382. Is q a composite number?
False
Suppose -4*g = 3*x - 44523 - 637892, -2*g = x - 341207. Is g a composite number?
False
Let j(k) = k**2 - 37*k + 218. Let s be j(30). Is 1/(s - (-310584)/(-38824)) a prime number?
False
Let w = -52 - -62. Suppose 8077 - 59607 = -w*o. Is o prime?
True
Suppose 2*b + 23 - 7 = 2*k, -5*k + 2*b + 34 = 0. Is (21/k - 4)*-17606 a prime number?
True
Let n = 62 - 60. Suppose 0*r = -2*r + n*c + 2100, -3146 = -3*r - c. Is r a prime number?
True
Let t be -2 + (0 - -1) + 1643. Suppose -3 = 3*f - 3*c, -f - c - 24 + 19 = 0. Is 5/((-30)/t)*f a composite number?
False
Suppose -5*g + 62886 = 4*r, 46*g - r = 48*g - 25152. Is g composite?
True
Suppose -2172*z + 925032 = -2164*z. Is z prime?
False
Let y(j) = -11*j**3 + 6*j**2 - 20*j - 96. Is y(-7) a composite number?
False
Suppose -10*l + 15*l - 95900 = 0. Suppose 0 = -15*s + l + 1505. Is s composite?
True
Let q(y) = 4956*y**2 - y + 10. Let n(r) = 1699*r**2 + 84*r + 7 + 1605*r**2 - 85*r. Let u(k) = -7*n(k) + 5*q(k). Is u(-1) a composite number?
True
Is 0 + (-1 - -2) - (86 + -6803) a prime number?
False
Suppose 156441 = 7*k - 124000. Is k composite?
False
Let s = 221362 + -37761. Is s a composite number?
True
Let g be (-26)/(9/(-12)*3/(-9)). Let c be 1*(-5 - g) - -1. Suppose 0 = -c*x + 103*x - 3261. Is x prime?
True
Suppose 2*b = -3*v + 122, -4 = 5*b - 3*b. Let c = 39 - v. Is c + 492 + (0 - 0/(-3)) composite?
True
Let v(d) = d + 13. Let j be v(-9). Let w be 6*((-2)/(-7))/(24/42). Suppose -j*x + 1151 = -w*x. Is x prime?
True
Suppose 39900 + 96383 = -7*g. Let r = -8254 - g. Is r prime?
False
Is (43274/(-10) + -5)/(0 + (-8)/20) composite?
False
Let k(d) = 9*d**2 - 21*d - 2*d**2 + 0 - 3*d**2 - 4. Suppose 0 = -o - 8 - 7. Is k(o) prime?
False
Suppose -3*x - 2*r - r - 90 = 0, -5*r + 160 = -5*x. Let w = 53 + x. Is -2*2/w - (-2952)/22 a prime number?
False
Suppose -2*k + 114 = -3*y - 0*k, -k + 114 = -3*y. Let x be y/247 - (-8524)/(-26). Is (0 + -1)*(x + -3) a prime number?
True
Let t = 20 - 5. Let y(j) = -10*j**2 + 16*j + 2. Let x be y(2). Let f = t - x. Is f a prime number?
False
Let c(j) = 55*j**3 + 15*j**2 + 24*j - 43. Is c(9) prime?
False
Suppose 3*o + 6 = 0, 4*m - o = 3*m + 87278. Suppose 42*j - m = 30*j. Is j composite?
True
Is (83125 - 175) + (0 - 11) prime?
True
Let p(d) = 2*d**2 - 27*d + 15. Let s be p(13). Let a be (-100)/45 - s/(-9). Let y(t) = 306*t**2 + 9*t + 5. Is y(a) prime?
False
Let u be (14 - 15)*-1*1. Let q(h) = 3594*h**2 + h. Is q(u) a composite number?
True
Let n(p) = 62*p**3 + 3*p**2 + 15*p + 3. Let f(y) = -y**2 - 2*y - 1. Let q(z) = f(z) - n(z). Is q(-3) a prime number?
False
Suppose 2*t - 4*o = 6, -27 + 18 = -4*t + 5*o. Is 80514/t - -1 - -6 a prime number?
False
Let a(l) = l**2 - 3*l - 24. Let u be a(7). Suppose 603 = c + u*h, 0 = -22*c + 17*c - 4*h + 2951. Is c prime?
True
Let w be 6/3*(-4)/(-4) + 2. Suppose 3*o = 2*k - 42959, w*k - 67146 = o + 18777. Is k prime?
True
Let g = -457 + 102. Let l = 438 + g. Is l prime?
True
Let b(l) = -2*l - 4*l**2 + 5*l**3 - 565 + 4*l**2 + 564. Let p be b(-5). Let u = p + 1011. Is u a composite number?
True
Let j = 12628 + 17701. Suppose 0 = -4*z - 9*z + j. Is z a prime number?
True
Let z be 1 - 4/3 - (-29)/87. Let a(c) be the third derivative of c**6/60 - c**5/30 + c**4/24 + 1099*c**3/6 + 2*c**2. Is a(z) composite?
True
Let a = 809594 + -245625. Is a composite?
True
Let x be ((-626)/(-2)*-34)/(-2). Let g = x + -7680. Let l = g + 3918. Is l a prime number?
True
Suppose 6361 = 4*o - 2*h - 105, -2*h = -o + 1609. Let s = o - 984. Is s a prime number?
False
Let o = 41 - -29. Let b = o + -68. Suppose b*y = 6*y - 1436. Is y composite?
False
Let v(d) = -3*d**3 - d**2 + 2*d - 12. Let t be v(-4). Suppose -i = -2*y - 456, -3*i + 1303 = 4*y - 75. Suppose i = 2*w - t. Is w composite?
False
Let y = 46914 - 22693. Is y a prime number?
False
Suppose 100 = -4*d - 0*g + 4*g, -12 = -4*g. Let q(m) = -37*m - 5. Is q(d) composite?
False
Suppose 7*j - 10*j + 73404 = 2*g, 0 = -3*g. Suppose 74*x - 70*x = j. Is x a prime number?
False
Let j be -7 - (44 - 2)/(-6). Suppose -2*u + 0*u = 3*a - 6957, 3*u = j. Is a composite?
True
Let x(m) = 3*m**2 - 41*m - 3. Let s be 46/(-4) + -2 + 60/40. Is x(s) composite?
True
Suppose -451*b + 449*b = 3*v - 73357, 0 = -2*b + 10. Is v a composite number?
True
Suppose 9*k = 3*k - 14*k. Suppose y + y - 4*q + 28 = k, -y = 5*q - 14. Is ((-2)/6)/((-13659)/(-2277) + y) prime?
False
Let v(y) = -2*y. Let z be v(-4). Suppose 7497 = -z*j + 2937. Let a = -337 - j. Is a a composite number?
False
Let q(z) = 515*z**3 - 4*z**2 - 3*z + 34. Is q(3) a prime number?
False
Suppose 55*g - 61*g + 4848 = 0. Suppose 0 = -g*n + 807*n + 15349. Is n a composite number?
False
Suppose f - 1024803 = -4*r, 10*f = 3*r + 8*f - 768583. Is r composite?
False
Suppose -109*n - 2242538 = -143*n. Is n composite?
False
Suppose 3*m + 0*m + 2*h = 119, -5*h + 122 = 3*m. Suppose 9*o = 1141 + 407. Let c = o + m. Is c a composite number?
False
Let v = 74 + -89. Let w = 20 + v. Suppose -141 = w*k - 1226. Is k prime?
False
Let h = -117 - -120. Let t be ((-2)/(-4))/((-1)/(-1862)). Suppose h*p = 10*p - t. Is p a prime number?
False
Suppose 8 = 4*x + 3*b, x - 3*b - 73 + 56 = 0. Suppose 1866 = 2*c + 178. Suppose -x*o + c = -o. Is o a composite number?
False
Let w(i) = 8367*i**2 - 381*i - 25. Is w(-13) composite?
False
Let s = -758 + 522. Let y = s - -2265. Suppose a + y = 5*t - 57, 0 = -2*t - 5*a + 829. Is t a prime number?
False
Suppose -18*w + 3 + 15 = 0. Is ((-6)/4 + w)/(6/(-10068)) composite?
False
Suppose 7*l = -205 - 33. Let u = -152 + 67. Is (-10)/u + (-56878)/l prime?
False
Let a(c) = -217393*c**2 + 3*c. Let x be a(-1). Is x/(-24) + 15/18 prime?
True
Let u(w) = 2*w - 240. Let h be u(-5). Let i = h + 567. Is i a prime number?
True
Let y be 4/(-14) - ((-491103)/63 - 12). Is y + 0 + -4 + 4 a composite number?
True
Let k = -91351 - -1697880. Is k a prime number?
True
Let b = 71 + -69. Suppose -4*l + 8 = -0*d - 3*d, l = -d + b. Suppose 2*s - 337 = -5*a, 0 = 3*a - 6*s + l*s - 197. Is a a composite number?
False
Suppose -4*x = -5*k + 1011, -1274 = 5*x + 3*k + k. Let t = 756 + x. Suppose t = -6*c + 8*c. Is c prime?
True
Suppose -3*p + 36799 = 2*b, 9*b = -3*p + 4*b + 36805. Suppose 0 = 20*z - 25*z + p. Is z a composite number?
True
Let k = 322 - 322. Suppose -4*c - 79395 - 20357 = -4*u, -u + 4*c + 24923 = k. Is u a composite number?
False
Is 293572/8*24/2 - (2 + -1) prime?
False
Let v = 699 + -699. Suppose 5*f + 20 = v, -1974 = 3*b + 4*f - 8921. Is b composite?
True
Is (-201640 + 17)/(2/4*(-5 - -3)) composite?
False
Let t = 44 + -42. Let i(n) = -211*n - 9. Let u be i(t). Let a = u - -942. Is a composite?
True
Let a = 13 - 9. Suppose 2*n - h = a*n - 2, -h = 0. Is n - 11/(33/(-1134)) a prime number?
True
Let w(a) = -a**2 - 10*a + 5. Let x be w(-11). Let f be x/9 + (-40)/(-6). Suppose -u - f*u = -3787. Is u a composite number?
False
Suppose 173272 = -53*r + 799679. Is r prime?
False
Let c = -567589 - -993192. Is c a composite number?
False
Let j(i) = 357*i**2 + 15*i + 135. Is j(-17) prime?
False
Suppose 15 = 2*s - 3*c, 5*c - 14 - 1 = 0. Is (-4 + -273)*(-11 - s) a composite number?
True
Let k = -161 + 152. Is (-1170)/(-36) - k/6 a composite number?
True
Let x be (10/(-4))/(35/(-112)). Suppose x*d - 11447 - 9401 = 0. Is d prime?
False
Let c = -73 - -40. Let y(a) = a**3 + 35*a**2 + 67*a + 39. Is y(c) a prime number?
False
Let g be (25714/3 - 2/6)*1. Suppose -2*f + 5*t + 31 = 0, 25 = -t - 4*t. Suppose 2*q - 5714 = -0*q + 3*d, -f*q - d + g = 0. Is q composite?
False
Let o(n) = -302*n - 27. Suppose -19*b + 23*b + 52 = 0. Is o(b) a prime number?
False
Let p be (9/54)/((-1)/(-18)). Suppose 3*f = -4*g + 1967, -5*g = -p*g + 2*f - 984. Is g a prime number?
True
Let k(s) = -s**3 - 57*s**2 + 501*s - 130. Is k(-69) composite?
False
Is 4 + 9/(-1) + (-1875984)/(-17) composite?
True
Let g be (132/18)/((-2)/(-3)). Suppose 68285 = 16*n - g*n. Is n composite?
True
Suppose -2*a - 3*f + 600841 - 15069 = 0, 5*f + 585788 = 2*a. Is a prime?
False
Suppose -58 = 43*z + 71. Is (56/(-48) + 1)/(z/4518) prime?
True
Let x = 15415 - 10862. Is x prime?
False
Let m be (-4)/(-10)*(-15)/(-9)*3. Suppose -3*i + 2*a + 20 = 3*a, -m*a = 5*i - 33. Suppose -135 + 7478 = i*q. Is q a prime number?
True
Let i(q) = q**3 + 14*q