 j(t) = t**2 - 3*t + 8. Let r be j(6). Suppose 5*w - 3*f + 5*f = -34, -5*w = -2*f + r. Let k(i) = 5*i**2 + 11*i + 13. Is k(w) a prime number?
True
Suppose 2*g + 19*h - 9650 = 22*h, 0 = -4*g + 2*h + 19316. Is g composite?
False
Let u(g) = -g - 9. Let p be u(-15). Is (-4)/p + 4443/9 prime?
False
Suppose -5*x - 2*y - 1333 = 0, y = 3*x - 0*x + 802. Let g = 170 - x. Is g composite?
True
Let i = -5495 + 9484. Is i composite?
False
Let o be 453 + ((-16)/2)/2. Suppose 4*j - o + 133 = 0. Is j composite?
False
Suppose l - 3 = 1. Is -1 + ((-1356)/(-4) - l) a prime number?
False
Let x be ((-21)/(-63))/((-2)/18). Is (15791 + x)/4 - 4 a composite number?
False
Let y = -11 - 23. Let a = -23 - y. Is a composite?
False
Is (38150/(-4))/(-7) - (-6)/(-4) composite?
False
Let r be -1252*(35/20 - 1). Suppose -2739 = 4*o - 4*g + 2617, 5*o + 2*g = -6716. Let p = r - o. Is p prime?
False
Is -6*-2427*7/42 a prime number?
False
Let y(d) = d**3 + 5*d**2 + 2*d + 5. Let o be y(-4). Suppose -2*x + 5295 = o*x. Is x composite?
False
Is ((-13070)/(-4) - -1)/(12/8) a prime number?
True
Suppose -2*t - 2*t = 8. Let i be 6/(-4) + (-1)/t. Is 1 - (1*-411 + i) composite?
True
Let f(w) = 2*w**2 - 2*w + 1. Let a be f(-3). Let l(t) = 1 - 2*t - 2*t + 3*t - 8 + a*t**2. Is l(-3) a composite number?
True
Suppose 5*n = -d + 69, 2*d - 3*n + 207 = 5*d. Suppose -5*l + 18 + 32 = -4*y, 4*y - 6 = l. Let i = d + l. Is i a prime number?
True
Suppose -4*v - 37 = -3*f - 9, 5*f = 2*v + 28. Suppose f*q = 8*q - 2164. Is q a composite number?
False
Let f = 2098 - 752. Suppose 3*h = 5*h - f. Is h a prime number?
True
Let p(g) = -g**2 - 4*g + 7. Suppose 5*t + 26 = 1. Let o be p(t). Suppose o*j - 213 = -j. Is j a composite number?
False
Let x(n) = 3 - 5 - 3 + 12*n. Suppose 3 = 2*w - 9. Is x(w) composite?
False
Let g(m) be the first derivative of -m**2 + 13. Let y be g(-3). Let v(j) = 9*j + 3. Is v(y) prime?
False
Let m = -6 + 5. Is 90 - 3/(m + 0) a composite number?
True
Let r be 4/(-10) - 132/(-30). Let x = r - -12. Suppose -2*b = -314 + x. Is b a composite number?
False
Let r(i) = 2*i. Let d be r(6). Let b be 32/d - (-2)/(-3). Suppose 2*z = -0*z + b*j + 1002, -1003 = -2*z + j. Is z a prime number?
False
Suppose k + 5 + 0 = 0. Let u = k + 8. Suppose 0 = q + 5*c - 432, -u*q + 2*c + 1196 = -3*c. Is q a composite number?
True
Let w = 18840 - 9101. Is w prime?
True
Suppose 2*w + 3*b + 45 = -2*b, 3*w = b - 25. Let g(x) = 5*x**2 + 10*x + 15. Is g(w) a composite number?
True
Let g be 3/9 + (-2)/6. Let t(l) = 99*l + 33. Let o be t(4). Suppose g = 2*a - 5*a + o. Is a a composite number?
True
Let f = 1 + -13. Let n be ((-52)/f)/(1/(-12)). Let r = n - -95. Is r prime?
True
Suppose 0 = -31*c + 22*c + 9783. Is c a prime number?
True
Suppose -75 = 6*y - 9*y. Is (-1 - -3)*(-3 - y/(-2)) composite?
False
Let u(l) = 8 + 6 + 24 - 9*l. Is u(-9) prime?
False
Let q = 36 + -13. Suppose 0 = q*c - 24*c + 187. Is c prime?
False
Let d(u) be the second derivative of 37*u**3/3 - u**2/2 + 4*u. Is d(7) a composite number?
True
Suppose -12*u = -25*u + 65429. Is u a prime number?
False
Suppose 0 = -8*v - 569 - 71. Let z be 2/(v/(-36) - 2). Suppose 7*b = z*b - 1346. Is b a prime number?
True
Let v be (5 + -46)/((-1)/7). Suppose -3*i + 1292 = v. Is i prime?
False
Suppose 0 = 6*q - 51836 - 10510. Is q prime?
True
Let m(d) = 182*d**2 - 3*d - 2. Let k be m(2). Suppose 0 = -4*u + k + 772. Is u a prime number?
True
Let r = -212 - 240. Let i = 267 + r. Let n = i + 304. Is n a composite number?
True
Suppose 8*q = 6*q - u + 5943, -2*q - 2*u + 5944 = 0. Is q composite?
False
Let d = 787 - -626. Suppose 0*z - 2*z + 2086 = 0. Suppose d + z = 4*m. Is m composite?
True
Let r(x) = x - 1. Let i be r(6). Suppose 3*d - 708 = -d - 3*m, -4*m = i*d - 885. Let p = d - 126. Is p composite?
True
Is 1*(54752 - 4/(-4)) prime?
False
Let y = -2223 - -8912. Is y prime?
True
Suppose 4*i + 2*i = 948. Suppose -5*y + 11 = -6*y. Is (i/(-4))/(y/22) prime?
True
Suppose -3*j - 2*j - 2*f - 30 = 0, 4*j + 3*f = -31. Let l be (29 + -2)*(j - -5). Is (-6)/l + (-2873)/(-9) a prime number?
False
Suppose 1626602 = 97*c - 1192509. Is c prime?
True
Let t be (-4)/(-22) - (-5 - 11540/55). Is t + (-1 - (3 + 0)) a prime number?
True
Suppose -27*l + 33*l = 438. Suppose -130 = 2*q + 6. Let f = l - q. Is f a composite number?
True
Let c be (-2)/(-3) + (0 - (-30)/9). Suppose 3*i = -2*i + 145. Suppose 3*b + i = -c*f + 522, 5*f = 4*b + 655. Is f composite?
False
Let f(c) = 7228*c - 87. Is f(2) composite?
False
Let i(u) = 181*u - 43. Is i(8) a composite number?
True
Let a(w) = -20*w**3 + 6*w**2 - w + 1. Is a(-2) prime?
False
Let h(s) = 6450*s**2 + 152*s + 5. Is h(-9) composite?
True
Suppose -11 = 4*u - 19, -u = p - 20411. Is p a prime number?
False
Suppose 3*x - 914 = 5*x. Let h = 210 - x. Is h a prime number?
False
Is 104952/18*((-34)/8 + 5) composite?
False
Let d(y) = y**2 + 2*y - 13. Let l be d(-5). Suppose 2*c - 3*c = -l*m - 767, -4*c + 2*m + 3068 = 0. Is c a composite number?
True
Is ((4647996/2)/(-9))/(-6) composite?
False
Suppose 0*k + 2514 = k - q, 0 = q - 2. Suppose -43*g + k = -39*g. Is g prime?
False
Let d(z) be the first derivative of -z**4/4 - 7*z**3/3 - 3*z**2 - 8*z + 2. Is d(-7) a prime number?
False
Let s be (-3)/(-4) - (-120)/(-32). Let h(w) = -155*w - 3. Let o be h(s). Suppose 0 = -2*i - 5*u + 173, 4*i = -2*u + o - 156. Is i a composite number?
True
Is (-19226)/(-1) + 57 + -52 a composite number?
False
Is 16569 - 0 - (-5 + 5) - 2 a prime number?
True
Suppose -16 = -h - 2. Suppose 0 = -10*t + h*t - 1004. Is t composite?
False
Suppose -7*b + 4*r - 520 = -2*b, -5*r - 475 = 5*b. Let c = -39 - b. Suppose -4*q + c = -559. Is q a composite number?
True
Let y be 8 + (-11)/(11/4). Suppose -11*b + 6223 = -y*b. Is b a composite number?
True
Is (-36965)/(-3) - (-692)/519 a prime number?
True
Let i(h) = 2*h**2 - 9*h + 67. Is i(18) prime?
False
Is (0 + -3)*2/(12/(-45206)) a prime number?
False
Is (-11)/(-22)*(2963 + -1) a composite number?
False
Suppose -5*t - 12019 = -2*h, -364*h + 362*h - 5*t + 12009 = 0. Is h composite?
False
Suppose 4*l + 2*r - 3458 = 0, 1156 = -2*l - 4*r + 2882. Is l prime?
False
Is ((-6969)/(-6))/((-1)/(-2)) composite?
True
Suppose -l = 4*c - 5*c - 5, 2*c - 20 = -4*l. Suppose -u = -2, -2*u = -d - l*u + 1853. Is d prime?
True
Suppose -4*i + z - 2*z = -28280, 3*z - 35357 = -5*i. Is i prime?
True
Let n be (-1)/1*(1 - 1). Suppose 2*i - 4*y - 12925 - 13277 = n, -i - 3*y + 13081 = 0. Is i prime?
True
Let f(i) = -5*i - 5. Let n be f(4). Is (n/(-2) + 3)*2 a composite number?
False
Let o = -36 + 41. Suppose -5*y + 4*y + r = -2782, 25 = o*r. Is y a composite number?
True
Suppose 8*z = 10*z - 4718. Is z composite?
True
Suppose 0 = -3*t + 14 - 2. Suppose t*q + 4*o - 16 - 20 = 0, 4*q + 2*o = 26. Suppose 2*h - 58 = q*x, 3*h + 3*x = 2*h + 4. Is h prime?
True
Let y = -81 - -86. Suppose -3*m + 4 = -5, 0 = -n - y*m + 26. Is n a prime number?
True
Let v(l) = -2 + 1 - 5*l + 7*l**2 + l + l. Suppose 0 = -o + 7 - 4. Is v(o) a prime number?
True
Let o be (-1)/((-30)/8448) - (-6)/(-10). Let w = o - 58. Is w prime?
True
Let j(i) be the first derivative of 13*i**3/3 - 2*i**2 - 3*i + 11. Is j(-2) a prime number?
False
Let y = 10025 - 2874. Is y prime?
True
Suppose -12 = g + 4*p, -2*g + 6*g - 5*p - 57 = 0. Let z(d) = -6*d**2 + d - 15. Let b(s) = 6*s**2 + 14. Let o(t) = 4*b(t) + 3*z(t). Is o(g) a prime number?
True
Let c = 1782 - 826. Suppose i - 5*i + c = 0. Is i prime?
True
Let r be 42/(-8) - 27/36. Is (r/(-9))/((-6)/(-1341)) a composite number?
False
Let v = 52639 + 5478. Is v composite?
True
Let z = -4606 + 6821. Is z a composite number?
True
Let g = 11948 - 2713. Is g prime?
False
Let y = 7 - 4. Suppose -5*a = -3*s - 89, -y*s + 8*s = a - 31. Is 311 + 7/((-28)/a) a prime number?
True
Suppose -39152 = 7*a - 129025. Is a prime?
False
Let z(x) = 7*x - 9. Let i(c) = -2*c + 38. Let s be i(12). Is z(s) prime?
True
Suppose -d + 3 = -0*d. Suppose 4*i = d*i + 57. Let n = -11 + i. Is n composite?
True
Let n(r) = 683*r - 2. Let y be n(-3). Let v = -937 - y. Suppose -7*p + 5*p = -v. Is p composite?
False
Suppose 5*d - 167 = -3*z - 699, 502 = -3*z + d. Let g be -470 + (1 - 2) - 1. Let w = z - g. Is w composite?
True
Let d(n) = -3*n**2 + 20*n + 3. Let b(s) = 2*s**2 - 19*s - 2. Let z(t) = -7*b(t) - 6*d(t). 