 2*c(w). Is j(-4) a composite number?
False
Suppose -3*w + 297 = -x - 146, 2*w - 278 = 5*x. Is w a prime number?
True
Let r = 12 - 21. Let v be ((-114)/(-8))/(r/(-24)). Suppose -8 + v = 5*y - 2*s, -5*y = 2*s - 30. Is y a composite number?
True
Let r be (-6 - -5)/(1/1). Let k = -38 + 44. Is (-10*339/k)/r prime?
False
Let f = 0 + 7. Let y(m) = m**2 - 5*m - 10. Let i be y(f). Is -332*(i - (-51)/(-12)) prime?
True
Suppose 0 = -0*j - j + 2. Let l be (6 + -6)*j/(-4). Suppose l*m + 4*n + 4596 = 4*m, 2*m = 3*n + 2296. Is m a composite number?
False
Suppose 2*d = 2*r + 636, 0 = 13*d - 11*d + 4*r - 642. Is d prime?
False
Suppose -4*n = -2*g + 618, -4*g + g = n - 892. Suppose 3*q = -z + g, 5*z - 1716 = -q - 221. Is z prime?
False
Suppose 4*r - 2*z - 28 = 0, -2*r + 5*r = -4*z - 1. Suppose -3*l - 2*l = -v - 38, 0 = -4*l + r*v + 43. Is l a composite number?
False
Let a = 333 - -3403. Suppose -4*l = 3*q + 1172 - a, -1923 = -3*l - 3*q. Is l a prime number?
True
Let k = -1226 + 5299. Is k prime?
True
Let z = 7 + -4. Suppose f - 4*f = -15, 32 = 4*w + 4*f. Suppose 0 = -3*b - b - d + 12066, w*d + 9057 = z*b. Is b a prime number?
False
Suppose 4*v + 4*y - 667 - 42645 = 0, 3*v - 32481 = -4*y. Is v a composite number?
False
Let b = -658 + 3120. Is b a prime number?
False
Let y be ((-3)/9)/((-2)/(-174)). Let x = y - -133. Suppose -75 = -2*c + a + x, -c - 5*a = -84. Is c a composite number?
False
Suppose -5*d = -5*z - 322917 - 676643, -5*z + 5 = 0. Is d a composite number?
True
Suppose o + 56 = -49. Let m = 116 - o. Is m a prime number?
False
Let f = -809 - -1646. Suppose 4*z + 3364 = 4*i, i + 2*z - f = 5*z. Is i composite?
True
Let a be 78/52*((-62)/(-3) + 0). Suppose 28*m - a*m + 201 = 0. Is m a composite number?
False
Let y be 12/4 + 0 - -17. Suppose y + 17 = 4*w - 5*h, -2*h = -4*w + 46. Is (-17)/(-2)*52/w a prime number?
False
Let n be 106/8 - 5/20. Let j = n + 15. Let r = j - 17. Is r composite?
False
Let u(c) = c**2 - 3*c + 4. Let h be u(2). Suppose 0*q - 2 = -h*q. Let k(x) = 250*x + 1. Is k(q) prime?
True
Let g(k) = -4*k + 3841. Is g(0) a prime number?
False
Let q = 1961 - 247. Is q composite?
True
Let l = 8 - 5. Suppose d - 1046 = -l*t, -4*d = -d + 3*t - 3168. Is d prime?
True
Let l(s) = s**2 - 19*s + 11. Suppose 44*c = 49*c + 45. Is l(c) a prime number?
True
Suppose -4*y + 4*u + 4256 = 0, 0 = -u + 1 - 4. Is y a prime number?
True
Suppose 3*j + 23 = -64. Let u = j - -49. Is 4*(-5)/(u/(-503)) composite?
False
Suppose -1480 = -2*x - 3*v, 4*x - 9*x + 2*v + 3719 = 0. Is x a prime number?
True
Let u = 43665 - 21982. Is u composite?
False
Let d(y) = -43*y**3 - 6*y**2 - 26*y - 86. Is d(-5) composite?
True
Let d = 102 - 45. Suppose -y = 4*s - 190, 9*y - 4*y - d = -s. Is (0 + s)*1 + 4 a prime number?
False
Suppose 0*b - 5 = -b. Let g(y) = y**3 - 2*y**2 - 6*y + 12. Is g(b) composite?
True
Let o = 60836 + -5193. Is o a composite number?
True
Suppose -17 = -2*b - 11. Suppose b*q + 3*y - 357 = 0, 3*q + 4*y = -0*y + 357. Is q composite?
True
Suppose 4*v = 8*v + 2*n - 26, 4*v - n - 29 = 0. Let j(s) = 353*s + 1. Let o be j(1). Suppose o = v*p - 5*p. Is p prime?
False
Suppose -5*r + 3 + 37 = 0. Let a(l) = -3 + 5 + 5 + r*l - 1. Is a(7) composite?
True
Let c(o) = -1764*o**3 + o**2 + o. Let n be -3 + -1 + -3 + 6. Let x be c(n). Suppose 0 = 5*v - 4*d - 1319, 5*v - d - x = -433. Is v a prime number?
False
Suppose 2*i - 5 = -0*a - 3*a, 0 = 4*i + 5*a - 7. Let u be (-66)/(-15) + i/5. Suppose 594 = -u*d + 2246. Is d a composite number?
True
Let l = 91767 - 50069. Is l a prime number?
False
Suppose o = -13 - 32. Let p = 140 + o. Is p a prime number?
False
Is (32255 - -65) + 3*-1 a composite number?
True
Let c(a) = a + 0*a + 3*a. Let i be c(-1). Is 3/i + (-2716)/(-16) composite?
True
Let t(c) = c**3 - 2*c**2 + c. Let v be t(1). Let u(l) = -4 + v*l**2 + 3 - l**2 + 4 - 5*l. Is u(-3) a prime number?
False
Let s be 477*(-4 + 16/6). Let h = 237 - s. Suppose -15 = 3*f, -2*x - f = -6*x + h. Is x a composite number?
True
Suppose 1443 = 3*b - 3252. Is b composite?
True
Let p(i) = -348*i + 1. Let o(t) = 348*t - 2. Let u(k) = 6*o(k) + 7*p(k). Is u(-2) prime?
True
Let u(t) be the first derivative of -41*t**3/6 + t**2/2 + 3*t + 6. Let h(k) be the first derivative of u(k). Is h(-2) a composite number?
False
Let o = -18 + 18. Suppose o*a + a - 2*s = 917, -s = -3*a + 2731. Suppose 146 + a = 5*k. Is k a prime number?
True
Suppose -3*d = 4*o + 187, 5*o - 2 = -7. Let r = 152 + d. Is r prime?
False
Let q(z) = 65*z**2 + 3*z + 23. Let t(u) = 32*u**2 + u + 11. Let n(f) = -2*q(f) + 5*t(f). Is n(4) a composite number?
True
Let n(o) = 6*o**2 + o + 1. Suppose -3*w - 7 = -2*v - 0*v, -3*v = -4*w - 9. Let k be n(v). Is -1*(k/(-3) - 75) composite?
True
Let g(d) = d**2 + 13*d + 33. Let y be g(-6). Is (-12967)/y + (-6)/(-27) prime?
False
Let n = 2629 + -1808. Is n composite?
False
Let y = -5 - -15. Suppose -3*h - 16 = -2*s, h - y = s + 4*h. Suppose -s*c + 5 = -45. Is c prime?
False
Let r(k) = -k**3 + 24*k**2 - 15*k - 89. Is r(20) a composite number?
True
Suppose 482 = 3*m - m - 4*z, -5*m + 1235 = -4*z. Is m prime?
True
Suppose -c = 3*w + 4*c - 200, 128 = 2*w - 2*c. Let q = 9 - -1. Suppose 5*p = q + w. Is p a composite number?
True
Let p = -49 + 53. Is -4 + 1 - (p + -257 + -4) a composite number?
True
Is 2*((-335)/(-10) + 6) prime?
True
Suppose -3*s + 488 = -268. Let y = -3 + s. Let j = y - -382. Is j composite?
False
Let k = 2010 + -859. Is k a composite number?
False
Suppose 0 = -5*s + 3*y - 5, 5 = -s + 4*y - 13. Suppose 2*h - l = 3, 4*h - s*l = 3*l + 3. Is 170/(-1 - (-6)/h) a composite number?
True
Suppose v - 132200 = 20*w - 24*w, 0 = 5*v - 20. Is w prime?
True
Let l(z) = -8*z**2 + z - 12. Let g(h) = 7*h**2 - h + 12. Let x(y) = -7*g(y) - 6*l(y). Let a be x(0). Is (65/20)/((-1)/a) a prime number?
False
Let c(t) = -212*t - 1. Let f be c(-8). Suppose -2*r + 3*g - 429 = -1118, 0 = -5*r + 2*g + f. Is r a prime number?
True
Let b(p) = 5*p**2 + 19*p + 2. Let h be b(-14). Let o = h - 153. Is o a prime number?
True
Suppose -851*p = -843*p - 8152. Is p a prime number?
True
Let r = 615 + -504. Is r a composite number?
True
Let k = -30 - -30. Is (587 - k) + -1 + -4 + 5 prime?
True
Let t(w) = -796*w - 151. Is t(-5) composite?
True
Let j = 581 + 2796. Is j a prime number?
False
Suppose 0 = -5*l + 10, -5*y - 106 = l + 492. Let r = y + 622. Suppose 0 = 2*f - 4*f + r. Is f a composite number?
False
Let v = 51 - 274. Is v*(-9 - -8)/((-2)/(-10)) a composite number?
True
Let a = 170764 + -109301. Is a a prime number?
True
Suppose 0 = 5*c + 15, 3*c + 380 + 1878 = o. Is o a composite number?
True
Let t = 382 + -766. Is 1/(-3)*(t + 3) composite?
False
Let p(q) = -1278*q + 185. Is p(-17) a composite number?
False
Suppose 2*s + 2*s = 4*g - 1484, 0 = 5*s - 5. Let r = g + -121. Is r prime?
True
Let r = 85686 + -42967. Is r composite?
False
Suppose 5*q - 3*y - 328 = 0, 2*q - 97 = 5*y + 38. Let h = q - 7. Is h a prime number?
False
Suppose 0 = 4*l + 4, 782 = 4*x + 5*l - 405. Is x a prime number?
False
Suppose 8*m + 4286 = 39622. Is m prime?
False
Let k(y) be the first derivative of -87*y**2/2 + y - 11. Is k(-20) a prime number?
True
Let r be (-12)/18*2/(-4)*39. Let t(u) = 16*u**2 + 5*u + 10. Is t(r) composite?
True
Let c = -2544 + 4937. Is c prime?
True
Let h(s) be the third derivative of -5*s**4/6 - 83*s**3/6 + 9*s**2. Is h(-21) composite?
False
Let c(j) = 296*j**2 - 10*j - 77. Is c(17) a composite number?
False
Let f be 8679/15 + (-4)/(-10). Suppose -2*h - 211 = f. Let z = h + 618. Is z a prime number?
True
Let s = 413 - -128. Is s a composite number?
False
Suppose -12*b = 18*b - 75270. Is b composite?
True
Is 404126/30 - ((-8)/60)/1 composite?
True
Let b be (6 + -2)*-1*(-4)/8. Suppose -5*z - j + 0*j = -893, -2*j + 354 = b*z. Is z a composite number?
False
Let u = 511 - -1267. Suppose -u = 17*n - 19*n. Is n a composite number?
True
Suppose 5*u + k - 40 = 0, 3*k + 6 = -2*u + 5*u. Is 94 - 4/(u + -3) prime?
False
Let h(d) = d**2 + 9*d + 1841. Let c be h(0). Is c*(-1)/(3/(-3 - 0)) prime?
False
Let b(n) = -n**2 - 3*n + 3. Let y be b(-3). Suppose -2*u = s - 289, -2*s + u = -y*s + 291. Is s composite?
False
Let w(g) = 4*g**2 + 64*g - 437. Is w(-60) a composite number?
True
Let z = 21 - 18. Suppose -5*a + 1883 = 3*o, -z*o - 2*a + 1118 + 771 = 0. 