ddrg/math_formulas · Datasets at Hugging Face

id int64 -30,985 55.9k	text stringlengths 5 437k
-4,479	\frac{7\cdot i + 24}{i^2 + 7\cdot i + 12} = \frac{3}{i + 3} + \frac{1}{4 + i}\cdot 4
-12,002	2/9 = \frac{1}{18 \cdot \pi} \cdot i \cdot 18 \cdot \pi = i
12,730	f_1\cdot f_2\cdot c = f_1\cdot (-f_2 - c) = -f_1 - -f_2 - c = -f_1 + f_2 + c
1,001	(x^2 + 1)^3 = x^6 + 3x^4 + 3x \cdot x + 1 = (x + 1)^2 + 3(x^2 + x) + 3x^2 + 1 = 7x^2 + 5x + 2
4,637	\mathbb{E}(X)\mathbb{E}(T^2) = \mathbb{E}(T^2X)
14,554	t - (t + (-1))/2 = (t + 1)/2 = \frac12 (t + (-1)) + 1
26,451	c d a + (a + c) (d + c) (a + d) = (a d + d c + a c) (a + d + c)
27,088	3^2 + \left(-4\right)^2 = \left(-4 + 1\right)^2 + (1 + 3) \cdot (1 + 3)
16,825	x^4 - x^2 + 2(-1) = x^4 + 2x^2 + 1 = (x \cdot x + 1)^2
11,565	ba = -a\left(-b\right)
39,116	1/(xy) = \frac{1}{xy}
42,257	5\cdot 7 \cdot 7 + 3 = 3\cdot 9^2 + 5 = 248
22,542	a0 + a0 + a0 = 0a + a*0
-1,368	-3/8\cdot (-\frac87) = \frac{(-8)\cdot \frac17}{(-8)\cdot 1/3}
34,387	\frac{1}{2} = (1 - 1/3) \cdot (1 - 1/4)
-178	\binom{10}{6} = \dfrac{1}{6!\left(6(-1) + 10\right)!}*10!
22,211	\cos\left(\arctan(x)\right) = \tfrac{1}{\left(1 + x^2\right)^{1 / 2}}
-4,464	20 \cdot (-1) + y^2 - y = (4 + y) \cdot (5 \cdot (-1) + y)
-6,433	\dfrac{3}{32 + 4 \cdot t} = \frac{1}{4 \cdot \left(t + 8\right)} \cdot 3
36,791	\frac{W}{m \cdot m\cdot k} = \frac{W/(m\cdot k)}{m}
23,429	(\left(-1\right) + x) (x x + x + 1) = x^3 + (-1)
17,792	0.3t7/16 = t*21/160
35,551	2^{3\cdot (-1) + 11}\cdot 155925 = 11!
11,580	5 = 200 (-1) + 120 + 85
-27,655	1 - \frac13\cdot 2 + 9/2 = 1/3 + 9/2 = \dfrac{29}{6}
19,537	-(x - 2 \cdot y) \cdot (x - 2 \cdot y) = -(x \cdot x - 4 \cdot x \cdot y + 4 \cdot y^2) = -x^2 - 4 \cdot y^2 + 4 \cdot x \cdot y
-20,283	\dfrac{63}{r\cdot 9 + 36} = \frac{1}{4 + r}\cdot 7\cdot \frac{1}{9}\cdot 9
6,677	d\cdot 2 + 1 + 10\cdot (-1) = 9\cdot (-1) + 2\cdot d
38,991	2 + 1^{1/2} = 4^{1/2} + 1
20,547	1050 = 7^13^12^1*5^2
17,371	f \cdot f = f^1\cdot f^1
-5,416	10^0\cdot 0.5 = 10^{4 + 4\cdot (-1)}\cdot 0.5
19,857	x^2\cdot \zeta^2 = \zeta \cdot \zeta\cdot x^2
12,751	\dfrac{1}{y^2} \cdot x \cdot x = 2/1\Longrightarrow 2 = x^2,1 = y^2
31,042	\frac{125}{216} = (5/6)^3
35,604	D \cap X^c = D - X = D - D \cap X
9,607	L\cdot M/K = \|L\cdot M\| = \max{\|L\|,\|M\|} = \max{\frac{L}{K},M/K} = \frac{1}{K}\cdot L\cdot \frac{M}{K}
37,857	2*(-1) + 0 = -2
5,576	2/15 = \dfrac{2}{3} \cdot 3/6 \cdot \frac{1}{10} \cdot 4
9,712	-z^2 + 1 = (1 - z) \cdot (1 + z)
15,661	t\cdot r\cdot M^{n + 1} \geq t\cdot r\cdot M^n\cdot t\cdot r\cdot M/2 = 19\cdot t\cdot r\cdot M^n > t\cdot r\cdot M^n
-27,421	338 = 10 (-1) + 348
10,356	\left(\frac{1}{G} = G \cdot 3 \Rightarrow x = 3 \cdot G^2\right) \Rightarrow x/3 = G \cdot G
21,827	2018 = (6^2)^2 + 5^2 \cdot 5^2 + (3^2)^2 + 2 \cdot 2 \cdot 2 \cdot 2
5,356	z \Rightarrow (z^2 - 3z + 1)^2 - 3(z^2 - 3z + 1) + 1 = z^2 - 3z + 1 = z
16,617	2 \cdot \cos^2{x} = 2 - \sin^2{x} \cdot 2
18,857	\frac{2}{16} + \dfrac{1}{17} = 50/(17*16)
21,143	217 = (20 z + 3) t + \frac{1}{20}(20 z + 3 + 3(-1)) = (20 z + 3) (t + 1/20) - 3/20
-3,989	\dfrac97 = \frac{9}{7}
-6,293	\frac{1}{45 + n\cdot 5} = \frac{1}{5\cdot (n + 9)}
-7,760	(-36 + 4\cdot i - 45\cdot i + 5\cdot (-1))/41 = \frac{1}{41}\cdot (-41 - 41\cdot i) = -1 - i
14,575	0 = c + 4 + 36 + g \cdot 4 + 12 a \Rightarrow g \cdot 4 + 12 a + c = -40 \cdots \cdot 3
4,293	\tan{g_1\cdot g_2} = \tan(0.5\cdot g_1\cdot g_2 + 0.5\cdot g_1\cdot g_2) = \frac{2\cdot \tan{0.5\cdot g_1\cdot g_2}}{1 - \tan^2{0.5\cdot g_1\cdot g_2}}
13,127	\sin(2 \times \pi + x) = \sin(x)
-1,602	\pi3/4 = -13/12\pi + \pi\frac1611
41,794	1 = 0.999 \cdot \dotsm
-7,035	\frac18\cdot 2/7 = \frac{1}{28}
-26,468	5x^2-20x+20=5(x^2-4x+4)
26,669	\dfrac{1}{2^{1/2}}\cdot \|(t + \frac{1}{2}) \cdot (t + \frac{1}{2}) + \frac14\cdot 7\| = \frac{1}{(1 \cdot 1 + 1^2)^{1/2}}\cdot \|t^2 + 2 + t\|
-18,250	\frac{x^2 - x\cdot 6 + 7\cdot \left(-1\right)}{x^2 - 7\cdot x} = \dfrac{(1 + x)\cdot \left(7\cdot (-1) + x\right)}{x\cdot (x + 7\cdot \left(-1\right))}
-26,579	-8^2 + y^2 = 64 (-1) + y * y
-11,608	-i\cdot 3 + 3 = 3 + 0\cdot \left(-1\right) - i\cdot 3
3,168	I = (I - E)\cdot \left(H + I\right) = H + I - E\cdot H - E
40,354	0.66 = 9 - 8.333*\ldots
-30,265	\frac{1}{z + 5}\left(z^2 + 10z + 25\right) = \frac{(z + 5)*(z + 5)}{z + 5} = z + 5
-16,589	\sqrt{112} \cdot 8 = 8 \sqrt{16 \cdot 7}
2,440	\\|b\\|_1 = 0 \Rightarrow b = 0
11,918	(x^{\frac12}T^{\frac{1}{2}})^2 = xT
12,089	0 = y * y - y + 380(-1) = (y + 19)(y + 20*(-1))
17,449	\left(1 \leq 0 \Rightarrow 0 = 1,0 \geq 2\right) \Rightarrow 0 = 2,\dots
-1,684	\frac{11}{6} \pi = \frac{1}{6}\pi + \dfrac{5}{3} \pi
8,639	(1 + l^5) \cdot \left((-1) + l^5\right) = l^{10} + (-1)
31,971	\frac{4}{52}\cdot \frac{3}{51} = 12/2652 = \frac{1}{221}
-1,207	\frac23 \times (-\dfrac37) = \frac{2 \times 1/3}{1/3 \times (-7)}
40,217	25^2 + 60 \cdot 60 = 65^2
28,526	2 = \frac{2*2}{2}
9,353	\frac{1}{-y + 1} \cdot (-y^{n \cdot 2 + 1} + 1) = (1 + y) \cdot (1 + y^2) \cdot (1 + y^4) \cdot \cdots \cdot (y^{2 \cdot n} + 1)
19,568	\left(z^2 = z + 3 \Leftrightarrow 3(-1) + z \cdot z - z = 0\right) \Rightarrow (1 \pm \sqrt{13})/2 = z
16,004	\binom{k}{x} = \frac{k!}{x! \left(k - x\right)!}
4,777	\dfrac{1}{\sqrt{z}} = \dfrac{\sqrt{z}}{z}
22,834	\left(d_2 + d_1\right)^2 = d_1^2 + d_1\times d_2\times 2 + d_2^2
-19,352	\phantom{\dfrac{2}{7} \times \dfrac{5}{2}} = \dfrac{2 \times 5}{7 \times 2} = \dfrac{10}{14}
-15,966	\frac{1}{10}\cdot 19 = \frac{7}{10}\cdot 7 - 3/10\cdot 10
11,871	t < 1 + u\wedge u \lt t + 1 \Rightarrow t = u
16,284	\binom{0 + 4 + (-1)}{0} \binom{4}{3} = 4
11,757	A \cdot A \cdot A = 0\cdot A^2 = 0\cdot A
17,075	n^2 \cdot 14 + 19 \cdot n + 6 = \left(1 + 2 \cdot n\right)^2 + 5 \cdot (1 + n \cdot 2) \cdot (n + 1)
-28,766	-\frac{9}{2 + x} + x^2 - x \cdot 2 + 4 = \frac{1}{x + 2} \cdot ((-1) + x^3)
24,629	(-1) + m + k = 2 + m + \left(-1\right) + k + 2\cdot (-1)
-14,602	586 + 2100 = 630
-15,074	\frac{t^3\frac{1}{x^2}}{t^{12}\tfrac{1}{x^{20}}} = \frac{t^3}{t^{12}}\frac{1}{x x\tfrac{1}{x^{20}}} = \frac{1}{t^9}x^{-2 - -20} = \frac{1}{t^9}*x^{18}
26,080	E/F = EF/F/F = \frac{E}{F}1 = \frac{E}{F}
12,720	(a\cdot f)^1 = a^1\cdot f^1 = a\cdot f
-12,903	\frac{1}{28} \cdot 10 = 5/14
9,266	t\cdot z\cdot 6/5 = \frac{1}{5}\cdot z\cdot t\cdot 2 + 4\cdot t\cdot z/5
16,023	c \cdot 3 + 3 = c + 2 + c + c + 1
18,035	a + ab + 2\left(-1\right) - 2b = (2(-1) + a)*(1 + b)
-20,338	2/2\cdot \frac{3\cdot \left(-1\right) + x}{2\cdot (-1) + x} = \frac{6\cdot (-1) + x\cdot 2}{x\cdot 2 + 4\cdot (-1)}
7,766	\left(x = 3^{1 / 2} \cdot 2 + 1\Longrightarrow 12 = \left((-1) + x\right)^2\right)\Longrightarrow 0 = x^2 - x \cdot 2 + 11 \cdot \left(-1\right)
-30,847	2\cdot (-1) + x = \frac{1}{x^2 + 3\cdot x}\cdot (x^3 + x^2 - 6\cdot x)

-4,479

\frac{7\cdot i + 24}{i^2 + 7\cdot i + 12} = \frac{3}{i + 3} + \frac{1}{4 + i}\cdot 4

-12,002

2/9 = \frac{1}{18 \cdot \pi} \cdot i \cdot 18 \cdot \pi = i

12,730

f_1\cdot f_2\cdot c = f_1\cdot (-f_2 - c) = -f_1 - -f_2 - c = -f_1 + f_2 + c

1,001

(x^2 + 1)^3 = x^6 + 3x^4 + 3x \cdot x + 1 = (x + 1)^2 + 3(x^2 + x) + 3x^2 + 1 = 7x^2 + 5x + 2

4,637

\mathbb{E}(X)*\mathbb{E}(T^2) = \mathbb{E}(T^2*X)

14,554

t - (t + (-1))/2 = (t + 1)/2 = \frac12 (t + (-1)) + 1

26,451

c d a + (a + c) (d + c) (a + d) = (a d + d c + a c) (a + d + c)

27,088

3^2 + \left(-4\right)^2 = \left(-4 + 1\right)^2 + (1 + 3) \cdot (1 + 3)

16,825

x^4 - x^2 + 2(-1) = x^4 + 2x^2 + 1 = (x \cdot x + 1)^2

11,565

b*a = -a*\left(-b\right)

39,116

1/(x*y) = \frac{1}{x*y}

42,257

5\cdot 7 \cdot 7 + 3 = 3\cdot 9^2 + 5 = 248

22,542

a*0 + a*0 + a*0 = 0*a + a*0

-1,368

-3/8\cdot (-\frac87) = \frac{(-8)\cdot \frac17}{(-8)\cdot 1/3}

34,387

\frac{1}{2} = (1 - 1/3) \cdot (1 - 1/4)

-178

\binom{10}{6} = \dfrac{1}{6!*\left(6*(-1) + 10\right)!}*10!

22,211

\cos\left(\arctan(x)\right) = \tfrac{1}{\left(1 + x^2\right)^{1 / 2}}

-4,464

20 \cdot (-1) + y^2 - y = (4 + y) \cdot (5 \cdot (-1) + y)

-6,433

\dfrac{3}{32 + 4 \cdot t} = \frac{1}{4 \cdot \left(t + 8\right)} \cdot 3

36,791

\frac{W}{m \cdot m\cdot k} = \frac{W/(m\cdot k)}{m}

23,429

(\left(-1\right) + x) (x x + x + 1) = x^3 + (-1)

17,792

0.3*t*7/16 = t*21/160

35,551

2^{3\cdot (-1) + 11}\cdot 155925 = 11!

11,580

5 = 200 (-1) + 120 + 85

-27,655

1 - \frac13\cdot 2 + 9/2 = 1/3 + 9/2 = \dfrac{29}{6}

19,537

-(x - 2 \cdot y) \cdot (x - 2 \cdot y) = -(x \cdot x - 4 \cdot x \cdot y + 4 \cdot y^2) = -x^2 - 4 \cdot y^2 + 4 \cdot x \cdot y

-20,283

\dfrac{63}{r\cdot 9 + 36} = \frac{1}{4 + r}\cdot 7\cdot \frac{1}{9}\cdot 9

6,677

d\cdot 2 + 1 + 10\cdot (-1) = 9\cdot (-1) + 2\cdot d

38,991

2 + 1^{1/2} = 4^{1/2} + 1

20,547

1050 = 7^1*3^1*2^1*5^2

17,371

f \cdot f = f^1\cdot f^1

-5,416

10^0\cdot 0.5 = 10^{4 + 4\cdot (-1)}\cdot 0.5

19,857

x^2\cdot \zeta^2 = \zeta \cdot \zeta\cdot x^2

12,751

\dfrac{1}{y^2} \cdot x \cdot x = 2/1\Longrightarrow 2 = x^2,1 = y^2

31,042

\frac{125}{216} = (5/6)^3

35,604

D \cap X^c = D - X = D - D \cap X

9,607

L\cdot M/K = |L\cdot M| = \max{|L|,|M|} = \max{\frac{L}{K},M/K} = \frac{1}{K}\cdot L\cdot \frac{M}{K}

37,857

2*(-1) + 0 = -2

5,576

2/15 = \dfrac{2}{3} \cdot 3/6 \cdot \frac{1}{10} \cdot 4

9,712

-z^2 + 1 = (1 - z) \cdot (1 + z)

15,661

t\cdot r\cdot M^{n + 1} \geq t\cdot r\cdot M^n\cdot t\cdot r\cdot M/2 = 19\cdot t\cdot r\cdot M^n > t\cdot r\cdot M^n

-27,421

338 = 10 (-1) + 348

10,356

\left(\frac{1}{G} = G \cdot 3 \Rightarrow x = 3 \cdot G^2\right) \Rightarrow x/3 = G \cdot G

21,827

2018 = (6^2)^2 + 5^2 \cdot 5^2 + (3^2)^2 + 2 \cdot 2 \cdot 2 \cdot 2

5,356

z \Rightarrow (z^2 - 3z + 1)^2 - 3(z^2 - 3z + 1) + 1 = z^2 - 3z + 1 = z

16,617

2 \cdot \cos^2{x} = 2 - \sin^2{x} \cdot 2

18,857

\frac{2}{16} + \dfrac{1}{17} = 50/(17*16)

21,143

217 = (20 z + 3) t + \frac{1}{20}(20 z + 3 + 3(-1)) = (20 z + 3) (t + 1/20) - 3/20

-3,989

\dfrac97 = \frac{9}{7}

-6,293

\frac{1}{45 + n\cdot 5} = \frac{1}{5\cdot (n + 9)}

-7,760

(-36 + 4\cdot i - 45\cdot i + 5\cdot (-1))/41 = \frac{1}{41}\cdot (-41 - 41\cdot i) = -1 - i

14,575

0 = c + 4 + 36 + g \cdot 4 + 12 a \Rightarrow g \cdot 4 + 12 a + c = -40 \cdots \cdot 3

4,293

\tan{g_1\cdot g_2} = \tan(0.5\cdot g_1\cdot g_2 + 0.5\cdot g_1\cdot g_2) = \frac{2\cdot \tan{0.5\cdot g_1\cdot g_2}}{1 - \tan^2{0.5\cdot g_1\cdot g_2}}

13,127

\sin(2 \times \pi + x) = \sin(x)

-1,602

\pi*3/4 = -13/12*\pi + \pi*\frac16*11

41,794

1 = 0.999 \cdot \dotsm

-7,035

\frac18\cdot 2/7 = \frac{1}{28}

-26,468

5x^2-20x+20=5(x^2-4x+4)

26,669

\dfrac{1}{2^{1/2}}\cdot |(t + \frac{1}{2}) \cdot (t + \frac{1}{2}) + \frac14\cdot 7| = \frac{1}{(1 \cdot 1 + 1^2)^{1/2}}\cdot |t^2 + 2 + t|

-18,250

\frac{x^2 - x\cdot 6 + 7\cdot \left(-1\right)}{x^2 - 7\cdot x} = \dfrac{(1 + x)\cdot \left(7\cdot (-1) + x\right)}{x\cdot (x + 7\cdot \left(-1\right))}

-26,579

-8^2 + y^2 = 64 (-1) + y * y

-11,608

-i\cdot 3 + 3 = 3 + 0\cdot \left(-1\right) - i\cdot 3

3,168

I = (I - E)\cdot \left(H + I\right) = H + I - E\cdot H - E

40,354

0.66 = 9 - 8.333*\ldots

-30,265

\frac{1}{z + 5}*\left(z^2 + 10*z + 25\right) = \frac{(z + 5)*(z + 5)}{z + 5} = z + 5

-16,589

\sqrt{112} \cdot 8 = 8 \sqrt{16 \cdot 7}

2,440

\|b\|_1 = 0 \Rightarrow b = 0

11,918

(x^{\frac12}*T^{\frac{1}{2}})^2 = x*T

12,089

0 = y * y - y + 380*(-1) = (y + 19)*(y + 20*(-1))

17,449

\left(1 \leq 0 \Rightarrow 0 = 1,0 \geq 2\right) \Rightarrow 0 = 2,\dots

-1,684

\frac{11}{6} \pi = \frac{1}{6}\pi + \dfrac{5}{3} \pi

8,639

(1 + l^5) \cdot \left((-1) + l^5\right) = l^{10} + (-1)

31,971

\frac{4}{52}\cdot \frac{3}{51} = 12/2652 = \frac{1}{221}

-1,207

\frac23 \times (-\dfrac37) = \frac{2 \times 1/3}{1/3 \times (-7)}

40,217

25^2 + 60 \cdot 60 = 65^2

28,526

2 = \frac{2*2}{2}

9,353

\frac{1}{-y + 1} \cdot (-y^{n \cdot 2 + 1} + 1) = (1 + y) \cdot (1 + y^2) \cdot (1 + y^4) \cdot \cdots \cdot (y^{2 \cdot n} + 1)

19,568

\left(z^2 = z + 3 \Leftrightarrow 3(-1) + z \cdot z - z = 0\right) \Rightarrow (1 \pm \sqrt{13})/2 = z

16,004

\binom{k}{x} = \frac{k!}{x! \left(k - x\right)!}

4,777

\dfrac{1}{\sqrt{z}} = \dfrac{\sqrt{z}}{z}

22,834

\left(d_2 + d_1\right)^2 = d_1^2 + d_1\times d_2\times 2 + d_2^2

-19,352

\phantom{\dfrac{2}{7} \times \dfrac{5}{2}} = \dfrac{2 \times 5}{7 \times 2} = \dfrac{10}{14}

-15,966

\frac{1}{10}\cdot 19 = \frac{7}{10}\cdot 7 - 3/10\cdot 10

11,871

t < 1 + u\wedge u \lt t + 1 \Rightarrow t = u

16,284

\binom{0 + 4 + (-1)}{0} \binom{4}{3} = 4

11,757

A \cdot A \cdot A = 0\cdot A^2 = 0\cdot A

17,075

n^2 \cdot 14 + 19 \cdot n + 6 = \left(1 + 2 \cdot n\right)^2 + 5 \cdot (1 + n \cdot 2) \cdot (n + 1)

-28,766

-\frac{9}{2 + x} + x^2 - x \cdot 2 + 4 = \frac{1}{x + 2} \cdot ((-1) + x^3)

24,629

(-1) + m + k = 2 + m + \left(-1\right) + k + 2\cdot (-1)

-14,602

5*86 + 2*100 = 630

-15,074

\frac{t^3*\frac{1}{x^2}}{t^{12}*\tfrac{1}{x^{20}}} = \frac{t^3}{t^{12}}*\frac{1}{x * x*\tfrac{1}{x^{20}}} = \frac{1}{t^9}*x^{-2 - -20} = \frac{1}{t^9}*x^{18}

26,080

E/F = E*F/F/F = \frac{E}{F}*1 = \frac{E}{F}

12,720

(a\cdot f)^1 = a^1\cdot f^1 = a\cdot f

-12,903

\frac{1}{28} \cdot 10 = 5/14

9,266

t\cdot z\cdot 6/5 = \frac{1}{5}\cdot z\cdot t\cdot 2 + 4\cdot t\cdot z/5

16,023

c \cdot 3 + 3 = c + 2 + c + c + 1

18,035

a + a*b + 2*\left(-1\right) - 2*b = (2*(-1) + a)*(1 + b)

-20,338

2/2\cdot \frac{3\cdot \left(-1\right) + x}{2\cdot (-1) + x} = \frac{6\cdot (-1) + x\cdot 2}{x\cdot 2 + 4\cdot (-1)}

7,766

\left(x = 3^{1 / 2} \cdot 2 + 1\Longrightarrow 12 = \left((-1) + x\right)^2\right)\Longrightarrow 0 = x^2 - x \cdot 2 + 11 \cdot \left(-1\right)

-30,847

2\cdot (-1) + x = \frac{1}{x^2 + 3\cdot x}\cdot (x^3 + x^2 - 6\cdot x)