 + -48920. Is h a prime number?
False
Let f(b) be the second derivative of -b**4/12 + 11*b**3/6 - b**2/2 - 16*b. Let d be f(10). Suppose -8*k + d*k = 317. Is k prime?
True
Let s = -37 - -39. Suppose -2*m = -s*n - 4744, m + 4743 = 3*m - n. Is m a composite number?
False
Let f(g) = -g + 863. Suppose 55 = 6*t + 5*t. Suppose t*h - 2*h = -h. Is f(h) prime?
True
Let u = 2 + -1. Let q(j) = 155*j**2 - 20*j - 1. Let h(c) = -154*c**2 + 16*c + 1. Let w(x) = -5*h(x) - 4*q(x). Is w(u) a prime number?
True
Let o be (-2)/3 + (0 - (-966210)/(-18)). Let l = -34372 - o. Is l prime?
False
Suppose 0 = 3*s + 4*w - 365273, -2*w - 121763 = -s - 6*w. Suppose 2*y - s = -13*y. Is y composite?
False
Let i(b) = -120382*b**3 + 21*b**2 + 11*b - 9. Is i(-1) a composite number?
False
Let j(g) = -292*g - 297. Let c be j(-1). Let t(r) = 67*r**2 + 13*r + 5. Let z(m) = -66*m**2 - 13*m - 4. Let q(x) = 4*t(x) + 3*z(x). Is q(c) a prime number?
True
Let t(a) = -3*a**3 + 45*a**2 - 9*a - 28. Let m be t(32). Let h = -13239 - m. Is h prime?
True
Suppose 122*x - 110*x - 18756 = 0. Suppose -1075*o = -1072*o - x. Is o prime?
True
Suppose -8548 = -10*i + 17122. Is i a composite number?
True
Let n = -44274 - -198203. Is n a prime number?
True
Suppose -3 = -2*d + d + c, 4*d + 4*c - 12 = 0. Let r be d/(2 - (4 - 1)). Is (-470)/(-6) - 2/r a prime number?
True
Let d be (57/152)/(39/26936). Suppose -3*r + 1276 = -2*r. Let g = r + d. Is g a prime number?
False
Let g = 164819 - 35238. Is g a prime number?
True
Is 12461 - -3*170/(-51) prime?
True
Let t be (-618)/12 + -4 - (-6)/4. Let w = t + 53. Let g(v) = 82*v**2 + 2*v - 1. Is g(w) composite?
False
Suppose -5*w + 4*f + 11451 = 0, 5*f + 237 = 217. Suppose 4*p = 13 - 5. Suppose -y = m - 568, -p*m + w = 4*y - m. Is y prime?
False
Let d(t) = -5863*t + 331. Is d(-4) a prime number?
False
Let j(p) = 132*p - 13 + 6 - 47*p - 18. Let n be j(8). Let d = n + -282. Is d prime?
True
Suppose -18*x = 32*x - 55850. Is x composite?
False
Let x(u) = -5*u - 17*u + 23 + 76*u**2 + 60 + 25*u**2 + 4*u**2. Is x(12) prime?
True
Suppose 0 = 26*t - 13447732 - 311539 - 404411. Is t a composite number?
False
Suppose -960*n + 955*n = -3385. Is n composite?
False
Let y = 45554 - -789433. Is y prime?
False
Let r(j) = 24970*j**2 + 6*j - 23. Is r(-3) prime?
False
Let f = -14 + 13. Let c be f + (6 - 2) + 65. Is (2/8 - (-45475)/c) + 4 a composite number?
False
Suppose 0 = 2*i - 111 + 39. Suppose k - t + 8 = 2*t, 4*k + 5*t - i = 0. Suppose 7*b = k*b + 8637. Is b composite?
False
Suppose 33 = -14*g + 25*g. Let n(w) = 17*w**3 - 11*w**2 - 3*w - 5. Let p(m) = -8*m**3 + 6*m**2 + m + 2. Let h(b) = g*n(b) + 5*p(b). Is h(4) a prime number?
False
Suppose -5*b + 2*b - 5*w = -109, 3*w = 15. Let x = -16680 - -26775. Suppose 25*f = b*f - x. Is f a prime number?
False
Suppose -40*k + 39*k + 47467 = 0. Suppose -5*r + k = -4*q, 44452 = 4*r - q + 6485. Is r prime?
True
Let b(v) = -3*v**2 + 13. Let f(g) = 7*g**2 - 26. Let l(y) = 13*b(y) + 6*f(y). Suppose -5*h - 12 = -7*h. Is l(h) a composite number?
True
Suppose -5*g + 178360 = -291410. Is 4/14 + g/98 a prime number?
False
Let r be (2/4)/(-1) - (-22)/44. Suppose r = -17*s + 15*s. Suppose -5*v + 4*p + 1154 + 2071 = s, -4*v + 2559 = p. Is v a composite number?
False
Suppose -6540 - 6220 = -11*h. Is ((h/(-15))/(-8))/((-7)/(-14721)) prime?
False
Let y(j) = -2*j - 33. Let r be y(-19). Suppose 0*d + d - 5695 = 4*z, 5*z = r*d - 28535. Is d a composite number?
False
Is 2033821/1472*8*8 a prime number?
True
Is 2/(-3)*(-14831256)/176 composite?
False
Let u(j) = 2*j**3 - 23*j**2 + 11*j + 1. Let n be u(11). Is 150/350 + (-34406)/(-14) + n prime?
True
Suppose -3*t = -663 - 996. Suppose 1064 = 4*l + w - 5*w, -5*w + t = 2*l. Is l a composite number?
False
Suppose 8*m - 12*m - b + 705043 = 0, 5*m - 2*b = 881307. Is m composite?
False
Suppose -4487*g = -4464*g - 2466543. Is g a composite number?
True
Suppose 2*c + 16 = 2*k, -k = -4*k - c + 16. Is (69982 + -4)/k + 2 a composite number?
True
Suppose 4*n = 2*x + 16012, 5*x + 11159 + 864 = 3*n. Let l = n - 1840. Is l composite?
False
Let f(j) = -512*j - 678. Is f(-46) composite?
True
Let u = -27836 + 168813. Is u composite?
False
Is 130701 + 0 - (-10 + (-10 - -18)) prime?
False
Let h be (15 - 18)*2*1/1. Let s(i) = 7*i**2 + 21*i + 1. Is s(h) prime?
True
Let d be (-1715364)/(-34) - (-30)/255. Let v = d - 21551. Is v prime?
True
Let k(z) = z**3 - 10*z**2 + 6*z + 9. Let o be k(9). Let n = o - -12. Let j(x) = -42*x - 41. Is j(n) composite?
False
Suppose n - 6*v + 7*v - 117955 = 0, 0 = -n + 4*v + 117975. Is n a prime number?
True
Let z = 1228 + -684. Let c = -371 + z. Suppose 5*a - c = 102. Is a prime?
False
Let f be -1 - (-18)/(-15)*(-10)/4. Let a be (1082/(-3))/((-1)/3*f). Let p = -84 + a. Is p prime?
True
Suppose -618*x - 1208 = -622*x. Let k = x - 225. Is k prime?
False
Let m = 13790 - 8134. Suppose -3*j - k + 5640 = -2*j, -3*k - m = -j. Suppose 3*a - 7*a + j = 0. Is a a prime number?
False
Suppose 21*a - 3497464 - 808047 = -50*a. Is a a prime number?
False
Suppose -z + 1022 + 1944 = -2*l, -2*l - 3*z = 2950. Let o = -684 - l. Is o composite?
False
Suppose -74737239 = 437*c - 674*c. Is c composite?
True
Let c(h) = -2*h**3 + 7*h**2 - 39*h + 7. Suppose -37*s + 22*s = 180. Is c(s) a prime number?
False
Let k(j) = 20*j + 35. Let i be k(-10). Is 1/((5/(i/6))/(-622)) prime?
False
Let b(n) = -n**3 - 16*n**2 - 14*n - 31. Let u be b(-15). Let i = u + 64. Suppose -4*f - i + 3854 = 0. Is f prime?
False
Let f(d) = 687*d**2 - 5*d + 26. Let b be f(5). Let u(l) = -647*l + 6. Let k be u(-11). Suppose -9*c = -b + k. Is c composite?
False
Let c be (-2 - 4)*151/2. Let b = 1332 + c. Suppose -8*i + 5*i + b = 0. Is i prime?
True
Suppose -31*n = 6334 + 58797. Let s = -1028 - n. Is s prime?
False
Is 50/(-875) + 452826870/350 prime?
True
Let u(t) = 32*t**2 - t + 2. Let h be (500/(-100))/(1*1*-1). Is u(h) prime?
True
Let p = -80 - -79. Is (-217 - (-24)/4)*p a composite number?
False
Let i(b) = -2*b**2 + 23*b + 38. Let n be i(13). Is ((-1)/((-6)/(-95154) + 0))/n composite?
False
Suppose 2*u - 10 = 7*u, t = -5*u + 83079. Is t prime?
True
Let v = -29 - -29. Let t(u) = -u**2 - u**3 + 235 + 1350 + 0*u**3. Is t(v) a prime number?
False
Is 19 + -18 - (-184443 - (-7 - -2)) prime?
False
Suppose h + 5 = -5*g, 12*h + 20 = g + 8*h. Suppose -o - 2*n + n + 13747 = g, -2*n - 27510 = -2*o. Is o composite?
False
Suppose 77 = -4*y - 735. Suppose 3*m - 4*k - 1418 = 0, -4*m - 10*k = -13*k - 1893. Let w = m + y. Is w a prime number?
True
Let a(q) = 457*q**2 - 6*q - 17. Let w(c) = -1370*c**2 + 19*c + 50. Let x(y) = -11*a(y) - 4*w(y). Is x(-2) a composite number?
True
Let f(w) = 170*w**2 - w - 49. Is f(-18) prime?
True
Let t = -465545 + 936898. Is t composite?
False
Is 2*36/12 - -18963 a composite number?
True
Suppose 0 = 1647*p - 1637*p - 82130. Is p a composite number?
True
Suppose -275680 = -7*t + 464577. Is t a composite number?
False
Let v(n) = -95*n**3 - 5*n**2 - 9*n - 181. Is v(-8) a composite number?
True
Let n(v) = -36*v - 40. Let j be n(25). Let w = j + 2339. Is w prime?
True
Let z = -293 + 175. Let a = z - -227. Let j = 194 - a. Is j prime?
False
Let f(l) = l**2 + 7*l + 15. Let s be f(-4). Is ((-13595)/(-10)*s)/((-12)/(-8)) prime?
True
Suppose -2*l + 3 = 3*y, 5*y + 2*l - 27 = 6*l. Let w(q) = -8 + 12*q**2 + q**2 + 2*q - 15*q**2 + 31*q**2 + 28*q**2. Is w(y) composite?
True
Suppose 0 = -5*v - 1 - 9. Let q(d) = -234 - 95*d - 31*d + 241. Is q(v) prime?
False
Let u = 132 + -192. Let z be (-9768)/(-14) - (u/21)/10. Suppose -z = -3*p + 5*i, 3*i - 348 = -p - 134. Is p a prime number?
False
Let d(r) = 719*r + 144. Is d(5) a composite number?
False
Suppose 0 = 5*n + 5*u - 16660, 3*u = 4*n - 0*u - 13349. Suppose -3 - 3 = -3*q, -b + q - 2078 = 0. Let t = b + n. Is t prime?
True
Let v = -245 - -473. Let o(u) = -5*u + 6. Let y be o(0). Suppose -1446 = -y*n - v. Is n a prime number?
False
Suppose 0 = k - 3. Suppose 0 = 4*l + k*a - 10991, -4*l - a = -3*a - 10966. Let z = -1335 + l. Is z a composite number?
False
Suppose 3*r - 6254 = 4*t, -6266 = -3*r + 3*t - 2*t. Suppose 24*f + r = 19*f. Let c = -167 - f. Is c a prime number?
True
Suppose 0 = 6*v - 243367 - 89555. Is v prime?
True
Let d(f) = 1861*f**2 + 49*f - 289. Is d(5) prime?
False
Let t(g) = -8 - 8*g - 2*g + 13*g - 4*g. 