) = 2*h**2 - 3*h + 4. Let y be b(1). Suppose -3*o - l = -24 + 105, 27 = -o - y*l. Is ((-974)/(-3))/((-18)/o) composite?
False
Suppose 51990 = 5*h + 4*n, 4*h + 12*n - 14*n = 41566. Is h composite?
True
Let s = 86197 + -33560. Is s composite?
True
Let t(m) = -m**2 - 38*m + 25. Let p be t(-43). Suppose i - 3*i - 670 = 0. Let z = p - i. Is z prime?
False
Is ((-5286)/(11 - 5))/(6/102)*-1 prime?
False
Let g(j) = 1038*j + 1973. Is g(20) prime?
False
Let l(a) = -8*a + 11. Let d be l(5). Let o = d + 34. Suppose -b + o*b = 4396. Is b prime?
False
Let q(t) = 4*t - 16. Let u be q(5). Suppose -2940 = -u*p - 6*p. Suppose 5*h = -5*m + 299 + 1, 0 = -5*m + h + p. Is m a composite number?
False
Suppose 14 = 4*k + 14. Suppose 4*m = 2*v + 8, k*m + 4 = -4*m. Is (-182944)/(-192) + (-1)/v composite?
False
Let w = 25292 - 11739. Is w prime?
True
Let f(x) = 0 + 5*x**2 + 0*x + 7 + 5 - 2*x. Let z = 27 - 22. Is f(z) prime?
True
Suppose -3*d - 3*f = -3549 - 3750, -d = -5*f - 2421. Suppose 3649 = 3*y - 4*c, -7*c - d = -2*y - 4*c. Is y prime?
True
Is 237/(-711)*(-2599960 - -1) composite?
False
Suppose 0 = -4*o - 4*c + 288, -5*o - 2*c - c + 362 = 0. Let t = o - 69. Suppose -5*r - 435 = -2*j - 41, t*r = -3*j + 545. Is j a composite number?
True
Suppose -4*n = -2*k + 24, 3*k + k = -5*n + 9. Suppose -k*s + 7 = -5*s. Suppose 901 = -s*o + 4296. Is o prime?
False
Let c(n) = -n**2 - 664. Let f be c(0). Let r = -227 - f. Is (r/2)/(7/14) prime?
False
Let i(n) = -723*n**3 - 6*n**2 + 3*n + 11. Is i(-5) a composite number?
True
Suppose -4*t = 2*g + 691 + 339, 4*g + t = -2039. Let z = g - -1144. Is z composite?
True
Suppose g - 4*o = -4*g + 2117369, -1693900 = -4*g + 4*o. Is g prime?
True
Let v = -3525 + 3523. Let x(a) = 2*a**3 - 2*a**2 - 2*a - 1. Let j be x(-1). Is 236 - j - (-8)/v a prime number?
False
Let a = 3 + -12. Let k(u) be the first derivative of -u**4/2 - 7*u**3/3 - 12*u**2 - 8*u - 1766. Is k(a) composite?
True
Let c = -96159 - -55015. Let t = c + 78937. Is t a composite number?
True
Let k(q) = 3*q**2 + 16*q + 11. Let g be k(-13). Let i = g - -217. Is i a composite number?
True
Suppose 3*v = -0*v + 4*g + 64941, 4*g - 86532 = -4*v. Is v composite?
True
Let q(p) = -3*p + 14. Let s be q(-1). Suppose -y = -s*y + 10096. Is y composite?
False
Suppose -h + 4*c - 24 = -2*h, 2*h - 30 = c. Let q be 4*(12/h + (-11001)/(-12)). Suppose 0 = -l - 671 + q. Is l composite?
False
Suppose 2*l - 30 + 0 = 0. Suppose -q - 2*r - 14 - 9 = 0, -l = 3*r. Let b(o) = -19*o - 28. Is b(q) a composite number?
True
Let h(m) = m. Let c(g) = -8*g**2 + 10*g + 12. Let p(q) = -c(q) + 5*h(q). Let v = -924 + 917. Is p(v) composite?
True
Suppose 4*p - 6*p = -3*o + 122683, 0 = 4*o - 2*p - 163580. Is o a composite number?
False
Suppose n - 15*n + 56 = 0. Suppose t = 3*c + 2815 + 2338, t - 5139 = -n*c. Is t a prime number?
True
Suppose 9 = 2*v - 5*v, v = -n - 799. Let p = n - -1370. Let g = p - -125. Is g a prime number?
False
Suppose 17*y - 24 = 21*y. Is (-3124)/y + (-5)/(-15) a composite number?
False
Suppose -167*u = -157*u - 836530. Is u prime?
True
Suppose -4*b = -11*b + 14. Suppose 5*o = 22 - b. Suppose 3*m = -3*t - 2*m + 371, o*t - m = 510. Is t prime?
True
Suppose g + 7*q = 114469, 44*g - 2*q = 42*g + 229050. Is g a composite number?
True
Let j(l) = -l**2 - 14*l - 12. Suppose -n = -6*n - 65. Let d be j(n). Is 358 + 0/(-2)*d a prime number?
False
Suppose -13*s + 67185 = 34*s - 20940. Suppose -4*n + 2 = -6. Suppose -n*c = 3*o - 1447, 4*c - 5*o - 986 = s. Is c a composite number?
False
Let y(a) = 3*a - 55. Let q be y(19). Suppose -q*c + 740 = -2*b, 4*c - 3*b - 1856 = -c. Is c composite?
False
Let u(o) = -o**2 - 5*o + 10. Let v be u(-6). Suppose -3*b = 4*z + 7, 3*z + v*b = -z - 8. Is z/(2/(-2018) - 0) prime?
True
Let f = -127813 - -272762. Is f a prime number?
False
Let a(d) = -295*d + 1433. Is a(-8) composite?
False
Suppose o - 1024 = -v - 158, 3491 = 4*o - 5*v. Suppose 52 = 3*y - o. Is y a prime number?
True
Let p = -2 + -5. Let o(g) be the first derivative of -7*g**4/4 + 7*g**3/3 - 5*g**2/2 - 87. Is o(p) prime?
False
Let r(b) = -b**3 - 9*b**2 + b + 7. Suppose 2*g + 5*z - 55 = 0, 3*g + g + 2*z - 150 = 0. Suppose -a + 5*a + g = 0. Is r(a) prime?
True
Let z = 214383 + -126576. Is z composite?
True
Suppose -7*a - 11 = -3*q - 6*a, -4*a = -5*q + 16. Let b(o) = 1715*o**2 + 4*o - 17. Is b(q) prime?
False
Suppose 0 = 4*m - 40 + 20. Suppose -u - 5*k + 7*k + 6415 = 0, m*k = 15. Is u prime?
True
Let h(v) = v**3 + 9*v**2 + v + 13. Let b be h(-9). Suppose -b*r = 20*r - 139368. Is r prime?
True
Let n = -94 + 101. Suppose 3*c + 4*z = 1445, -2*c + 4*z = n*z - 964. Is c a prime number?
True
Let s be -5*4*1*(-358 - -359). Let a(x) = -3*x**2 + 25*x + 63. Let t(h) = -12*h**2 + 101*h + 252. Let k(c) = -9*a(c) + 2*t(c). Is k(s) a composite number?
False
Let d(f) be the second derivative of f**5/20 + 13*f**4/12 + 17*f**3/6 + 24*f**2 - 3*f + 5. Is d(-7) prime?
True
Let d(c) = 16*c**2 + 7*c - 261. Is d(30) a prime number?
False
Let c = 4096 + -1888. Suppose -2*o - 1387 + 5813 = 4*t, -o + c = t. Is o a composite number?
False
Let q(c) = 181*c + 6. Let g be q(17). Suppose 7*r = 20 + 8. Suppose -r*a + 1313 = -g. Is a a prime number?
False
Suppose 5*b - 10 = -5*j, -2*b + 7 = -2*j - 5. Let s = j + 4. Suppose 0 = 3*y + s*y - 9865. Is y prime?
True
Suppose -7*f = -3*f - 52. Suppose 5*h = -v + 24, 0 = 5*v - 16*h + f*h - 36. Let t(i) = 2*i**2 - 17*i + 5. Is t(v) prime?
False
Suppose 3*k + 3*d = 4*d - 12, 2*k = -2*d. Let u(j) = -27*j**2 - 4*j - 12. Let n(i) = -26*i**2 - 4*i - 11. Let g(p) = k*n(p) + 2*u(p). Is g(5) prime?
False
Suppose -4720*a + 4730*a = 1091830. Is a a prime number?
False
Let z be -2*2 - (58274 - 2)/(-3). Suppose -12*c - z = -16*c. Suppose -20*i - c = -25*i. Is i a composite number?
False
Suppose 1835074 = 173*f - 100*f. Is f prime?
False
Let j(u) = 6*u**2 + 76*u - 31. Let r be j(-13). Is (r + 4)*4 - -3911 a composite number?
False
Suppose -1062 = 3*c - 2*q - 3935, 2*q = 4. Let t = -636 + c. Is t composite?
True
Let b = 6455 - 2446. Is b a prime number?
False
Let u(a) = -11*a**3 - 5*a**2 + 21*a + 9. Let o be u(-7). Suppose 0 = 4*x - p - 2433 - 4335, p = -2*x + o. Is x prime?
True
Let v(g) = 75240*g**2 + 22*g - 201. Is v(-5) a prime number?
True
Let z(u) = u - 18. Let l be z(18). Let x(i) = 431 - 170 + 210 - 2*i + 160. Is x(l) a composite number?
False
Suppose 2*h + 1 = 3, 0 = -g + 4*h. Suppose 2*a - 5*v = 764, -a + 5*a - 1528 = g*v. Let b = -225 + a. Is b a prime number?
True
Let r(y) = -20*y**2 + 5*y - 23. Suppose 4*x - 65 = o, x - 4*o - 22 = -x. Let t(h) = -7*h**2 + 2*h - 8. Let m(n) = x*t(n) - 6*r(n). Is m(3) a composite number?
False
Suppose 5*n + 1 = 1. Let j be -2 + 0 + 1 - n. Let q(s) = 135*s**2 + 3*s + 1. Is q(j) prime?
False
Let l(o) be the second derivative of -3*o**5/20 + 2*o**4/3 + 2*o**3 - 11*o**2/2 - 80*o. Is l(-6) a composite number?
False
Let g be 4/(-24) + ((-7)/(-6) - -2). Let i(h) = 568*h + 6. Let n be i(g). Let l = 2443 - n. Is l a composite number?
False
Let h = 542115 - -198926. Is h a prime number?
False
Suppose 413*c + 8637541 = 472*c. Is c a composite number?
True
Let y(x) = 8*x + 7*x + 535*x**2 - 4*x**3 - 542*x**2 - 5*x - 22. Is y(-9) prime?
True
Suppose 32*x - 4 = 34*x. Let j be (-2)/(1/(1 + x)). Is 2*j + (139 - (1 - 7)) prime?
True
Is (-7)/(-63) - ((-326085380)/495 + (-36)/66) prime?
False
Suppose -8*n - 10 = -10*n. Suppose 18*f - 3*q - 21958 = 16*f, n*f - 54895 = 4*q. Is f a composite number?
False
Let m(o) = 10*o**3 - o**2 + 13*o - 29. Suppose -13*k + 4 = -74. Is m(k) composite?
True
Suppose -5*i + 2*u + 24 = 5*u, 0 = -4*i + 4*u. Suppose i*x + 2*r - 2135 = 0, 3*x - 2107 = -0*r + 5*r. Is x composite?
False
Let t be (2*(-1 + 2))/2. Let j(n) = 1001*n + 20. Let b(g) = 1002*g + 17. Let d(l) = 6*b(l) - 5*j(l). Is d(t) composite?
False
Let a = 3522 + -5554. Let t(k) = 197*k + 153. Let d be t(16). Let r = a + d. Is r a prime number?
False
Suppose 3*o = -67*f + 65*f + 549726, -3*f + 824589 = -5*o. Is f prime?
False
Suppose 8*d + 1370158 = 4*q + 11*d, -8 = 4*d. Is q prime?
False
Suppose 102459 = 58*r + 29828 - 198751. Is r a composite number?
False
Let d(l) be the second derivative of 7*l**4/12 + 7*l**3/2 - 55*l**2/2 - 109*l. Is d(13) prime?
False
Let j = -78 - -144. Suppose j = t + 63, 4*h - 2995 = -5*t. 