 (0/(-10 + 7))/2. What is y in f + 1/2*y**3 - 1/2*y**2 - y = 0?
-1, 0, 2
Let c be 0/(-9) - (0 - 3). Find a such that 1 + 0 - 2 - c - 2*a**3 + 6*a = 0.
-2, 1
Suppose 2*k - v = 7*k + 3, -v - 3 = -2*k. Suppose 4*r - 4 - 4 = 0. Factor x + k*x**r + x + x**2.
x*(x + 2)
Suppose 3*s = -3*g, 2*g - 9 = 2*s + 3. Suppose -g*a + 14 = 4*a. Factor -12/5*z - 18/5 - 2/5*z**a.
-2*(z + 3)**2/5
Suppose 2*x - 8*x = -18. Suppose 0 = t - x. What is r in 0*r**t + 0*r**2 + 0*r**4 - 2/5*r**5 + 0*r + 0 = 0?
0
Let 0*x**2 + 2/11*x + 0*x**4 + 2/11*x**5 + 0 - 4/11*x**3 = 0. What is x?
-1, 0, 1
Let h(w) be the first derivative of w**6/480 - w**5/160 - w**4/16 - w**3 - 2. Let l(i) be the third derivative of h(i). Find c, given that l(c) = 0.
-1, 2
Let d(c) be the second derivative of -c**7/168 - c**6/120 + c**5/80 + c**4/48 - 8*c. Factor d(r).
-r**2*(r - 1)*(r + 1)**2/4
Suppose u - 5*l - 48 = -u, 5*u - 5*l = 90. Suppose -u*g = -11*g. Solve 6*d**3 + g - 2/3*d + 2*d**2 + 10/3*d**4 = 0 for d.
-1, 0, 1/5
Let s(j) be the second derivative of j**4/90 - 2*j**3/9 + 3*j**2/5 - 27*j + 1. Suppose s(m) = 0. Calculate m.
1, 9
Let t(x) be the second derivative of x**8/168 - 4*x**7/105 + x**6/12 - x**5/15 + x**2/2 + x. Let o(l) be the first derivative of t(l). Solve o(d) = 0.
0, 1, 2
Let m = 335/1386 - 3/154. Let r(n) = -n**3 + 12*n**2 + 30*n - 26. Let c be r(14). Let -2/9*y**c - m*y + 0 = 0. What is y?
-1, 0
Suppose 2 = 5*o - t, -o = -3*o - 2*t + 8. Let u(d) = 7*d**3 - d**2 - d + 1. Let z be u(o). Determine g so that -z*g**4 - 2*g**3 + 5*g**4 + g**3 = 0.
-1, 0
Let a(r) = -35*r**3 - 60*r**2 - 40*r. Let j(h) = 9*h**3 + 15*h**2 + 10*h. Let p(y) = -4*a(y) - 15*j(y). Solve p(w) = 0.
-2, -1, 0
Factor -3/7*d**4 + 9/7*d**2 - 6/7*d**3 + 12/7*d - 12/7.
-3*(d - 1)**2*(d + 2)**2/7
Let d = -120 + 122. Find f such that -4/7 - 6/7*f**d + 10/7*f - 2/7*f**3 + 2/7*f**4 = 0.
-2, 1
Let x(s) be the second derivative of s**4/8 - 4*s**3 + 48*s**2 + 8*s. Factor x(t).
3*(t - 8)**2/2
Factor 36 + 17*b - 85*b + 0*b**3 + 3*b**3 + 28*b**2 + b**3.
4*(b - 1)**2*(b + 9)
Let g be (8/20 + 4/(-10))/(-3). Let q(i) be the second derivative of 0*i**2 - 1/8*i**4 + 1/12*i**3 + 3/40*i**5 + g - i - 1/60*i**6. Factor q(t).
-t*(t - 1)**3/2
Let c = 0 + 0. Let r be 0 + (3 - 1 - c). Factor 0*z**4 + 3*z**2 - z**2 + 7*z**5 - 7*z**3 - r*z**4.
z**2*(z - 1)*(z + 1)*(7*z - 2)
Let q = 6 - 5. Suppose -3*r + q = -5. Let r*m**4 - 13*m - m**4 - m**2 + 13*m = 0. What is m?
-1, 0, 1
Suppose 5*x - 37 = -4*f, -3*f + 0*f + 34 = 5*x. Let s = 1 - -1. Let 6 + f*r**s + 8*r - r + 2*r = 0. What is r?
-2, -1
Let b = -3813/5 + 763. Find m such that -4/5 - 6/5*m - b*m**2 = 0.
-2, -1
Let b be 48/9 - 1/3. Suppose -3*x + 26 = -b*k - 0, 0 = -2*x - 3*k - 8. Factor -x*g**2 - g**2 - 2*g + 2*g**2 - 1.
-(g + 1)**2
Let f(j) = -j**2 + j - 1. Let s(b) = 15*b**2 - 3*b - 18. Let h(t) = 12*f(t) + s(t). Solve h(g) = 0.
-5, 2
Let w(s) = -21*s**4 - 48*s**3 - 6*s**2 + 48*s + 42. Let n(z) = 3*z**4 + 7*z**3 + z**2 - 7*z - 6. Let o(p) = 15*n(p) + 2*w(p). Suppose o(c) = 0. What is c?
-2, -1, 1
Let z(j) be the third derivative of -7*j**6/60 - 9*j**5/40 + j**4/16 + j**3/6 + 5*j**2. Factor z(l).
-(l + 1)*(4*l + 1)*(7*l - 2)/2
Let d(a) = -37*a**3 + 64*a**2 - 44*a + 17. Let j(h) = 9*h**3 - 16*h**2 + 11*h - 4. Let z(v) = 2*d(v) + 9*j(v). Factor z(p).
(p - 1)**2*(7*p - 2)
Let m be -2 + -1 - -5 - 2. Suppose m = -6*q + 4*q + 4. Factor 0*c**q + 4/3*c - 4/3*c**3 - 2/3*c**4 + 2/3.
-2*(c - 1)*(c + 1)**3/3
Let x(j) be the third derivative of j**8/336 - j**7/70 + j**6/120 + j**5/20 - j**4/12 + 14*j**2. Factor x(a).
a*(a - 2)*(a - 1)**2*(a + 1)
Let a be (-33)/12 + 3 + 0. Factor 0 - 1/4*q**3 - a*q + 1/2*q**2.
-q*(q - 1)**2/4
Let v(p) = 10*p**2 + p - 1. Let s be v(1). Let n = s + -7. Determine d, given that 1 - 2*d**3 + 3*d - 2*d**2 + 4*d**2 - 6*d**5 - n*d**4 + 5*d**5 = 0.
-1, 1
Let o(m) be the third derivative of m**6/120 + 13*m**5/240 + m**4/32 + 12*m**2. Factor o(t).
t*(t + 3)*(4*t + 1)/4
Let o(q) be the second derivative of 5*q**4/6 - 11*q**3/6 + q**2/2 + 24*q. Determine m so that o(m) = 0.
1/10, 1
Suppose -c + c**4 - 2*c**3 + 1/5 + 2*c**2 - 1/5*c**5 = 0. Calculate c.
1
Let m be (-8)/(48/18) + 3. Let g(k) be the third derivative of 1/20*k**5 + 0*k**6 + 0 + m*k**3 - 2*k**2 + 0*k**4 + 0*k - 1/70*k**7. Factor g(t).
-3*t**2*(t - 1)*(t + 1)
Let j(t) be the first derivative of -1/3*t**2 - 1/3*t - 4 - 1/9*t**3. Let j(k) = 0. Calculate k.
-1
Suppose 3*l - 68 = 5*v, 4*v = -3*l + 2*v + 82. Suppose 2*b = 4*d - l, 0*d = -4*d - 5*b - 9. Factor -z**d - z**3 + z**5 - z + z + z**2.
z**2*(z - 1)**2*(z + 1)
What is y in -1/2*y - 21/4*y**3 - y**5 - 11/4*y**2 + 0 - 4*y**4 = 0?
-2, -1, -1/2, 0
Let x = -5 + 10. Factor 58*i**4 + 43*i**4 - 98*i**x - 218*i**3 - 8*i + 151*i**4 + 72*i**2.
-2*i*(i - 1)**2*(7*i - 2)**2
Let d(l) be the third derivative of -1/27*l**3 - l**2 + 0*l**4 + 0 + 0*l + 1/270*l**5. Find s, given that d(s) = 0.
-1, 1
Let n(z) be the first derivative of 2*z**3/21 + z**2/7 - 4*z/7 + 2. Determine j, given that n(j) = 0.
-2, 1
Let m be 0 + 3 + -6 - -7. Let r be (-2 + -4)/(m/(-6)). Factor v**5 + v**3 - r*v**2 + 2*v**4 + 9*v**2.
v**3*(v + 1)**2
Factor 7*x**4 - 4*x**4 - 5*x + 16*x**2 + 16*x + 3*x**2 + 13*x**3 + 2.
(x + 1)**2*(x + 2)*(3*x + 1)
Let o(s) be the second derivative of s**6/60 - s**5/20 + s**4/24 + 3*s. Factor o(p).
p**2*(p - 1)**2/2
Let b(p) = p**2 - 3*p. Let x be b(4). Factor 2/3*f + 1/3*f**5 - 1/3*f**x - f**3 + 1/3*f**2 + 0.
f*(f - 2)*(f - 1)*(f + 1)**2/3
Let j(y) be the third derivative of y**7/1120 - y**6/240 + y**5/160 + y**3/2 + 4*y**2. Let z(a) be the first derivative of j(a). Factor z(t).
3*t*(t - 1)**2/4
Let i(q) = q - 5. Let p be i(5). Let t(v) be the third derivative of 1/60*v**5 + 0*v**3 + 0*v - 1/24*v**4 - 4*v**2 + p. Factor t(j).
j*(j - 1)
Factor -2/7*x**3 + 8/7*x**2 - 8/7*x + 0.
-2*x*(x - 2)**2/7
Factor 8*j - 2*j**2 + 16 - 6 - 6 - 12.
-2*(j - 2)**2
Let j be -6 - -7 - (8 - 0). Let z = 11 + j. Suppose -2*l**z - 4*l**5 - 12 + 12 = 0. Calculate l.
-1/2, 0
Let g(m) be the second derivative of 0 - 5/6*m**4 - 3/5*m**6 + 8/5*m**5 + 0*m**2 - 2/3*m**3 - 5*m. Factor g(x).
-2*x*(x - 1)**2*(9*x + 2)
Find p, given that 0 + 3/2*p**2 + 3/2*p = 0.
-1, 0
Let t(u) be the second derivative of -2*u**6/15 - 2*u. Determine p so that t(p) = 0.
0
Factor 1/3*j + 1/6*j**2 + 1/6.
(j + 1)**2/6
Let a(k) = -k**2 - 8*k + 12. Let z be a(-9). Find p, given that -2/3*p**2 - 1/3*p + 0 - 1/3*p**z = 0.
-1, 0
Let m(h) be the first derivative of -h**4 - 4*h**3/3 + 10*h**2 - 12*h + 43. Suppose m(i) = 0. Calculate i.
-3, 1
Let w(x) be the first derivative of x**6/9 + 8*x**5/15 + x**4 + 8*x**3/9 + x**2/3 + 23. Factor w(k).
2*k*(k + 1)**4/3
Suppose -5 - 4 = -3*f. Let d(r) = -5*r**2 + 8*r + 8. Let i(c) = 3*c - 3*c**2 + c**2 + 2 + 1. Let z(h) = f*d(h) - 8*i(h). Factor z(l).
l**2
Let l(a) be the third derivative of 1/9*a**3 + 0 + 0*a - a**2 - 1/24*a**4 + 1/180*a**5. Factor l(g).
(g - 2)*(g - 1)/3
Let p(t) be the first derivative of -t**4/14 + 6*t**3/7 - 15*t**2/7 - 50*t/7 - 19. Let p(a) = 0. What is a?
-1, 5
Let g(m) = -m - 3. Let f be 2*-5*3/6. Let k be g(f). Solve -k*n**4 + 2*n**2 + 4 - 4 = 0.
-1, 0, 1
Let v(g) be the third derivative of g**5/330 - g**4/132 - 2*g**3/33 - 20*g**2. Find c such that v(c) = 0.
-1, 2
Solve -19*q - 9*q**3 - 5 + 2 + 295*q**2 - 328*q**2 = 0.
-3, -1/3
Let t be (-56)/315 - 9/((-45)/2). Factor -t - 2/9*l**3 + 2/9*l + 2/9*l**2.
-2*(l - 1)**2*(l + 1)/9
Let w(z) be the third derivative of z**6/480 - z**5/80 + z**4/48 - 19*z**2. Factor w(x).
x*(x - 2)*(x - 1)/4
Let n(c) be the second derivative of c**7/210 - c**6/75 + c**4/30 - c**3/30 + 70*c. Factor n(u).
u*(u - 1)**3*(u + 1)/5
Let j = -3 + 6. Let h(t) be the first derivative of 2*t**j - 4 + 0*t - t**2 - 3/2*t**4 + 2/5*t**5. What is o in h(o) = 0?
0, 1
Suppose 5*m - 20 = -5*r, -r + 4 = -m + 2. Factor 572/5*v**4 + 8/5*v - 88/5*v**2 + 338/5*v**5 + 138/5*v**r + 0.
2*v*(v + 1)**2*(13*v - 2)**2/5
Let u(f) = -3150*f**3 - 3990*f**2 - 1525*f - 295. Let j(b) = 225*b**3 + 285*b**2 + 109*b + 21. Let p(i) = -85*j(i) - 6*u(i). Factor p(z).
-5*(3*z + 1)**2*(5*z + 3)
Let d(p) = -9*p**4 + 12*p**2 + 3*p. Let u(y) = -9*y**4 - y**3 + 11*y**2 + 3*y. Let h(l) = -2*d(l) + 3*u(l). Solve h(m) = 0 for m.
-1, -1/3, 0, 1
Solve 26 + 6*v + 21 - 3*v**2 - 50 = 0.
1
Let n(b) = b**2 + 5*