9*w**3 - 1/15*w**5 + 0 - 2/9*w**4 + 18*w. Factor v(r).
-4*(r - 2)*(r - 1)*(r + 5)/3
Factor 2/13*x**4 + 40/13*x + 36/13*x**3 + 0 - 6*x**2.
2*x*(x - 1)**2*(x + 20)/13
Let f be 1 + (-40)/25 + (-3406)/(-2310). Let s = 26/21 - f. Factor 2/11*i**2 - s - 2/11*i.
2*(i - 2)*(i + 1)/11
Factor -55*t**2 - 1946*t + 58*t**2 - 2239*t.
3*t*(t - 1395)
Suppose -b + 59 + 41 = 0. Let 114*c - 75*c**3 - b*c**2 - 179*c - 35*c**2 - 5*c**4 = 0. What is c?
-13, -1, 0
Let m be ((95 - -5)*-3)/(-10 + 176/33). Solve 2/7*s**2 - 60/7*s + m = 0.
15
Let j be -28*3/9*6/(-4). Suppose -15*c + j*c + 4 = 0. Find z such that 35*z**2 - 23*z**2 - 18*z**c + 6*z**4 - 4*z**5 + 4*z**3 = 0.
-3, -1, 0, 1
Let j(y) be the first derivative of -y**5/20 - 319*y**4/8 - 11342*y**3 - 1224724*y**2 - 4764064*y - 1385. Factor j(q).
-(q + 2)*(q + 212)**3/4
Let l(h) = -78*h**2 - 1171*h - 12. Let y be l(-15). Suppose -3/2 + 53/8*b**2 + 49/8*b**5 + 111/8*b**y - 161/8*b**4 - 5*b = 0. What is b?
-3/7, -2/7, 1, 2
Let t(k) = -3*k**3 - 518*k**2 + 528*k. Let r(x) = 2*x**3 + 345*x**2 - 352*x. Let b(q) = 7*r(q) + 5*t(q). Find v, given that b(v) = 0.
-176, 0, 1
Let i(p) be the second derivative of -p**7/315 + p**6/75 - p**5/50 + p**4/90 + 3772*p. Solve i(o) = 0.
0, 1
Let c(g) be the first derivative of 2/33*g**3 - 48/11*g**2 + 1152/11*g - 21. What is u in c(u) = 0?
24
Let s(k) be the second derivative of k - 5 - 1/95*k**5 - 5/19*k**3 + 13/114*k**4 + 0*k**2. Factor s(r).
-2*r*(r - 5)*(2*r - 3)/19
Let g be 9 + (1 - (-7 - -10)). Let x be 41/(-287) - (-15)/g. Determine m, given that -2/11*m**x + 0 + 2/11*m = 0.
0, 1
Let r(p) be the third derivative of -4*p**5/15 + 7*p**4/6 + 22*p**3/3 - 480*p**2 + 3*p. Factor r(n).
-4*(n + 1)*(4*n - 11)
Let k(a) be the second derivative of -a**4/28 - 23*a**3/14 - 33*a**2/7 - a + 446. Factor k(v).
-3*(v + 1)*(v + 22)/7
Let z = -573 + 1860. Factor v**2 - v**3 - v**4 + 2581*v**5 - z*v**5 + 0*v**2 - 1293*v**5.
v**2*(v - 1)**2*(v + 1)
Let x be ((-6)/7)/(72/(-168)). Suppose -6*p + 3*p = -15. What is q in 5*q**4 + q**2 - 7*q**5 + 0*q**2 - 4*q**3 + 3*q**p + x*q**5 = 0?
0, 1/2, 1
Let f = -582 + 1890. Let u = f + -1303. Factor 0 + 6*n**2 + 3*n**4 - 13/2*n**3 - 1/2*n**u - 2*n.
-n*(n - 2)**2*(n - 1)**2/2
Let v(k) = k**2 - 2*k. Let q(a) = 15*a**2 - 21*a. Let y = -76 + 77. Let i(n) = y*q(n) - 12*v(n). Find r such that i(r) = 0.
-1, 0
Let r(w) be the second derivative of -1/2*w**3 + 0 - 1/16*w**4 - 294*w + 15/8*w**2. Find v such that r(v) = 0.
-5, 1
Let y = -584098/15 - -38940. Let r(b) be the first derivative of -7 + 0*b**2 + 1/12*b**4 + y*b**5 - 1/18*b**6 - 2/9*b**3 + 0*b. What is d in r(d) = 0?
-1, 0, 1, 2
Let t be ((-60)/(-108))/((-91)/12 + -45 + 53). Find m such that 0 + 0*m + 1/3*m**4 + 4/3*m**2 + t*m**3 = 0.
-2, 0
Let h(t) = 8*t**3 - 123*t**2 - 224*t - 3. Let l(u) = -58*u**3 + 862*u**2 + 1560*u + 22. Let g(w) = -44*h(w) - 6*l(w). Factor g(m).
-4*m*(m - 62)*(m + 2)
Let s = 2 + 4. Let w be -2 - 3/(s/(-64)). Suppose 65*u**2 - 30*u**3 - 10*u**2 - u**4 - w*u + 6*u**4 = 0. What is u?
0, 1, 2, 3
Let y(p) = -202*p**2 + 23220*p + 6110102. Let l(t) = 19*t**2 - 2111*t - 555464. Let a(u) = -32*l(u) - 3*y(u). Find j, given that a(j) = 0.
-527
Factor 0 + 0*i + 28/3*i**4 + i**2 + 37/6*i**3 + 25/6*i**5.
i**2*(i + 1)**2*(25*i + 6)/6
Let w(h) be the third derivative of h**7/840 + h**6/160 - h**5/40 - h**4/12 - 3493*h**2. Factor w(t).
t*(t - 2)*(t + 1)*(t + 4)/4
Let m = -53 - -57. Solve 2*f + 4*f**3 + 17*f**m - 3*f**4 - 9*f**4 - 5*f**2 - 6*f**4 = 0 for f.
0, 1, 2
Let d(x) be the third derivative of -x**9/100800 + x**8/3360 - 2*x**7/525 + 2*x**6/75 - 7*x**5/30 - x**2. Let n(f) be the third derivative of d(f). Factor n(z).
-3*(z - 4)**2*(z - 2)/5
Let m(n) be the first derivative of n**3 + 30*n**2 + 57*n + 962. Factor m(i).
3*(i + 1)*(i + 19)
Let o(d) = d**3 - 40*d**2 - 43*d + 92. Let k(a) = 30*a**3 - 1080*a**2 - 1160*a + 2485. Let q(z) = 2*k(z) - 55*o(z). Factor q(t).
5*(t - 1)*(t + 3)*(t + 6)
Let n(s) be the second derivative of -23*s**5/10 - 95*s**4/6 - 27*s**3 - 9*s**2 + 1275*s. Factor n(h).
-2*(h + 1)*(h + 3)*(23*h + 3)
Let j(n) be the third derivative of -7*n**6/1980 + 61*n**5/660 + 3*n**4/22 - n**3 + 18*n**2 - 2. Let x(p) be the first derivative of j(p). Factor x(z).
-2*(z - 9)*(7*z + 2)/11
Let n be 1770/(-70) - (-27)/(-9). Let o = -1577/56 - n. Factor 1/4 - o*q**2 - 1/8*q.
-(q - 1)*(q + 2)/8
Let z be (-56)/16*(-12)/14. Let x be 10/3*(63/35)/z. Find c such that 5/3*c**x - 10/3 - 5/3*c = 0.
-1, 2
Let y(i) be the third derivative of -i**6/480 + i**5/60 + 33*i**4/32 + 39*i**3/4 - 559*i**2. Find c such that y(c) = 0.
-6, -3, 13
Find j such that -9 + 520*j - 61 + 0 - 13 - 13 + 44*j**2 = 0.
-12, 2/11
Let v = 604217/144966 - 32/24161. Suppose -1352/3 - 260/3*b - v*b**2 = 0. What is b?
-52/5
Let j be (-2025)/(-180) - (-1)/(-4). Let l be j/28 + 33/(-231). Factor -l*u - 1/8*u**4 + 0*u**2 + 1/8 + 1/4*u**3.
-(u - 1)**3*(u + 1)/8
Let v(t) be the third derivative of -t**6/180 + 4*t**5/15 + 3*t**4 + 14*t**3 - 193*t**2. Let p(f) be the first derivative of v(f). Factor p(u).
-2*(u - 18)*(u + 2)
Let t(v) = -2*v**3 + 24*v**2 + 4*v - 4. Let l(f) = 5*f**3 - 72*f**2 - 11*f + 11. Let x = 214 - 203. Let w(k) = x*t(k) + 4*l(k). Solve w(s) = 0.
-12, 0
Find t such that -626*t + 2592 + 59*t**3 - 274*t - 117*t**3 + 104*t**2 + 54*t**3 = 0.
8, 9
Let d = -142418 - -142420. Factor 0*j + 1/2*j**3 + 3/4*j**d + 0 - 1/4*j**4.
-j**2*(j - 3)*(j + 1)/4
Factor -22/3*g**4 - 188/3*g**3 - 373/3*g + 1/3*g**5 - 116/3 - 422/3*g**2.
(g - 29)*(g + 1)**3*(g + 4)/3
Suppose 22*x + 50345 = 19985. Let h = x - -12436/9. Find d such that 8/3*d**2 + 0 - 4/3*d**3 - h*d + 2/9*d**4 = 0.
0, 2
Let i(w) be the third derivative of w**8/84 + 2*w**7/105 - w**6/2 + 23*w**5/15 - 5*w**4/3 + 8164*w**2. Find u such that i(u) = 0.
-5, 0, 1, 2
Suppose -253 + 1610*p + 3*p**2 + 9 - 5*p**2 - 1484*p = 0. What is p?
2, 61
Let u(m) = 433*m**2 + 2*m + 3. Let j be u(-1). Let v = 436 - j. Solve 9/5 - 6/5*l - 3/5*l**v = 0.
-3, 1
Let -4/5*a**3 + 72/5*a**2 - 12*a - 136/5 = 0. Calculate a.
-1, 2, 17
Let y(v) be the third derivative of v**6/280 - 24*v**5/35 + 93*v**4/56 + 95*v**3/7 - 7*v**2 - 50*v. Factor y(d).
3*(d - 95)*(d - 2)*(d + 1)/7
Suppose 41 = s + 31. Let l be 5/(s/4) + 3/3. Factor -274*z**3 + 277*z**l + 2*z**2 - 5*z**2.
3*z**2*(z - 1)
Factor 122/3*j - 2/3*j**2 - 312.
-2*(j - 52)*(j - 9)/3
Let h(w) be the first derivative of w**6/1980 - 7*w**5/220 - 7*w**3 + 69. Let m(d) be the third derivative of h(d). Factor m(k).
2*k*(k - 21)/11
Solve 10*s - 68 + 2/9*s**2 = 0.
-51, 6
What is i in 84 + 123/4*i**4 + 3/2*i**5 + 336*i**2 + 159*i**3 + 300*i = 0?
-14, -2, -1/2
Factor 10*l**3 + 0*l - 1/3*l**4 - 104/3*l**2 + 0.
-l**2*(l - 26)*(l - 4)/3
Suppose 5*a + 71 = u + 59, 4*u + 2 = -5*a. Factor -11 + 2*z - 1/11*z**u.
-(z - 11)**2/11
Let v(m) = -97*m**2 + 2616*m - 2623. Let g(a) = 45*a**2 - 1308*a + 1311. Let h(k) = -13*g(k) - 6*v(k). Determine q, given that h(q) = 0.
1, 435
Let u(a) be the third derivative of 0 + 2*a**2 + 8/3*a**3 + 9*a - 1/15*a**5 - 1/2*a**4. Factor u(h).
-4*(h - 1)*(h + 4)
Let i = 1223/2 - 13373/22. Let n = i + -38/11. Factor n*p + 0 + 0*p**2 - 2/11*p**3.
-2*p*(p - 1)*(p + 1)/11
Let f(h) be the third derivative of h**7/840 + h**6/480 - h**5/80 - h**4/96 + h**3/12 - 3112*h**2. Factor f(v).
(v - 1)**2*(v + 1)*(v + 2)/4
Let z(k) be the second derivative of -29*k + 0 + 1/12*k**4 + 0*k**2 - 1/6*k**3. Solve z(t) = 0.
0, 1
Let c = 1415722 - 7078608/5. Factor -16/5*g - c*g**2 + 0.
-2*g*(g + 8)/5
Let b(t) be the first derivative of t**3 + 1083*t**2 + 390963*t - 1222. Factor b(v).
3*(v + 361)**2
Let 2*s**3 - 11/5*s + 1/5*s**5 + 7/5*s**4 - 2/5*s**2 - 1 = 0. Calculate s.
-5, -1, 1
Let k be 44352/21780 + (-6)/165. Determine d so that -3/2*d**k + 6*d + 15/2 = 0.
-1, 5
Let t(z) be the second derivative of z**5/110 + 4*z**4/33 - 37*z**3/33 - 4*z**2 + 2216*z. Determine c, given that t(c) = 0.
-11, -1, 4
Let i = 30 - 24. Suppose -16 = -i*p + 2. Determine w, given that -5*w**p - 4*w**2 - 48 - w**2 + 5*w + 27 + 26 = 0.
-1, 1
Let c be 35/(-21)*(-396)/120*(-18)/(-165). Determine p, given that -c*p - 6/5*p**2 + 0 - 3/5*p**3 = 0.
-1, 0
Let k = -22 - -26. Suppose -z = -g + 5, -k*z = -5*g - 0*z + 22. Factor 15*s - 14*s**g - 20 + 9*s**2 + 5*s.
-5*(s - 2)**2
Let q(h) be the first derivative of -2*h**3/