se -4*x = y + 5 - 3, -4*y - 5*x + 14 = 0. Suppose 3*j - y = -0*j. Solve 0 + 1/6*s**4 - j*s**3 - 32/3*s + 8*s**2 = 0.
0, 4
Suppose 8 - 8 = -14*b. Suppose b = -4*i + 2*m + 146, 94 = 2*i + m + 31. Let 5*u**2 - i*u + 32*u + 2*u**3 - 7*u**2 + 4*u**4 - 2*u**4 = 0. What is u?
-1, 0, 1
Let z(t) be the third derivative of 934/135*t**5 + 136/9*t**4 + 5/3024*t**8 + 221/216*t**6 + 256/27*t**3 + 0 + 3*t**2 + 0*t + 1/15*t**7. Solve z(l) = 0 for l.
-8, -1, -1/5
Determine s, given that -128*s**3 - 78*s**3 + 9*s + 104*s**3 + 93*s**3 - 12 + 12*s**2 = 0.
-1, 1, 4/3
Let g(j) be the second derivative of -7*j**4/6 - 254*j**3 - 648*j**2 - 193*j - 15. Factor g(s).
-2*(s + 108)*(7*s + 6)
Let d(h) be the first derivative of h**3 - 1095*h**2/2 + 4332*h + 2298. Suppose d(f) = 0. Calculate f.
4, 361
Factor -254*n - 18*n**3 + 303/2 + 361/3*n**2 + 1/6*n**4.
(n - 101)*(n - 3)**2*(n - 1)/6
Let p(k) be the second derivative of 3/2*k**3 + 27/7*k**2 + 61*k + 3/140*k**5 + 2/7*k**4 + 0. Let p(r) = 0. What is r?
-3, -2
Suppose -29*h = -108 + 50. Let i(z) be the third derivative of -1/32*z**4 + 0 - 25*z**h + 0*z + 0*z**3 + 1/240*z**5. Find a, given that i(a) = 0.
0, 3
Suppose 0 = 4*v - 8. Determine d, given that -2*d**4 + 82*d**2 + 2*d**3 - 41*d**2 - v*d - 43*d**2 + 4*d**4 = 0.
-1, 0, 1
Let w be (9/(-8))/((-18)/96). Determine d so that -168*d + w*d**3 + 3*d**3 - 234*d**2 + 2*d**3 - 10*d**2 + d**3 = 0.
-2/3, 0, 21
Suppose 30683 - 30473 = 35*i. Let -i + 11*x - 5/3*x**2 = 0. What is x?
3/5, 6
Let b(k) be the third derivative of -2*k**7/525 - 43*k**6/300 - 26*k**5/25 - 47*k**4/60 + 68*k**3/15 - 25*k**2 - k - 38. Find s such that b(s) = 0.
-17, -4, -1, 1/2
What is h in 1/3*h**3 - 76 + 23/3*h**2 + 64/3*h = 0?
-19, -6, 2
Let i be (-4)/(-210)*5*105/2400. Let p(s) be the third derivative of 0*s + 1/32*s**4 - 1/80*s**5 - i*s**6 - 31*s**2 + 1/12*s**3 + 0. Factor p(w).
-(w - 1)*(w + 2)*(2*w + 1)/4
Suppose -3*q = 3*j - 30, 3*q - 338*j + 335*j + 18 = 0. Determine r so that 162/11*r + 36/11*r**q + 0 + 2/11*r**3 = 0.
-9, 0
Let x(d) be the second derivative of -1/130*d**5 - 8/13*d**2 + 85*d + 1 - 2/39*d**3 + 5/78*d**4. Solve x(y) = 0 for y.
-1, 2, 4
Let o = 45 - 42. Let -623*b - b**3 + 639*b - 3*b**o = 0. Calculate b.
-2, 0, 2
Let y(h) = -229*h**3 - 30*h**2 + 265*h - 384. Let t(a) = 196*a**3 + 32*a**2 - 266*a + 384. Let l(f) = -7*t(f) - 6*y(f). Suppose l(s) = 0. Calculate s.
2, 8, 12
Suppose -3*o + 195 = 174. Factor 137 + 115 + 2*h**2 + 147 - o + 56*h.
2*(h + 14)**2
Let f(o) be the first derivative of -3993*o**2 + 3/10*o**5 + 157 + 43923/2*o + 363*o**3 - 33/2*o**4. Suppose f(m) = 0. Calculate m.
11
Let f = 228264 + -2965457/13. Let o = f + 685/117. Factor 124*t**4 + 16/9 - 64/3*t - 36*t**5 + 268/3*t**2 - o*t**3.
-4*(t - 1)**3*(9*t - 2)**2/9
Let w be (-26)/8 + 4/16 - -7. Let i be (80/(-14))/(w/(-14)). Suppose 2*q + 7*q - 15*q**4 + 15*q**2 + i*q**5 + 2*q - 6*q - 25*q**3 = 0. What is q?
-1, -1/4, 0, 1
Let m = 13061/15810 + 19/2635. Factor 1 + m*b + 1/6*b**2.
(b + 2)*(b + 3)/6
Let 16 - 8*b - 20*b**2 - b**5 + 5*b**3 - 14*b + 25*b + 7*b + 4*b**4 - 14*b = 0. What is b?
-2, -1, 1, 2, 4
Suppose v - 3*x - 17 = -6*x, 2*v = -4*x + 24. Let t be (-2 - (-7)/v)*(-360)/(-405). Suppose 0 + 8/3*w**2 - t*w**3 - 4/3*w = 0. Calculate w.
0, 1
Suppose 39*d - 248 = -23*d. Let u(q) be the third derivative of -1/240*q**5 + 0*q**d + 0*q + 25*q**2 + 0*q**3 + 0. Find j such that u(j) = 0.
0
Let y(w) be the third derivative of 5/336*w**8 + 5/12*w**5 + 11/24*w**6 + 1/6*w**7 + 0*w**3 + 0*w**4 - 15*w**2 + 0*w + 0. Solve y(n) = 0 for n.
-5, -1, 0
Let x(u) be the first derivative of u**3/2 - 243*u**2/4 - 1995*u - 9716. Determine z, given that x(z) = 0.
-14, 95
Let m(b) be the third derivative of b**7/20160 - b**5/240 + 105*b**4/8 - 2*b**2 + 62*b. Let q(r) be the second derivative of m(r). Factor q(d).
(d - 2)*(d + 2)/8
Let b(n) be the second derivative of n**5/35 + 8*n**4/21 - 88*n**3/3 - 1523*n. Factor b(a).
4*a*(a - 14)*(a + 22)/7
Let p(g) be the first derivative of g**5/80 - 7*g**4/48 - g**3/24 + 7*g**2/8 + 60*g + 38. Let z(d) be the first derivative of p(d). Factor z(h).
(h - 7)*(h - 1)*(h + 1)/4
Let n = -743 - -759. Suppose 4*k = 2*i + n, -2*i + k - 15 = -7*i. Factor -5/4 - 45/2*s - 270*s**3 - 135*s**i.
-5*(6*s + 1)**3/4
Let w = 13117 + -13113. Find v, given that 20*v**2 + 32/3*v - 4/3*v**w + 8*v**3 + 0 = 0.
-1, 0, 8
Factor 6/7*u + 0 + 3/7*u**2.
3*u*(u + 2)/7
Let d(a) be the first derivative of 0*a + 18*a**2 + a**4 - 59 + 40/3*a**3. Factor d(t).
4*t*(t + 1)*(t + 9)
Let h = 251760 - 251760. Factor 0*t - 5/3*t**2 + h - 1/3*t**4 + 2*t**3.
-t**2*(t - 5)*(t - 1)/3
Let d(o) = 6*o - 16 + 11*o - 16*o - 20*o**2 + o**3. Let r be d(20). Factor 0*u**r + u**4 - 5*u**5 + u**4 + 17*u**5 - 4*u**3.
2*u**3*(2*u - 1)*(3*u + 2)
Let q(n) be the third derivative of 0*n + 0 + 0*n**3 + 1/25*n**5 - 1/300*n**6 - 3/20*n**4 + 192*n**2. Factor q(t).
-2*t*(t - 3)**2/5
Let y be ((-25)/(-10))/((-2)/(-4)). Let s be 5/(-3)*162/(-108). Determine g so that 0*g + 0 + 1/2*g**3 - s*g**4 + 0*g**2 + 2*g**y = 0.
0, 1/4, 1
Let w(m) be the second derivative of -m**4/12 + 11*m**3/2 - 44*m**2 + 6*m - 21. Let i be w(3). Factor -16/15*o + 2/15*o**i + 32/15.
2*(o - 4)**2/15
Let y(f) be the third derivative of f**7/735 + 9*f**6/140 + f**5/7 - 17*f**4/3 + 200*f**3/7 - 4070*f**2. Let y(c) = 0. What is c?
-25, -6, 2
Let t(g) be the third derivative of 0*g**3 + 1/30*g**5 + 0*g + 1/75*g**6 + 1/525*g**7 + 7 + 1/30*g**4 - 17*g**2. Let t(k) = 0. What is k?
-2, -1, 0
Let p = 27 - 22. Suppose -191*m**3 + 11*m**3 + 5*m**p - 6*m**5 + 60*m**4 - 4*m**5 = 0. What is m?
0, 6
Let -402/5*i**2 + 81 - 408/5*i - 3/5*i**4 + 408/5*i**3 = 0. Calculate i.
-1, 1, 135
Let w be (-3)/(-60)*1*12/45. Let c(m) be the third derivative of 1/300*m**6 + 0*m + 0*m**3 + 0 - 16*m**2 + 1/60*m**4 - w*m**5. Factor c(i).
2*i*(i - 1)**2/5
Let t = -3810 - -3815. Let w(m) be the second derivative of 5/9*m**3 + 2/3*m**2 + 1/30*m**t + 2/9*m**4 + 0 + 6*m. Factor w(d).
2*(d + 1)**2*(d + 2)/3
Let d = -2098 + 708. Let k = 18082/13 + d. What is z in -18/13 - 2/13*z**2 - k*z = 0?
-3
Let d(s) = -2*s**4 + 30*s**3 + 58*s**2 - 652*s - 1514. Let w(i) = 2*i**4 - 31*i**3 - 60*i**2 + 654*i + 1515. Let a(x) = 3*d(x) + 2*w(x). Solve a(m) = 0.
-3, 6, 14
Let n(j) be the second derivative of -j**4/18 + 241*j**3/9 - 478*j**2/3 + 2039*j. Let n(o) = 0. Calculate o.
2, 239
Let k = 2/8133 - -1057268/89463. Let h = 1258/99 - k. Suppose -2/9*j**2 + 8/9 + h*j - 2/9*j**3 = 0. What is j?
-2, -1, 2
Let l = 1294 + -1311. Let t(r) = -31*r - 527. Let y be t(l). Factor -a**2 + a**4 + y + 0*a - 1/3*a**3 + 1/3*a**5.
a**2*(a - 1)*(a + 1)*(a + 3)/3
Suppose -94/17*o + 0 - 4/17*o**4 - 194/17*o**3 - 284/17*o**2 = 0. What is o?
-47, -1, -1/2, 0
Let d(q) be the first derivative of -q**7/385 + q**6/55 + q**5/110 - q**4/11 + 61*q**2 + 158. Let f(s) be the second derivative of d(s). What is i in f(i) = 0?
-1, 0, 1, 4
Suppose 2*w + 4*c - 57 = -3*w, -w + 5*c = 6. Let h be (w + -5)*22/8. Let 2*l + 17 - 2*l**3 - 24 - 4*l**2 + h = 0. Calculate l.
-2, -1, 1
Let h be 213/12 - 2/(-8) - 4. Suppose -2*g + h = 3*m, g + m - 3*m = 0. Let -91*w**2 - 83*w**2 - g + 4*w + 173*w**2 = 0. Calculate w.
2
Suppose -4*c + 2*v + 44 = 6*v, 33 = 3*c - 5*v. Suppose 5*y + 2*d = c, y = -3*y - 4*d + 4. Factor 5*f**5 - 22*f**3 + 26*f**y + 15*f**4 + 6*f**3.
5*f**3*(f + 1)*(f + 2)
Let d(o) be the first derivative of -o**6/270 - o**5/15 + o**2/2 - 16*o - 43. Let k(h) be the second derivative of d(h). Factor k(s).
-4*s**2*(s + 9)/9
Let y(w) = -3 - 8*w + 2 - w**2 - 4. Let m be y(-7). Factor 2*c**4 - 2*c**m + 1 - 2*c**3 + 2*c**5 - 1.
2*c**2*(c - 1)*(c + 1)**2
Let m be (-705)/282 - (13/2 - -1). Let i be ((-7)/(-210)*5)/((-5)/m). Factor 0*o + 1/9*o**5 + i*o**3 + 4/9*o**4 + 0 + 0*o**2.
o**3*(o + 1)*(o + 3)/9
Let 114/17*k**2 + 1176/17 - 2/17*k**3 - 808/17*k = 0. Calculate k.
2, 6, 49
Factor 261/5*h**2 + 18 - 267/5*h - 81/5*h**3 - 3/5*h**4.
-3*(h - 1)**3*(h + 30)/5
Suppose 3*q - 14 = q. Factor -12*j - 8*j**2 + 2*j**2 - 15 + 4*j**3 - 5*j**3 + q.
-(j + 2)**3
Let c(v) be the second derivative of 5*v**6/6 - 13*v**5/4 - 85*v**4/4 - 215*v**3/6 - 25*v**2 + 5242*v. Factor c(b).
5*(b - 5)*(b + 1)**2*(5*b + 2)
Let j(x) be the first derivative of -4*x**5/25 + 102*x**4/5 - 3036*x**3/5 - 33048*x**2/5 - 104976*x/5 + 206. 