y**2 - 8*y - 79. Is p(8) a composite number?
False
Let w(a) = a**3 - 6*a**2 - 13*a + 10. Let s be w(16). Let o = s - -801. Is o prime?
True
Suppose 4*r + 29256 + 35676 = 0. Is (56/(-12))/(14/r) composite?
True
Let i(r) = r**2 - 8*r - 7. Let f be i(7). Let h = f + 12. Let n = 12 - h. Is n prime?
False
Let o(u) = u**3 - 4*u**2 + 4*u. Let c be o(5). Let j = c + -8. Suppose -9 + j = 2*t. Is t a prime number?
False
Let h(p) = p**3 + 50*p**2 + 28*p + 68. Is h(-35) prime?
False
Let j be -4 + (3 - 3) + 2. Is ((-15)/30)/(j/3260) a prime number?
False
Let d(t) = 20*t**2 - 25*t + 25. Is d(-12) composite?
True
Let o(k) = 71*k - 36. Let m be 2/2*(-4)/(-16)*44. Is o(m) a prime number?
False
Let r = 156 - 94. Suppose -i - r = -3*m - 20, -4*i = -5*m + 77. Is m composite?
False
Let z(j) = -j**2 + 12*j + 15. Let k be z(9). Suppose -41*u = -k*u + 337. Is u a prime number?
True
Suppose -40 = -o - 3*o. Suppose -4*t = 4*g - 2660, 5*t + 3341 = o*t - 3*g. Is t a prime number?
False
Let q(v) = -843*v + 52. Is q(-5) prime?
False
Suppose 9*m + 191865 = 24*m. Is m composite?
False
Let b(o) = 3*o**2 - 9*o + 3. Is b(-23) composite?
True
Suppose -3*q + 26145 = 3*x, -35*q - 12 = -32*q. Is x a prime number?
True
Suppose -2*m = -2*r + 122694, 4*r = 5*m + 51576 + 193816. Is r a prime number?
True
Suppose -3*y = -3*z + 84, -5*z + 0*z + 40 = -y. Let a = -23 - y. Is (412/(-16))/(a/(-8)) a prime number?
True
Let g(a) = -a**3 - a**2 - 2*a. Let s be -10*2/8*2. Let d be g(s). Suppose -3*l - 64 = -v, -4*l + d = 3*v - 43. Is v composite?
True
Let k(y) = 70*y**3 + y - 1. Let n be k(1). Let a be (104/(-10))/(14/n). Is 18*a/(-6) - -1 a prime number?
True
Suppose -17*j = -10*j - 4109. Is j a composite number?
False
Let o = 26 - 23. Suppose -h + o*h = 6338. Suppose -3*w + x + 1902 = 0, w - 6*w + 2*x + h = 0. Is w prime?
False
Let t = 42524 + -28015. Is t composite?
True
Suppose -4*c - 5*g + 0*g + 5869 = 0, -g = -4*c + 5839. Suppose -3*k = 5*z - 4383, -4*z + 3*z + c = k. Is k a composite number?
True
Let x(f) = 4 + 487*f + 4 - 6. Is x(5) a prime number?
True
Suppose -o + 1200 = q + 281, 0 = 3*o - 3*q - 2787. Suppose 5*m = 2*m + o. Suppose n - m = -v - 0*v, -3*v + 1538 = 5*n. Is n composite?
False
Let i = -3994 - -16943. Is i composite?
True
Suppose 0 = -143*v + 110*v + 464673. Is v composite?
False
Let z(a) = 231*a - 3. Let h(y) = -230*y + 3. Let v(j) = -3*h(j) - 4*z(j). Is v(-2) prime?
False
Let p(f) = 336*f + 9. Let y be (-58)/(-18) - 4/18. Let t be p(y). Suppose 2*w - 4*i = 678, -i = -3*w - 4*i + t. Is w a prime number?
False
Let b(c) = -5 + 1 - 2 - 4 + 23*c. Let p be b(4). Let j = p + -17. Is j a prime number?
False
Let j(s) = 42*s**2 - 8*s + 27. Is j(5) a composite number?
True
Let i be 5*-3*1145/(-15). Let w = -103 + i. Is w prime?
False
Let k(c) = 87*c**2 - 8*c + 64. Is k(9) composite?
False
Let y be (1 - -1 - 2) + 0. Suppose y = 4*q + 2*m - 166, 3*q - 220 = -2*q - 5*m. Suppose -k + 58 = -q. Is k a composite number?
False
Let o = 23 - 29. Let h be (o/(-2))/(18/12). Suppose h*y - 996 = -2*y. Is y a composite number?
True
Let l be (-5 - (0 - -1))*(-3374)/28. Let m = l - 512. Is m composite?
False
Let i(l) = 3*l**3 - 4*l**2 + 7*l + 7. Let s(p) = -p**3 + 15*p**2 + 16*p - 3. Let m be s(16). Let h = 9 + m. Is i(h) composite?
True
Is 1 + 2 - (-3 - (-25132)/(-4)) a prime number?
False
Suppose -4*u = -5*q + 25, -5*q = -5*u - 31 + 6. Is (-2 + -2 + q)*157 a prime number?
True
Suppose 3*v + 3*r = 186987, 100*r - 104*r + 8 = 0. Is v prime?
True
Suppose 3*h + 2*z = 25, 2*z + 5 = 5*h - 2*z. Suppose -358 = -h*u + 107. Is u a prime number?
False
Let g(f) = -59*f + 1. Let l be g(-1). Let b = -417 - -570. Let i = b - l. Is i a prime number?
False
Let q(l) = 14*l**2 + 4*l + 3. Let s = 3 - -1. Suppose 0*x + 16 = -s*x. Is q(x) a composite number?
False
Let m(h) = 10*h**3 + 3*h**2 - 2*h - 3. Let c be m(-3). Let x = c - -381. Is x a composite number?
True
Is ((-82)/(-8))/((-7)/(-476)) a prime number?
False
Suppose 0 = n - 2*d - 1217, -n + 6*n + 3*d - 6085 = 0. Is n composite?
False
Suppose -8*u - 6 = -5*u, 3*h = -5*u - 4. Let a(w) = -10 - 3*w**h + 0*w + w**2 + 3*w**2 + 2*w. Is a(7) a composite number?
False
Suppose -498*w + 499*w = 9287. Is w a composite number?
True
Suppose 0 = s - 1 + 16. Let t = s + 31. Suppose 2*l = -3*r + 86, -l - 5*r + 13 = -t. Is l composite?
True
Let a(t) = -t**3 - 5*t**2 + 6*t. Let w be a(-6). Suppose -c + 350 = -0*c + 3*j, w = 5*c + j - 1708. Is c a prime number?
False
Let l be ((-10)/30)/((-2)/(-6114)). Let v = -537 - l. Is v composite?
True
Let b be (-4)/14 - (-68706)/77. Suppose b = 5*k - 103. Is k composite?
False
Suppose 9*i - 6*i = 12996. Let z = -3013 + i. Is z composite?
False
Is (4/12 - 4/3)*-12611 composite?
False
Let j(y) = 0*y**2 + y**2 - 6 + 0 + 2. Let q be j(-3). Suppose -4*i = q*n - 2151, -4*i = -19 + 3. Is n a composite number?
True
Let z(d) = -3*d + 4. Let t be z(0). Suppose c - 547 = -4*c - 2*s, -t*c + 2*s = -452. Is c composite?
True
Let x(u) = 8*u + 2. Let d be x(4). Suppose -15*g + 10*g = -15. Is (d/g)/((-8)/(-36)) composite?
True
Let r(i) = i**3 + 5*i**2 - 5*i + 8. Let x be r(-6). Suppose 0 = -4*a - x*g + 268 + 220, 5*a = -4*g + 613. Is a/(-2)*(5 - 7) a composite number?
True
Suppose -16*y + 5*y = -1892. Let z = 0 + 3. Suppose 0 = t + z*t - y. Is t a composite number?
False
Let c = -23 - -38. Is c composite?
True
Let s be (-14)/(-105) + 874/(-30). Let q = s - -54. Is q a prime number?
False
Let q = -2251 + 3930. Is q composite?
True
Let l = -5535 + 7868. Is l composite?
False
Let h(j) = 225*j**2 - 21*j + 1. Is h(-5) prime?
False
Suppose 67 + 158 = z. Suppose -a - a + 5*j = 75, 4*a + 5*j + z = 0. Let x = a - -209. Is x composite?
True
Let d be 8/2 + 683 + -23. Suppose -3*n = -329 - d. Is n a prime number?
True
Let p(k) = 134*k**2 - 49*k + 15. Is p(7) a prime number?
False
Suppose -3*f = 4*q - 23, f + 2*q - 6 = 3. Suppose 0 = -2*s - n + 4292, 0 = f*s - 5*n + 291 - 11036. Is s composite?
True
Suppose -8 = 6*t + 4. Is 2361/(-2)*(-1)/((-3)/t) a composite number?
False
Suppose -5*g + 3306 + 134 = 0. Let h = g - 486. Suppose 2*t + 3*q = h, 2*t - q - 52 = 134. Is t composite?
True
Let r = 3759 + 6332. Is r prime?
True
Suppose 2 = 6*j - 4*j. Is (4 - j) + -2 + 372 composite?
False
Let m = 21 - 27. Let k be -4 + (-3)/(m/4). Is 63/42 + (-11)/k a prime number?
True
Let z(c) = -3*c + 7. Suppose 9 = -3*k + 21. Let g be (-34)/k + (-1)/2. Is z(g) a prime number?
False
Let b = -21644 - -32163. Is b a prime number?
False
Let b(s) = 230*s**2 - 61*s + 29. Is b(-24) a composite number?
True
Is 25 + -17 - -47*591 composite?
True
Let p(w) = w. Suppose l = a + 3, 2*l - 5*a - 19 = l. Let m(h) = 2*h - 7. Let i(x) = l*m(x) - 2*p(x). Is i(-9) a composite number?
False
Let m be (2/(-2))/((-2)/(-1 + 459)). Suppose 0 = 3*g - m + 52. Is g composite?
False
Let m(y) = y**2 + y - 5. Suppose -2*k + 5*c + 1 = -5, -4*k = -2*c + 20. Let t be m(k). Suppose -6*z + t = -5*z. Is z prime?
True
Let s(w) = 227*w**3 + 7*w**2 + 6*w - 21. Is s(5) prime?
True
Let w be 28/2 + 6/2. Suppose -w*v + 14*v + 381 = 0. Is v composite?
False
Let y be 2 + -4 + 4 + 31. Suppose -o + 22 = -d - 0*o, 0 = -d - 3*o - 14. Let m = y + d. Is m prime?
True
Suppose -i - 38349 = -4*c, -6*c = -11*c - 2*i + 47933. Is c composite?
False
Let o(b) = 708*b + 87. Is o(30) a composite number?
True
Let x(c) = 17*c**2 - 4*c + 1. Let a be x(-2). Let n = a + -26. Is n a composite number?
True
Let s(w) be the third derivative of -21*w**4/8 - w**3/2 - 11*w**2. Is s(-2) a prime number?
False
Let d(q) = -113*q + 46. Is d(-15) composite?
False
Is 46902/(-12)*20/(-10) a prime number?
True
Let x be (-7)/(14/(-1780)) - (-5 - -3). Suppose 0*h + x = 4*h. Is h a composite number?
False
Let h = -66 + 59. Let j(c) = -215*c + 38. Is j(h) a composite number?
False
Let m = 1584 + -1130. Is m prime?
False
Let s(p) = p**3 - 21*p**2 + 18*p - 47. Is s(25) prime?
True
Suppose -12*f - 5*f + 141899 = 0. Is f a composite number?
True
Let v = 67 + -65. Is ((v - -1)*-1)/((-9)/6609) a prime number?
True
Suppose 33*i = 4*g + 36*i - 10891, 0 = -4*g - 2*i + 10886. Is g composite?
False
Suppose -6*r + 4*r + 2912 = 0. Suppose -4*z = -2892 - r. Is z composite?
False
Let i(d) = -905*d - 27. Is i(-6) composite?
True
Suppose 0*v - 2 = -v. Suppose -4*c = x, 4*c = 3*x - 14 - v. 