 = -0*c. Is g(c) a prime number?
True
Let c(h) = 117*h**2 + 4*h - 4. Let y be c(1). Suppose -g = -4*p + 95, 0*p - 3*g - y = -5*p. Is (16/p)/(1/(6867/6)) prime?
False
Let p = 567 - 361. Suppose u + 0*k = -k + p, -3*u + 5*k = -658. Is u composite?
False
Let p = -70756 + 104099. Is p prime?
True
Let i(c) = 8*c - 152*c - 14 - 15 + 17*c. Is i(-4) a composite number?
False
Let m = 157768 + -16569. Is m composite?
False
Suppose -d + q + 8 = -0*q, -2*q = 3*d - 14. Suppose -d*f = f - 1043. Is f composite?
False
Suppose -3*k + 6 - 6 = 0. Suppose 2*q + 4*f - 6914 = k, -2*f + 6914 = 2*q + 3*f. Is q composite?
False
Let f(t) = t**3 + 8*t**2 - 8*t - 8. Let v be f(-8). Let j = -58 + v. Is 6 + -3 - (j - 444) prime?
True
Let w(r) = 25*r**2 + 25*r - 27. Suppose 5*y - 51 = 3*z + 83, 2*z + 6 = 0. Is w(y) a prime number?
True
Suppose -3*z - 3*r = -11619 - 46206, -2*r = -2*z + 38546. Let y = z - 12161. Is y composite?
True
Let u = 1 + -3. Let n(l) = 226*l + 1. Let c be n(u). Let t = c - -992. Is t prime?
True
Suppose 23 = 2*z + 9. Suppose -5*d = -4*h - z, -2*d = 2*d - 2*h - 2. Is (1139*d)/(11 - 12) prime?
False
Let d(y) = 6321*y + 32. Suppose -4*r + 9 = -5*h, h + 16 = 3*r + 12. Is d(r) a prime number?
True
Suppose 8*c - 9*c = -133. Let h = 1434 + c. Is h composite?
False
Suppose 2*c + 4*p - 1052062 = 0, 2*c = -54*p + 55*p + 1052052. Is c composite?
False
Let a be (-21)/7 - (-24)/1. Suppose 0 = -5*o + a - 1. Suppose 0 = -o*n + 2*g - g + 711, -g = 3*n - 528. Is n a composite number?
True
Let c be -5*((-4)/18 + 138/135). Let z be -1893*c/6*(-6)/4. Is ((-9)/27)/(1/z) prime?
True
Let v be 2 + (-28)/(-12) + (-3)/9. Suppose -2*j - 2*j = -3*r - 2366, v*r = -2*j + 1172. Suppose -905 - j = -5*k. Is k a prime number?
False
Let z(g) = 20*g**2 - 14*g - 225. Is z(26) a prime number?
False
Let f(a) = 12*a**2 - 59*a - 28. Let p = 264 + -247. Is f(p) composite?
False
Let o(l) = l**3 - 5*l**2 - 23. Let u be o(6). Suppose 16*w = u*w + 2841. Is w composite?
False
Suppose -4*f - 20 = v - 2*v, -2*v - f - 5 = 0. Suppose 4*m - m - 22921 = -5*b, v = m - 2. Is b prime?
True
Suppose -5*m - 9 - 4 = u, -5*m + 2 = -4*u. Let h be (2 + 1)*8/(-6). Is 59 - (h/6)/(2/u) prime?
False
Let i(w) be the second derivative of 62*w**3/3 - 75*w**2/2 + 23*w. Is i(6) prime?
False
Suppose -2*n + 104999 = 3*o, -n + 52498 = -7*o + 10*o. Is n composite?
False
Let y(i) be the first derivative of 2707*i**3/3 + 2*i**2 - 4*i + 95. Is y(1) prime?
True
Suppose -p + 92 = 4*l, -p + 3*l - 174 = -3*p. Let t be 3880/(-80) - 6/(-4). Let b = t + p. Is b composite?
False
Let i = 3982 + -2674. Let c = 2497 - i. Is c a prime number?
False
Let p be ((-67314)/65)/(6/(-105)). Suppose -6*h - p = -13*h. Is h composite?
True
Let h(i) = 2009*i**3 + i**2 + 23*i - 12. Let g be h(6). Is ((-2)/(-4))/((-3)/g*-9) a composite number?
False
Let l(a) = 6174*a - 181. Is l(5) composite?
False
Suppose -3*a + 234 = -2*a. Let p = a - -457. Is p prime?
True
Let c(k) = 129*k. Let u(m) = -m - 1. Let d(i) = -3*c(i) + 6*u(i). Let z be d(2). Is (-2044296)/z + (4/(-22))/1 prime?
False
Let x(a) be the third derivative of -17*a**5/3 + a**4/12 + 2*a**3/3 - 12*a**2. Let u be x(-4). Is 2*u/(-16)*-1*-2 prime?
True
Suppose 8*v + 657855 = 19*v - 1289684. Is v prime?
False
Let p = -15 - -14. Let j(y) = -3*y**3 - 1. Let m be j(p). Is (10/(-15))/(m/(-795)) a composite number?
True
Suppose 0 = 10*z + 35*z - 214962 - 4206333. Is z a composite number?
False
Let z(q) = 16*q + 709. Let f(v) = v**3 + 2*v**2 - v - 2. Let r be f(-1). Is z(r) a composite number?
False
Let s(u) = -2586*u**2. Let n be s(1). Let o = n - -5743. Suppose -2*p - 4*h = -1282, -5*p + o = -0*h - 2*h. Is p composite?
True
Let c be -38 + (1*-4 - -3 - 2). Let x = 37 + c. Is 1061 + ((-16)/x - 4) prime?
True
Let s(i) = 1906*i**3 - 2*i**2 + 52*i - 6. Is s(5) composite?
True
Suppose 34*x = 19*x + 30. Is (-4)/28*x + (-137945)/(-35) composite?
True
Let a(q) = 1963*q**2 - 66*q + 379. Is a(8) a prime number?
False
Let w be (-92)/(-16) + -2 - 2/(-8). Is (-8)/20*((-18010)/w)/1 a composite number?
False
Let p(c) = 3571*c**3 + c**2 - 6*c - 1. Let m(s) = -1785*s**3 - s**2 + 3*s + 1. Let d(j) = -5*m(j) - 2*p(j). Is d(2) composite?
True
Suppose -88*u + 3*m - 1059077 = -93*u, -847246 = -4*u - 5*m. Is u prime?
False
Let x = -230672 + 348771. Is x a composite number?
True
Let y be (-46)/(-16) - (-3)/24. Suppose o = -4 - y. Is 1405*(21/(-5))/o prime?
False
Suppose -u + 1 = -0*u. Let k(d) = 239*d**3 + 2*d**2 + 2*d - 3. Let i(c) = 239*c**3 + 3*c**2 + 3*c - 4. Let p(w) = -3*i(w) + 4*k(w). Is p(u) a composite number?
True
Suppose -5 + 1 = -2*h + t, 2*t = -2*h + 16. Suppose -5*z = -3*z - 6. Suppose -z*a = o - 190, h = -a + 1. Is o prime?
True
Let q(r) = 2*r + 68. Let w be q(-18). Suppose 35*l = w*l + 6693. Is l prime?
False
Let x(n) = n**3 - 6*n**2 + 9*n - 8. Let w be x(5). Suppose 6305 = a + w*a. Is a composite?
True
Suppose -701 = -2*m - 691. Let d(v) = 2375*v - 142. Is d(m) a composite number?
True
Let o = 2029 - 1191. Suppose o = -s + 6717. Let t = 8832 - s. Is t composite?
False
Let p = 533561 + -350892. Is p composite?
True
Is 32624703/162 - (-28)/(-504) a composite number?
True
Let h = -57386 + 106593. Suppose -13493 = 14*s - h. Is s a composite number?
False
Let t = 20072 + -7992. Suppose 7*f - 64499 + 21830 = 4*g, 3*f - 18291 = g. Let o = t - f. Is o a composite number?
False
Suppose -21*p = 5*p - 182. Suppose -p*z + 45981 = -8542. Is z a composite number?
False
Suppose -3*n = -11*n - 256. Is (24788/16)/((-8)/n) a composite number?
False
Let j(f) = 3*f**3 + 8*f**2 - 7*f + 13. Suppose -354 = -6*b - 0*b. Let a = -54 + b. Is j(a) a prime number?
False
Let o = -114 - -1039. Suppose f - o = -4*f. Suppose 4*l - t = -0*l + f, l - 47 = t. Is l prime?
False
Let o = 79 + -44. Let w(u) = o + 28 + 320*u - 58. Is w(4) composite?
True
Let f = 156 - 153. Is 1184 + 24/(-2)*f/(-12) a composite number?
False
Let z = -245918 - -396723. Is z prime?
False
Suppose -5*k + 2*p - 16 = 14, 2*k + 5*p = 17. Let t(h) = -18*h**3 - 8*h**2 - 8*h - 14. Is t(k) composite?
True
Suppose -4*h = -4*g - 733349 + 36145, 0 = -5*g. Is h prime?
False
Let d(n) = 110957*n**2 - 6*n. Is d(-1) a composite number?
True
Suppose 1 - 37 = 6*v. Let g be (-2)/(-17) + (-555)/(-51) + v. Suppose t = g, -4*t = 6*h - 2*h - 328. Is h a prime number?
False
Let i = -183 + 283. Suppose -4*f - i = -96. Is (f - (0 - (-3)/(-6)))*-2674 prime?
False
Let g = 537 + -533. Is (-3768369)/(-495) + g/30 prime?
False
Let m be (-22)/88 - 837/(-12)*-1. Is 1/(-5) + (-89124)/m a composite number?
True
Let c = 109181 - -70098. Is c a prime number?
False
Let d(p) = 2*p - 10. Let x be d(8). Let u(m) = -m**2 + 8*m - 13. Let l be u(x). Is (l + 2)*2/2 - -264 composite?
True
Let i(z) = -2*z - 10. Let g be i(-5). Suppose 0 = -m, g*o + 2*m + 35 = 5*o. Suppose o*j = 3*j + 284. Is j a prime number?
True
Let p be 2/2 + (38 - 34). Suppose -2*r + 6791 = k - 2652, -p*r + 23610 = 5*k. Is r a composite number?
False
Let g(p) = p**3 + 7*p**2 + 15*p + 17. Let y be g(-14). Let b = y + 2689. Suppose b = 9*h - 181. Is h a prime number?
False
Suppose -4*h + 5*r + 31161 = 0, 18474 - 2901 = 2*h + 5*r. Is h prime?
True
Suppose 3*p - 28602 = -5*t, 5*t - 2*t + 47704 = 5*p. Suppose -3*y + p = j, -2*y = 4*j + 3*y - 38142. Is j prime?
True
Suppose 0 = 172*p - 3792 - 3948. Let w = 36 - 60. Is (-534)/w*(-1 + p) a composite number?
True
Let i(x) = -x**3 - x**2 + 9*x + 14. Let j be i(-4). Let l = j - 10. Suppose 13*z - l*z = -753. Is z prime?
True
Let r = 10 - 31. Let a = r - -25. Suppose y = -a*y + 1265. Is y composite?
True
Let l = -9675 - -48380. Is l prime?
False
Is (-33*2/(-12))/((-11)/(-223102)) a prime number?
False
Suppose 0 = 2*l + 14*z - 17*z - 33634, 4*l - 5*z = 67268. Is l a composite number?
True
Let f(i) = -i**3 - 6*i**2 - 8*i + 3. Let c be f(-4). Suppose -2233 = -2*w - c*d, -2*d - 28 = -w + 1071. Is w a composite number?
False
Suppose -f + 4*o = -0*o - 18, -2*o = -2*f + 6. Is f - -6 - (-2 + -2927) prime?
False
Suppose 2*g - 5*w - 9 = -2, 8 = 2*g - 4*w. Is (-4)/6 - (-46330)/g prime?
False
Suppose 4*a = 10 + 6. Let i(m) = -553*m + 3. Let j(w) = -276*w + 2. Let h(d) = -3*i(d) + 5*j(d). Is h(a) composite?
False
Let p = -316 + 388. Suppose 53912 = 80*f - p*f. Is f prime?
False
Suppose -2*z = -2*d + 4, 2*d = -0*d - 2*z. 