+ 7*z**2 + 0*z**4 - 3*z**y - z**2.
-3*(z - 1)**2*(z + 1)**2
Factor 7*z**4 - 4*z**5 + 14*z**5 - 4*z**3 - 13*z**4.
2*z**3*(z - 1)*(5*z + 2)
Let r(b) = 2*b**4 + 4*b**3 + 3*b**2. Let v(n) = 2*n**3 - 2*n**2 + 2*n**2 + 0*n**2 + n**4 + n**2. Let w(j) = 4*r(j) - 9*v(j). Factor w(d).
-d**2*(d - 1)*(d + 3)
Let r(u) be the third derivative of 0*u**4 + 1/12*u**3 - 3*u**2 + 0*u + 0 - 1/120*u**5. Factor r(q).
-(q - 1)*(q + 1)/2
Let l(k) be the third derivative of k**8/112 + 23*k**7/490 + k**6/14 + k**5/35 - 8*k**2. Find t, given that l(t) = 0.
-2, -1, -2/7, 0
Let l be 0*4/(-40)*-5. Let j(u) be the second derivative of -1/15*u**6 + 0*u**2 + 0 + 0*u**4 - u + l*u**5 + 0*u**3. Factor j(i).
-2*i**4
Let z = 4 + 1. Suppose -9 = -z*r + 1. Find w, given that 0 + 2/5*w - 3/5*w**r + 1/5*w**3 = 0.
0, 1, 2
Let n(c) be the third derivative of -c**5/60 + c**4/3 + c**3/3 + c**2. Let k be n(8). Factor 0 - 3*w**2 + k*w**4 + 2 - w**2.
2*(w - 1)**2*(w + 1)**2
Factor -4/3*n**3 + 0 + 2/3*n**4 - 2/3*n**2 + 4/3*n.
2*n*(n - 2)*(n - 1)*(n + 1)/3
Suppose o + 5 = 2*o. Suppose 3*k - 4*r - 1 - 1 = 0, 0 = o*k + r - 11. Factor 7*j**2 + j**3 - j + 4*j + 1 - 4*j**k.
(j + 1)**3
Let y(t) = t**3 + 6*t**2 - 3*t - 15. Let w be y(-6). Suppose w*c = -4 + 10. Factor 1/4*h**c + 0 - 1/4*h**4 - 1/4*h**3 + 1/4*h.
-h*(h - 1)*(h + 1)**2/4
Let y(g) be the first derivative of g**3/3 - 3*g**2 + 5*g + 30. Factor y(d).
(d - 5)*(d - 1)
Let t(l) be the third derivative of -l**8/112 - 2*l**7/35 - 3*l**6/20 - l**5/5 - l**4/8 - 8*l**2. Factor t(q).
-3*q*(q + 1)**4
Factor 0 - 8/13*y + 2/13*y**3 - 6/13*y**2.
2*y*(y - 4)*(y + 1)/13
Let q(s) be the third derivative of -1/315*s**7 + 1/72*s**4 + 0*s + 1/90*s**5 + 0*s**3 + 0*s**6 - 1/1008*s**8 - 2*s**2 + 0. Determine b so that q(b) = 0.
-1, 0, 1
Let j(c) be the first derivative of 0*c + 1/20*c**5 - 1/6*c**3 + 3 + 1/16*c**4 + 0*c**2. Let j(k) = 0. Calculate k.
-2, 0, 1
Let w(i) be the third derivative of 9*i**2 - 1/24*i**4 + 0 - 1/9*i**3 + 0*i - 1/180*i**5. Let w(p) = 0. What is p?
-2, -1
Let v(b) = b**3 + 4*b**2 + 2*b - 1. Let x be v(-2). Solve x*o + 4*o**3 + o**4 + 2*o**4 - 2*o**3 - 3*o**2 - 5*o**3 = 0.
-1, 0, 1
Suppose w = 7 - 6. Let v be (-2*w)/(-1 + -2). Suppose -2/3 + v*t**2 + 0*t = 0. Calculate t.
-1, 1
Let c(h) = 2*h - 2 + 1 + h**2 + 2*h. Let w be c(-5). Factor -f**2 + 0 + 1/2*f - 1/2*f**5 + 0*f**3 + f**w.
-f*(f - 1)**3*(f + 1)/2
Let o = -1946/5 - -390. Factor -o*m**5 + 0*m + 0 - 4/5*m**3 + 8/5*m**4 + 0*m**2.
-4*m**3*(m - 1)**2/5
Let t be 0/3 + 3/54. Let q(d) be the second derivative of 0*d**2 - d + 1/18*d**3 + 1/60*d**5 + t*d**4 + 0. Factor q(w).
w*(w + 1)**2/3
Let b = 1/2 + -1/4. Factor -1/2*v**4 - 1/4*v + 1/2*v**2 + 0*v**3 + b*v**5 + 0.
v*(v - 1)**3*(v + 1)/4
Let j(f) be the first derivative of f**4/4 + f**3/3 + 3. Let c(w) = -w**3 - w**2. Let v(a) = -c(a) - 4*j(a). Factor v(p).
-3*p**2*(p + 1)
Let f(s) = -16*s**2 - 99*s + 25. Let a(t) = -95*t**2 - 595*t + 150. Let l(u) = -4*a(u) + 25*f(u). Factor l(o).
-5*(o + 5)*(4*o - 1)
Let b = 109 - 109. Let b - 10/3*s**4 - 2*s**3 + 0*s + 4/3*s**2 = 0. What is s?
-1, 0, 2/5
Let u(w) be the first derivative of w**8/840 + w**7/210 - w**5/30 - w**4/12 - w**3/3 + 3. Let h(f) be the third derivative of u(f). Factor h(g).
2*(g - 1)*(g + 1)**3
Let c be 58/4 - (-10 - -10). Let n = c + -14. Factor 0*p + 0 - n*p**2.
-p**2/2
Let h(o) = o**3 - 3*o**2 - 7*o + 12. Let w be h(4). Let v(d) be the first derivative of -1/4*d**4 + 3 + 0*d**3 + w*d + 1/2*d**2. Find x such that v(x) = 0.
-1, 0, 1
Let s = 59 + -57. Factor 1/4*c**4 - 1/4*c**s + 0 + 0*c + 0*c**3.
c**2*(c - 1)*(c + 1)/4
Factor -33*u**2 + 4*u - 17 + 68*u**2 - 31*u**2 - 7.
4*(u - 2)*(u + 3)
Let u(g) be the second derivative of -g**6/6 + g**5/2 + 5*g**4/3 - 5*g**3/3 - 15*g**2/2 - 2*g. Let u(d) = 0. Calculate d.
-1, 1, 3
Suppose 2*i - 3*g = 13, 4*g + 0 = 2*i - 14. Find b such that 3/2*b**4 - 3/2*b**2 - 5/2*b**i - b + 0 + 7/2*b**3 = 0.
-1, -2/5, 0, 1
Let l = -2 - 1. Let d(o) = -o - 1. Let i be d(l). Find q, given that 5 - 1 - q - 4 - q**3 + 2*q**i = 0.
0, 1
Let b = -110/3 - -772/21. Let n(u) be the first derivative of 2/7*u - b*u**3 + 0*u**2 + 2. What is h in n(h) = 0?
-1, 1
Let c(k) be the first derivative of -2*k**5/55 + 7*k**4/66 - 2*k**3/33 - k**2/11 - k + 1. Let r(s) be the first derivative of c(s). Factor r(l).
-2*(l - 1)**2*(4*l + 1)/11
Let g be ((-17)/(-85))/((-1)/2 + 1). Let l be 2 - (1 - 6/10). Let -l*p**2 - g*p - 8/5*p**3 + 0 = 0. What is p?
-1/2, 0
Let h(c) be the second derivative of 2/75*c**6 - 1/15*c**4 + 6*c + 1/105*c**7 + 0 + 0*c**5 + 0*c**2 - 1/15*c**3. Determine f, given that h(f) = 0.
-1, 0, 1
Let d(r) be the first derivative of 0*r**4 + r**2 + 1 - 1/5*r**5 + 2*r + 2/3*r**3 - 1/15*r**6. Let v(c) be the first derivative of d(c). Factor v(n).
-2*(n - 1)*(n + 1)**3
Suppose -u + 0*u + 4 = 0. Solve -2/3*w**2 + 0 - 2/9*w**u - 2/3*w**3 - 2/9*w = 0.
-1, 0
Let u = 950/119 - 126/17. Let i(f) be the second derivative of f - 1/70*f**5 + 1/14*f**4 + 0 - u*f**2 + 0*f**3. Factor i(k).
-2*(k - 2)**2*(k + 1)/7
Suppose -1/3*s**5 + 0 + 10/3*s**2 + 2*s**4 - s - 4*s**3 = 0. Calculate s.
0, 1, 3
Let w(k) = 4*k**2 + 3*k - 7. Let m(g) = g**2 - 1. Let p(i) = -i + 7. Let u be p(5). Let q(a) = u*w(a) - 10*m(a). Factor q(b).
-2*(b - 2)*(b - 1)
Let f(o) = o**2 + 1. Let z(w) = 16*w**2 + 44*w + 12. Let h(p) = -12*f(p) + z(p). Solve h(u) = 0 for u.
-11, 0
Factor 0 + 1/6*l**3 + 0*l**2 + 0*l + 1/6*l**4.
l**3*(l + 1)/6
Let j be (22/84 + (-15)/35)*-3. Determine a so that -3/2*a**2 - a + 0 - j*a**3 = 0.
-2, -1, 0
Let v(z) be the third derivative of -3*z**8/560 - 17*z**7/525 - 23*z**6/300 - 2*z**5/25 - z**4/120 + z**3/15 + 16*z**2. Factor v(b).
-(b + 1)**4*(9*b - 2)/5
Let u = 949/630 - 2/315. Determine k, given that 1 - u*k**2 + 1/2*k**4 - 1/2*k**3 + 1/2*k = 0.
-1, 1, 2
Let t be (1 - 2) + -1 + 8. Let u = 11 - t. Solve -5*o**5 + 3*o**u + 0*o**3 - 4*o**2 + 0*o**2 + 6*o**3 = 0 for o.
-2, 0, 1
Let a(r) be the second derivative of r**4/42 - 2*r**3/21 - 3*r**2/7 - 3*r. Suppose a(s) = 0. Calculate s.
-1, 3
Let l(n) = -5*n**2 + n - 1. Let y be l(1). Let i be y + 8 + (-21)/9. Factor -4/9 - i*t - 2/9*t**2.
-2*(t + 1)*(t + 2)/9
Let -1/2 - 7/4*n + 5/4*n**2 + n**3 = 0. Calculate n.
-2, -1/4, 1
Let s(b) be the second derivative of b**9/1512 + b**8/840 - b**7/420 - b**6/180 - b**3/6 + 2*b. Let t(o) be the second derivative of s(o). Factor t(k).
2*k**2*(k - 1)*(k + 1)**2
Let f(h) be the second derivative of -3*h**2 - 1/10*h**5 + 1/2*h**4 + 1/3*h**3 + 0 + 7*h. Factor f(r).
-2*(r - 3)*(r - 1)*(r + 1)
Factor -2/3 + 8/9*i - 2/9*i**2.
-2*(i - 3)*(i - 1)/9
Let l(v) be the third derivative of 0*v**3 - 1/24*v**4 - 1/168*v**8 + 0*v - 1/12*v**5 - 7*v**2 - 1/30*v**7 - 3/40*v**6 + 0. Find x such that l(x) = 0.
-1, -1/2, 0
Suppose 0 = -4*d, 2*k + 0*d - 5*d - 40 = 0. Suppose k*f = 19*f. Find i, given that f*i - 2/7*i**3 - 4/7*i**2 + 0 = 0.
-2, 0
Let a = -989/21 - -339/7. Find h such that -5/3*h - 2/3 - a*h**2 - 1/3*h**3 = 0.
-2, -1
Let k(z) be the second derivative of -z**4/28 + 3*z**3/14 + 18*z. Factor k(j).
-3*j*(j - 3)/7
Let v be (208/(-78))/((-2)/3). Suppose -n + 1/2 + n**3 + 0*n**2 - 1/2*n**v = 0. What is n?
-1, 1
Let f(u) = u**3 - u**2 - u - 2. Let r(h) = h**3 - h**2 - h. Suppose 0 = 2*s + 3*i, -5*s - i - 13 = -0*i. Let m(q) = s*r(q) + f(q). Factor m(x).
-2*(x - 1)**2*(x + 1)
Let s = 43/558 - 2/93. Let d(v) be the second derivative of 0*v**2 + 0*v**5 - s*v**4 + 1/45*v**6 - v + 0 + 0*v**3. Factor d(a).
2*a**2*(a - 1)*(a + 1)/3
Let z = 19 - 17. Factor 93*l**4 + l - z*l**2 - 2*l - 91*l**4 + l**5.
l*(l - 1)*(l + 1)**3
Let r(f) = 2*f**2 - f + 2. Suppose -j + 0 = 3. Let t(a) = -3*a**2 + 2*a - 3. Let u(s) = j*t(s) - 4*r(s). Determine c so that u(c) = 0.
1
Let f(w) = -w**2 - 11*w - 22. Let h be f(-8). Factor -4/7 - 6/7*g - 2/7*g**h.
-2*(g + 1)*(g + 2)/7
Let 0 - 4/11*v**3 - 2/11*v**2 + 4/11*v + 2/11*v**4 = 0. What is v?
-1, 0, 1, 2
Let t be (-2)/(0/(-4) + -4 - -2). Let d(n) be the first derivative of 2/3*n**3 + 2*n - t + 2*n**2. What is r in d(r) = 0?
-1
Factor 5*j - 8*j**2 - 8*j**4 + 10*j**2 + 3*j**5 + 3*j**3 - 5*j.
j**2*(j - 2)*(j - 1)*(3*j + 1)
Factor 10 + 13 + 1 + 153*r + 28*r**2 - 61*r.
4*(r + 3)*(7*r + 2)
Suppose -2 = 2*n - 8. Let 4*r**3 - 3*r**3 + 3*r**n - 5*r**3 = 0. Calculate r.
0
Let r = -5 + 9. Let g be (-1)/2 + 55/10. 