y**2. Is w(-18) a composite number?
False
Suppose 2495 = z + 4*z. Suppose 0*h - 3*h + z = m, 4*h + 4*m - 668 = 0. Is h composite?
True
Suppose -6*x + 101507 = x. Is x a prime number?
False
Let r be -6 - -7 - (-2)/(-1). Let w be (3 + 2)/(r - -2). Suppose 1775 = 4*k + 5*z, 1294 + 935 = w*k - 4*z. Is k composite?
True
Suppose 36*m - 15474 = 30*m. Is m prime?
True
Let x(m) = m**3 - 11*m**2 + 7. Let h be x(11). Let b(f) = -f**3 + 12*f**2 + 7*f + 13. Is b(h) composite?
False
Let a be (-3 + -265)*(-2 + 1). Suppose 324 = -4*l - a. Let k = l + 267. Is k composite?
True
Is ((-1041702)/2)/(-1)*3/9 a prime number?
True
Suppose 2*s = p - 2*p + 752, 0 = 5*p - 3*s - 3721. Is p composite?
True
Suppose -2*i - 2*l - 12 = 0, -3*i + 5*l - 1 = -7. Let x(k) = 113*k**2 - 5*k + 7. Is x(i) composite?
False
Let i = 10153 - 526. Is i a prime number?
False
Let n(s) = 2*s**2 - 26*s + 159. Is n(11) a composite number?
True
Let h be 2 + 3/((-12)/(-40)). Let o be (h/(-14))/(1/7). Is 974/8 + o/8 prime?
False
Let b(h) = 8*h**3 + 3*h**2 + 36*h - 15. Is b(16) a prime number?
False
Is (-225645)/(-231) - (-4)/22 composite?
False
Is ((-121796)/10)/(190/(-475)) a prime number?
True
Let t(d) = -d**2 + 8*d + 9. Let g be t(10). Suppose 2*i + 504 = 6*i. Let v = i + g. Is v a prime number?
False
Suppose -2*u - 28 = -16*u. Let h be 2/(-8) + (-1)/(-4). Suppose u*x - n - 514 = h, -n + 1 = -3. Is x prime?
False
Let l(v) = 22*v**3 + 3*v**2 - 16*v - 4. Is l(5) prime?
True
Let r = 25 - 24. Let s be (r - 2) + (26 - 0). Let o = s - 4. Is o prime?
False
Let s(b) = -b**2 - 4*b + 5. Let p be s(-5). Let t be 69 + 2/(-1) + -14 + 17. Suppose t = -p*o + 5*o. Is o a composite number?
True
Suppose -30*g = -18093 - 2277. Is g a prime number?
False
Suppose -13 = j - 17. Suppose 0 = j*h + 2*w - 2452, h + 0*w = 3*w + 613. Is h composite?
False
Is (-24169)/(-7) + (-30)/(-105) a composite number?
True
Let q(i) = 141*i - 60*i + 5 + 275*i + 85*i. Is q(2) prime?
True
Let a be 2/(-4)*18 + -1. Is 68/5 + (-4)/a a composite number?
True
Let q(v) = -3*v**2 + 48*v + 12. Let w be q(18). Let f(s) = 16*s**2 + 2*s + 7. Let o be f(5). Let u = w + o. Is u a composite number?
True
Suppose 9900 = 4*a - 2*t, 0*t + 4 = -t. Is a a composite number?
False
Let n = 4127 + 5670. Is n a prime number?
False
Suppose 4*m = 5*q + 8*m - 3745, -q = -m - 749. Let r = q + 68. Is r composite?
True
Let p(u) = 284*u - 3. Is p(10) composite?
False
Let c = -2 + 7. Suppose -3*t = -c*i - 5*t + 2443, 0 = -3*i - t + 1465. Is i prime?
True
Let i(o) = 551*o + 554. Is i(27) composite?
True
Is 2*6/(-4) - -7774 composite?
True
Let v = 0 + -3. Let p be (-6)/4*262/v. Let s = 390 - p. Is s a prime number?
False
Let p = 17 + -12. Suppose 6 + 4 = p*t. Suppose -3*v - t*h - 1318 = -3717, 5*h - 20 = 0. Is v prime?
True
Suppose 22 = -2*z + 5*a + 2, 3*a - 12 = -z. Suppose z = -2*d - 10, 988 = 2*c - d + 3*d. Is c composite?
False
Let v(l) = 8*l - 5. Let o be v(-5). Let h = o - -566. Is h composite?
False
Let f(s) = 2338*s + 27. Is f(2) composite?
False
Let q = -8 + 13. Suppose 0 = q*y - 81 - 1769. Suppose -4*k = k - y. Is k a composite number?
True
Suppose -p - 113399 = -5*x, -2*x + 6*x - 2*p = 90724. Is x composite?
False
Let z(j) = 1. Let t(i) = 35*i. Let f(y) = y. Let k(m) = -150*f(m) + 5*t(m). Let l(h) = k(h) + 2*z(h). Is l(5) a prime number?
True
Suppose 0 = -5*i + 3*a + 15732, -2*i - 5*a + 6*a + 6293 = 0. Is (0 + (-6)/9)/((-2)/i) a composite number?
False
Let z(f) = -68*f**2 - 4*f - 3. Let y be z(-3). Let u = y - -898. Is u composite?
True
Let k(p) = -133*p + 14. Is k(-21) a composite number?
True
Suppose -20*o + 24715 + 58825 = 0. Is o composite?
False
Suppose -45*d + 16*d + 266017 = 0. Is d a prime number?
True
Let b(u) = -u**3 + 10*u**2 - 10*u + 12. Let z be b(9). Let l be 5/z*(8 + -5). Suppose l*s - 379 - 2046 = 0. Is s prime?
False
Let s = -11 - -13. Let o be s/(-1) + 42/1. Suppose -o + 4 = -4*f. Is f composite?
True
Suppose 0 = -j + 6*j - 80. Let s be (-12)/j - (-37)/(-4). Is (-4490)/s - (1 + -1) a prime number?
True
Suppose 0 = 2*y - 4 - 8. Suppose -847 = -y*t + 3809. Let k = t + -441. Is k a prime number?
False
Let t be (-105)/(-12) - (-12)/(-16). Suppose 0 = 5*d - 2 - t. Let m(y) = 98*y**2 - 5*y + 7. Is m(d) composite?
False
Let s be 17 + ((-1)/(-3))/(1/3). Is (-4)/s - 4980/(-54) - 1 a composite number?
True
Let v = -884 - -1593. Is v a composite number?
False
Suppose -3*i - 4*i = -83713. Is i composite?
False
Let o be 10/2 + (-3)/(-1). Let t(y) = 174*y + 7. Is t(o) prime?
True
Let s = -46511 + 146746. Is s a composite number?
True
Suppose 0 = -12*p - 7*p + 21869. Is p a composite number?
False
Suppose 896*r - 904*r + 39448 = 0. Is r composite?
False
Suppose 6*y + 6298 = 5*t + 3*y, -4 = -y. Is t composite?
True
Let d(p) = -2*p**3 - 43*p**2 - 47*p - 27. Is d(-29) composite?
True
Suppose -25503 = -5*a + 2*i, 0 = 5*a + 4*i - 618 - 24861. Is a prime?
True
Suppose -554 - 164 = -5*w - p, 0 = 3*w - 4*p - 417. Is w prime?
False
Suppose -15 - 48 = -7*i. Let z(y) = -4*y - 5*y**2 + 6*y**2 - 2 + 5 + 3. Is z(i) prime?
False
Suppose 4*m - 8*m = -16. Is 72 - (m - 3/3) composite?
True
Let p(y) = 118*y**2 + 21*y + 6. Is p(13) a prime number?
False
Suppose 8*q - 17*q + 20961 = 0. Is q a prime number?
False
Suppose -l - y + 0 = -9, 0 = -5*l - 2*y + 42. Suppose l*r + 9 = -39. Is 1/r - 6861/(-18) a prime number?
False
Let g = -870 - -1378. Suppose 4*o + 3*q - g = 1057, 4*o - 1562 = -2*q. Is o a composite number?
False
Let f(d) = 101*d**2 - 8*d + 9. Is f(-8) a prime number?
False
Suppose 6*i - 3*i + o - 4207 = 0, -2*i + 4*o = -2814. Let a = i - 958. Is a a composite number?
True
Suppose 0 = 2*h + 5*c - 3555 - 658, 5*c + 2084 = h. Is h a composite number?
False
Let l be 3506*((-9)/6)/(-3). Is 3/6*(1 + l) prime?
True
Let i(p) = 4*p + 8. Let c be i(-5). Let r be (3 + 28/c)*633. Suppose r = -0*b + 2*b. Is b composite?
False
Let i = -19 - -4. Let f be 5/(-25) + (-3438)/i. Let s = f + -72. Is s a composite number?
False
Let x be (-65)/(-15) + 2/3. Suppose -x*l - 31 = 3*b - 2*b, 0 = 2*b + 3*l + 27. Is 13/((3 + b)/(-3)) a composite number?
False
Let s = -5187 + 8822. Is s prime?
False
Let c = 3 + 3. Let i(h) = h**3 - 4*h**2 + 6*h - 5. Let n be i(c). Suppose -2*s = -3*s + n. Is s prime?
True
Let p = -21 + 26. Suppose -1536 = -4*g - 4*t, -p*g - 63 = -3*t - 2015. Suppose -6*x = -2*x - g. Is x prime?
True
Suppose -4*c - 3*m + 27 = 0, -m + 1 = -3*c + m. Is 374 - (-4 - 0 - -3)*c composite?
True
Let b(g) = 675*g**2 + 4*g + 69. Is b(-8) a composite number?
False
Suppose 3*z + 8*z = 6743. Is z a composite number?
False
Suppose -w = 2*x + 3*x - 28, -2 = -x. Let m(f) = -1 + 1 - 3 + w*f + 0. Is m(2) prime?
False
Suppose 0 = -4*u - 3*d + 27, -u - 2*u = 3*d - 24. Suppose 5*y = 5*r + 4520, u*r + 907 = y + r. Is y prime?
False
Suppose -2*r + 468 = 2*n, 2*n - 478 = -2*r + 5*r. Let b = n - -527. Is b prime?
False
Let f(l) = -38*l**2 - 17*l + 3. Let m be f(17). Let h(s) = -s**3 - 4*s**2 - 1. Let q be h(-3). Is (-6)/q - m/45 composite?
False
Let f = 7457 + 1776. Is f composite?
True
Let n(k) = 128*k**2 - 44*k - 333. Is n(-13) a prime number?
True
Suppose 4*u + 5*t - 28291 = 0, -14 = -5*t + 1. Is u composite?
False
Let s(x) = -18*x + 2933. Is s(0) a prime number?
False
Suppose -13*x + 9*x = 8. Let g be 9 - (x - (-1 + -5)). Suppose 3*a - 95 = p + 80, 0 = -g*a - 4*p + 303. Is a a composite number?
False
Is 9/(-18) + 1*(-64188)/(-8) a prime number?
False
Let f(g) = -g**3 - 15*g**2 - 14*g. Let r = -18 + 4. Let q be f(r). Suppose -5*k + 970 + 145 = q. Is k composite?
False
Let s(j) = 616*j + 181. Is s(16) a prime number?
True
Suppose 3*o + 1670 = 5*o. Suppose 2*w - 7*w = o. Let y = w - -326. Is y a prime number?
False
Suppose 10250 = 5*y + 5*d, 2*d = -5*y + 5*d + 10226. Is y a prime number?
False
Suppose 0*i = -2*i - 3*u + 91, -4*u = 3*i - 136. Let y = i - 79. Is (-1 + 14)/((-7)/y) a prime number?
False
Is (-4 + 17)/13*4553 composite?
True
Let c(p) be the third derivative of 93*p**5/5 - p**4/24 - 4*p**2. Let d be c(1). Suppose -3*q + d = 2*q. Is q composite?
False
Let b = -1560 - 1071. Let n = 4562 + b. Is n a composite number?
False
Let y = -5807 - -9466. Is y a prime number?
True
Suppose -4*u = -5*f - 7369 - 2883, 4*f + 10252 = 4*u. Suppose 2*o - u + 725 = 0. Is o composite?
False
Let n = -131 + 129. 