$( x^3 - x^2 - x ) ( 2 x - 7 )$
z^2 - (2a - b)z + (a^2 - ab + b^2)
i=1
ax^2 + bx = c
\pi (n)
\frac{c}{d}-\frac{a}{b}=\frac{(bc-ad)}{bd}
\frac{1}{1-c}
y^3 = x
a=\frac{1}{0}
\sqrt{n}
d=1
153 - 51 \neq 140
16^{0}
\frac{5}{6}
z= \frac 1y
\phi=\frac{\pi}{2}
x^3 + ax + b
x = \pm n\pi
y^2 = x^3 + ax^2 + bx + c
3y^2 + 3y + 1
80 + 152 \neq 286
3=1+1
187 - 42 \neq -21
n=\pi(y)
n = 2 k
2(ab + bc + ca)
x^{2}+ny^{2}
n_1 = 1
-(y_1 + y_2)(y_3 + y_4)
2z^2 - 3z - 3 - 7i = 0
a+i b
\phi_i x_i
ax + b y + c = 0
187 + 136 \leq 323
10^2-1
x(x^2 + y^2) - 10(x^2 - y^2) = 0
\frac{1-ax_{0}}{b}
x = y
166 \pm 92 + 55 - 6
\frac{1}{1+x}
b-a
y^2+y=x^3-x
x\leq 0
z = x^2-y^2
k=12n-1
(a_n + b_n)
\theta = \frac{\pi}{2}
e=1
x(i)
z = 4
\frac{dx}{\pi \sqrt{x(1-x)}}
b \leq c
45 - 98 + 170 - 125 + 76 \neq 77
\frac{\sqrt{3}}{{2}}
\frac {9 }{ 4}
\frac{7}{5}
n=3
x^2=x
b = \sqrt{c^2-a^2}
197 + 62 \neq -74
bz+d=0
3 \pm 23 - 162
a_7 x^7 + a_6 x^6 + a_5 x^5 + a_4 x^4 + a_3 x^3 + a_2 x^2 + a_1 x + a_0 = 0
ax^4+bx^3+cx^2+dx+e = 0
d = c
\phi_a = \phi_b
(1+i)
e_1 = 9
\phi_k = \pi
167 + 165 = 332
3n^2+2n
e = \frac{c}{a}
144^5 = 27^5 + 84^5 + 110^5 + 133^5
\frac{6(k^3+k^2-6k-2)}{k(k-3)(k-4)}
z=x+y
\frac{3\pi}{7}
x=a+id
121 + 56 = 177
c \leq ab
\frac {1}{2\sqrt{x}}
(6\sqrt{21}-27 )x^2+3x+4\sqrt{21}-18
\theta (0) = 1
k_y = k \sin \theta \sin \phi
178 - 64 + 21 \leq 93
\frac1x - \frac1y = \frac{y-x}{xy}
12=2y
(6\sqrt{21}-27 )x^2+3x+4\sqrt{21}-18 = 10\sqrt{21}-42
d(x^n)
25 - 151 + 29 - 33 = -122
i = e
x^k - 1 = 0
e - 1
3^3 + 4^3 + 5^3 = 6^3
n(0)
y= a x^2 + b
x^3-2
\theta = 0
y = ax^k
y=x_{n}
x\neq\pm i