54. Is u composite?
False
Suppose 0 = 62*o - 35*o - 2509623. Is o composite?
True
Let p be 2*2/8*0. Suppose 0 = x - 630 + 627. Suppose -x*m = 9, p = -n - 2*m + 47. Is n a composite number?
False
Let o(q) be the first derivative of -3*q**4 + q**3/3 + q**2/2 - q + 2. Suppose -3*c - 12 + 6 = 0. Is o(c) prime?
True
Let o be 50/(-4) - (-2)/4. Let m(j) = 33*j**2 - 12*j - 15. Is m(o) a composite number?
True
Let h(g) = 18*g**3 + 3*g**2 + 10*g - 28. Is h(3) composite?
True
Let d(p) = -3*p - 6. Let f be d(-4). Let y be (-3)/f*2 + 3. Suppose 0 = y*b + 4, u = 5*u - b - 638. Is u a prime number?
False
Let k(z) = 256*z + 27. Let a be k(16). Suppose a + 6705 = 4*m. Is m composite?
False
Suppose 0 = -5*d + 4*d + 238. Suppose -d = 18*l - 20*l. Is l a composite number?
True
Let d = -21 - -1. Let j = -87 + 53. Let q = d - j. Is q a composite number?
True
Suppose -11*q = -10*q - 30. Suppose -6*k = -9*k + q. Is k prime?
False
Suppose -33 = 3*y - 324. Is y composite?
False
Let s(t) = -3*t + 4. Let u be s(2). Is ((-1)/u)/(-5*6/(-7980)) a prime number?
False
Suppose 0*i + 5*i = 60. Suppose -3*a = -9*a + i. Suppose -a*u + u + 71 = 0. Is u a composite number?
False
Suppose -2*l + 18 = -l - 4*i, 5*l - 26 = 4*i. Let s = l + 49. Let y = s + -36. Is y prime?
False
Suppose 0 = 3*g - d - 8330, -2*g = -d - 1106 - 4447. Is g a prime number?
True
Let w = 287 + 1476. Is w a composite number?
True
Suppose 0 = 2*c - 5*y + 3, 3*c - 25 = 8*c + 5*y. Let r be (-1)/(3*c/(-108)). Is (2082/r)/((-4)/6) a composite number?
False
Let n(s) be the third derivative of s**6/120 + s**5/20 + s**4/6 + 7*s**3/6 - 18*s**2. Is n(6) a composite number?
True
Let k be ((-2122)/(-4))/((-4)/(-8)). Let w be -3 - (6 - -7920)/(-6). Suppose 3*m = -4*f + k, -6*f - m + w = -f. Is f composite?
False
Let k be 5*(-1)/(-1) - 1. Suppose -2*h + 6*h = -t - 12, 12 = -k*h. Suppose -513 = -4*p - g + 6*g, t = -p + g + 128. Is p a prime number?
True
Let s = 5018 - -1713. Is s a prime number?
False
Suppose 4*s + 88 = -a, 280 = -a - 2*a - 4*s. Let v = a - -389. Is v prime?
True
Let k = 4 - 11. Let h(g) be the second derivative of -23*g**3/6 - 2*g**2 - 4*g. Is h(k) a prime number?
True
Suppose 0 = 4*t + 281 - 1041. Let k = t - -13. Is k a composite number?
True
Suppose -4*l - 12 = -4*w, 0 = 5*l - 0*l - 2*w + 21. Let o(n) be the third derivative of 2*n**5/15 - n**4/12 + 5*n**3/6 + n**2. Is o(l) a prime number?
False
Let p(k) = 5*k - 11. Let l be p(3). Suppose 5*w + o - 1278 = -o, -l*w - o + 1020 = 0. Is w composite?
True
Let o(s) = 25990*s + 41. Is o(1) a composite number?
True
Let d = 3636 - 782. Is d prime?
False
Let r(s) be the third derivative of 25*s**4/24 + s**3/6 - 4*s**2. Let w be r(-1). Is (-4620)/w - 6/4 a composite number?
False
Is (25 - 26)/((-2)/4946) a composite number?
False
Suppose 9850 - 42604 = -6*a. Is a prime?
False
Let d = -5 - -3. Let q(l) = -l**3 + l**2 - l. Let v(c) = -6*c**3 + 3*c**2 + c + 3. Let a(u) = -3*q(u) + v(u). Is a(d) composite?
False
Let y(d) = d**2 + 3*d - 5. Let o be y(2). Let k(g) = 7*g**3 - 3*g - 19. Is k(o) a composite number?
True
Let l(r) = -105*r - 11. Let m be l(-6). Let s = m - -392. Is s composite?
True
Let m(t) = -8*t - 14. Let j(u) = 3*u**2 + 2*u + 2. Let o be j(-2). Let y be m(o). Let g = y - -285. Is g composite?
False
Is 8531212/(-109)*2/(-8) a prime number?
False
Suppose -75618 = 3*h - 21*h. Is h prime?
True
Is 659*((-2)/(-10) - 96/(-20)) prime?
False
Suppose t = 2*t - 1, t = 3*q + 1. Suppose 5*w - w - 3*a - 165 = q, -4*w = -4*a - 168. Is w prime?
False
Let p(k) = k**3 + k**2 - 3*k + 2. Let j be p(-2). Suppose -6111 = -3*g + 3*u, -j*g - 2*u + 8152 = -4*u. Is g a composite number?
False
Let m(t) = -8*t + 7. Let a be m(3). Is a/2*(3 + -13) composite?
True
Let v be (2/(-6))/(6/(-108)). Is v - 9 - (-369 - 1) prime?
True
Suppose -w = -3*l + 11, 2*l - 5 = w + 4. Suppose q = 3*v + 5, -q + l*q = v + 5. Suppose x - 143 = -v*x. Is x a composite number?
True
Suppose y + 221 = 3*o, 3*y - 18 = -2*o + 133. Is o prime?
False
Let b(h) = 30*h**2 - 5*h - 21. Let d be b(5). Suppose 3*a + 11 - 1559 = 0. Suppose -4*c = -a - d. Is c a prime number?
False
Suppose 0 = t + 505 - 3. Let a = 1151 + t. Is a prime?
False
Suppose 0 = b + 3 - 8. Suppose 3*q - 874 - 2575 = -r, 0 = -2*q + b*r + 2322. Is q prime?
True
Is (3/2)/(8/794912*6) a prime number?
True
Suppose 0 = -f - 7 + 8. Is -2*211/(-2)*f prime?
True
Suppose -5*h + 3*u + 570 = 0, h = 2*u + 113 + 8. Suppose 4*m - 2*q - 1149 + h = 0, -2 = 2*q. Is m composite?
True
Let f be (-19)/(-114) - (-91306)/12. Suppose -w + 3797 = 4*y, 4*w + 5*y = 2*w + f. Is w a composite number?
True
Suppose -a + q + 19954 = 4*a, 0 = -3*q + 3. Is a prime?
False
Let q(d) = 2*d - 4. Let f be q(4). Suppose 0 = -4*x + 52*x - 30192. Suppose -4*z - x = -3*p + 476, f*p - 1470 = 2*z. Is p composite?
False
Suppose -t + 93310 - 35469 = 0. Is t prime?
False
Suppose 13*q - 8862 = 7*q. Is q a prime number?
False
Let k be ((-30)/(-20))/((-1)/2). Let b be 14/((-3)/36*k). Let s = 198 - b. Is s composite?
True
Let v = 1964 + -600. Let d = 1929 - v. Is d prime?
False
Suppose 6*l - 2*l = 12. Suppose 5 = u + l. Suppose 2*b + 5*x = 130, 0*x - u*x = b - 63. Is b a prime number?
False
Suppose -4*w - 5*i = 12, -2*w - 2*i = -3*w - 3. Is (2/w)/(12/(-3438)) prime?
True
Let s(q) = 1 + 4*q**3 - 3*q - 8*q**3 - 2*q**2 + 3*q**3 + 0. Is s(-8) a composite number?
False
Let z(a) = -35*a**3 - 9*a**2 + 12. Is z(-5) a prime number?
False
Suppose 0*u + 16*u - 3376 = 0. Is u a prime number?
True
Let c be (6/(-15))/1 - 127/(-5). Suppose -2*k + 32 = -5*f + 6*f, -3*k - 4*f + 38 = 0. Let o = c - k. Is o composite?
False
Let n = -4990 + 11937. Is n prime?
True
Let q(d) = -5 + 4 - 80*d + 2. Let a be q(-7). Suppose -15*l - a = -18*l. Is l a prime number?
False
Suppose 31*p + 80090 = 41*p. Is p composite?
False
Let n(p) = -4*p**3 + 15*p**2 + 43*p + 103. Is n(-15) composite?
False
Suppose -3*u + 42987 = 4*i, -26*i + 12 = -30*i. Is u composite?
True
Let k(d) = -257*d + 59. Is k(-4) composite?
False
Suppose -2*d - 952 = -4*d. Suppose d = 7*n - 3*n. Is n a composite number?
True
Let l(q) = -1 - 3*q - 15*q**2 - 146*q**3 + 33*q**2 - 21*q**2. Is l(-1) a prime number?
False
Suppose -10 = -5*z + 3*r, -4 = 4*z - 6*z - 2*r. Suppose 4*y - 3*n - 734 = 0, -z*y - 3*y + 935 = 5*n. Is y a prime number?
False
Let u(a) = 4*a**3 - 17*a**2 + 19*a - 17. Is u(9) a composite number?
False
Let k = 1958 + 21725. Is k a prime number?
False
Is (-68)/51 + (-66674)/(-6) composite?
True
Let v(g) = 326*g - 52. Let j be v(11). Let t(i) = -25*i**2 + 9*i - 7. Let k be t(9). Let w = j + k. Is w a prime number?
True
Let j = 4 + -8. Let a be -3*(j + 5) + 3. Suppose a*b - 1671 = -3*b. Is b a composite number?
False
Suppose 3*c - 9 = -0*c. Suppose -c*k + 2034 = -0*k. Is (-6)/9*k/(-4) prime?
True
Suppose 3*i + 4 = 10. Suppose -2*z = -i*b + 14, 6 = -4*z + 5*b - 22. Is (453 - 1) + 7/z composite?
True
Suppose -3*l + 543 = -0*l + 3*g, 5*l - 877 = 2*g. Is l prime?
False
Is ((-1)/4*-2)/(12/319416) a composite number?
False
Let m(r) = -r - 12. Let a be m(-7). Let n(y) = -6*y + 13. Let t(l) = -6*l + 12. Let k(h) = -4*n(h) + 5*t(h). Is k(a) a composite number?
True
Let k(c) = -7*c**3 - 8*c**2 + 5*c + 11. Let h(x) = -20*x**3 - 25*x**2 + 14*x + 34. Let q(d) = -6*h(d) + 17*k(d). Let l = -24 - -12. Is q(l) a composite number?
True
Suppose -16*y - 31537 = -467489. Is y a prime number?
False
Let j(f) = -3489*f + 33. Is j(-4) a composite number?
True
Let g = 3317 + 6837. Is g prime?
False
Suppose x - 1 = 2. Suppose 8*a = 5*p + x*a - 40, 0 = -5*p + 2*a + 28. Suppose -4*b + 206 = -2*b - 4*y, -97 = -b + p*y. Is b prime?
True
Let z = 26 - 19. Let p = z + -16. Is 226 - p/(-2 - 1) prime?
True
Suppose -4*r + 10*p + 451128 = 14*p, -4*r + 2*p + 451098 = 0. Is r a prime number?
False
Let a be 2*2 + (490 - -10). Let u be -1*(-2 - -1) + a. Suppose 4*c - 3*c - u = 0. Is c a composite number?
True
Suppose 5*u + 6260 = -3*k, -k = -4*k + 5*u - 6310. Let z = k - -6292. Suppose z = -10*w + 13*w. Is w a composite number?
False
Let u(l) = 3*l - 8. Let v be u(5). Suppose -9*o + 28 = -v*o. Let m(i) = 24*i - 1. Is m(o) prime?
False
Let i = -22 - -22. Suppose 3*l + i*r + 1 = -2*r, 4*l + r = 7. Is l a composite number?
False
Suppose 10 = -3*w + 4*w. Suppose 0*p - 3*p + 2*d + 8 = 0, -3*d = p - w. 