 is d?
-2, -1, 0, 1
Let l(q) = q**2 + q + 2. Let y(j) = -14*j**2 - 10*j - 2. Let n(a) = -3*l(a) - y(a). Factor n(h).
(h + 1)*(11*h - 4)
Suppose -t + 35 = 4*t. Let l(a) = -2*a + 16. Let w be l(t). Factor -2/3*c**3 + 0*c + 0 + 4/3*c**w.
-2*c**2*(c - 2)/3
Let y be (-965)/(-14)*(-7100)/(-125). Let u = 3924 - y. Solve 10*i**2 + 12/7 - u*i = 0 for i.
2/7, 3/5
Factor -4/5*u + 16/5*u**2 + 0 - 12/5*u**3.
-4*u*(u - 1)*(3*u - 1)/5
Determine l, given that 0 + 0*l + l**2 + 1/2*l**3 = 0.
-2, 0
Find c, given that -3*c**3 - 55*c**2 - 55*c - 15*c + 32*c**2 - 84*c**2 = 0.
-35, -2/3, 0
Let n(q) be the third derivative of -q**8/84 + 8*q**7/105 - q**6/10 - 6*q**2. Let n(d) = 0. Calculate d.
0, 1, 3
Let l = 17389/2167 - -31/197. Let c = l + -84/11. Let 2/11*j**3 - 6/11*j**2 + c*j**4 + 0 - 2/11*j = 0. What is j?
-1, -1/3, 0, 1
Factor 0 - 4/11*q**4 + 0*q**3 + 0*q**2 + 0*q - 2/11*q**5.
-2*q**4*(q + 2)/11
Suppose 68*m = 57*m. Let r(d) be the third derivative of 8*d**2 + m*d - 1/150*d**5 + 0 + 0*d**3 + 0*d**4. Solve r(s) = 0 for s.
0
Let o(f) = -4*f**4 + 212*f**3 + 968*f**2 + 1008*f. Let r(w) = -3*w**4 + 141*w**3 + 645*w**2 + 672*w. Let k(l) = -5*o(l) + 8*r(l). Determine h so that k(h) = 0.
-2, 0, 21
Let x(d) = -d**3 + d**2 + d. Let n be 8 - 9/((-9)/4). Let a(i) = -5*i**3 + 4*i**2 + 7*i + 2. Let t(g) = n*x(g) - 3*a(g). Find p such that t(p) = 0.
-1, 2
Let d(k) = -25*k**3 + 225*k**2 + 20*k + 40. Let s(p) = p**3 - p**2 - p - 2. Let o(r) = -d(r) - 20*s(r). What is x in o(x) = 0?
0, 41
Let m(s) = 27*s**2 - 57*s + 23. Let p(j) = -13*j**2 + 28*j - 12. Let t(v) = -4*m(v) - 9*p(v). Find x such that t(x) = 0.
4/3
Let t = -1612/5 + 323. Let -t*z**2 + 3/5*z + 6/5 = 0. Calculate z.
-1, 2
Let q(s) be the second derivative of -3*s**5/20 + 261*s**4/4 - 22707*s**3/2 + 1975509*s**2/2 - 81*s. Factor q(v).
-3*(v - 87)**3
Let f = 12766/15 + -851. Let g(n) be the third derivative of -f*n**5 + 0*n + 1/36*n**6 + 9*n**2 + 0 + 1/12*n**4 - 1/18*n**3 - 1/210*n**7. Solve g(z) = 0 for z.
1/3, 1
Let n(b) be the first derivative of -6*b**5/65 - 43*b**4/26 - 322*b**3/39 - 49*b**2/13 + 131. Determine r so that n(r) = 0.
-7, -1/3, 0
Factor -11395*c + 3*c**4 - 48*c**2 - 6*c**3 + 3*c**3 + 11335*c.
3*c*(c - 5)*(c + 2)**2
Let x = 14 - 12. Suppose 3*y + 3*m = 0, x*m = -3*m - 15. Factor -13*d**2 + 5*d**2 + 2*d**y + 7*d - d.
2*d*(d - 3)*(d - 1)
Let r = -344/365 - -98/73. Determine w, given that 0*w - 2/5*w**3 - r*w**2 + 0 = 0.
-1, 0
Let d(y) = -y**2 + 6*y - 7. Let j be d(5). Let c be (0/((-18)/3))/(j/(-1)). Factor -9/7*w**2 - 3/7*w**4 + 3/7*w + c + 9/7*w**3.
-3*w*(w - 1)**3/7
Let f be 5211/(-126)*1/6. Let s = f + 31/4. Factor -4/7 + 6/7*r + 2/7*r**4 - s*r**3 + 2/7*r**2.
2*(r - 2)*(r - 1)**2*(r + 1)/7
Suppose 11 = 2*l + 1. Suppose 6*i**4 - l*i + 7*i**3 + 6 + 2*i - 18*i**2 - 10*i**3 = 0. What is i?
-1, 1/2, 2
Factor 23 - 3*h - h**3 + 0*h**3 - 3*h**2 - 13 - 11.
-(h + 1)**3
Let t be (-1 - -9) + (-68 - -64). Find l, given that -8/11*l**2 + 16/11*l**3 + 0 - 18/11*l**5 + 0*l + 6/11*l**t = 0.
-1, 0, 2/3
Let v(o) be the third derivative of 7*o**8/1800 - o**6/675 - o**3/6 + 4*o**2. Let c(g) be the first derivative of v(g). Factor c(t).
2*t**2*(7*t - 2)*(7*t + 2)/15
Let x = 147 - 143. Let d(a) be the first derivative of 32/11*a - 24/11*a**2 - 1/22*a**x + 6/11*a**3 + 2. Determine b so that d(b) = 0.
1, 4
Factor 28 - 53*b - 14*b**3 + 32*b**2 + 52 - 83*b + 44*b**2.
-2*(b - 2)**2*(7*b - 10)
Let t be (0 - (1 + (-3 - -1)))*3. Solve -7/6*f + 1/2 - 1/6*f**t + 5/6*f**2 = 0 for f.
1, 3
Factor 4*y**2 - 5*y**2 + 3*y**2 - 36*y + 34.
2*(y - 17)*(y - 1)
Let f = 83 - 83. Let j(o) be the second derivative of f - 8*o + 3/4*o**4 - 5/2*o**3 + 3*o**2. Factor j(h).
3*(h - 1)*(3*h - 2)
Let a(w) = 17*w**2 - 47*w + 17. Let f(c) = -8*c**2 + 24*c - 10. Let n(v) = -6*a(v) - 13*f(v). Factor n(q).
2*(q - 14)*(q - 1)
Let d be 0 - -3 - (-9)/48*-12. Let f be 1 + 1/(-1 + 2). Factor -d*q - 3/4*q**f - 1/4 - 1/4*q**3.
-(q + 1)**3/4
Suppose -2*u = 5*f - 25, 0 = -4*u - u. Factor 40*x**3 + 20*x + 11*x**4 - 45*x**5 + 9*x**4 + 40*x**2 + 4 + 49*x**f.
4*(x + 1)**5
Let y(j) be the second derivative of j**7/14 + 7*j**6/10 + 6*j**5/5 - 4*j**4 + 504*j - 2. Solve y(n) = 0.
-4, 0, 1
Let k(a) be the first derivative of -a**5/40 - 5*a**4/32 + 3*a**3/8 + 7*a**2 + 6. Let x(h) be the second derivative of k(h). Determine i, given that x(i) = 0.
-3, 1/2
Let a(q) be the second derivative of q**5/30 + q**4/3 + 4*q**3/3 - q**2/2 - 2*q. Let f(t) be the first derivative of a(t). Factor f(r).
2*(r + 2)**2
Let d = 70 - 96. Let b be 5/2 + d/12. Solve 0 + 1/3*y - b*y**2 = 0.
0, 1
Let p = 1383 + -1377. Let b(i) be the first derivative of p + i**3 - 6*i + 3/2*i**2. Factor b(a).
3*(a - 1)*(a + 2)
Determine u, given that 4/3*u**2 + 312*u + 18252 = 0.
-117
Let v = 1/1997 + 7985/5991. Factor 0 + 2*w**2 - 2/3*w**3 - v*w.
-2*w*(w - 2)*(w - 1)/3
Factor -32*m + 79*m**3 + 16*m - 9*m**4 - 9*m**4 - 52*m**2 + 7*m**3.
-2*m*(m - 4)*(m - 1)*(9*m + 2)
Let b(s) = 67*s**2 - 5*s + 7. Let i(f) = 4 - 12 - 2 - 2*f + 6 - f**2. Let k be i(-3). Let a(q) = 22*q**2 - 2*q + 2. Let t(p) = k*a(p) + 2*b(p). Factor t(n).
-4*n*(5*n - 1)
Let q = -9 + 11. Factor -3*z**2 + z**q - 8 + 4*z + 6.
-2*(z - 1)**2
Let r = -723 + 1044. Suppose 4*l + 7 = -5*v + 543, -r = -3*v - 3*l. Factor v*o**3 - 12*o**2 - 134*o**4 - 109*o**4 + 3*o**2 - 3*o**2.
-3*o**2*(9*o - 2)**2
Let w(c) be the second derivative of -c**6/105 + 9*c**5/70 - 10*c**4/21 + 4*c**3/7 - 367*c. Solve w(g) = 0.
0, 1, 2, 6
Let g(f) be the third derivative of 2*f**7/735 - f**6/35 + 4*f**5/35 - 4*f**4/21 - 105*f**2. Determine b, given that g(b) = 0.
0, 2
Factor -443*b**2 + 282*b**2 + 596*b**2 + 1456*b**3 - 26*b**5 + 917*b**2 + 28*b**5 + 106*b**4.
2*b**2*(b + 1)*(b + 26)**2
Let q be 184/(-14)*(-15)/(-10) - 4. Let m = q - -26. Factor m + 2/7*v**3 + 24/7*v + 12/7*v**2.
2*(v + 2)**3/7
Let t(u) be the first derivative of 2*u**3/27 + 10*u**2/9 + 2*u - 163. Find r such that t(r) = 0.
-9, -1
Let v be 434/144 - (8 + -11 - -6). Let q(l) be the second derivative of 2*l + 0*l**3 + 0 - v*l**4 - 1/120*l**5 + 0*l**2. Factor q(p).
-p**2*(p + 1)/6
Let p(m) = -2*m + 3. Let g be p(0). Factor -5*l**3 + 2*l**3 - 6*l**2 - l + 6 + 7*l - g*l.
-3*(l - 1)*(l + 1)*(l + 2)
Let o be (1 + 3)*3/4. Factor 7*u + 2*u - 6*u - 2 + 4*u**o - 5*u**3.
-(u - 1)**2*(u + 2)
Let n(o) be the first derivative of -o**5/15 + 7*o**4/12 - 5*o**3/3 + 13*o**2/6 - 4*o/3 + 145. Factor n(t).
-(t - 4)*(t - 1)**3/3
Suppose 1/6*l**5 + 0 + 0*l**2 + 0*l - 1/6*l**4 + 0*l**3 = 0. What is l?
0, 1
Let c(i) be the first derivative of -i**4/34 + 16*i**3/51 + 16. Factor c(n).
-2*n**2*(n - 8)/17
Let k(v) be the second derivative of -v**4/14 - 2*v**3/3 + 5*v**2/7 - 3*v. Factor k(p).
-2*(p + 5)*(3*p - 1)/7
Suppose -60*i + 15 = c - 55*i, 2*i = -5*c + 6. Factor -2/17*n**3 + 6/17*n + c*n**2 - 4/17.
-2*(n - 1)**2*(n + 2)/17
Let v(l) = l**3 - l - 2. Let b(r) = 16*r**3 + 156*r**2 - 2048*r + 8748. Suppose -2 = 5*h - 7*h. Let q(d) = h*b(d) - 20*v(d). Factor q(j).
-4*(j - 13)**3
Suppose 2*a = -5*k + 117, 0 = -2*k + 5*k - 2*a - 67. Suppose 3 = -4*x + k. Find q, given that -8 - 6*q**5 + 3*q**x - 3*q**4 + 8 = 0.
-1, 0
Let n(g) be the second derivative of -2*g**6/45 + 28*g**5/5 - 294*g**4 + 8232*g**3 - 129654*g**2 + 230*g. Find v such that n(v) = 0.
21
Suppose 1165 = -89*k + 4013. Determine i so that -292/7*i**2 - 172/7*i**3 - 44/7*i**4 - k*i - 64/7 - 4/7*i**5 = 0.
-4, -1
Let k = -46 - -51. Find d, given that k - 24*d + 6 + 3*d**2 - 2 + 12*d = 0.
1, 3
Let g(f) = 3*f**4 + 78*f**3 + 508*f**2 - 70*f - 511. Let h(z) = 3*z**4 + 78*z**3 + 507*z**2 - 72*z - 510. Let k(m) = 3*g(m) - 4*h(m). Factor k(q).
-3*(q - 1)*(q + 1)*(q + 13)**2
Let l(a) = -11*a**3 + 7*a**2 + 13*a - 21. Let f(z) = -9*z**3 + 7*z**2 + 12*z - 20. Let s(y) = -6*f(y) + 5*l(y). Suppose s(q) = 0. Calculate q.
-5, -3, 1
Let f(y) be the first derivative of -1/2*y**2 - 2 + 0*y + 1/3*y**3. Factor f(s).
s*(s - 1)
Let s(z) be the third derivative of 0*z - 5/48*z**5 + 0 - 5/12*z**4 - 5/6*z**3 - 6*z**2 - 1/96*z**6. Find h such that s(h) = 0.
-2, -1
Let w(r) be the second derivative of r**4/12 - r**3/2 - 5*r**2 - 122*r. What is t in w(t) = 0?
-2, 5
Let d(i) be the first derivative of 3*i**5/40 - 9*i**4/32 + 3*i**3/8 - 3*i**2/16 - 14. Let d(b) = 0. Calculate b.
0, 1
Let w(l) = -36*l**5 - 560*l**4 - 2080