pose -2*l + 12 = 5*t - 7, 0 = -5*t + 5*l + 40. Determine k(t).
-48
Let x(n) = -n**3 + 5*n**2 - 6*n + 1. Let s be ((-2)/(2/3))/(198/(-264)). Calculate x(s).
-7
Let l(d) = d + 4. Let c be l(12). Suppose -13*r = -c*r - 36. Let v = r + 12. Let z(x) = -x + 4. What is z(v)?
4
Let b(s) = -5*s**3 - 7*s**2 + s - 2. Let q(j) = -6*j**3 - 7*j**2 + j - 2. Let c(m) = 7*b(m) - 6*q(m). What is c(7)?
5
Let y(j) be the third derivative of -j**8/6720 - j**7/420 + j**6/360 + j**5/40 - 11*j**4/12 + j**2. Let z(q) be the second derivative of y(q). Determine z(-6).
-9
Suppose -2*d + 2*x - 2 = 0, -108*x - 1 = -5*d - 109*x. Let u(k) = -2*k - 9. What is u(d)?
-9
Let x(w) = -w**3 + 7*w**2 - 4*w - 6. Let q(b) = -b**3 - 2*b**2 + 2*b + 3. Let f = 18 - 21. Let i be q(f). Determine x(i).
6
Let u(h) = 6*h**3 - 2*h**2 + 2*h + 10. Let z(b) = b - b**2 - 3*b**3 - 3*b**2 + 3*b**2 - 1 + 2*b**3. Let g(c) = u(c) + 5*z(c). Calculate g(6).
11
Let p(u) = -7*u - 5. Let l(i) = -5*i - 6. Let f(n) = 3*l(n) - 2*p(n). Give f(-9).
1
Let t(c) = 11*c**2 + 2*c + 5. Let y be t(-5). Let s = 387 - y. Let q be 684/s - (-2)/13. Let u(b) = b - 6. What is u(q)?
0
Let i(y) = 3*y**2 + 2*y - 1. Suppose 0*m - 4*m = 5*j - 40, -3*m = j - 19. Suppose 5*b - 4 = 2*b - j*n, 5*b = -5*n + 5. Let q = 1 + b. What is i(q)?
4
Let m(u) = -4 + u**2 + 4 + 55*u + 11 - 56*u. Suppose 2 = 2*k - 2*d, -1 = 4*k + 4*d + 3. Determine m(k).
11
Suppose 5*z = 5*c - 10, 3 = -2*z - c - 10. Let a(b) be the first derivative of -3*b**2/2 - 7*b + 978. What is a(z)?
8
Let p(x) = -2*x - 15. Let r(u) = 4*u + 29. Let a(t) = -11*p(t) - 6*r(t). Suppose 3*k = 0, 11*i - 16*i = 3*k + 35. Determine a(i).
5
Let k(s) be the third derivative of s**5/60 + s**4/4 - s**3 + 3*s**2. Let b(p) = p**2 - 5*p - 9. Let i be b(7). Suppose -5*g - 40 = -i*d, -d = d - 4. Give k(g).
-6
Let r be (-902)/(-66) + 4/(-6). Let f be 6/(-24) - r/(-4). Suppose 0 = -5*g - n + f, -g + 2*g - 2*n = -6. Let b(l) = l**2 - l - 8. What is b(g)?
-8
Let q(x) be the first derivative of -x**4/12 + 4*x**3/3 - 4*x**2 + 12*x + 8. Let i(c) be the first derivative of q(c). What is i(6)?
4
Let f(b) be the first derivative of -b - 4 - 7/2*b**2 - 1/3*b**3. Determine f(-8).
-9
Let p(u) = -6*u - 36. Let q(t) = -t - 7. Let v(j) = -2*p(j) + 11*q(j). Let r(f) = 4*f. Suppose a + 3*a - 4 = 0. Let z be r(a). Calculate v(z).
-1
Let u(f) be the second derivative of -f**4/6 - f**3/3 + f**2/2 - 75*f. Calculate u(1).
-3
Let n(q) = -q**2 + 7*q + 11. Suppose 84*s - 27 = 81*s. Determine n(s).
-7
Let x(m) = -17*m + 10*m + 9*m - 1 + 2*m. Determine x(-1).
-5
Let y(n) = n**2 + 8*n - 2. Suppose -6*x + 36 - 156 = 0. Let v = -27 - x. Give y(v).
-9
Let z(c) = 7*c**2 - 8*c - 16. Let q(r) be the first derivative of 4*r**3/3 - 2*r**2 - 8*r - 27. Let j(g) = -5*q(g) + 3*z(g). Calculate j(6).
4
Let u(y) = -6*y. Suppose 4*g - 4*s = 4, 4*g - 3*s = 2*s. Calculate u(g).
-30
Let v be (8/(-46 - -6))/(3/(-15)). Let z(a) = -23*a**2 + a - 1. What is z(v)?
-23
Let c(x) be the first derivative of -x**3/3 + 5*x**2 + 14*x + 128. Calculate c(10).
14
Let d(u) = -3 + 4 + 2*u + 0. Let t be (0 - (5 - 2)) + 41 + -23. Let l(i) = -i**3 + 15*i**2 + 3*i - 44. Let v be l(t). What is d(v)?
3
Let s(h) be the second derivative of -h**3/6 - 5*h**2/2 + 2*h + 7. Determine s(-8).
3
Let y(f) = 2*f**2 + 2*f - 1. Let p be (6/(-15))/((-1)/(-5)). Let c be p*5/((-30)/69). Let z = 24 - c. Give y(z).
3
Let k(d) = d**3 + 10*d**2 + 7*d - 13. Suppose -7*h + 7 = -7. Suppose 3*s - 39 = 3*i, 3 = -i + h*i + 3*s. Determine k(i).
5
Let t(h) = -11*h + 4. Suppose -2*r + 22 = -4*q, -20 = 6*q - 2*q. Let n(s) = 5 - 3 - r. Let a(d) = -3*n(d) + t(d). What is a(-1)?
12
Let n = 26 + -25. Let g(w) = 8*w**2 - w - 4. Let b(o) = o**3 - o**2 - 1. Let l(c) = n*g(c) + b(c). Calculate l(-7).
2
Let k(s) = -s**2 - 6*s - 4. Let h = -124 - -124. Suppose -5*n - 3 = -3*i, i + h*n - 2*n - 2 = 0. Calculate k(i).
4
Let y(q) = -q - 5. Let l be (29 + 1)*22/132. Suppose 43 = -0*n - 3*n + l*f, 0 = -n - 2*f + 4. Give y(n).
1
Let w(k) be the first derivative of -3*k**2 + 50*k + 168. Determine w(9).
-4
Suppose 6*f = 11*f - 10. Let d(w) = w**2 - 2*w + 1. Determine d(f).
1
Let x(n) = 20*n**2 + 1 - 43*n**2 + 13*n**2. What is x(1)?
-9
Let h(z) be the first derivative of -z**7/840 + z**6/60 - z**5/30 - z**4/8 - 22*z**3/3 + 18. Let g(a) be the third derivative of h(a). What is g(5)?
2
Suppose 0*s + 6*s - 18 = 0. Let j(p) = 0 - 13 + s + 2*p + 1. What is j(6)?
3
Let w(i) = -103*i - 13. Let q(a) = -223*a - 27. Let x(f) = 6*q(f) - 13*w(f). Give x(6).
13
Let q(i) = -2*i**2 + 16*i - 27. Let w be q(5). Let d(y) = -y**2 + 8*y - 3. What is d(w)?
12
Let n(h) = h**3 - 17*h**2 + 17*h - 14. Let g be n(16). Let x(o) be the second derivative of 0 + 3/2*o**g + 1/2*o**3 - 6*o. Determine x(-2).
-3
Let i(z) be the third derivative of z**4/12 - z**3/2 + 5*z**2 + 7*z. Determine i(5).
7
Let y(w) = w**2 + 10*w + 6. Suppose -3*m = -4*m - g, -2*m = 5*g + 15. Suppose 2*b = -4*o + 2, 5*o + 27 - 7 = -m*b. What is y(b)?
-3
Let f(y) = -8*y**2 + 15079*y**3 - 7543*y**3 + 6*y + 2 + 0 - 7535*y**3. Let z be (-2)/3 - (-23)/3. What is f(z)?
-5
Let s(u) = 3*u - 4. Let o(i) = -8*i + 8. Let y(l) = -4*o(l) - 9*s(l). Give y(-3).
-11
Let w(a) be the third derivative of -a**5/60 + a**4/24 + 2*a**3/3 - 71*a**2. Give w(4).
-8
Let t be -13 + -1 - (10 - 12). Let h(l) = -l**2 - 13*l - 6. Calculate h(t).
6
Let k(j) = j**2 + j - 1. Suppose -3*x + 2*o - 14 = 0, 3*x + 3*o = 6*x + 18. Let q be k(x). Let p(z) = 11*z**3 - z**2 - z + 1. Give p(q).
10
Let s = 14 + 1. Suppose 2*u - 2*m = 2, 3*u - 3*m - s = -2*u. Let g(d) = -1 + 2*d**2 - 3*d**2 - 2*d + u. Give g(-4).
-3
Let f(c) be the third derivative of 0*c + 0 + 5/24*c**4 - 1/6*c**3 + 4*c**2. Determine f(2).
9
Let c(x) be the third derivative of 0 + 1/12*x**4 + 0*x**3 + 1/120*x**6 + 8*x**2 + 0*x + 1/30*x**5. Determine c(-2).
-4
Let r(h) be the second derivative of h**4/12 - h**3/2 + 117*h. Calculate r(5).
10
Suppose -3*y - 30 = 5*l - 2*l, -y + 8 = -2*l. Let o(i) = i**3 + i. Let n(b) = -7*b**3 + 6*b**2 - 9*b - 6. Let s(a) = l*o(a) - n(a). What is s(5)?
-4
Let l(p) = -p + 1. Let d be l(1). Let a(q) = q**3 - 5 + 4*q**2 - 5*q + d*q + 3 + 0*q. Suppose 0 = -2*m - 3*n - 1, -n + 4 = -2*m - 3*n. Give a(m).
-2
Let b be 0*(0 + (-1 - -2)). Suppose 6*i - 14 - 16 = b. Let p(d) = d**3 - 6*d**2 + 6*d - 6. What is p(i)?
-1
Let x(s) be the first derivative of s**4/4 - 2*s**3/3 - 7*s**2/2 + 5*s - 532. Give x(4).
9
Let v(n) be the third derivative of 6*n**2 - 1/3*n**4 + 0 - 1/3*n**3 - 1/60*n**5 + 0*n. Calculate v(-6).
10
Let x(w) be the third derivative of -w**6/60 - w**5/30 + w**4/24 - 2*w**2. Let u be (-14)/7 + -1 + 1. What is x(u)?
6
Let d(f) = -5*f + 1. Let z(j) = 19*j + 174. Let g be z(-9). Give d(g).
-14
Let l(x) = -21*x**2 - 7*x. Let c(m) = -m**2 - 3*m. Let i(t) = -2*c(t) + l(t). Determine i(-1).
-18
Let w(m) be the third derivative of m**4/12 - m**3/3 - 55*m**2. Determine w(3).
4
Let j(o) = o**3 + 5*o**2 - o - 4. Let t(f) = f**2 + 8*f - 7. Let k be t(-9). Suppose 3*h + 5*v + 30 = 0, -k*v - 33 = 3*h - 12. Determine j(h).
1
Let k(i) be the third derivative of 2*i**2 + 1/120*i**6 + 0 + 1/24*i**4 + 0*i + 1/20*i**5 + 0*i**3. Calculate k(-1).
1
Let n(k) be the first derivative of -k**2 + 4*k + 14. Let s be n(-11). Let o = s - 21. Let x(r) = -r + 6. Determine x(o).
1
Let h = -218 + 1020. Let o(m) = -3*m - 803 + 5*m + h + 13*m**2. What is o(1)?
14
Let k be 1*(1 - 2) + 1. Let a(j) = j**3 + j**2 + 3*j + 6. Let w = 29 + -34. Let x(y) = y**3 + y**2 + 4*y + 6. Let u(r) = w*a(r) + 4*x(r). Determine u(k).
-6
Let d(q) = -267*q - 264*q + 1068*q - 272*q - 266*q + 16. Let c be ((-14)/6)/((-4)/24). Calculate d(c).
2
Let i(t) = 19*t**2 - 15*t - 2. Let q(d) = -16*d**2 + 14*d + 3. Let v(g) = 6*i(g) + 7*q(g). Calculate v(-6).
33
Let g(m) = 17 + 2*m + 4*m**2 - 4 + 0*m**2 + 12*m - 3*m**2. Determine g(-12).
-11
Let m(d) = -4*d - 4. Let y = -140 + 137. What is m(y)?
8
Suppose -n = k + 10, -2*k - 14 = 5*n + 21. Let f(y) = 18 - 14*y + y**3 + 18 - 53 + 3*y**2 + 6*y + 12. Determine f(n).
-15
Suppose 5*d - 6 = 9. Let r(c) = -c. Let m(t) = t**2 - 3*t - 1. Let u(p) = -m(p) + 3*r(p). Determine u(d).
-8
Let m(z) = -19*z + 7. Let l = 0 - -3. Let i(u) = 7*u - 2. Let r(q) = l*m(q) + 8*i(q). What is r(0)?
5
Let p(z) = z + 9. Suppose -22*a = -13*a + 81. Give p(a).
