t + 771. Give k(q(w)).
-2048*w**2 - 1280*w - 200
Let d(l) be the first derivative of 11*l**3/3 + 3523. Let p(b) be the third derivative of 13*b**5/30 - 7*b**2. Calculate d(p(a)).
7436*a**4
Let k(i) be the first derivative of -3*i**2 + 1. Let t(o) be the second derivative of o**3/2 + 7636*o. Determine k(t(x)).
-18*x
Let d(r) = -2*r + 14460449. Let n(u) = 2*u**2. Determine d(n(p)).
-4*p**2 + 14460449
Let k(b) = 3*b**2 - b**2 + b**2 + 0*b**2. Suppose -8*l + 6*l = -36. Let j(c) = -l*c + 2*c + 7*c. What is k(j(g))?
243*g**2
Let p(v) = 4*v. Let d(f) be the first derivative of 0*f + 14 + 1/40*f**5 + 0*f**2 + 0*f**4 - 9*f**3. Let n(q) be the third derivative of d(q). Give p(n(j)).
12*j
Let a(c) = 4*c. Let r(f) = 6*f**2 - 2314*f + 5. Let h(t) = 4*t**2 - 1161*t + 3. Let p(z) = -5*h(z) + 3*r(z). What is p(a(d))?
-32*d**2 - 4548*d
Let a(j) = -13*j + 67. Let s be a(5). Let u(n) = -s*n + n + 5*n + 2*n. Let m(b) = 13*b. What is m(u(l))?
78*l
Let d(z) = 15410862*z**2. Let h(n) = -4*n**2. What is d(h(m))?
246573792*m**4
Let f(j) be the first derivative of -2*j**3 + 2216. Let q(c) = 374*c. What is f(q(u))?
-839256*u**2
Let z(a) = 2*a - 3. Let y(s) = 0 + 18*s - 7 - 19. Let c(x) = -6*y(x) + 52*z(x). Let w(l) = -2*l + 760 + 765 + 0*l - 1525. Determine c(w(i)).
8*i
Let n(u) = -1706348*u. Let z(b) = -15*b**2. Determine z(n(k)).
-43674352456560*k**2
Let x(m) = -34 + 7731*m - 7731*m - 8*m**2 + 101. Let d(v) = -2*v**2. What is x(d(t))?
-32*t**4 + 67
Let g(q) = -235*q + 10. Let z(s) = 16*s**2 - 6. Determine g(z(r)).
-3760*r**2 + 1420
Let t(b) = 16*b**2. Let q(v) = 5721 - 114*v - 2864 - 2857. Calculate t(q(h)).
207936*h**2
Let d(v) be the third derivative of v**5/30 + 9521*v**2 + 5*v - 2. Let w = 11 + -7. Let n(r) = 23*r + w*r + 0*r. Give n(d(m)).
54*m**2
Let h(t) be the third derivative of 17*t**4/24 + 60*t**2. Let u = 52 - 100. Let o(q) = 162*q. Let n(c) = u*h(c) + 5*o(c). Let p(i) = -7*i. Give n(p(z)).
42*z
Let u(h) = 5575*h. Let m(t) = 2*t - 82. What is m(u(f))?
11150*f - 82
Let j(g) = 2*g**2 - 32. Suppose 0 = d + 160 - 162. Let x(v) = 4*v**2 - 7*v**2 + 4*v**2 + v**2 + d*v**2. Calculate x(j(q)).
16*q**4 - 512*q**2 + 4096
Let d(t) = -2*t**2. Let u(m) = 68*m**2 - 10*m + 226. Let q(v) = -34*v**2 + 6*v - 141. Let g(l) = 5*q(l) + 3*u(l). What is d(g(z))?
-2312*z**4 + 3672*z**2 - 1458
Let j(i) = -7*i**2. Let x = 469 - 458. Let l(y) = x*y + 5*y + y - 27*y - y. Give l(j(a)).
77*a**2
Let j(t) be the second derivative of 0 + 0*t**2 - 1/6*t**3 + 2/3*t**4 - 14*t. Let f(o) = -4*o. What is f(j(z))?
-32*z**2 + 4*z
Let l(m) = 401*m**2. Let d(h) be the second derivative of -h**4/12 + 503*h. Determine d(l(t)).
-160801*t**4
Let h(l) = 44490*l**2. Let n(g) = 3281*g. Determine n(h(r)).
145971690*r**2
Let k(w) = -17*w**2 + 9*w**2 + 16*w**2. Let f(v) = -11*v**2 - 60*v. Let c(u) = 20*u**2 + 105*u. Let i(n) = 4*c(n) + 7*f(n). Determine k(i(l)).
72*l**4
Let x(a) be the first derivative of a**2 - 5549. Let m(l) = 2*l**2 + 478. Determine x(m(h)).
4*h**2 + 956
Let m(g) = -g**2 + 6*g + 5. Let n be m(6). Let y(k) = -4*k + 2*k + n*k - 2*k. Let p(u) = -99*u - 114*u - 110*u + 334*u. What is p(y(w))?
11*w
Let r(g) = 438*g. Let m(v) = 2*v + 534633. Calculate r(m(o)).
876*o + 234169254
Let f(r) = r**2. Suppose 46 = 8*w + 6. Let z(v) = -56*v + 5. Let k(p) = -3*p + 25*p - 7 + 62*p. Let s(i) = w*k(i) + 7*z(i). What is s(f(h))?
28*h**2
Let d(o) = -45*o + 21*o + 22*o. Let h(k) be the second derivative of 0*k**2 - 1/2*k**3 + 2*k + 0. What is h(d(t))?
6*t
Let n(s) = -2374*s. Let h(z) = 140*z**2 + 3*z. Let y(t) = 466*t**2 + 10*t. Let v(f) = 10*h(f) - 3*y(f). Determine v(n(w)).
11271752*w**2
Let k(n) = 30*n**2. Let c = 116 + -112. Let d(b) be the second derivative of -11*b + 0*b**3 + 0*b**2 + 0 + 1/12*b**c. Calculate d(k(v)).
900*v**4
Let c(r) be the first derivative of 2*r**3/3 + 61. Let v(u) be the second derivative of 5*u**4/4 + 26*u. What is c(v(q))?
450*q**4
Let i(m) = -4*m - 24. Let k(a) be the third derivative of a**6/720 - 7*a**4/24 - a**2 + 3. Let x(q) be the second derivative of k(q). Determine i(x(s)).
-4*s - 24
Let r(x) = -12*x. Let p(s) = 42*s - 2971. What is p(r(l))?
-504*l - 2971
Let k(n) be the second derivative of 17*n**4/12 - 611*n + 2. Let s(f) be the first derivative of 5*f**3 + 6. Determine k(s(b)).
3825*b**4
Let x(z) = 8*z. Let r(m) = 90*m - 143*m - 3 + 3 + 9 + 70*m. Calculate x(r(j)).
136*j + 72
Let s(a) = 2*a + 14. Suppose -4*g = 4*p - 76, 2*g - 15 = g - 5*p. Let i(n) = 55*n**2 - 16*n**2 - 18*n**2 - g*n**2. Calculate i(s(r)).
4*r**2 + 56*r + 196
Let q(b) = -3282810*b**2 - 2*b. Let t(v) = -26*v. Calculate q(t(j)).
-2219179560*j**2 + 52*j
Let q(n) = -1218746*n. Let k(j) = 68*j**2. What is k(q(a))?
101003243251088*a**2
Let c(a) = 400*a + 7245. Let z(s) = -21*s - 378. Let l(u) = -6*c(u) - 115*z(u). Let f(m) = -69*m**2. Determine f(l(g)).
-15525*g**2
Let n(q) be the third derivative of q**5/15 - 1019*q**2. Let k(p) = 159*p. What is k(n(r))?
636*r**2
Let j(a) = 2*a. Let q(f) = -f - f - 6396 + 6393. Determine q(j(c)).
-4*c - 3
Let c(p) = 32*p - 9. Let v(q) = 14*q - 7. Let x(n) = -28*n + 13. Let o(f) = -5*v(f) - 3*x(f). Let b(t) = 4*c(t) - 9*o(t). Let s(m) = -402*m**2. What is s(b(k))?
-1608*k**2
Let s(y) = 9*y + 1950. Let w(f) = 133*f**2. Calculate s(w(m)).
1197*m**2 + 1950
Let t = -3616 + 3616. Let u(r) be the third derivative of 1/60*r**5 + t*r**4 + 0*r + 15*r**2 + 0 + 0*r**3. Let w(m) = 4*m. Determine w(u(k)).
4*k**2
Let c(o) = -107*o + 8. Let k(v) = -202*v + 15. Let m(a) = -15*c(a) + 8*k(a). Let j be -7 - -8 - (0 + 0). Let g(x) = 4*x**2 - 1 + 0 + j. Calculate g(m(h)).
484*h**2
Let f = 80 - 57. Suppose 0 = 22*x - f*x + 2. Let n(y) = y**2 + 5*y**2 - 9*y**x + 5*y**2. Let o(v) = -13*v. Calculate o(n(u)).
-26*u**2
Let i(j) = -19*j. Let b(d) = 2*d**2 + 16977*d - 8. Calculate i(b(u)).
-38*u**2 - 322563*u + 152
Let x(t) = 2*t**2. Let y be (-2 - (-9)/3)*67. Let z = 62 - y. Let v(g) = g + 5. Let n(r) = 3. Let u(m) = z*n(m) + 3*v(m). Give u(x(l)).
6*l**2
Let x(z) = 2*z**2. Suppose -19*t - 20 = -24*t. Let v(j) = 30*j - 7. Let g(y) = 31*y - 8. Let i(r) = t*g(r) - 5*v(r). What is i(x(w))?
-52*w**2 + 3
Let s(l) be the third derivative of l**5/20 + 13*l**3/6 - 132*l**2 + l. Let x(u) = -14*u**2. Calculate s(x(w)).
588*w**4 + 13
Let w(u) = 23*u - 5. Let z(i) = -i**3 - 31*i**2 - 34*i - 66. Let a be z(-30). Let y(b) = -a*b - 35 + 35 + 53*b. Determine y(w(q)).
-23*q + 5
Let b(l) = -23341*l**2. Let g(j) = -1395*j. Give g(b(k)).
32560695*k**2
Let v(j) = 2*j. Let q(g) = -3*g + 22. Let a(k) = -14975*k + 92246. Let p(c) = -2*a(c) + 8386*q(c). Give p(v(s)).
9584*s
Let z(y) = -y**2. Let s(j) = 2*j + 6. Let i(q) = 88*q - 48. Let v(x) = -i(x) - 6*s(x). Determine v(z(m)).
100*m**2 + 12
Let t(w) = -120*w. Let u(i) = -17*i. Let f(c) = t(c) - 6*u(c). Let n(x) = -51*x**2 - 1. Give f(n(m)).
918*m**2 + 18
Let m(q) = -3*q**2 - 740176*q. Let s(i) = -8*i. What is s(m(n))?
24*n**2 + 5921408*n
Let r(d) = 103*d**2. Suppose -39 = -21*n + 3. Let z(c) = -24*c**n - 24*c**2 + 46*c**2. Give z(r(v)).
-21218*v**4
Suppose 2*r - 2 = -3*o + 163, 2*o - 83 = -r. Let b(q) = -2 + 2 + r*q - 82*q. Let n(u) = u + 3*u + 4*u + 0*u - 3*u. What is b(n(h))?
-5*h
Let x(j) = 2407578*j. Let s(i) = 8*i. Give x(s(h)).
19260624*h
Suppose 0 = -f - 3, -4*u - u + 5*f = -20. Let p be (3/(-1) + 5)*(u + 0). Let m(r) = 13*r**p + 25*r**2 - 12*r**2. Let q(z) = z. Give m(q(w)).
26*w**2
Let g(c) = -167*c - 2. Let u(n) = 13*n + 786. Give u(g(k)).
-2171*k + 760
Let j(d) = -14*d**2 + 5*d. Let p(u) = 200587*u. What is p(j(i))?
-2808218*i**2 + 1002935*i
Let p(m) = 2*m**2 - 2*m**2 - 2*m**2 + 5*m**2. Suppose -5*f = 3*b - 59, 9 + 53 = 5*f + 4*b. Let v(t) = f*t**2 - 3415 + 3415. Calculate v(p(j)).
90*j**4
Let a(v) = -260*v. Let y(k) = -28*k**2 - 17*k**2 + 4*k - 4*k + 33*k**2. Determine y(a(g)).
-811200*g**2
Let h(l) = 2*l. Let a(s) = 10*s + 30705. Calculate h(a(r)).
20*r + 61410
Let b(v) = 104*v**2. Let h(z) be the third derivative of z**5/60 + 49*z**3/6 - 2964*z**2 + 2. What is h(b(o))?
10816*o**4 + 49
Let t(r) = -2*r. Let i(c) = 4785 + 281*c + 330*c - 612*c. Calculate i(t(j)).
2*j + 4785
Let w(f) = -211*f. Let n(l) be the first derivative of 8*l**3/3 + 6266. Determine w(n(k)).
-1688*k**2
Let b(t) = -t**2. Let n(d) be the second derivative of 0*d**3 + 0*d**2 + 51/4*d**4 + 11*