4	$\sqrt{{}_{a}^{b}x^{d}} r$	Root Sub a Sup b Base x Sup d Base EndRoot r
5	$\sqrt{{}_{a}^{b}x^{d} r}$	Root Sub a Sup b Base x Sup d Base r EndRoot
6	$\frac{1}{{}_{a}^{b}x^{d}} r$	Frac 1 Over Sub a Sup b Base x Sup d Base EndFrac r
7	$\frac{1}{{}_{a}^{b}x^{d} r}$	Frac 1 Over Sub a Sup b Base x Sup d Base r EndFrac
8	${}_{a}^{b}x$	Sub a Sup b Base x
9	${}_{a}^{b}x r$	Sub a Sup b Base x r
10	$\sqrt{{}_{a}^{b}x} r$	Root Sub a Sup b Base x EndRoot r
11	$\sqrt{{}_{a}^{b}x r}$	Root Sub a Sup b Base x r EndRoot
12	$\frac{1}{{}_{a}^{b}x} r$	Frac 1 Over Sub a Sup b Base x EndFrac r
13	$\frac{1}{{}_{a}^{b}x r}$	Frac 1 Over Sub a Sup b Base x r EndFrac
14	${}_{a}^{b}x_{c} r$	Sub a Sup b Base x Sub c Base r
15	${}_{a}^{b}x_{c}^{d} r$	Sub a Sup b Base x Sub c Sup d Base r
16	$\sqrt{{}_{a}^{b}x_{c}^{d}}$	Root Sub a Sup b Base x Sub c Sup d EndRoot
17	$\sqrt{{}_{a}^{b}x_{c}^{d}} r$	Root Sub a Sup b Base x Sub c Sup d Base EndRoot r
18	$\sqrt{{}_{a}^{b}x_{c}^{d} r}$	Root Sub a Sup b Base x Sub c Sup d Base r EndRoot
19	$\frac{1}{{}_{a}^{b}x_{c}^{d}}$	Frac 1 Over Sub a Sup b Base x Sub c Sup d EndFrac
20	$\frac{1}{{}_{a}^{b}x_{c}^{d}} r$	Frac 1 Over Sub a Sup b Base x Sub c Sup d Base EndFrac r
21	$\frac{1}{{}_{a}^{b}x_{c}^{d} r}$	Frac 1 Over Sub a Sup b Base x Sub c Sup d Base r EndFrac
22	${}^{b}x$	Sup b Base x
23	${}^{b}x r$	Sup b Base x r
24	$\sqrt{{}^{b}x} r$	Root Sup b Base x EndRoot r
25	$\sqrt{{}^{b}x r}$	Root Sup b Base x r EndRoot
26	$\frac{1}{{}^{b}x} r$	Frac 1 Over Sup b Base x EndFrac r
27	$\frac{1}{{}^{b}x r}$	Frac 1 Over Sup b Base x r EndFrac
28	${}^{b}x^{d}$	Sup b Base x Sup d
29	${}^{b}x^{d} r$	Sup b Base x Sup d Base r
30	$\sqrt{{}^{b}x^{d}} r$	Root Sup b Base x Sup d Base EndRoot r
31	$\sqrt{{}^{b}x^{d} r}$	Root Sup b Base x Sup d Base r EndRoot
32	$\frac{1}{{}^{b}x^{d}} r$	Frac 1 Over Sup b Base x Sup d Base EndFrac r
33	$\frac{1}{{}^{b}x^{d} r}$	Frac 1 Over Sup b Base x Sup d Base r EndFrac
34	${}^{b}x_{c}$	Sup b Base x Sub c
35	${}^{b}x_{c} r$	Sup b Base x Sub c Base r
36	$\sqrt{{}^{b}x_{c}} r$	Root Sup b Base x Sub c Base EndRoot r
37	$\sqrt{{}^{b}x_{c} r}$	Root Sup b Base x Sub c Base r EndRoot
38	$\frac{1}{{}^{b}x_{c}} r$	Frac 1 Over Sup b Base x Sub c Base EndFrac r
39	$\frac{1}{{}^{b}x_{c} r}$	Frac 1 Over Sup b Base x Sub c Base r EndFrac
40	${}^{b}x_{c}^{d}$	Sup b Base x Sub c Sup d
41	${}^{b}x_{c}^{d} r$	Sup b Base x Sub c Sup d Base r
42	$\sqrt{{}^{b}x_{c}^{d}} r$	Root Sup b Base x Sub c Sup d Base EndRoot r
43	$\sqrt{{}^{b}x_{c}^{d} r}$	Root Sup b Base x Sub c Sup d Base r EndRoot
44	$\frac{1}{{}^{b}x_{c}^{d}} r$	Frac 1 Over Sup b Base x Sub c Sup d Base EndFrac r
45	$\frac{1}{{}^{b}x_{c}^{d} r}$	Frac 1 Over Sup b Base x Sub c Sup d Base r EndFrac
46	${}_{a}x$	Sub a Base x
47	${}_{a}x r$	Sub a Base x r
48	$\sqrt{{}_{a}x} r$	Root Sub a Base x EndRoot r
49	$\sqrt{{}_{a}x r}$	Root Sub a Base x r EndRoot
50	$\frac{1}{{}_{a}x} r$	Frac 1 Over Sub a Base x EndFrac r
51	$\frac{1}{{}_{a}x r}$	Frac 1 Over Sub a Base x r EndFrac
52	${}_{a}x^{d}$	Sub a Base x Sup d
53	${}_{a}x^{d} r$	Sub a Base x Sup d Base r
54	$\sqrt{{}_{a}x^{d}} r$	Root Sub a Base x Sup d Base EndRoot r
55	$\sqrt{{}_{a}x^{d} r}$	Root Sub a Base x Sup d Base r EndRoot
56	$\frac{1}{{}_{a}x^{d}} r$	Frac 1 Over Sub a Base x Sup d Base EndFrac r
57	$\frac{1}{{}_{a}x^{d} r}$	Frac 1 Over Sub a Base x Sup d Base r EndFrac
58	${}_{a}x_{c}$	Sub a Base x Sub c
59	${}_{a}x_{c} r$	Sub a Base x Sub c Base r
60	$\sqrt{{}_{a}x_{c}} r$	Root Sub a Base x Sub c Base EndRoot r
61	$\sqrt{{}_{a}x_{c} r}$	Root Sub a Base x Sub c Base r EndRoot
62	$\frac{1}{{}_{a}x_{c}} r$	Frac 1 Over Sub a Base x Sub c Base EndFrac r
63	$\frac{1}{{}_{a}x_{c} r}$	Frac 1 Over Sub a Base x Sub c Base r EndFrac
64	${}_{a}x_{c}^{d}$	Sub a Base x Sub c Sup d
65	${}_{a}x_{c}^{d} r$	Sub a Base x Sub c Sup d Base r
66	$\sqrt{{}_{a}x_{c}^{d}} r$	Root Sub a Base x Sub c Sup d Base EndRoot r
67	$\sqrt{{}_{a}x_{c}^{d} r}$	Root Sub a Base x Sub c Sup d Base r EndRoot
68	$\frac{1}{{}_{a}x_{c}^{d}} r$	Frac 1 Over Sub a Base x Sub c Sup d Base EndFrac r
69	$\frac{1}{{}_{a}x_{c}^{d} r}$	Frac 1 Over Sub a Base x Sub c Sup d Base r EndFrac
70	${}_{a}^{b}x_{c^{l}}$	Sub a Sup b Base x Sub c Sub Sup l
71	${}_{a}^{b}x_{c_{l}}^{d}$	Sub a Sup b Base x Sub c Sub Sub l Sup d
72	${}_{a}^{b}x_{c_{l^{k}}}^{d}_{e}$	Sub a Sup b Base x Sub c Sub Sub l Sub Sub Sup k Sub e Sup d
73	${}_{a}^{b}x_{c^{l}}^{d}$	Sub a Sup b Base x Sub c Sub Sup l Sup d
74	${}_{a}^{b}x_{c k^{l}}^{d}$	Sub a Sup b Base x Sub c k Sub Sup l Sup d
75	${}_{a}^{b}x_{c}^{d} {}_{a}^{b}x_{c}^{d}$	Sub a Sup b Base x Sub c Sup d Base Sub a Sup b Base x Sub c Sup d

English Mathspeak tests. Locale: en, Style: Verbose.

0	$π \approx 3.14159$	pi almost equals 3.14159
1	$102 + 2,214 + 15 = 2,331$	102 plus 2,214 plus 15 equals 2,331
2	$59 \times 0 = 0$	59 times 0 equals 0
3	$3 - - 2$	3 minus negative 2
4	$- y$	negative y
5	$- 32$	negative 32
6	$t2e4$	Number t 2 e 4
7	$#FF0000$	Number number sign F F 0 0 0 0
8	$0x15FF + 0x2B01 = 0x4100$	Number 0 x 1 5 F F plus Number 0 x 2 B 0 1 equals Number 0 x 4 1 0 0
9	$I, II, III, IV, V .$	upper I comma UpperWord I I comma UpperWord I I I comma UpperWord I V comma upper V period
10	$d = \sqrt{{(X - x)}^{2} - {(Y - y)}^{2}}$	d equals StartRoot left parenthesis upper X minus x right parenthesis squared minus left parenthesis upper Y minus y right parenthesis squared EndRoot
11	$If A \to B and B \to C then A \to C .$	If upper A right arrow upper B and upper B right arrow upper C then upper A right arrow upper C period
12	$[x]$	bold left bracket x bold right bracket
13	$\oint E \cdot d l = - \frac{d Φ B}{d t}$	contour integral upper E dot d bold l equals minus StartFraction d upper Phi upper B Over d t EndFraction
14	$- \frac{1}{b}$	minus StartFraction 1 Over b EndFraction
15	$- \frac{a}{b}$	minus StartFraction a Over b EndFraction
16	$- 3 \frac{1}{2}$	negative 3 and one half
17	$Uppercase ({α, β, γ, δ, ϵ, φ}) = {Α, Β, Γ, Δ, Ε, Φ}$	Uppercase left parenthesis StartSet alpha comma beta comma gamma comma delta comma epsilon comma phi EndSet right parenthesis equals StartSet upper Alpha comma upper Beta comma upper Gamma comma upper Delta comma upper Epsilon comma upper Phi EndSet
18	$y - 1$	y minus 1
19	$(1 -to- 1)$	left parenthesis 1 hyphen to hyphen 1 right parenthesis
20	$- 1$	negative 1
21	$The Fibonacci numbers are: {0, 1, 1, 2, 3, 5, 8, \dots}$	The Fibonacci numbers are colon StartSet 0 comma 1 comma 1 comma 2 comma 3 comma 5 comma 8 comma ellipsis EndSet
22	$\| 4 - 7 \| = 3$	StartAbsoluteValue 4 minus 7 EndAbsoluteValue equals 3
23	$\|a \pm \|b - c\|\| \neq \|a\| \pm \|b - c\|$	StartAbsoluteValue a plus or minus StartAbsoluteValue b minus c EndAbsoluteValue EndAbsoluteValue not equals StartAbsoluteValue a EndAbsoluteValue plus or minus StartAbsoluteValue b minus c EndAbsoluteValue
24	$\frac{1}{x}$	StartFraction 1 Over x EndFraction
25	$a - \frac{b + c}{d - e} \times f$	a minus StartFraction b plus c Over d minus e EndFraction times f
26	$\frac{\frac{x}{y}}{z} \neq \frac{x}{\frac{y}{z}}$	StartStartFraction StartFraction x Over y EndFraction OverOver z EndEndFraction not equals StartStartFraction x OverOver StartFraction y Over z EndFraction EndEndFraction
27	$\frac{\frac{(1 - x) \frac{d}{d x} (2 x) - 2 x \frac{d}{d x} (1 - x)}{{(1 - x)}^{2}}}{1 + {(\frac{2 x}{1 - x})}^{2}}$	StartStartStartFraction StartStartFraction left parenthesis 1 minus x right parenthesis StartFraction d Over d x EndFraction left parenthesis 2 x right parenthesis minus 2 x StartFraction d Over d x EndFraction left parenthesis 1 minus x right parenthesis OverOver left parenthesis 1 minus x right parenthesis squared EndEndFraction OverOverOver 1 plus left parenthesis StartFraction 2 x Over 1 minus x EndFraction right parenthesis squared EndEndEndFraction
28	$a_{0} + \frac{1}{a_{1} + \frac{1}{a_{2} + \frac{1}{\dots + \frac{1}{a_{n}}}}}$	a 0 plus StartStartStartStartFraction 1 OverOverOverOver a 1 plus StartStartStartFraction 1 OverOverOver a 2 plus StartStartFraction 1 OverOver ellipsis plus StartFraction 1 Over a Subscript n Baseline EndFraction EndEndFraction EndEndEndFraction EndEndEndEndFraction
29	$\frac{1}{2} + \frac{2}{2} + \frac{3}{2} + \frac{4}{2} + \dots = \sum_{n = 1}^{\infty} \frac{n}{2}$	one half plus two halves plus three halves plus four halves plus ellipsis equals sigma summation Underscript n equals 1 Overscript infinity Endscripts StartFraction n Over 2 EndFraction
30	$\frac{20}{5} \times \frac{1}{100} = \frac{1}{25}$	StartFraction 20 Over 5 EndFraction times StartFraction 1 Over 100 EndFraction equals one twenty fifth
31	$\frac{\frac{3}{5}}{8} = \frac{3}{5} \times \frac{1}{8}$	StartFraction three fifths Over 8 EndFraction equals three fifths times one eighth
32	$3 \frac{5}{8} = \frac{29}{8}$	3 and five eighths equals StartFraction 29 Over 8 EndFraction
33	$a_{0} + \frac{b_{1}}{a_{1} + \frac{b_{2}}{a_{2} + \frac{b_{3}}{a_{3} + \dots}}} = a_{0} + \frac{b_{1}}{a_{1}} + \frac{b_{2}}{a_{2}} + \dots$	a 0 plus ContinuedFraction b 1 Over a 1 plus StartFraction b 2 Over a 2 plus StartFraction b 3 Over a 3 plus ellipsis equals a 0 plus StartFraction b 1 Over a 1 EndFraction plus StartFraction b 2 Over a 2 EndFraction plus ellipsis
34	$x^{3} + 6 x^{2} - x = 30$	x cubed plus 6 x squared minus x equals 30
35	$\frac{d^{2} y}{d x^{2}} + (a x^{2} + b x + c) y = 0$	StartFraction d squared y Over d x squared EndFraction plus left parenthesis a x squared plus b x plus c right parenthesis y equals 0
36	$x^{\frac{1}{2}}$	x Superscript one half
37	$x_{n}$	x Subscript n
38	$x^{a}$	x Superscript a
39	$x^{m + n}$	x Superscript m plus n
40	$T_{n - 1} + 5 = 0$	upper T Subscript n minus 1 Baseline plus 5 equals 0
41	$x^{m + n} = x^{m} x^{n}$	x Superscript m plus n Baseline equals x Superscript m Baseline x Superscript n
42	$x^{a_{n} + a_{n - 1}}$	x Superscript a Super Subscript n Superscript plus a Super Subscript n minus 1
43	$x^{a_{b}}$	x Superscript a Super Subscript b
44	$x_{a^{b}}$	x Subscript a Sub Superscript b
45	$y^{a^{b_{c}}} \neq y^{a^{b} c}$	y Superscript a Super Superscript b Super Super Subscript c Baseline not equals y Superscript a Super Superscript b Superscript c
46	$y^{a^{_{c} b}}$	y Superscript a Super Super Subscript c Super Superscript b
47	$y^{a^{_{c}}}$	y Superscript a Super Super Subscript c
48	$y_{a_{^{c}}}$	y Subscript a Sub Sub Superscript c
49	$y_{a_{^{c} b}}$	y Subscript a Sub Sub Superscript c Sub Subscript b
50	$x^{a^{b}}$	x Superscript a Super Superscript b
51	$x_{a_{b}}$	x Subscript a Sub Subscript b
52	$T^{(x^{a} + y^{b})}$	upper T Superscript left parenthesis x Super Superscript a Superscript plus y Super Superscript b Superscript right parenthesis
53	$x_{1}$	x 1
54	$x_{- 1}$	x Subscript negative 1
55	$x_{10,000}$	x 10,000
56	$x_{1.3}$	x 1.3
57	$4 Fe + 3 O_{2} \to 2 {Fe}_{2} O_{3}$	4 upper F e plus 3 upper O 2 right arrow 2 upper F e 2 upper O 3
58	$a_{2, 3}$	a Subscript 2 comma 3
59	$T_{n_{1} + n_{0}}$	upper T Subscript n 1 plus n 0
60	${log}_{2} (x) = \frac{{log}_{10} (x)}{{log}_{10} (2)}$	log Subscript 2 Baseline left parenthesis x right parenthesis equals StartFraction log Subscript 10 Baseline left parenthesis x right parenthesis Over log Subscript 10 Baseline left parenthesis 2 right parenthesis EndFraction
61	$Φ_{5}$	upper Phi 5
62	$ln x = \int_{1}^{x} \frac{d t}{t}$	ln x equals integral Subscript 1 Superscript x Baseline StartFraction d t Over t EndFraction
63	$$ n 2 = 2 * $ n + 1;$	dollar sign n Baseline 2 equals 2 asterisk dollar sign n plus 1 semicolon
64	$n 2$	n Baseline bold 2
65	${}_{c d}^{a b}x_{e f}^{g h}$	Subscript c d Superscript a b Baseline x Subscript e f Superscript g h
66	${}_{c}^{a}_{d}^{b}x_{e}^{g}_{f}^{h}$	Subscript c d Superscript a b Baseline x Subscript e f Superscript g h
67	$T_{0}^{2}$	upper T 0 squared
68	${T_{0}}^{2}$	upper T 0 squared
69	$T_{0}^{3}$	upper T 0 cubed
70	${T_{0}}^{3}$	upper T 0 cubed
71	$T_{n - 1}^{2}$	upper T Subscript n minus 1 Superscript 2
72	$x^{'}$	x prime
73	$f^{'''} (y) = \frac{d f^{''} (y)}{d y}$	f triple prime left parenthesis y right parenthesis equals StartFraction d f double prime left parenthesis y right parenthesis Over d y EndFraction
74	$ρ^{'} = ρ_{+}^{'} + ρ_{-}^{'}$	rho prime equals rho prime Subscript plus Baseline plus rho prime Subscript minus
75	$x_{10}^{'}$	x prime 10
76	$T_{n}^{'}$	upper T prime Subscript n
77	$[\begin{matrix} x^{n} & y^{n} & z^{n} \\ x^{n + 1} & y^{n + 1} & z^{n + 1} \end{matrix}]$	Start 2 By 3 Matrix 1st Row 1st Column x Superscript n 2nd Column y Superscript n 3rd Column z Superscript n 2nd Row 1st Column x Superscript n plus 1 2nd Column y Superscript n plus 1 3rd Column z Superscript n plus 1 EndMatrix
78	${x_{a}}^{b}$	x Subscript a Baseline Superscript b
79	${x^{b}}_{a}$	x Superscript b Baseline Subscript a
80	${log}^{4}^{b} x$	log Superscript 4 Superscript b Baseline x
81	$T_{n}_{a} y$	upper T Subscript n Subscript a Baseline y
82	$\sqrt{2}$	StartRoot 2 EndRoot
83	$\sqrt{m + n}$	StartRoot m plus n EndRoot
84	$\sqrt[m + n]{x + y}$	RootIndex m plus n StartRoot x plus y EndRoot
85	$\sqrt[n]{x^{m}} = {(\sqrt[n]{x})}^{m} = x^{\frac{m}{n}}, x > 0$	RootIndex n StartRoot x Superscript m Baseline EndRoot equals left parenthesis RootIndex n StartRoot x EndRoot right parenthesis Superscript m Baseline equals x Superscript StartFraction m Over n EndFraction Baseline comma x greater than 0
86	$\sqrt[3]{x} = x^{\frac{1}{3}}$	RootIndex 3 StartRoot x EndRoot equals x Superscript one third
87	$\sqrt{\sqrt{x + 1} + \sqrt{y + 1}}$	NestedStartRoot StartRoot x plus 1 EndRoot plus StartRoot y plus 1 EndRoot NestedEndRoot
88	$\sqrt[n]{\sqrt[m]{x}} = \sqrt[m]{\sqrt[n]{x}}$	NestedRootIndex n NestedStartRoot RootIndex m StartRoot x EndRoot NestedEndRoot equals NestedRootIndex m NestedStartRoot RootIndex n StartRoot x EndRoot NestedEndRoot
89	$x^{e - 2} = \sqrt{x \sqrt[3]{x \sqrt[4]{x \sqrt[5]{x \dots}}}}, x \in ℝ$	x Superscript e minus 2 Baseline equals Nested3StartRoot x NestedTwiceRootIndex 3 NestedTwiceStartRoot x NestedRootIndex 4 NestedStartRoot x RootIndex 5 StartRoot x ellipsis EndRoot NestedEndRoot NestedTwiceEndRoot Nested3EndRoot comma x element of double struck upper R
90	$\frac{2}{π} = \frac{\sqrt{2}}{2} \frac{\sqrt{2 + \sqrt{2}}}{2} \frac{\sqrt{2 + \sqrt{2 + \sqrt{2}}}}{2} \dots$	StartFraction 2 Over pi EndFraction equals StartFraction StartRoot 2 EndRoot Over 2 EndFraction StartFraction NestedStartRoot 2 plus StartRoot 2 EndRoot NestedEndRoot Over 2 EndFraction StartFraction NestedTwiceStartRoot 2 plus NestedStartRoot 2 plus StartRoot 2 EndRoot NestedEndRoot NestedTwiceEndRoot Over 2 EndFraction ellipsis
91	$\frac{5 x y}{2 y} = \frac{5}{2} x$	StartFraction 5 x CrossOut y EndCrossOut Over 2 CrossOut y EndCrossOut EndFraction equals five halves x
92	$\frac{12}{18} = \frac{\overset{2}{12}}{\underset{3}{18}} = \frac{2}{3}$	StartFraction 12 Over 18 EndFraction equals StartFraction CrossOut 12 With 2 EndCrossOut Over CrossOut 18 With 3 EndCrossOut EndFraction equals two thirds
93	$\frac{12}{18} = \frac{\underset{12}{2}}{\overset{18}{3}} = \frac{2}{3}$	StartFraction 12 Over 18 EndFraction equals StartFraction CrossOut 12 With 2 EndCrossOut Over CrossOut 18 With 3 EndCrossOut EndFraction equals two thirds
94	$\ddot{x}$	ModifyingAbove x With two dots
95	$\vec{x + y}$	ModifyingAbove x plus y With right arrow
96	$\hat{x}$	ModifyingAbove x With caret
97	$\underset{˙}{x}$	ModifyingBelow x With dot
98	$\tilde{x}$	x overtilde
99	$\bar{x}$	x overbar
100	$\underset{˜}{y}$	y undertilde
101	$\bar{\bar{x}}$	x overbar overbar
102	$\underline{\underline{\bar{\bar{y}}}}$	y overbar overbar underbar underbar
103	$\underset{*}{\underline{a + b}}$	ModifyingBelow Below ModifyingBelow a plus b With bar With asterisk
104	$\bar{\tilde{x + y}}$	ModifyingAbove Above ModifyingAbove x plus y With tilde With bar
105	$\sum_{n = 1}^{\infty} a_{n}$	sigma summation Underscript n equals 1 Overscript infinity Endscripts a Subscript n
106	$\underset{b = 3}{\underset{a = 5}{\underline{x + y}}}$	ModifyingBelow x plus y With bar Underscript a equals 5 UnderUnderscript b equals 3 Endscripts
107	$\overset{m = 2}{\overset{n = 1}{\bar{x + y}}}$	ModifyingAbove x plus y With bar Overscript n equals 1 OverOverscript m equals 2 Endscripts
108	${log}_{b} x$	log Subscript b Baseline x
109	$cos y$	cosine y
110	$sin x$	sine x
111	$\frac{60 mi}{hr} \times \frac{5,280 ft}{1 mi} \times \frac{1 hr}{60 \min} = \frac{5,280 ft}{\min}$	StartFraction 60 CrossOut miles EndCrossOut Over CrossOut hours EndCrossOut EndFraction times StartFraction 5,280 feet Over 1 CrossOut miles EndCrossOut EndFraction times StartFraction 1 CrossOut hours EndCrossOut Over 60 minutes EndFraction equals StartFraction 5,280 feet Over minutes EndFraction
112	$1 J = 1 kg \cdot m^{2} \cdot s^{- 2}$	1 joules equals 1 kilograms dot meters squared dot seconds Superscript negative 2
113	$m m = 100 m cm = \frac{m}{1,000} km$	m meters equals 100 m centimeters equals StartFraction m Over 1,000 EndFraction kilometers
114	$1 mi \approx 1.6 km$	1 miles almost equals 1.6 kilometers
115	$1 in = 2.54 cm$	1 inches equals 2.54 centimeters
116	$\begin{matrix} H_{2} & + & F_{2} & \to & 2 H F \\ hydrogen & fluorine & hydrogen fluoride \end{matrix}$	StartLayout 1st Row 1st Column upper H 2 2nd Column plus 3rd Column upper F 2 4th Column right arrow 5th Column 2 upper H upper F 2nd Row 1st Column hydrogen 2nd Column Blank 3rd Column fluorine 4th Column Blank 5th Column hydrogen fluoride EndLayout
117	$x = \{\begin{matrix} y < 0 & 0 \\ y \geq 0 & 2 y \end{matrix}$	x equals StartLayout Enlarged left brace 1st Row 1st Column y less than 0 2nd Column 0 2nd Row 1st Column y greater than or equals 0 2nd Column 2 y EndLayout
118	$[\begin{matrix} x + a & x + b & x + c \\ y + a & y + b & y + c \\ z + a & z + b & z + c \end{matrix}]$	Start 3 By 3 Matrix 1st Row 1st Column x plus a 2nd Column x plus b 3rd Column x plus c 2nd Row 1st Column y plus a 2nd Column y plus b 3rd Column y plus c 3rd Row 1st Column z plus a 2nd Column z plus b 3rd Column z plus c EndMatrix
119	$\|\begin{matrix} a + 1 & b \\ c & d \end{matrix}\| = (a + 1) d - b c$	Start 2 By 2 Determinant 1st Row 1st Column a plus 1 2nd Column b 2nd Row 1st Column c 2nd Column d EndDeterminant equals left parenthesis a plus 1 right parenthesis d minus b c
120	$\|\begin{matrix} a & b \\ c & d \end{matrix}\| = a d - b c$	Start 2 By 2 Determinant 1st Row a b 2nd Row c d EndDeterminant equals a d minus b c
121	$(\begin{matrix} x \\ y \end{matrix})$	StartBinomialOrMatrix x Choose y EndBinomialOrMatrix

English Mathspeak tests. Locale: en, Style: Brief.

0	$π \approx 3.14159$	pi almost equals 3.14159
1	$102 + 2,214 + 15 = 2,331$	102 plus 2,214 plus 15 equals 2,331
2	$59 \times 0 = 0$	59 times 0 equals 0
3	$3 - - 2$	3 minus negative 2
4	$- y$	negative y
5	$- 32$	negative 32
6	$t2e4$	Num t 2 e 4
7	$#FF0000$	Num num sign F F 0 0 0 0
8	$0x15FF + 0x2B01 = 0x4100$	Num 0 x 1 5 F F plus Num 0 x 2 B 0 1 equals Num 0 x 4 1 0 0
9	$I, II, III, IV, V .$	upper I comma UpperWord I I comma UpperWord I I I comma UpperWord I V comma upper V period
10	$d = \sqrt{{(X - x)}^{2} - {(Y - y)}^{2}}$	d equals StartRoot left p'ren upper X minus x right p'ren squared minus left p'ren upper Y minus y right p'ren squared EndRoot
11	$If A \to B and B \to C then A \to C .$	If upper A right arrow upper B and upper B right arrow upper C then upper A right arrow upper C period
12	$[x]$	bold left brack x bold right brack
13	$\oint E \cdot d l = - \frac{d Φ B}{d t}$	contour integral upper E dot d bold l equals minus StartFrac d upper Phi upper B Over d t EndFrac
14	$Uppercase ({α, β, γ, δ, ϵ, φ}) = {Α, Β, Γ, Δ, Ε, Φ}$	Uppercase left p'ren StartSet alpha comma beta comma gamma comma delta comma epsilon comma phi EndSet right p'ren equals StartSet upper Alpha comma upper Beta comma upper Gamma comma upper Delta comma upper Epsilon comma upper Phi EndSet
15	$y - 1$	y minus 1
16	$(1 -to- 1)$	left p'ren 1 hyphen to hyphen 1 right p'ren
17	$- 1$	negative 1
18	$The Fibonacci numbers are: {0, 1, 1, 2, 3, 5, 8, \dots}$	The Fibonacci numbers are colon StartSet 0 comma 1 comma 1 comma 2 comma 3 comma 5 comma 8 comma ellipsis EndSet
19	$\| 4 - 7 \| = 3$	StartAbsoluteValue 4 minus 7 EndAbsoluteValue equals 3
20	$\|a \pm \|b - c\|\| \neq \|a\| \pm \|b - c\|$	StartAbsoluteValue a plus or minus StartAbsoluteValue b minus c EndAbsoluteValue EndAbsoluteValue not equals StartAbsoluteValue a EndAbsoluteValue plus or minus StartAbsoluteValue b minus c EndAbsoluteValue
21	$\frac{1}{x}$	StartFrac 1 Over x EndFrac
22	$a - \frac{b + c}{d - e} \times f$	a minus StartFrac b plus c Over d minus e EndFrac times f
23	$\frac{\frac{x}{y}}{z} \neq \frac{x}{\frac{y}{z}}$	StartStartFrac StartFrac x Over y EndFrac OverOver z EndEndFrac not equals StartStartFrac x OverOver StartFrac y Over z EndFrac EndEndFrac
24	$\frac{\frac{(1 - x) \frac{d}{d x} (2 x) - 2 x \frac{d}{d x} (1 - x)}{{(1 - x)}^{2}}}{1 + {(\frac{2 x}{1 - x})}^{2}}$	StartStartStartFrac StartStartFrac left p'ren 1 minus x right p'ren StartFrac d Over d x EndFrac left p'ren 2 x right p'ren minus 2 x StartFrac d Over d x EndFrac left p'ren 1 minus x right p'ren OverOver left p'ren 1 minus x right p'ren squared EndEndFrac OverOverOver 1 plus left p'ren StartFrac 2 x Over 1 minus x EndFrac right p'ren squared EndEndEndFrac
25	$a_{0} + \frac{1}{a_{1} + \frac{1}{a_{2} + \frac{1}{\dots + \frac{1}{a_{n}}}}}$	a 0 plus StartStartStartStartFrac 1 OverOverOverOver a 1 plus StartStartStartFrac 1 OverOverOver a 2 plus StartStartFrac 1 OverOver ellipsis plus StartFrac 1 Over a Sub n Base EndFrac EndEndFrac EndEndEndFrac EndEndEndEndFrac
26	$\frac{1}{2} + \frac{2}{2} + \frac{3}{2} + \frac{4}{2} + \dots = \sum_{n = 1}^{\infty} \frac{n}{2}$	one half plus two halves plus three halves plus four halves plus ellipsis equals sigma summation Underscript n equals 1 Overscript infinity Endscripts StartFrac n Over 2 EndFrac
27	$\frac{20}{5} \times \frac{1}{100} = \frac{1}{25}$	StartFrac 20 Over 5 EndFrac times StartFrac 1 Over 100 EndFrac equals one twenty fifth
28	$\frac{\frac{3}{5}}{8} = \frac{3}{5} \times \frac{1}{8}$	StartFrac three fifths Over 8 EndFrac equals three fifths times one eighth
29	$3 \frac{5}{8} = \frac{29}{8}$	3 and five eighths equals StartFrac 29 Over 8 EndFrac
30	$a_{0} + \frac{b_{1}}{a_{1} + \frac{b_{2}}{a_{2} + \frac{b_{3}}{a_{3} + \dots}}} = a_{0} + \frac{b_{1}}{a_{1}} + \frac{b_{2}}{a_{2}} + \dots$	a 0 plus ContinuedFrac b 1 Over a 1 plus StartFrac b 2 Over a 2 plus StartFrac b 3 Over a 3 plus ellipsis equals a 0 plus StartFrac b 1 Over a 1 EndFrac plus StartFrac b 2 Over a 2 EndFrac plus ellipsis
31	$x^{3} + 6 x^{2} - x = 30$	x cubed plus 6 x squared minus x equals 30
32	$\frac{d^{2} y}{d x^{2}} + (a x^{2} + b x + c) y = 0$	StartFrac d squared y Over d x squared EndFrac plus left p'ren a x squared plus b x plus c right p'ren y equals 0
33	$x^{\frac{1}{2}}$	x Sup one half
34	$x_{n}$	x Sub n
35	$x^{a}$	x Sup a
36	$x^{m + n}$	x Sup m plus n
37	$T_{n - 1} + 5 = 0$	upper T Sub n minus 1 Base plus 5 equals 0
38	$x^{m + n} = x^{m} x^{n}$	x Sup m plus n Base equals x Sup m Base x Sup n
39	$x^{a_{n} + a_{n - 1}}$	x Sup a Sup Sub n Sup plus a Sup Sub n minus 1
40	$x^{a_{b}}$	x Sup a Sup Sub b
41	$x_{a^{b}}$	x Sub a Sub Sup b
42	$y^{a^{b_{c}}} \neq y^{a^{b} c}$	y Sup a Sup Sup b Sup Sup Sub c Base not equals y Sup a Sup Sup b Sup c
43	$y^{a^{_{c} b}}$	y Sup a Sup Sup Sub c Sup Sup b
44	$y^{a^{_{c}}}$	y Sup a Sup Sup Sub c
45	$y_{a_{^{c}}}$	y Sub a Sub Sub Sup c
46	$y_{a_{^{c} b}}$	y Sub a Sub Sub Sup c Sub Sub b
47	$x^{a^{b}}$	x Sup a Sup Sup b
48	$x_{a_{b}}$	x Sub a Sub Sub b
49	$T^{(x^{a} + y^{b})}$	upper T Sup left p'ren x Sup Sup a Sup plus y Sup Sup b Sup right p'ren
50	$x_{1}$	x 1
51	$x_{- 1}$	x Sub negative 1
52	$x_{10,000}$	x 10,000
53	$x_{1.3}$	x 1.3
54	$4 Fe + 3 O_{2} \to 2 {Fe}_{2} O_{3}$	4 upper F e plus 3 upper O 2 right arrow 2 upper F e 2 upper O 3
55	$a_{2, 3}$	a Sub 2 comma 3
56	$T_{n_{1} + n_{0}}$	upper T Sub n 1 plus n 0
57	${log}_{2} (x) = \frac{{log}_{10} (x)}{{log}_{10} (2)}$	log Sub 2 Base left p'ren x right p'ren equals StartFrac log Sub 10 Base left p'ren x right p'ren Over log Sub 10 Base left p'ren 2 right p'ren EndFrac
58	$Φ_{5}$	upper Phi 5
59	$ln x = \int_{1}^{x} \frac{d t}{t}$	ln x equals integral Sub 1 Sup x Base StartFrac d t Over t EndFrac
60	$$ n 2 = 2 * $ n + 1;$	dollar sign n Base 2 equals 2 asterisk dollar sign n plus 1 semicolon
61	$n 2$	n Base bold 2
62	${}_{c d}^{a b}x_{e f}^{g h}$	Sub c d Sup a b Base x Sub e f Sup g h
63	${}_{c}^{a}_{d}^{b}x_{e}^{g}_{f}^{h}$	Sub c d Sup a b Base x Sub e f Sup g h
64	$T_{0}^{2}$	upper T 0 squared
65	${T_{0}}^{2}$	upper T 0 squared
66	$T_{0}^{3}$	upper T 0 cubed
67	${T_{0}}^{3}$	upper T 0 cubed
68	$T_{n - 1}^{2}$	upper T Sub n minus 1 Sup 2
69	$x^{'}$	x prime
70	$f^{'''} (y) = \frac{d f^{''} (y)}{d y}$	f triple prime left p'ren y right p'ren equals StartFrac d f double prime left p'ren y right p'ren Over d y EndFrac
71	$ρ^{'} = ρ_{+}^{'} + ρ_{-}^{'}$	rho prime equals rho prime Sub plus Base plus rho prime Sub minus
72	$x_{10}^{'}$	x prime 10
73	$T_{n}^{'}$	upper T prime Sub n
74	$[\begin{matrix} x^{n} & y^{n} & z^{n} \\ x^{n + 1} & y^{n + 1} & z^{n + 1} \end{matrix}]$	Start 2 By 3 Matrix 1st Row 1st Column x Sup n 2nd Column y Sup n 3rd Column z Sup n 2nd Row 1st Column x Sup n plus 1 2nd Column y Sup n plus 1 3rd Column z Sup n plus 1 EndMatrix
75	${x_{a}}^{b}$	x Sub a Base Sup b
76	${x^{b}}_{a}$	x Sup b Base Sub a
77	${log}^{4}^{b} x$	log Sup 4 Sup b Base x
78	$T_{n}_{a} y$	upper T Sub n Sub a Base y
79	$\sqrt{2}$	StartRoot 2 EndRoot
80	$\sqrt{m + n}$	StartRoot m plus n EndRoot
81	$\sqrt[m + n]{x + y}$	RootIndex m plus n StartRoot x plus y EndRoot
82	$\sqrt[n]{x^{m}} = {(\sqrt[n]{x})}^{m} = x^{\frac{m}{n}}, x > 0$	RootIndex n StartRoot x Sup m Base EndRoot equals left p'ren RootIndex n StartRoot x EndRoot right p'ren Sup m Base equals x Sup StartFrac m Over n EndFrac Base comma x greater than 0
83	$\sqrt[3]{x} = x^{\frac{1}{3}}$	RootIndex 3 StartRoot x EndRoot equals x Sup one third
84	$\sqrt{\sqrt{x + 1} + \sqrt{y + 1}}$	NestStartRoot StartRoot x plus 1 EndRoot plus StartRoot y plus 1 EndRoot NestEndRoot
85	$\sqrt[n]{\sqrt[m]{x}} = \sqrt[m]{\sqrt[n]{x}}$	NestRootIndex n NestStartRoot RootIndex m StartRoot x EndRoot NestEndRoot equals NestRootIndex m NestStartRoot RootIndex n StartRoot x EndRoot NestEndRoot
86	$x^{e - 2} = \sqrt{x \sqrt[3]{x \sqrt[4]{x \sqrt[5]{x \dots}}}}, x \in ℝ$	x Sup e minus 2 Base equals Nest3StartRoot x NestTwiceRootIndex 3 NestTwiceStartRoot x NestRootIndex 4 NestStartRoot x RootIndex 5 StartRoot x ellipsis EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot comma x element of double struck upper R
87	$\frac{2}{π} = \frac{\sqrt{2}}{2} \frac{\sqrt{2 + \sqrt{2}}}{2} \frac{\sqrt{2 + \sqrt{2 + \sqrt{2}}}}{2} \dots$	StartFrac 2 Over pi EndFrac equals StartFrac StartRoot 2 EndRoot Over 2 EndFrac StartFrac NestStartRoot 2 plus StartRoot 2 EndRoot NestEndRoot Over 2 EndFrac StartFrac NestTwiceStartRoot 2 plus NestStartRoot 2 plus StartRoot 2 EndRoot NestEndRoot NestTwiceEndRoot Over 2 EndFrac ellipsis
88	$\frac{5 x y}{2 y} = \frac{5}{2} x$	StartFrac 5 x CrossOut y EndCrossOut Over 2 CrossOut y EndCrossOut EndFrac equals five halves x
89	$\frac{12}{18} = \frac{\overset{2}{12}}{\underset{3}{18}} = \frac{2}{3}$	StartFrac 12 Over 18 EndFrac equals StartFrac CrossOut 12 With 2 EndCrossOut Over CrossOut 18 With 3 EndCrossOut EndFrac equals two thirds
90	$\frac{12}{18} = \frac{\underset{12}{2}}{\overset{18}{3}} = \frac{2}{3}$	StartFrac 12 Over 18 EndFrac equals StartFrac CrossOut 12 With 2 EndCrossOut Over CrossOut 18 With 3 EndCrossOut EndFrac equals two thirds
91	$\ddot{x}$	ModAbove x With two dots
92	$\vec{x + y}$	ModAbove x plus y With right arrow
93	$\hat{x}$	ModAbove x With caret
94	$\underset{˙}{x}$	ModBelow x With dot
95	$\tilde{x}$	x overtilde
96	$\bar{x}$	x overbar
97	$\underset{˜}{y}$	y undertilde
98	$\bar{\bar{x}}$	x overbar overbar
99	$\underline{\underline{\bar{\bar{y}}}}$	y overbar overbar underbar underbar
100	$\underset{*}{\underline{a + b}}$	ModBelow Below ModBelow a plus b With bar With asterisk
101	$\bar{\tilde{x + y}}$	ModAbove Above ModAbove x plus y With tilde With bar
102	$\sum_{n = 1}^{\infty} a_{n}$	sigma summation Underscript n equals 1 Overscript infinity Endscripts a Sub n
103	$\underset{b = 3}{\underset{a = 5}{\underline{x + y}}}$	ModBelow x plus y With bar Underscript a equals 5 UnderUnderscript b equals 3 Endscripts
104	$\overset{m = 2}{\overset{n = 1}{\bar{x + y}}}$	ModAbove x plus y With bar Overscript n equals 1 OverOverscript m equals 2 Endscripts
105	${log}_{b} x$	log Sub b Base x
106	$cos y$	cosine y
107	$sin x$	sine x
108	$\frac{60 mi}{hr} \times \frac{5,280 ft}{1 mi} \times \frac{1 hr}{60 \min} = \frac{5,280 ft}{\min}$	StartFrac 60 CrossOut miles EndCrossOut Over CrossOut hours EndCrossOut EndFrac times StartFrac 5,280 feet Over 1 CrossOut miles EndCrossOut EndFrac times StartFrac 1 CrossOut hours EndCrossOut Over 60 minutes EndFrac equals StartFrac 5,280 feet Over minutes EndFrac
109	$1 J = 1 kg \cdot m^{2} \cdot s^{- 2}$	1 joules equals 1 kilograms dot meters squared dot seconds Sup negative 2
110	$m m = 100 m cm = \frac{m}{1,000} km$	m meters equals 100 m centimeters equals StartFrac m Over 1,000 EndFrac kilometers
111	$1 mi \approx 1.6 km$	1 miles almost equals 1.6 kilometers
112	$1 in = 2.54 cm$	1 inches equals 2.54 centimeters
113	$\begin{matrix} H_{2} & + & F_{2} & \to & 2 H F \\ hydrogen & fluorine & hydrogen fluoride \end{matrix}$	StartLayout 1st Row 1st Column upper H 2 2nd Column plus 3rd Column upper F 2 4th Column right arrow 5th Column 2 upper H upper F 2nd Row 1st Column hydrogen 2nd Column Blank 3rd Column fluorine 4th Column Blank 5th Column hydrogen fluoride EndLayout
114	$x = \{\begin{matrix} y < 0 & 0 \\ y \geq 0 & 2 y \end{matrix}$	x equals StartLayout Enlarged left brace 1st Row 1st Column y less than 0 2nd Column 0 2nd Row 1st Column y greater than or equals 0 2nd Column 2 y EndLayout
115	$[\begin{matrix} x + a & x + b & x + c \\ y + a & y + b & y + c \\ z + a & z + b & z + c \end{matrix}]$	Start 3 By 3 Matrix 1st Row 1st Column x plus a 2nd Column x plus b 3rd Column x plus c 2nd Row 1st Column y plus a 2nd Column y plus b 3rd Column y plus c 3rd Row 1st Column z plus a 2nd Column z plus b 3rd Column z plus c EndMatrix
116	$\|\begin{matrix} a + 1 & b \\ c & d \end{matrix}\| = (a + 1) d - b c$	Start 2 By 2 Determinant 1st Row 1st Column a plus 1 2nd Column b 2nd Row 1st Column c 2nd Column d EndDeterminant equals left p'ren a plus 1 right p'ren d minus b c
117	$\|\begin{matrix} a & b \\ c & d \end{matrix}\| = a d - b c$	Start 2 By 2 Determinant 1st Row a b 2nd Row c d EndDeterminant equals a d minus b c
118	$(\begin{matrix} x \\ y \end{matrix})$	StartBinomialOrMatrix x Choose y EndBinomialOrMatrix

English Mathspeak tests. Locale: en, Style: Superbrief.

0	$π \approx 3.14159$	pi almost equals 3.14159
1	$102 + 2,214 + 15 = 2,331$	102 plus 2,214 plus 15 equals 2,331
2	$59 \times 0 = 0$	59 times 0 equals 0
3	$3 - - 2$	3 minus negative 2
4	$- y$	negative y
5	$- 32$	negative 32
6	$t2e4$	Num t 2 e 4
7	$#FF0000$	Num num sign F F 0 0 0 0
8	$0x15FF + 0x2B01 = 0x4100$	Num 0 x 1 5 F F plus Num 0 x 2 B 0 1 equals Num 0 x 4 1 0 0
9	$I, II, III, IV, V .$	upper I comma UpperWord I I comma UpperWord I I I comma UpperWord I V comma upper V period
10	$d = \sqrt{{(X - x)}^{2} - {(Y - y)}^{2}}$	d equals Root L p'ren upper X minus x R p'ren squared minus L p'ren upper Y minus y R p'ren squared EndRoot
11	$If A \to B and B \to C then A \to C .$	If upper A R arrow upper B and upper B R arrow upper C then upper A R arrow upper C period
12	$[x]$	bold L brack x bold R brack
13	$\oint E \cdot d l = - \frac{d Φ B}{d t}$	contour integral upper E dot d bold l equals minus Frac d upper Phi upper B Over d t EndFrac
14	$Uppercase ({α, β, γ, δ, ϵ, φ}) = {Α, Β, Γ, Δ, Ε, Φ}$	Uppercase L p'ren Set alpha comma beta comma gamma comma delta comma epsilon comma phi EndSet R p'ren equals Set upper Alpha comma upper Beta comma upper Gamma comma upper Delta comma upper Epsilon comma upper Phi EndSet
15	$y - 1$	y minus 1
16	$(1 -to- 1)$	L p'ren 1 hyphen to hyphen 1 R p'ren
17	$- 1$	negative 1
18	$The Fibonacci numbers are: {0, 1, 1, 2, 3, 5, 8, \dots}$	The Fibonacci numbers are colon Set 0 comma 1 comma 1 comma 2 comma 3 comma 5 comma 8 comma ellipsis EndSet
19	$\| 4 - 7 \| = 3$	AbsoluteValue 4 minus 7 EndAbsoluteValue equals 3
20	$\|a \pm \|b - c\|\| \neq \|a\| \pm \|b - c\|$	AbsoluteValue a plus or minus AbsoluteValue b minus c EndAbsoluteValue EndAbsoluteValue not equals AbsoluteValue a EndAbsoluteValue plus or minus AbsoluteValue b minus c EndAbsoluteValue
21	$\frac{1}{x}$	Frac 1 Over x EndFrac
22	$a - \frac{b + c}{d - e} \times f$	a minus Frac b plus c Over d minus e EndFrac times f
23	$\frac{\frac{x}{y}}{z} \neq \frac{x}{\frac{y}{z}}$	NestFrac Frac x Over y EndFrac NestOver z NestEndFrac not equals NestFrac x NestOver Frac y Over z EndFrac NestEndFrac
24	$\frac{\frac{(1 - x) \frac{d}{d x} (2 x) - 2 x \frac{d}{d x} (1 - x)}{{(1 - x)}^{2}}}{1 + {(\frac{2 x}{1 - x})}^{2}}$	NestTwiceFrac NestFrac L p'ren 1 minus x R p'ren Frac d Over d x EndFrac L p'ren 2 x R p'ren minus 2 x Frac d Over d x EndFrac L p'ren 1 minus x R p'ren NestOver L p'ren 1 minus x R p'ren squared NestEndFrac NestTwiceOver 1 plus L p'ren Frac 2 x Over 1 minus x EndFrac R p'ren squared NestTwiceEndFrac
25	$a_{0} + \frac{1}{a_{1} + \frac{1}{a_{2} + \frac{1}{\dots + \frac{1}{a_{n}}}}}$	a 0 plus Nest3Frac 1 Nest3Over a 1 plus NestTwiceFrac 1 NestTwiceOver a 2 plus NestFrac 1 NestOver ellipsis plus Frac 1 Over a Sub n Base EndFrac NestEndFrac NestTwiceEndFrac Nest3EndFrac
26	$\frac{1}{2} + \frac{2}{2} + \frac{3}{2} + \frac{4}{2} + \dots = \sum_{n = 1}^{\infty} \frac{n}{2}$	one half plus two halves plus three halves plus four halves plus ellipsis equals sigma summation Underscript n equals 1 Overscript infinity Endscripts Frac n Over 2 EndFrac
27	$\frac{20}{5} \times \frac{1}{100} = \frac{1}{25}$	Frac 20 Over 5 EndFrac times Frac 1 Over 100 EndFrac equals one twenty fifth
28	$\frac{\frac{3}{5}}{8} = \frac{3}{5} \times \frac{1}{8}$	Frac three fifths Over 8 EndFrac equals three fifths times one eighth
29	$3 \frac{5}{8} = \frac{29}{8}$	3 and five eighths equals Frac 29 Over 8 EndFrac
30	$a_{0} + \frac{b_{1}}{a_{1} + \frac{b_{2}}{a_{2} + \frac{b_{3}}{a_{3} + \dots}}} = a_{0} + \frac{b_{1}}{a_{1}} + \frac{b_{2}}{a_{2}} + \dots$	a 0 plus ContinuedFrac b 1 Over a 1 plus Frac b 2 Over a 2 plus Frac b 3 Over a 3 plus ellipsis equals a 0 plus Frac b 1 Over a 1 EndFrac plus Frac b 2 Over a 2 EndFrac plus ellipsis
31	$x^{3} + 6 x^{2} - x = 30$	x cubed plus 6 x squared minus x equals 30
32	$\frac{d^{2} y}{d x^{2}} + (a x^{2} + b x + c) y = 0$	Frac d squared y Over d x squared EndFrac plus L p'ren a x squared plus b x plus c R p'ren y equals 0
33	$x^{\frac{1}{2}}$	x Sup one half
34	$x_{n}$	x Sub n
35	$x^{a}$	x Sup a
36	$x^{m + n}$	x Sup m plus n
37	$T_{n - 1} + 5 = 0$	upper T Sub n minus 1 Base plus 5 equals 0
38	$x^{m + n} = x^{m} x^{n}$	x Sup m plus n Base equals x Sup m Base x Sup n
39	$x^{a_{n} + a_{n - 1}}$	x Sup a Sup Sub n Sup plus a Sup Sub n minus 1
40	$x^{a_{b}}$	x Sup a Sup Sub b
41	$x_{a^{b}}$	x Sub a Sub Sup b
42	$y^{a^{b_{c}}} \neq y^{a^{b} c}$	y Sup a Sup Sup b Sup Sup Sub c Base not equals y Sup a Sup Sup b Sup c
43	$y^{a^{_{c} b}}$	y Sup a Sup Sup Sub c Sup Sup b
44	$y^{a^{_{c}}}$	y Sup a Sup Sup Sub c
45	$y_{a_{^{c}}}$	y Sub a Sub Sub Sup c
46	$y_{a_{^{c} b}}$	y Sub a Sub Sub Sup c Sub Sub b
47	$x^{a^{b}}$	x Sup a Sup Sup b
48	$x_{a_{b}}$	x Sub a Sub Sub b
49	$T^{(x^{a} + y^{b})}$	upper T Sup L p'ren x Sup Sup a Sup plus y Sup Sup b Sup R p'ren
50	$x_{1}$	x 1
51	$x_{- 1}$	x Sub negative 1
52	$x_{10,000}$	x 10,000
53	$x_{1.3}$	x 1.3
54	$4 Fe + 3 O_{2} \to 2 {Fe}_{2} O_{3}$	4 upper F e plus 3 upper O 2 R arrow 2 upper F e 2 upper O 3
55	$a_{2, 3}$	a Sub 2 comma 3
56	$T_{n_{1} + n_{0}}$	upper T Sub n 1 plus n 0
57	${log}_{2} (x) = \frac{{log}_{10} (x)}{{log}_{10} (2)}$	log Sub 2 Base L p'ren x R p'ren equals Frac log Sub 10 Base L p'ren x R p'ren Over log Sub 10 Base L p'ren 2 R p'ren EndFrac
58	$Φ_{5}$	upper Phi 5
59	$ln x = \int_{1}^{x} \frac{d t}{t}$	ln x equals integral Sub 1 Sup x Base Frac d t Over t EndFrac
60	$$ n 2 = 2 * $ n + 1;$	dollar sign n Base 2 equals 2 asterisk dollar sign n plus 1 semicolon
61	$n 2$	n Base bold 2
62	${}_{c d}^{a b}x_{e f}^{g h}$	Sub c d Sup a b Base x Sub e f Sup g h
63	${}_{c}^{a}_{d}^{b}x_{e}^{g}_{f}^{h}$	Sub c d Sup a b Base x Sub e f Sup g h
64	$T_{0}^{2}$	upper T 0 squared
65	${T_{0}}^{2}$	upper T 0 squared
66	$T_{0}^{3}$	upper T 0 cubed
67	${T_{0}}^{3}$	upper T 0 cubed
68	$T_{n - 1}^{2}$	upper T Sub n minus 1 Sup 2
69	$x^{'}$	x prime
70	$f^{'''} (y) = \frac{d f^{''} (y)}{d y}$	f triple prime L p'ren y R p'ren equals Frac d f double prime L p'ren y R p'ren Over d y EndFrac
71	$ρ^{'} = ρ_{+}^{'} + ρ_{-}^{'}$	rho prime equals rho prime Sub plus Base plus rho prime Sub minus
72	$x_{10}^{'}$	x prime 10
73	$T_{n}^{'}$	upper T prime Sub n
74	$[\begin{matrix} x^{n} & y^{n} & z^{n} \\ x^{n + 1} & y^{n + 1} & z^{n + 1} \end{matrix}]$	2 By 3 Matrix 1st Row 1st Column x Sup n 2nd Column y Sup n 3rd Column z Sup n 2nd Row 1st Column x Sup n plus 1 2nd Column y Sup n plus 1 3rd Column z Sup n plus 1 EndMatrix
75	${x_{a}}^{b}$	x Sub a Base Sup b
76	${x^{b}}_{a}$	x Sup b Base Sub a
77	${log}^{4}^{b} x$	log Sup 4 Sup b Base x
78	$T_{n}_{a} y$	upper T Sub n Sub a Base y
79	$\sqrt{2}$	Root 2 EndRoot
80	$\sqrt{m + n}$	Root m plus n EndRoot
81	$\sqrt[m + n]{x + y}$	Index m plus n Root x plus y EndRoot
82	$\sqrt[n]{x^{m}} = {(\sqrt[n]{x})}^{m} = x^{\frac{m}{n}}, x > 0$	Index n Root x Sup m Base EndRoot equals L p'ren Index n Root x EndRoot R p'ren Sup m Base equals x Sup Frac m Over n EndFrac Base comma x greater than 0
83	$\sqrt[3]{x} = x^{\frac{1}{3}}$	Index 3 Root x EndRoot equals x Sup one third
84	$\sqrt{\sqrt{x + 1} + \sqrt{y + 1}}$	NestRoot Root x plus 1 EndRoot plus Root y plus 1 EndRoot NestEndRoot
85	$\sqrt[n]{\sqrt[m]{x}} = \sqrt[m]{\sqrt[n]{x}}$	NestIndex n NestRoot Index m Root x EndRoot NestEndRoot equals NestIndex m NestRoot Index n Root x EndRoot NestEndRoot
86	$x^{e - 2} = \sqrt{x \sqrt[3]{x \sqrt[4]{x \sqrt[5]{x \dots}}}}, x \in ℝ$	x Sup e minus 2 Base equals Nest3Root x NestTwiceIndex 3 NestTwiceRoot x NestIndex 4 NestRoot x Index 5 Root x ellipsis EndRoot NestEndRoot NestTwiceEndRoot Nest3EndRoot comma x element of double struck upper R
87	$\frac{2}{π} = \frac{\sqrt{2}}{2} \frac{\sqrt{2 + \sqrt{2}}}{2} \frac{\sqrt{2 + \sqrt{2 + \sqrt{2}}}}{2} \dots$	Frac 2 Over pi EndFrac equals Frac Root 2 EndRoot Over 2 EndFrac Frac NestRoot 2 plus Root 2 EndRoot NestEndRoot Over 2 EndFrac Frac NestTwiceRoot 2 plus NestRoot 2 plus Root 2 EndRoot NestEndRoot NestTwiceEndRoot Over 2 EndFrac ellipsis
88	$\frac{5 x y}{2 y} = \frac{5}{2} x$	Frac 5 x CrossOut y EndCrossOut Over 2 CrossOut y EndCrossOut EndFrac equals five halves x
89	$\frac{12}{18} = \frac{\overset{2}{12}}{\underset{3}{18}} = \frac{2}{3}$	Frac 12 Over 18 EndFrac equals Frac CrossOut 12 With 2 EndCrossOut Over CrossOut 18 With 3 EndCrossOut EndFrac equals two thirds
90	$\frac{12}{18} = \frac{\underset{12}{2}}{\overset{18}{3}} = \frac{2}{3}$	Frac 12 Over 18 EndFrac equals Frac CrossOut 12 With 2 EndCrossOut Over CrossOut 18 With 3 EndCrossOut EndFrac equals two thirds
91	$\ddot{x}$	ModAbove x With two dots
92	$\vec{x + y}$	ModAbove x plus y With R arrow
93	$\hat{x}$	ModAbove x With caret
94	$\underset{˙}{x}$	ModBelow x With dot
95	$\tilde{x}$	x overtilde
96	$\bar{x}$	x overbar
97	$\underset{˜}{y}$	y undertilde
98	$\bar{\bar{x}}$	x overbar overbar
99	$\underline{\underline{\bar{\bar{y}}}}$	y overbar overbar underbar underbar
100	$\underset{*}{\underline{a + b}}$	ModBelow Below ModBelow a plus b With bar With asterisk
101	$\bar{\tilde{x + y}}$	ModAbove Above ModAbove x plus y With tilde With bar
102	$\sum_{n = 1}^{\infty} a_{n}$	sigma summation Underscript n equals 1 Overscript infinity Endscripts a Sub n
103	$\underset{b = 3}{\underset{a = 5}{\underline{x + y}}}$	ModBelow x plus y With bar Underscript a equals 5 UnderUnderscript b equals 3 Endscripts
104	$\overset{m = 2}{\overset{n = 1}{\bar{x + y}}}$	ModAbove x plus y With bar Overscript n equals 1 OverOverscript m equals 2 Endscripts
105	${log}_{b} x$	log Sub b Base x
106	$cos y$	cosine y
107	$sin x$	sine x
108	$\frac{60 mi}{hr} \times \frac{5,280 ft}{1 mi} \times \frac{1 hr}{60 \min} = \frac{5,280 ft}{\min}$	Frac 60 CrossOut miles EndCrossOut Over CrossOut hours EndCrossOut EndFrac times Frac 5,280 feet Over 1 CrossOut miles EndCrossOut EndFrac times Frac 1 CrossOut hours EndCrossOut Over 60 minutes EndFrac equals Frac 5,280 feet Over minutes EndFrac
109	$1 J = 1 kg \cdot m^{2} \cdot s^{- 2}$	1 joules equals 1 kilograms dot meters squared dot seconds Sup negative 2
110	$m m = 100 m cm = \frac{m}{1,000} km$	m meters equals 100 m centimeters equals Frac m Over 1,000 EndFrac kilometers
111	$1 mi \approx 1.6 km$	1 miles almost equals 1.6 kilometers
112	$1 in = 2.54 cm$	1 inches equals 2.54 centimeters
113	$\begin{matrix} H_{2} & + & F_{2} & \to & 2 H F \\ hydrogen & fluorine & hydrogen fluoride \end{matrix}$	Layout 1st Row 1st Column upper H 2 2nd Column plus 3rd Column upper F 2 4th Column R arrow 5th Column 2 upper H upper F 2nd Row 1st Column hydrogen 2nd Column Blank 3rd Column fluorine 4th Column Blank 5th Column hydrogen fluoride EndLayout
114	$x = \{\begin{matrix} y < 0 & 0 \\ y \geq 0 & 2 y \end{matrix}$	x equals Layout Enlarged L brace 1st Row 1st Column y less than 0 2nd Column 0 2nd Row 1st Column y greater than or equals 0 2nd Column 2 y EndLayout
115	$[\begin{matrix} x + a & x + b & x + c \\ y + a & y + b & y + c \\ z + a & z + b & z + c \end{matrix}]$	3 By 3 Matrix 1st Row 1st Column x plus a 2nd Column x plus b 3rd Column x plus c 2nd Row 1st Column y plus a 2nd Column y plus b 3rd Column y plus c 3rd Row 1st Column z plus a 2nd Column z plus b 3rd Column z plus c EndMatrix
116	$\|\begin{matrix} a + 1 & b \\ c & d \end{matrix}\| = (a + 1) d - b c$	2 By 2 Determinant 1st Row 1st Column a plus 1 2nd Column b 2nd Row 1st Column c 2nd Column d EndDeterminant equals L p'ren a plus 1 R p'ren d minus b c
117	$\|\begin{matrix} a & b \\ c & d \end{matrix}\| = a d - b c$	2 By 2 Determinant 1st Row a b 2nd Row c d EndDeterminant equals a d minus b c
118	$(\begin{matrix} x \\ y \end{matrix})$	BinomialOrMatrix x Choose y EndBinomialOrMatrix

English Mathspeak Units tests. Locale: en, Style: Verbose.

0	${in}^{2}$	inches squared
1	$s^{2}$	seconds squared
2	$m^{2}$	meters squared
3	${in}^{3}$	inches cubed
4	$s^{3}$	seconds cubed
5	$m^{3}$	meters cubed
6	${in}^{- 1}$	inches Superscript negative 1
7	${in}^{- 1} {mm}^{- 1}$	inches Superscript negative 1 Baseline millimeters Superscript negative 1
8	$\frac{in}{mm}$	StartFraction inches Over millimeters EndFraction
9	$km$	kilometers
10	$A$	amperes
11	$Ω$	ohms
12	$kΩ$	kilohms
13	$°C$	Celsius
14	$\min \min$	min minutes
15	$3 km$	3 kilometers
16	$km + s$	kilometers plus seconds
17	${km}^{2}$	kilometers squared
18	$m^{3}$	meters cubed
19	${km}^{4}$	kilometers Superscript 4
20	$m^{- 1}$	meters Superscript negative 1
21	$s m^{- 1}$	seconds meters Superscript negative 1
22	${\frac{s}{m}}^{- 1}$	StartFraction seconds Over meters EndFraction Superscript negative 1
23	${\frac{s}{m}}^{- 1}$	StartFraction seconds Over meters EndFraction Superscript negative 1
24	$3 m^{- 1}$	3 meters Superscript negative 1
25	$\frac{km}{h}$	StartFraction kilometers Over hours EndFraction
26	$N \frac{km}{h}$	Newtons StartFraction kilometers Over hours EndFraction
27	$\frac{m}{km}$	StartFraction m Over kilometers EndFraction
28	$3 km h$	3 kilometers hours
29	$s 3 m km h$	seconds 3 m kilometers hours
30	$km s^{2} 3 m km h$	kilometers seconds squared 3 m kilometers hours
31	$3 m km h \frac{N}{s^{2}}$	3 m kilometers hours StartFraction upper N Over seconds squared EndFraction
32	$3 m km h \frac{N}{s^{2}}$	3 m kilometers hours StartFraction Newtons Over seconds squared EndFraction
33	$4 mm$	4 millimeters
34	$1 mm$	1 millimeters
35	$4 mm$	4 millimeters
36	$1 mm$	1 millimeters
37	$m s$	meters seconds
38	$m s$	m seconds
39	$m s$	meters s
40	$m s$	meters seconds
41	$m s$	m seconds
42	$m s$	meters s
43	$m s l$	meters seconds liters
44	$63360 in = 63360 in. = 63360^{″} = 63360 inches = 5280 ft = 5280 ft. = 5280^{'} = 5280 feet = 1760 yd = 1760 yd. = 1760 yards = 1 mi = 1 mi. = 1 mile$	63360 inches equals 63360 inches equals 63360 double prime equals 63360 inches equals 5280 feet equals 5280 feet equals 5280 prime equals 5280 feet equals 1760 yards equals 1760 yards equals 1760 yards equals 1 miles equals 1 miles equals 1 mile
45	$8000 li = 8000 li. = 8000 links = 320 rd = 320 rd. = 320 rods = 80 ch = 80 ch. = 80 chains = 8 fur = 8 fur. = 8 furlongs = 1 mi = 1 mi. = 1 mile$	8000 links equals 8000 links equals 8000 links equals 320 rods equals 320 rods equals 320 rods equals 80 chains equals 80 chains equals 80 chains equals 8 furlongs equals 8 furlongs equals 8 furlongs equals 1 miles equals 1 miles equals 1 mile
46	$43560 sq ft = 43560 sq. ft. = 43560 {ft}^{2} = {43560^{'}}^{2} = 43560 square feet = 4840 sq yd = 4840 sq. yd. = 4840 {yd}^{2} = 4840 square yards = 160 sq rd = 160 sq. rd. = 160 {rd}^{2} = 160 square rods = 1 ac = 1 ac. = 1 acre = \frac{1}{640} sq mi = \frac{1}{640} sq. mi. = \frac{1}{640} {mi}^{2} = \frac{1}{640} square miles$	43560 square feet equals 43560 square feet equals 43560 feet squared equals 43560 prime squared equals 43560 square feet equals 4840 square yards equals 4840 square yards equals 4840 yards squared equals 4840 square yards equals 160 square rods equals 160 square rods equals 160 rods squared equals 160 square rods equals 1 acres equals 1 acres equals 1 acre equals StartFraction 1 Over 640 EndFraction square miles equals StartFraction 1 Over 640 EndFraction square miles equals StartFraction 1 Over 640 EndFraction miles squared equals StartFraction 1 Over 640 EndFraction square miles
47	$46656 cu in = 46656 cu. in. = 46656 {in}^{3} = {46656^{″}}^{3} = 46656 cubic inches = 27 cu ft = 27 cu. ft. = 27 {ft}^{3} = {27^{'}}^{3} = 27 cubic feet = 1 cu yd = 1 cu. yd. = 1 {yd}^{3} = 1 cubic yard$	46656 cubic inches equals 46656 cubic inches equals 46656 inches cubed equals 46656 double prime cubed equals 46656 cubic inches equals 27 cubic feet equals 27 cubic feet equals 27 feet cubed equals 27 prime cubed equals 27 cubic feet equals 1 cubic yards equals 1 cubic yards equals 1 yards cubed equals 1 cubic yard
48	$1024 fl dr = 1024 fl. dr. = 1024 fluid drams = 768 tsp = 768 tsp. = 768 teaspoons = 256 Tbsp = 256 Tbsp. = 256 tablespoons = 128 fl oz = 128 fl. oz. = 128 fluid ounces = 16 cp = 16 cp. = 16 cups = 8 pt = 8 pt. = 8 pints = 4 qt = 4 qt. = 4 quarts = 1 gal = 1 gal. = 1 gallon$	1024 fluid drams equals 1024 fluid drams equals 1024 fluid drams equals 768 teaspoons equals 768 teaspoons equals 768 teaspoons equals 256 tablespoons equals 256 tablespoons equals 256 tablespoons equals 128 fluid ounces equals 128 fluid ounces equals 128 fluid ounces equals 16 cups equals 16 cups equals 16 cups equals 8 pints equals 8 pints equals 8 pints equals 4 quarts equals 4 quarts equals 4 quarts equals 1 gallons equals 1 gallons equals 1 gallon
49	$256 dr = 256 dr. = 256 drams = 16 oz = 16 oz. = 16 ounces = 1 # = 1 lb = 1 lb. = 1 pounds = 100 cwt = 100 cwt. = 100 hundredweights = 2000 tons$	256 drams equals 256 drams equals 256 drams equals 16 ounces equals 16 ounces equals 16 ounces equals 1 # equals 1 pounds equals 1 pounds equals 1 pounds equals 100 hundredweights equals 100 hundredweights equals 100 hundredweights equals 2000 tons
50	$63360 in = 63360 in. = 63360^{″} = 63360 inches = 5280 ft = 5280 ft. = 5280^{'} = 5280 feet = 1760 yd = 1760 yd. = 1760 yards = 1 mi = 1 mi. = 1 mile$	63360 inches equals 63360 inches equals 63360 double prime equals 63360 inches equals 5280 feet equals 5280 feet equals 5280 prime equals 5280 feet equals 1760 yards equals 1760 yards equals 1760 yards equals 1 miles equals 1 miles equals 1 mile
51	$1 J = 1 kg \cdot m^{2} \cdot s^{- 2}$	1 joules equals 1 kilograms dot meters squared dot seconds Superscript negative 2
52	$1 J = 1 kg m^{2} s^{- 2}$	1 joules equals 1 kilograms meters squared seconds Superscript negative 2
53	$1 J = 1 \cdot kg \cdot m^{2} \cdot s^{- 2}$	1 joules equals 1 kilograms meters squared seconds Superscript negative 2
54	${in}^{3}$	inches cubed
55	$\frac{km kg s^{2}}{J}$	StartFraction kilometers kilograms seconds squared Over joules EndFraction
56	$\frac{3 km 1 kg s^{2}}{J}$	StartFraction 3 kilometers 1 kilograms seconds squared Over joules EndFraction
57	$\frac{1 km kg s^{2}}{J}$	StartFraction 1 kilometers kilograms seconds squared Over joules EndFraction
58	$\frac{1 km kg s^{2}}{5 J}$	StartFraction 1 kilometers kilograms seconds squared Over 5 joules EndFraction
59	$km$	kilometers
60	$3 km kg s^{2} J$	3 kilometers kilograms seconds squared joules
61	$3 km kg s^{2} J$	3 kilometers kilograms seconds squared joules
62	$3 km 4 kg s^{2} J$	3 kilometers 4 kilograms seconds squared joules
63	$3 km 1 kg s^{2} J$	3 kilometers 1 kilograms seconds squared joules
64	$1 km s + 2 km s + 0 km s + a km s +$	1 kilometers seconds plus 2 kilometers seconds plus 0 kilometers seconds plus a kilometers seconds plus
65	$1 km + 2 km + 0 km + a km$	1 kilometers plus 2 kilometers plus 0 kilometers plus a kilometers
66	$1 \frac{2}{3} kg$	1 and two thirds kilograms
67	$1 \frac{2}{3} kg km$	1 and two thirds kilograms kilometers
68	$1 km 2 kg km$	1 kilometers 2 kilograms kilometers
69	$1 km kg s + 2 km kg s + 0 km kg s + a km kg s +$	1 kilometers kilograms seconds plus 2 kilometers kilograms seconds plus 0 kilometers kilograms seconds plus a kilometers kilograms seconds plus
70	$1 $$	1 dollars
71	$$ 1$	dollars 1
72	$$$	dollars
73	$$$	dollars
74	$2 $$	2 dollars
75	$$ 2$	dollars 2
76	$1 $ + 2 $ + 0 $ + a $$	1 dollars plus 2 dollars plus 0 dollars plus a dollars
77	$1 $ + $ 2 + 0 $ + $ a$	1 dollars plus dollars 2 plus 0 dollars plus dollars a
78	$1 € + 2 € + 0 € + a €$	1 euros plus 2 euros plus 0 euros plus a euros
79	$1 ￡ + 2 ￡ + 0 ￡ + a ￡$	1 pounds plus 2 pounds plus 0 pounds plus a pounds

English Mathspeak Units tests. Locale: en, Style: Brief.

0	${in}^{2}$	inches squared
1	$s^{2}$	seconds squared
2	$m^{2}$	meters squared
3	${in}^{3}$	inches cubed
4	$s^{3}$	seconds cubed
5	$m^{3}$	meters cubed
6	${in}^{- 1}$	inches Sup negative 1
7	${in}^{- 1} {mm}^{- 1}$	inches Sup negative 1 Base millimeters Sup negative 1
8	$\frac{in}{mm}$	StartFrac inches Over millimeters EndFrac

English Mathspeak Units tests. Locale: en, Style: Superbrief.

0	${in}^{2}$	inches squared
1	$s^{2}$	seconds squared
2	$m^{2}$	meters squared
3	${in}^{3}$	inches cubed
4	$s^{3}$	seconds cubed
5	$m^{3}$	meters cubed
6	${in}^{- 1}$	inches Sup negative 1
7	${in}^{- 1} {mm}^{- 1}$	inches Sup negative 1 Base millimeters Sup negative 1
8	$\frac{in}{mm}$	Frac inches Over millimeters EndFrac