(-45). Suppose z*k + 3548 = 13043. Is k prime?
False
Suppose 0 = 4*q - 3*w - 1162948, 74*w - 73*w = 3*q - 872211. Is q a prime number?
True
Suppose r - z = -7, -r - 4*z + 14 = 2*r. Let w be ((-3)/((-15)/(-2)))/(r/5). Is 0 - (-2 + -2) - (-2983)/w prime?
False
Let r(z) = -10533*z + 11435*z - 4 + 5 - 4. Is r(5) composite?
False
Suppose 0 = 31*s - 35*s + h + 4, -6 = 3*s - 3*h. Suppose 2*c = s*p + 736, -393 = -c - 0*c - 4*p. Is c a composite number?
False
Let f(x) = 13*x**2 - 12*x - 19. Let i(t) = 27*t**2 - 22*t - 39. Let n(q) = 9*f(q) - 4*i(q). Is n(-16) prime?
True
Let q = 67 - 36. Let h = 17 - q. Is h/(-28)*3*134 a prime number?
False
Let h = 77778 - 15505. Is h a composite number?
False
Let v(m) = -878*m + 1771. Is v(-8) a composite number?
True
Suppose 4*f - 2*l = 14, -f - 4*f + l + 19 = 0. Suppose f*w = -636 + 4184. Is w prime?
True
Let w = 5 + -5. Suppose 322381 + 165023 = 9*g. Suppose -7*v - 5*v + g = w. Is v a prime number?
True
Let w be ((-7)/(-14))/(9/(-18)). Let c(i) be the first derivative of -80*i**4 - i**3/3 - i**2 - 2*i + 1. Is c(w) a composite number?
True
Let q(l) = 628*l**3 + 2*l**2 - 3*l + 2. Let w(a) = 3*a + 50. Let k(b) = 3*b + 49. Let z(t) = -3*k(t) + 2*w(t). Let n be z(-16). Is q(n) a prime number?
False
Let w be (3/2)/(4/(-32)*-3). Suppose -w*b - 2*a = -1564, 3*a = 13*b - 9*b - 1544. Is b a composite number?
False
Suppose -2*t + 2*k = -36, t + k - 92 = -3*t. Suppose t*z - 21*z = 100. Suppose -i + z = -6571. Is i composite?
True
Is ((-10)/100 + (-207054)/20)/((-2)/5) a prime number?
False
Let x = 8854 + -5532. Suppose -5*s + 2208 = z, -4*z + 8727 = -0*z - s. Let n = x - z. Is n prime?
False
Let y = 21273 - -3008. Suppose -5*j + 14251 = 2*h - y, -5*j + 3*h + 38527 = 0. Suppose -4*g - 19251 = -5*t - 0*g, 2*t - 3*g - j = 0. Is t a composite number?
False
Let a(y) = -y**3 + 133*y**2 - 307*y + 466. Is a(87) a composite number?
True
Let l = 31096 - 21245. Is l composite?
False
Let f(t) = -t**3 - 8*t**2 - 13*t + 11. Let v be f(-6). Let b(i) = 57*i - 32. Is b(v) composite?
False
Suppose -s - 6 = -2*n, -s - 2*s - 2*n + 22 = 0. Suppose s*j + 4*p = 36152, 6*j - 3*p + 18077 = 8*j. Is j prime?
False
Let r be 37/3*(-11 + (1 - -1)). Let w = r + -60. Let q = 92 - w. Is q a prime number?
True
Suppose 21 = 3*r - 3*t + 6*t, 3*r - 4*t - 7 = 0. Suppose -5*l + 29920 = r*a, 6*l - a = 3*l + 17940. Is l a composite number?
False
Let b(h) = 0 + 17*h**3 + 4*h - 2 - 3 + 0. Let r be b(4). Suppose 3*n = 2*a - r, -2*a - 5*n - 395 = -1454. Is a a composite number?
True
Let a = 358887 + -252760. Is a composite?
True
Let i be 0/(4/(1 - 5)). Suppose 12*n + i*n = 6972. Is n composite?
True
Let a(y) = -1280*y**3 + 4*y**2 + 80*y + 185. Is a(-6) composite?
True
Suppose -3*u = -2*z - 13, 0 = 2*u - 8*z + 12*z + 18. Let m(j) = 1841*j**2 - 14*j + 2. Is m(u) composite?
True
Let l(f) = -f**3 - 6*f**2 - 5*f. Let o be l(-5). Let i = 8031 + -8027. Suppose o = 2*x - i*x + 1262. Is x a prime number?
True
Suppose 3*y + 18 = 0, 3*c + 44320 = 4*y + 152593. Is c prime?
True
Suppose 2*p - 5*p = -4*l + 132, 0 = -4*l - 2*p + 152. Suppose l*s - 30*s = 27654. Is s a composite number?
True
Let n(q) = -131*q - 19. Let a = -16 + 55. Suppose 4*d + 4*y = -13 - a, -3*y + 11 = -2*d. Is n(d) a prime number?
True
Let s(i) be the third derivative of -i**6/10 - i**5/30 + 5*i**4/24 - 13*i**3/6 + 85*i**2. Is s(-6) composite?
False
Suppose 5*a = 3*m + 4, 46 = 3*m + a + 4*a. Suppose 26427 = 5*b - 5*s + m*s, -b - 4*s + 5271 = 0. Is b a prime number?
False
Let r = 791 - 792. Is ((-4410)/1 - 7)*r a prime number?
False
Let w be 16 + ((-3)/(-2))/(3/4). Let g(r) = r**2 - 4*r - 11. Let y be g(6). Is 536 + w - (y - 4) composite?
False
Let j be (-1 + 100 + 2)*(8 - 1). Let p = -150 + j. Is p composite?
False
Let w(j) = 23*j**2 + 11*j**2 - 34*j + 9*j + 7 + 9*j. Is w(4) prime?
True
Suppose -13*f - 308 = -27*f. Suppose f*d + 2*r - 26591 = 17*d, 3*d + 5*r - 15966 = 0. Is d prime?
False
Suppose -315908 = -4*l - 5*d, 391*l + 3*d + 157954 = 393*l. Is l prime?
True
Suppose 20*d + 149906 = 5*p + 19*d, -2*p + 59965 = -3*d. Is p a prime number?
False
Is 507294/4 - (-5)/(-2) prime?
False
Let b be 14357*(5 + -7) + -5. Let w = -19482 - b. Is w prime?
False
Suppose -2*q - 538 = -z, 3*z + 0*z = -2*q - 546. Let x be 3*(-1 + 0) - q. Let s = 520 - x. Is s prime?
False
Let a(w) = 59750*w**2 - 59*w - 127. Is a(-2) composite?
False
Let f(b) = b**2 + 2*b - 9. Let t be f(3). Suppose z - 2760 = -4*u, 2*z = 7*u - t*u - 699. Is u a prime number?
True
Let x = 353 - 226. Suppose 123*b + 844 = x*b. Is b prime?
True
Let l = -28165 + 15072. Let f = -1428 - l. Is f prime?
False
Let k = -46 + 73. Let j = 28 - k. Is (1/(-4))/(j/(-268)) a prime number?
True
Let p(a) = 714*a - 61. Is p(77) composite?
False
Suppose -37*j + 35*j - 3*d = -540811, j = d + 270408. Is j a composite number?
False
Suppose 0 = 82*a - 81*a - 3*f - 607367, f + 1214719 = 2*a. Is a prime?
False
Let i be 4/14 - (-2480)/140. Suppose -13*z = 8 + i. Is z/6*1 + 30768/72 a composite number?
True
Let f(i) = 402*i**2 - 5*i + 3. Let s be f(-12). Suppose s = 132*l - 123*l. Is l a prime number?
False
Let v be 107/(-5) - (-8)/20. Is (-3*4627/v)/((-1)/(-7)) a composite number?
True
Let a = -73 + 77. Is ((-1915)/10 + -6)/((-2)/a) prime?
False
Let t(n) = 15987*n**2 - 16*n - 64. Is t(-3) a prime number?
False
Is 22408011/(-513)*(0 - 3) composite?
False
Suppose -11*k = -7*k - 4*a - 20508, -5125 = -k + 2*a. Is k a composite number?
True
Suppose 2794420 = 122*j - 102*j. Is j a prime number?
True
Suppose 2*f = -10*o + 5*o + 1274643, o - 637320 = -f. Is f a composite number?
False
Suppose -19*u + 14*u - h = -593771, 5*u - 593729 = 6*h. Is u a prime number?
False
Let f(o) = -o**2 + 6*o - 7. Let u be f(3). Suppose -23 = -u*a - 5*x, 3*a = 2*a - 5*x + 19. Let p(s) = 21*s**2 - 3*s - 5. Is p(a) a composite number?
True
Let v = 281008 - 186755. Is v a composite number?
False
Let h(u) = 78*u**2 + 16*u + 78. Is h(10) prime?
False
Suppose 2*w + 37 = -47. Let h = w - -50. Suppose h*p - 846 = 2*p. Is p composite?
True
Suppose 17*q + 380 + 742 = 0. Let b = -47 - q. Suppose 0 = -b*p + 34691 + 8306. Is p a prime number?
False
Let p be -6 + 1 + 7 + 24/12. Is 28637/p - (-16 - 910/(-56)) a prime number?
True
Suppose 33*s = 97055 + 34186. Is s a composite number?
True
Let x(k) = -1498*k - 64. Let b(r) = 300*r + 13. Let t(n) = 11*b(n) + 2*x(n). Let s be t(8). Suppose 0 = 3*f - 4090 - s. Is f a composite number?
False
Let j(b) = 713*b**2 + 3*b + 137. Is j(-18) a composite number?
True
Is (11/(-4))/(214/(-5537464)) a prime number?
False
Suppose -63506 = -3*c - 5*x, -c + 18*x - 16*x = -21165. Is c a prime number?
False
Let x be (-65)/(-39)*(9 + (2 - -1)). Suppose x*h + 19862 = 66522. Is h a composite number?
False
Let g(p) = -307*p + 3. Let u(h) = 1. Let v(i) = g(i) + 6*u(i). Is v(-2) prime?
False
Let w = 29719 + 10665. Suppose 6*v + 5830 - w = 0. Is v prime?
False
Let b be 21/12 + -2 + 37578/8. Let x = b - 808. Is x a prime number?
True
Let d(f) = 9*f**2 - 161*f + 1927. Is d(100) a composite number?
True
Let v = 1852 + -1141. Let i = 1042 - v. Is i prime?
True
Let d = 296375 + -211228. Is d a composite number?
False
Suppose 24 = o + 17. Let c = 8 - o. Is -2*c*2122/(-4) prime?
True
Let i = 27278 + -15487. Is i composite?
True
Suppose -21*v + 338 = -34*v. Let a(w) = -64*w - 255. Is a(v) composite?
False
Suppose 46*g = 35*g + 21747. Suppose -5*a + 18772 = g. Is a composite?
False
Is (9537490/(-15))/(-2) + 46/69 a prime number?
False
Let v(j) = -j**3 + 12*j**2 - 8*j - 22. Let b be v(9). Suppose x = g + 3, -4*g - 12 = x + 10. Is g + b + 1 + -4 prime?
False
Let g = 10 + -20. Is (-16502)/g - (-5 + 105/25) prime?
False
Let j be 1/(-4) + (-2 - 45/12). Let t be (-445)/2*j/5. Suppose v - 76 = -7*i + 2*i, 3*v + 2*i - t = 0. Is v composite?
True
Suppose -5*u = -4*x - 41, -x + 9*u + 6 = 11*u. Is (-4083)/x*(-6)/45*-10 a prime number?
True
Let c = 217343 + -130840. Is c a prime number?
False
Suppose 1025905 = -219*k + 224*k. Is k a prime number?
False
Let l(p) = -6*p - 11. Let u(j) = -j + 1. Let a(t) = 2*l(t) + 6*u(t). Let k be a(-2). Suppose 2*q - 854 = k. Is q prime?
False
Let q(c) be the second derivative of -3*c**5/20 - 3*c**4 - 5*c**3 + 14*c**2 + 2*c + 16. Is q(-15) composite?
False
Let l be (3 + -11)/(-16) - (-1242)/4. 