ite number?
True
Suppose 58*q = 66*q - 24. Suppose -2*n - 5*l - 115575 = -7*n, -4*l + 69359 = q*n. Is n composite?
False
Is (-45)/(-240) - 3723245/(-16) a prime number?
False
Suppose 0 = 3*h + 12, 3*i + 11*h = 10*h - 10. Let c(s) = 2 + 5 + 18*s**2 + 4*s - 2. Is c(i) a composite number?
True
Suppose -3*q - 3*g + 137265 = 0, 5*q - 2*g - 138885 = 89862. Is q prime?
True
Let x = 69264 - 15994. Suppose 14*t - 24*t + x = 0. Is t a composite number?
True
Is (261 - 51463)*1/(-2) composite?
False
Suppose -c - a + 16637 = 0, -3*c + 0*a + 49899 = -3*a. Let z = c + -7598. Is z a prime number?
False
Let y = 203693 + -117294. Is y a composite number?
False
Suppose 1 = -p - 2. Let o be (p + 22)/(2 - 1). Suppose 20*u = o*u + 191. Is u a prime number?
True
Let c = -132509 - -208540. Is c a prime number?
True
Let y = 2073 - 410. Let l = y - 660. Suppose -7*o + 3484 = -l. Is o prime?
True
Suppose 5*b - 21869 = -3*u, -4*b + 2*b = -u - 8752. Suppose b + 4885 = 20*m. Is m composite?
False
Let i(w) = -w**3 - 6*w**2 - 6*w - 4. Let y be i(-5). Let v(f) = -3 + 33*f + 2 + 2 + 45*f. Is v(y) prime?
True
Let q(a) = 269*a + 81. Let m(t) = -179*t - 54. Let z(n) = -8*m(n) - 5*q(n). Let i be z(9). Let j = i + -433. Is j a prime number?
False
Suppose 35 = 12*s - 13. Suppose s*k - 838 = 2766. Is k a composite number?
True
Let w(n) = 12*n**3 + 12*n**2 + 5*n - 40. Let x(j) = -j**3 + j**2 - j + 1. Let b(u) = w(u) + 5*x(u). Is b(10) a prime number?
False
Let l(v) = -1140*v + 139. Let c(x) = 2*x**3 - 32*x**2 + x - 27. Let n be c(16). Is l(n) prime?
False
Let n(i) = i**3 - 5*i**2 + 5*i + 3. Let l be n(4). Is 2503 + 0 + 0/l composite?
False
Let f = 8 + -6. Suppose -2*r + 0*v - 4*v + 982 = 0, -4*v = -20. Is (-3)/(f + 1)*(-6 - r) composite?
False
Suppose 7*a + 450 = 32*a. Suppose -35106 = -24*n + a*n. Is n composite?
False
Let q = -38 + 41. Suppose 2*w - 1 - 10 = 3*n, -w = q*n + 8. Is -10*(1/(-2) + n) a composite number?
True
Let f(y) = -11*y - 1. Let k be f(0). Let q be (k + 3)*285*2/3. Let z = 1219 - q. Is z composite?
False
Let w(l) = -16882*l - 3521. Is w(-6) a composite number?
False
Let o = 210 - 56. Let b(x) = o*x - 156*x + 2*x**2 - 11 + 4*x**2. Is b(-6) prime?
False
Suppose -8 = -q - 4. Suppose 19 = x - 3*g, -x - 4*x - q*g = 0. Is (12/4 - -1110) + x a prime number?
True
Let b(u) = -31*u**3 + 3*u**2 + 4*u + 4. Let k(d) = -3*d**3 - d**2 + d + 1. Let l be k(1). Let j be b(l). Let f = j + -137. Is f a prime number?
False
Let q(s) = -s**3 - 7*s**2 + 2*s + 18. Let i be q(-7). Suppose -j = -2*j + i. Suppose -1673 = -j*k + 3*k. Is k a composite number?
True
Let o(r) = -2 - 11 + 12. Let y(t) = 3*t**2 - 10*t + 70. Let c(a) = 4*o(a) + y(a). Is c(19) a prime number?
False
Suppose -19644949 = 16*d - 167*d. Is d composite?
False
Let f = 2134 + -4049. Let z = f - -796. Let w = -542 - z. Is w prime?
True
Let v = -1040 + 8659. Is v a prime number?
False
Let k(r) = 205*r**2 + 70*r - 1006. Is k(-63) composite?
False
Let n = 27741 - 3968. Is n composite?
False
Let d be (7/(-4))/((-9)/8 + 1). Suppose -4819 = -5*w - 4*k, 19*w - k - 4839 = d*w. Is w composite?
False
Let j(w) = 1785*w + 82. Let p = 246 - 235. Is j(p) composite?
False
Is -5 - 7/(77/(-308264)) prime?
True
Suppose 0 = -4*k - p + 547, 5*k = -4*p + 6*p + 674. Let c be (-12)/((-6)/k - 0). Suppose 4*n + 2*h = 560, -5*n + 434 + c = h. Is n composite?
True
Let p(l) = 5790*l**2 - 458*l + 4627. Is p(10) composite?
True
Suppose 3*g + 554241 = 3*h, -1899*h - 739000 = -1903*h + 2*g. Is h prime?
True
Is 5209628/28 + (-9)/(-105)*100/10 a composite number?
True
Let b(d) be the third derivative of d**6/120 - 3*d**5/20 + 5*d**4/12 - 11*d**3/6 + 6*d**2. Let x be b(7). Let a = 96 + x. Is a a composite number?
True
Suppose 3*p + 5*n = 584706, -2*p + n + 389791 = -0*p. Suppose 16*b - p = -15*b. Is b prime?
True
Let z(w) = -w**2 + 9*w + 15. Let y be z(10). Suppose m = -y, 2*l - 2*m + 200 - 50 = 0. Let d = l - -238. Is d a prime number?
False
Suppose 59*l - 69*l + 6610 = 0. Let n = l - -106. Is n a composite number?
True
Let b(i) = 981*i - 679. Is b(10) prime?
False
Suppose 0 = 24*j - 17*j - 182. Is 1744/12*39/j composite?
True
Let k(d) = -d**2 - 21*d - 34. Let u be k(-16). Let q = 48 - u. Is 2 + (q - 0)/(4/3014) a prime number?
False
Suppose 32*o = 148 + 172. Suppose -15*q = -o*q - 39085. Is q prime?
True
Suppose -5*r - 57071 - 77459 = 0. Suppose 10*o + 43515 = -2118 - 115437. Let b = o - r. Is b prime?
True
Let y = 120676 + -69843. Is y a prime number?
True
Suppose d - 111271 = -w - 0*w, 0 = w + 4*d - 111253. Is w prime?
False
Let c = -249 + 221. Is (-46162)/(-13) + c/(-364) prime?
False
Suppose -8*n = -2*t - 3*n - 8, -t = 2*n - 14. Let v be ((-8)/t)/(16/(-7032)). Suppose v = 2*i + 4*s, 0 = -i - 4*s + 269 + 26. Is i prime?
False
Suppose -16844716 = 21*s - 59387083. Is s a prime number?
True
Suppose 3*q - 4435 - 2596 = -4*d, -5273 = -3*d - 2*q. Suppose h - d = -0*h. Is h a composite number?
True
Suppose 13*o = -0*o + 4693. Let j = 2058 + o. Is j prime?
False
Is -6 - (801/(-36))/(2/5560) prime?
False
Let c(q) = -17*q**2 + 31*q + 24. Let m(a) = -51*a**2 + 93*a + 71. Let w(t) = 11*c(t) - 4*m(t). Let i(z) be the first derivative of w(z). Is i(15) composite?
False
Suppose -20*k - 90632 = -24*k. Suppose x = -1, -5*x = -3*w + k + 21444. Is w prime?
True
Suppose 47 = -k + 49. Suppose v - k*v + 1 = -z, -v = 4*z - 16. Suppose 2*t = -3*w - 0*w + 2339, -v*w + 3*t + 3113 = 0. Is w composite?
True
Let d(b) be the second derivative of 179*b**3/2 + b. Let h = 2172 + -2171. Is d(h) a composite number?
True
Let t(b) be the first derivative of 5*b**3/3 - 12*b**2 - 58*b - 75. Is t(49) a prime number?
True
Suppose -w + 5 - 3 = 2*t, -t = 3*w - 21. Is ((-3532)/w)/(-2 - 108/(-56)) composite?
True
Suppose r - 169467 = -3*d, 24*d - 169467 = 21*d + r. Is d prime?
True
Let v(b) = 5*b**2 + 202*b - 6698. Is v(50) prime?
False
Let s(h) = 9*h**2 + 10*h + 60. Let y be s(-9). Let d(n) = -n**3 + 5*n**2 + 13*n + 2. Let r be d(10). Let c = r + y. Is c prime?
True
Let t(c) = 35*c**3 + 2*c**2 + c + 1. Let p be t(3). Let f be ((-112)/(-12))/((-20)/30). Is (-15 - f)*p/(-1) composite?
False
Let o(c) be the third derivative of -c**6/120 + c**5/4 - c**4/24 - 8*c**3/3 + 16*c**2. Let w(s) = 8*s + 3. Let q be w(1). Is o(q) composite?
False
Suppose 116*x - 44*x = 194040. Suppose -688 - 14948 = -3*y. Let u = y - x. Is u a prime number?
False
Let y(d) = -939*d - 105*d - 93 + 416*d - 796*d. Is y(-9) composite?
True
Let f = 14248 - -19209. Is f a prime number?
True
Suppose 1 = g, 4*u - 5*g = -0*g - 53. Let z(l) = 444*l - 10. Let i be z(u). Is i/(-14) - (-3 + 92/28) prime?
False
Let u = -10521 + 41756. Is u prime?
False
Let p = 2747 - 1315. Suppose 0 = y - 3029 - p. Suppose 5*c = -3*j + 2647, -5*j + c + y = -3*c. Is j a prime number?
False
Let p(u) be the third derivative of -7*u**6/60 + u**4/4 + 7*u**3/6 + 2*u**2 + 20*u. Let l be -7 + (-1)/((-2)/4). Is p(l) composite?
True
Let k = 23 - -8693. Suppose 171*h = 175*h - k. Is h a composite number?
False
Let o be (18/15 + 2/(-10))/1. Is 14026*((-4)/(-8) - 0)/o a composite number?
False
Let z(w) = -4710*w + 103. Let a be z(-9). Suppose 10*h + 1863 = a. Is h a composite number?
True
Let h = -499457 + 1044000. Is h composite?
False
Suppose 0 = 91*c - 87*c - 442820. Suppose 11*m = -24*m + c. Is m a prime number?
True
Suppose -170 = -5*i + 5*t, -2*t - t = -i + 24. Suppose -9*q + i = 3. Suppose 883 = -2*o + 5*o + 2*d, 5*d = q*o - 1162. Is o a composite number?
False
Let a be 0 + (-2)/1*-2. Suppose 6*t - a = 4*t. Suppose 196 - 638 = -t*d. Is d prime?
False
Suppose 2*n + 605*c = 607*c + 374110, 2*c = -4*n + 748256. Is n a composite number?
True
Let m = 47 + 43. Is 7506/m - 2/5 a composite number?
False
Let p = -906 + 1511. Suppose p = 4*o - 1259. Is o composite?
True
Let d(r) = 4*r**2 - 5*r - 23. Suppose 4*h = x - 8, -x - 4 + 6 = -2*h. Let y be (-1)/(x/96*-2). Is d(y) prime?
True
Let m be (2 - 2) + -1 + 3. Let x(i) = 8*i + m - 3 + i**3 + 45*i**2 - 35*i**2. Is x(-6) composite?
True
Suppose 2*w + 3*y - 210110 = 0, 4*y + 578952 = 4*w + 158732. Is w prime?
False
Suppose -h = -4*w + 5923, 36*h = 31*h + 4*w - 29551. Let n = h + 9896. Is n prime?
True
Suppose -17214 + 167842 = 63*x + 3649. Is x a composite number?
False
Suppose 9*a + 7 = 34. Let q(n) = n + 9. Let d be q(-4). 