). Suppose 343 = -s*a - 2*k + 1073, 0 = -2*a + 3*k + 750. Suppose 4*n + a = 1429. Is n a prime number?
False
Let m be (2/2)/((-7)/(-7) - 2). Let i be (-41238)/24 + 3/12. Is 3/(m/(i/6)) a composite number?
False
Suppose -g - 4*k = -0*k - 2, 4*k = g - 18. Let l be (-2)/g - 279/(-45). Suppose 25030 = l*v + 4*v. Is v a prime number?
True
Let c(w) = 3*w**2 - 38*w + 22. Let i be c(12). Is -1*i/2 + (1 - -953) prime?
False
Let i(k) be the first derivative of 6*k + 9 + 0*k**2 + 13/3*k**3. Is i(-9) a prime number?
False
Suppose 2*g - 7848 = -2*g. Let x(a) = -2*a**2 + 15*a - 21. Let f be x(5). Suppose -646 = -s - 3*z, 0 = -s + f*s + z - g. Is s prime?
False
Suppose -69 = 9*m - 5*m + 5*y, m + 5*y + 21 = 0. Let v(r) = 6*r**2 + 6*r - 25. Is v(m) prime?
False
Let u(r) = 11*r**3 - r**2 + 2*r + 2. Let x be u(-1). Let s = 12 + x. Is (s + -2)*1 + 1975 prime?
True
Let k = 0 - -5. Suppose 0 = -12*o + 7 + k. Suppose 3*s - 264 - 146 = -t, -o = s. Is t a composite number?
True
Suppose -14816153 = -19*v - 5692068. Is v composite?
True
Suppose 2*s = -2*k + 12, -k = 4*k + 15. Suppose s*q - 2*q = 357. Suppose 38 + q = l. Is l composite?
False
Let w(j) = 2*j + 8. Let g be w(-2). Suppose u - 7 = 5*d, 3*u = 2*u + 2*d + g. Suppose 6 = u*x, 3*x + 2820 = 5*v - 416. Is v composite?
True
Let q(w) = -w**2 - 6*w - 2. Let m be q(-4). Suppose -1 = 5*j + 5*f - 36, 0 = 2*f - m. Suppose -4*o = j*p - 2332, 5*p = 4*o - 1525 - 843. Is o composite?
False
Let m(r) = r**3 + 5*r**2 + 4*r - 1. Let o be m(-2). Suppose 0 = -5*y + 2*y + 159. Suppose -o*q + 4*q = y. Is q composite?
False
Let w = -117 + 122. Suppose -w*f + 20432 = -3*u + 2242, 4*u - 18225 = -5*f. Is f a prime number?
False
Suppose 7*b + 3*b = 0. Suppose 0 = 3*o, b = -5*u + 9*o - 5*o + 12035. Is u a composite number?
True
Let n be 5 - 6/3 - -1. Let z(i) be the first derivative of 11*i**4/4 - 7*i**3/3 + 3*i**2/2 + 9*i - 192. Is z(n) prime?
True
Suppose -55 + 19 = 3*l. Let n = 12 + l. Suppose 0*t + t - 106 = n. Is t prime?
False
Let g be -3 + (-8)/(24/(-9)). Suppose g = 15*t - 22*t + 1043. Is t a composite number?
False
Let s = -3121 + 11943. Suppose s = 3*o + 1565. Is o prime?
False
Let l = 16 + 8. Suppose -18*n - 2 = s - 17*n, 5*s + 4 = -2*n. Suppose s = -l*v + 17*v + 581. Is v a prime number?
True
Let g(j) = -2*j**3 - 19*j**2 - 8*j + 4. Let d be g(-9). Let v(i) = -60*i**3 + 8*i**2 + 14*i + 9. Is v(d) a composite number?
False
Let u be ((-12)/10)/(39/(-65)). Suppose -w + 3*a = -2*w + 2424, a = u*w - 4855. Is w a prime number?
False
Suppose -l - 2*w = -83777, -3*l + 30*w - 33*w + 251319 = 0. Suppose -l = -11*i - 10*i. Is i a prime number?
True
Let d(a) = 4*a**2 + 4*a + 15. Let f be d(-7). Let j be (-4)/2 + (-39)/(-3). Let w = f + j. Is w composite?
True
Suppose -37 = -3*j + 2*s, -5*j + 22 + 3 = 4*s. Suppose -j*d + 14 = -4. Let g(q) = 367*q + 5. Is g(d) a prime number?
True
Is ((-399678)/(-232))/((-502)/(-2360) - (-2)/(-10)) a composite number?
True
Let g = 127 - 71. Let r = 90 - g. Suppose -r*s = -29*s - 15325. Is s prime?
False
Let o(w) = -w**2 - 11*w - 5. Let q(f) = 2 - f**2 - 64*f - 7 + 52*f. Let b(g) = -7*o(g) + 6*q(g). Is b(-7) a composite number?
False
Let z be 27 - 1*((9 - 7) + -3). Suppose -5*t + 69 = -2*t. Suppose -t*r + z*r = 6905. Is r a prime number?
True
Let t(q) = 133*q**2 - 328*q - 85. Is t(32) a composite number?
True
Suppose 173*i = -5*m + 178*i + 166965, 0 = -m - 5*i + 33381. Is m a composite number?
False
Let s = 240215 + 176934. Suppose 18*f = s - 81251. Is f composite?
False
Suppose 0 = -z - 2, 4*n - 327220 = -2*z - 0*z. Suppose 2*r = 2*l + 5*r - n, 3*l - 122703 = -3*r. Is l composite?
False
Let i = -36990 - -60329. Is i prime?
True
Suppose -22*n - 72 = -4*n. Is (-17570)/15*6/n a prime number?
False
Let z be (-4)/4*2 - -6. Suppose 5*m = -z*t + 4648, -5*t + 0*t = -4*m + 3743. Suppose -m - 787 = -9*g. Is g prime?
True
Let b(o) = -4*o**3 - 3*o**2 + o + 7. Let d be (-6)/(5/(25/10)). Let h be b(d). Let u = h + -27. Is u a composite number?
True
Suppose -20*k - 2*r + 50830 = -16*k, 2*k - 4*r = 25410. Is k prime?
False
Let i be 95/(-76) - (-43506)/8. Suppose 0 = -3*v - i + 21742. Is v prime?
False
Let g(i) = 2*i**3 - 15*i**2 - 2*i + 29. Let z be g(10). Suppose 11*u = 4*o + 6*u - 1021, 0 = 2*o - u - z. Is o a composite number?
True
Suppose -89 = 2*m - 103. Let q(p) = -8 - 2 - 6 - m + 112*p. Is q(9) prime?
False
Suppose 1736*v + 20419002 = 1754*v. Is v a prime number?
True
Let d(y) = -y**3 - 37*y**2 - 4*y - 130. Let g be d(-37). Suppose 81930 = g*n + 15096. Is n prime?
False
Suppose -p + 39126 = 5*z + 2*p, -15 = 5*p. Is z prime?
False
Let y(o) = -9649*o + 6299. Is y(-80) a prime number?
False
Suppose 0 = 2*j + t - 1241, -5*t + 0*t = -3*j + 1842. Let o be 8 - (-8868)/(-30) - 2/5. Let y = o + j. Is y prime?
True
Suppose 12 = 3*s - 4*v + 2*v, 2*s - 8 = 3*v. Suppose -3*z + 32093 = 5*r, 7*r = s*r - 3*z + 19251. Is r prime?
True
Suppose -q - 2*s - 9 = -5*s, -4*q = -3*s. Is ((-26521)/q)/(-11)*(2 - -1) a composite number?
False
Suppose -5*y = 2*g - 64113, 4*y + g - 2*g = 51293. Suppose y = 4*r - 1549. Is r a prime number?
True
Let i(z) = 1866*z + 21. Let n be i(9). Suppose 25*c - n = 10*c. Is c a prime number?
False
Suppose 3*x + 5*m = 3 + 3, -2*m = 6. Let n(k) = -6*k + 2*k + 21 + 8*k**2 + x*k. Is n(-6) a composite number?
True
Let i(v) = 83*v**2 + 22. Let w be i(5). Suppose 2*h - w = 5*u, 12*u - 8*u = -5*h + 5193. Is h composite?
True
Let i(k) = -13*k - 208. Let b be i(-11). Is (-4)/(-26) - (547290/b - -1) a prime number?
True
Let q be (7 + (-2 - 1))*1. Let u(h) = -140*h - 2. Let g be u(-4). Suppose d - j - 139 = 0, -q*d - 3*j + g = -6*j. Is d composite?
True
Let t = -180086 + 335133. Is t a composite number?
False
Suppose -2*n - n + 10 = -r, 4*n - 4*r = 24. Suppose -3*k - 11878 = -4*y, -n*k + 11886 = 4*y - k. Is y a composite number?
False
Let m = 64 - 75. Let h be 996/(-2)*(858/(-12))/m. Let w = h + 8332. Is w composite?
True
Suppose 0 = 5*p + 44 - 34. Let t be -18*-141*(3/p + 2). Suppose -2*n + 540 = -w - t, 0 = 4*n + w - 3633. Is n composite?
False
Suppose 5937*w - 5938*w + 224027 = 0. Is w composite?
False
Let p be (24/(-16))/(1/2). Is (3806 - p) + (-8 - -4) composite?
True
Let j(p) = 2 + 0 - 7 - 2*p. Let f = 471 - 478. Is j(f) composite?
True
Let u = -42 - -45. Suppose 3*a = -2*k + 4089, 0*a - u*k - 2726 = -2*a. Is a prime?
False
Suppose 0 = u - 6583 - 21893. Suppose 4*l + 4*n - u = 0, -3761 = -4*l - 2*n + 24719. Is l composite?
False
Let t(c) = c**2 + 22*c + 27. Let i = -58 + 37. Let g be t(i). Is (2/2)/3 + 2656/g prime?
True
Let s(v) be the first derivative of 9*v**3 - 9*v**2/2 - 9*v - 13. Let u be s(10). Let c = u - 946. Is c a composite number?
True
Let o(t) = -483*t**2 - 3*t + 9. Let j(a) = 242*a**2 + a - 5. Let k(c) = -7*j(c) - 4*o(c). Is k(-4) a prime number?
False
Suppose 43*o = 40*o + 459. Let i = o - 77. Is i + 2*(-4 + 3) a composite number?
True
Let j be (-44)/(-7) + (-2)/7. Is 479*(j + (-3 - 2)) a prime number?
True
Suppose k - 40402 = 4*o, -2*o - 109205 = -2*k - 28419. Suppose -23*j = -k - 16029. Is j a composite number?
True
Let w = 107453 + 9548. Is w a prime number?
False
Let l be ((-4)/14)/(5/(-35)). Is (l/3)/((-94)/(-601365)) a prime number?
False
Is (547558/(-5))/(57/(10260/(-72))) composite?
True
Suppose -11*s = 3*s - 56. Suppose -3*u + 4*l = -2105, -68 = 2*u + s*l - 1478. Is u a prime number?
False
Let k(b) = -b**2 + 16*b + 18. Let w be k(17). Is -2 - ((w - 2657) + 1) composite?
True
Let w be 32298 + ((-35)/(-10) - 4)*4. Suppose -4*v = -w - 3188. Is v a composite number?
True
Is ((-2230)/5)/(4/(-1306)) a composite number?
True
Let g(t) = 8*t**2 + 11*t**2 - 16 - 3*t + 8 + 4. Let j be g(-2). Suppose -2*a + j = n - 3*a, n = -a + 76. Is n a composite number?
True
Let b(h) = 2*h**3 - 2*h**2 + 6*h - 3. Let v = 79 + -77. Let i be b(v). Suppose -3520 = i*r - 10473. Is r prime?
True
Suppose 0 = 58*w - 17062984 - 44930490. Is w a prime number?
False
Let l(k) = -1 + 0 - 51*k + 2 + 433*k. Let i be l(-2). Let u = -360 - i. Is u prime?
False
Suppose -8*s + 95887 = -5*h, -29*h + 24*h + 35992 = 3*s. Is s a composite number?
True
Let y = 380490 - -506291. Is y a composite number?
True
Let z = 192911 + 73752. Is z a composite number?
False
Let u be 11970 - 2/(-4)*10. Suppose -2*t - 2*v + 4790 = 3*v, u = 5*t + 5*v. 