e number?
False
Suppose 56223 - 198002 = -11*f. Is f prime?
True
Suppose 4*q - 2272 = -2*l, 3*q - 2276 = 16*l - 18*l. Is (-28)/(4 - 8) + l a prime number?
True
Suppose 580*a - 559*a - 260211 = 0. Is a prime?
True
Let m = -3869456 + 5857041. Is m a composite number?
True
Let z = 268615 - 101306. Is z a composite number?
False
Suppose 3*a + 4 = 2*q + 17, 5*a - 5 = 0. Let k be 51882/(-2)*5*q/(-75). Let j = -4860 - k. Is j a prime number?
False
Let a = -107082 - -300799. Is a a composite number?
True
Suppose -48*u + 891711 = 105703 - 311608. Is u composite?
True
Suppose -5*t + g = 2*g - 17, g + 19 = 4*t. Suppose -3*w + 4*q + q - 340 = 0, t*w - q + 459 = 0. Is (0 - -2)*(w/(-2) + -1) composite?
False
Let g(r) = 249*r**2 - 2*r - 50. Let a be g(-8). Let z = a + -9553. Is z composite?
True
Suppose v = -5*y - 470, v = -4*y - 278 - 97. Is 2/((-114)/(-96507)) + 10/y prime?
True
Let u be (-2 - -4) + 4 - 2. Let w(p) = -p**2 - p + 16. Let c be w(u). Is ((-12)/18)/(c/12930) a prime number?
False
Let y(h) = -h**2 + 25*h - 2. Let b(m) = m + 6. Let j be b(6). Let w be y(j). Suppose 10*u + w = 21*u. Is u a composite number?
True
Suppose 0 = -2*p - 5*r + 488409, 0 = 3*p + 5*r - 428172 - 304444. Is p a composite number?
True
Let r(h) = 349*h**2 - 271*h + 41. Is r(-22) a composite number?
True
Suppose 0 = -5*u + 33 + 2. Suppose u*r = 9*r. Suppose 10*y - 3*y - 1757 = r. Is y prime?
True
Suppose 5*v + 271103 + 172276 = 3*c, -4*c = -4*v - 591188. Is c prime?
False
Suppose -k - 6 = 5*y, 4*k - 4*y - 26 + 2 = 0. Suppose k*u = -3 + 15. Suppose 0 = -2*c - n + 891, 0*n - u*n = 5*c - 2226. Is c a prime number?
False
Is (4945340/40)/47 + 3/(-2) prime?
False
Suppose 34*a - 198*a + 2378492 = 0. Is a a composite number?
False
Let y(d) = -403*d**3 - 7*d**2 - 26*d - 3. Suppose 4*c = -3*f - 2 - 10, 3 = -c - 3*f. Is y(c) prime?
False
Let x = -422 + 441. Suppose -2*d - x*d = -109599. Is d prime?
False
Let m(y) = -y**3 - y**2 + 2*y + 123. Suppose -w + 7*c - 3*c + 24 = 0, -4*c = 16. Let i(b) = -b**2 + 8*b. Let q be i(w). Is m(q) a composite number?
True
Let u(l) = 278*l**2 - 5*l - 5. Suppose -2*k = 2*n - 3*n + 8, 2*n - 2*k - 10 = 0. Suppose 2*j + 4*d + d = -29, n*d = j - 8. Is u(j) a composite number?
False
Is (22 - 23) + 39954*1 a prime number?
True
Let z = 116881 - -121712. Is z a prime number?
False
Suppose -4*r + 8 = -2*r. Suppose 2*b = -r*s - 12, 2*b - 29 = 5*s - 5. Suppose 0*h - b*h = z - 595, -5*z + 2915 = -5*h. Is z a prime number?
True
Suppose -5*n - 6*y + 275 = -y, n + 3*y - 61 = 0. Suppose -n = -k + 205. Is k a prime number?
True
Let z = 337058 + 82809. Is z a prime number?
False
Let c = 19338 - -5800. Is c prime?
False
Let d = 561 + 9650. Is d prime?
True
Let w = 626 + -288. Let j = w - -829. Is -2*(3/6 - (j + 0)) a prime number?
True
Let w = -6 + 0. Let r(k) = -812*k + 17. Let l(t) = -811*t + 19. Let v(x) = 7*l(x) - 6*r(x). Is v(w) composite?
False
Suppose -5*p = j - 0*p - 30, 4*j + 5*p = 45. Suppose -2*w + 5*h + j = 11, 12 = 4*w + 2*h. Is ((-3)/(24/(-356)))/(w/44) composite?
True
Is ((-4)/(-48))/((-7)/4483276)*(-6)/2 a composite number?
False
Suppose -12*v = 61*v - 6840915 - 4686442. Is v composite?
True
Suppose -8922245 = -4*s - 3*n - 3146887, -3*s + 4331487 = -3*n. Is s a prime number?
False
Let q(h) = 6*h**2 + 8*h + 23. Let t(o) = 5*o + 68. Let i be t(-8). Suppose i*x = 31*x + 18. Is q(x) prime?
True
Let v be -3*((-85)/(-15) + -6). Suppose 0 = 2*r - v - 1, -3*g - r = -796. Is g a prime number?
False
Let y be 40/60 + 454/(-6). Let r = y + 80. Is 29646/10 - (-2)/r a prime number?
False
Let d(p) be the first derivative of -p**4/4 + 23*p**3/3 + 16*p**2 + 25*p - 64. Is d(22) a composite number?
False
Let i(d) = -51*d - 99. Let o be i(-21). Let p = 17575 - o. Is p a prime number?
True
Suppose -9*a - 32*a + 59471141 = 12*a. Is a prime?
False
Suppose 3*y - 2*n - 6 = 5*y, 2*y - 2*n - 14 = 0. Let p be 11/2 + (-3)/y + 1. Suppose -2*f + 670 = p*u - 3*u, -1647 = -5*u + 2*f. Is u composite?
False
Suppose -349*x + 336*x = -6708. Suppose 0 = x*b - 522*b + 21534. Is b a composite number?
True
Let h = -119560 + 181310. Suppose h = 12*y - 36758. Is y a composite number?
False
Suppose 495*o - 505*o - 20440 = 0. Let g = 17509 - o. Is g a composite number?
False
Suppose 1609485 = -14*c + 5950199. Is c composite?
True
Let h be 4/((-24)/57)*2. Let w = -15 - h. Suppose 2*b + 4*a = 426, -w*b = -0*b + a - 838. Is b composite?
True
Let p(j) = 3*j**3 + 5*j**2 + 4*j + 5. Let r be (-84)/(-28) + (-1)/(1/(-13)). Suppose 0 = -2*l + l - 4*s - 4, -3*l + 2*s + r = 0. Is p(l) composite?
False
Let c be 4/22 - (432/(-44) - -4). Suppose c*v = 51 + 21. Is -2802*(-3)/v*(-4)/(-6) a composite number?
False
Let o be 6/(-10) - (-131271)/(-15). Let y be 4/26 - o/(-104). Let a = y - -263. Is a a composite number?
False
Let a(z) be the third derivative of -7*z**4/24 + z**3/6 - 2*z**2. Let r be 224/168 - ((-129)/(-9) + -1). Is a(r) a composite number?
True
Suppose 4 = -i, 0 = 8*f - 10*f - 3*i + 42. Is ((-63)/f)/((-1)/687) a prime number?
False
Let n(i) = -i - 2. Let z(w) = -w - 3. Let v(m) = 3*n(m) - 2*z(m). Let y be v(-4). Suppose 0 = q - 2, -4*x = -0*x - y*q - 564. Is x prime?
False
Suppose a + 4*c - 1012 = 0, -4*a + 0*a + 4075 = 7*c. Suppose 5*f - 2*f - 55 = 5*k, -11 = 2*k + f. Is 4*(-6)/k + a prime?
False
Suppose 0*k = -2*k + 4*z + 4028, 3*z = -2*k + 4014. Suppose -484*x - 57689 = -432*x - 2829. Let i = k + x. Is i a composite number?
True
Is 2/((-5)/(-2) - 74772786/29909220) composite?
True
Suppose -5*p + 30180 = 3*q - 448272, -2*q = -4*p - 318946. Is q composite?
True
Let j(n) = -11810*n + 286. Let x be j(-7). Suppose -20*b + 76304 + x = 0. Is b prime?
True
Suppose -2 = -n + 4*s, 3*n - 12*s = -14*s + 6. Suppose 2*y = -2*c + 15682, 0 = -3*y + 2*y - n*c + 7841. Is y a composite number?
False
Suppose -4*d - 5*p - 308 = -2*p, -d - 100 = -5*p. Suppose 1055 = 4*g + 2*f - 141, 2*g - 582 = -5*f. Let c = g - d. Is c prime?
False
Suppose 1826341 = 29*x - 486612. Is x a composite number?
False
Let k(b) = 76*b**2 - 2*b - 2. Let t be k(3). Let w = t + 389. Let u = -562 + w. Is u composite?
False
Let u(k) = 1937*k**2 - 8*k + 7. Suppose -508 = 3*p - 514. Is u(p) prime?
False
Is (-205229)/((-81)/63 - (-12)/42) a composite number?
True
Suppose 180*c = 32*c + 15*c + 798. Let z(r) be the second derivative of 2*r**4/3 - 2*r**3/3 - 5*r**2/2 + 2*r. Is z(c) a prime number?
False
Suppose -y - 5*j + 63 = 0, -3*j = -2*y + 48 + 26. Let t = y - 40. Suppose t*r = -2*r + 1105. Is r prime?
False
Let q = 8735 + -5308. Is q a prime number?
False
Let o = -307 - -705. Suppose -2*c + 0*v = -3*v - o, 4*c - 3*v = 808. Is c a composite number?
True
Let p = 8699 - -23258. Is p a composite number?
False
Is (-110)/(-15) - (-25101395)/165 composite?
True
Let q = -1210 - 1507. Let w = 4218 + q. Is w a prime number?
False
Let p = -4 - 8. Let r = 4 - p. Suppose 3*x + 3*u - 3757 = -2*x, -r = -4*u. Is x composite?
True
Let t(y) = 7*y - 14. Let l be t(3). Is (119658/28 - l) + 2/4 composite?
True
Let d be (6 + (-45)/10)*2 - 0. Suppose 0 = 3*m + 2*t - 1083, m + 2*m = -3*t + 1080. Suppose -d*l = 132 - m. Is l a composite number?
True
Let j(s) = 19*s**2 - 16*s + 181. Is j(10) a composite number?
True
Let w be 5 + (-2)/(2 + -1). Suppose -w*p + 8*p = 6005. Is p composite?
False
Let k be 4 - (-34)/(-9) - 1824/(-54). Let a(o) = 156*o - 227. Is a(k) a prime number?
True
Let q = 28 + -24. Let g = q - 1. Suppose 2*k + 2742 = 4*x, 0 = 5*x + 7*k - g*k - 3395. Is x prime?
True
Let h = 1011 - 976. Suppose -5*g = h*g - 489080. Is g prime?
True
Suppose -3*z + 6932 = -r, z + r = -4*z + 11540. Let p = -1054 + z. Is p composite?
True
Let r(h) = -463*h - 8. Let b be r(3). Let c = -285 - b. Let z = c + 1325. Is z a composite number?
False
Let s be (16/12*3)/(-1 - 1). Is ((-111)/(5 - 8))/(s/(-514)) a prime number?
False
Suppose o - 399868 = -4*w, 26*o - 21*o = -w + 99967. Is w a prime number?
False
Let r = -108825 - -229292. Is r a composite number?
True
Let v = -14387 + 4366. Let m = -2738 - v. Is m a composite number?
False
Let q be (5 + -1)*12661/44. Is (-1 - -4)*(-4)/((-12)/q) a composite number?
False
Suppose -11*y = -9*y - 4. Is (0 - y/6)*52911/(-3) a composite number?
False
Is ((-35)/70)/(362994/(-725986) + (-3)/(-6)) a prime number?
False
Let t(p) = 143*p**2 - 17*p + 21. 