. Suppose p + 4 = 0, -4*a + q*p - 2464 = 4*p. Is 0 + -4 - -3 - a a composite number?
True
Let j be ((-32)/(-24))/(2/60). Suppose j = -2*d + 214. Is d prime?
False
Suppose 0 = 7*r - 2 - 12. Suppose 4*j - 4*z + r = -9*z, 0 = 3*j + 2*z + 5. Is j*(-12)/(-18) + (94 - -1) prime?
False
Suppose -5 + 11 = 3*i. Let o(f) = 2 - 1404*f**3 + 3*f**2 + i + 3*f + 5 - 8. Is o(-1) composite?
True
Suppose 0 = -7*u + 4*u - 2*u + 693635. Is u composite?
False
Suppose -44*d + 6863232 + 19246677 = 19*d. Is d a composite number?
True
Let i be (1 - 0 - 0) + (0 - -3). Is (-4 + -4914)*(0 - i/8) a composite number?
False
Let d be (42/24 - 2)*-20 + -1. Is 1/(d - 23739/5935) prime?
False
Suppose 20 = 5*l - 5*x, 5*x = -5*l + 7*l - 8. Let h be ((l/10)/(8/(-40)))/2. Is h*10*68/(-8) composite?
True
Let n(q) = 241*q - 3. Let l(m) = -241*m + 3. Let b(r) = 4*l(r) + 5*n(r). Is b(2) composite?
False
Let w be (10 + -378)*(1 + -2) - 1. Suppose -12898 = -3*z - w. Is z a composite number?
False
Let y = -371980 - -843869. Is y a prime number?
False
Suppose -4*i + 24 = -4*m - 0*m, -3*m = -2*i + 13. Suppose -4*a + 2*h = -3*a - 4, 0 = -5*a + i*h. Is 191*2 - (4 + a/4) a composite number?
False
Suppose 0 = -106*u + 120*u - 56. Suppose u*k = 8199 + 7693. Is k a prime number?
False
Let l be 7 - 13/(104/32). Suppose -l*i + 10446 = 3*i. Is i prime?
True
Suppose g = 4*m - 218880, -4*m + 47*g + 218864 = 50*g. Is m a prime number?
False
Let s(b) = 97175*b**2 + 412*b - 821. Is s(2) a composite number?
True
Suppose 51*x = 448*x - 468261103. Is x composite?
False
Suppose 185 = -13*y - 348. Let u = y + 44. Is u composite?
False
Let m(d) = -45*d**3 + 31*d**2 - 13*d + 41. Let r(k) = 23*k**3 - 16*k**2 + 7*k - 21. Let u(i) = 6*m(i) + 11*r(i). Is u(-7) a composite number?
False
Let l(i) = -27*i + 187. Let h be l(7). Is ((-3)/(-1))/(3/(-974)*h) a composite number?
False
Let a = 414 - 304. Is 1*(-1 - (-3*a)/1) a composite number?
True
Let y(d) = 5846*d + 190. Let n be y(26). Suppose 59178 - n = -8*l. Is l composite?
True
Let a be (-3 - (-2)/6*10)*33. Let h be (-12)/66 + 24/a + 7. Let t(n) = n**2 - 4*n - 19. Is t(h) prime?
False
Let w(g) = 50*g**2 + 3*g - 9. Let k be w(3). Let x(l) = -6 + 95*l - 332*l - k*l + 122*l. Is x(-3) prime?
False
Let c = -60 + 64. Suppose -c*s - 2*s = -s. Suppose s = 18*n - 19*n + 298. Is n a composite number?
True
Suppose 11*y = -9*y + 25*y. Suppose -17*u + 14*u + 5*p + 5273 = y, -u + 1759 = -2*p. Is u prime?
False
Let y(q) be the second derivative of q**5/20 + 7*q**4/12 + q**3 + 7*q**2/2 + 9*q. Let t be y(-6). Suppose 0 = -6*o + t*o - 77. Is o a prime number?
False
Let j be (90/24)/(3/16). Let w be 513/(-6)*j/6. Let q = -68 - w. Is q prime?
False
Let a(c) = 282*c**2 + 106*c - 1145. Is a(12) a composite number?
True
Let k be (-5)/((-15)/(-2)) - (-1412)/12. Let j(r) = -106*r - 13 + k*r - 4 - 266*r. Is j(-6) a prime number?
False
Suppose 0 = -88*l + 171810070 - 22633262. Is l prime?
True
Let d be (2/7)/((-2)/(-28)). Suppose 4*j + j - 2*f = 200, -d*j - f = -147. Suppose 484 = -34*r + j*r. Is r composite?
True
Suppose 2*h + 52664 = 5*x - 2*h, h + 1 = 0. Suppose -3*y - t = -15811, -5*y + 7*y - x = -5*t. Suppose 0*j = 3*j - y. Is j a prime number?
False
Suppose -5*i + 1344 = 7*i. Let m be 4/((-4)/(-18) - i/(-63)). Suppose 0 = -m*b + 16*b - 62902. Is b prime?
True
Suppose 3*j = -18702 + 110349. Suppose 5*k = 25, -j - 22226 = -5*w + 4*k. Is w a prime number?
True
Let o = -234 - -198. Is 14469/17 + o/306 prime?
False
Is 149284*((13/36 - 0) + (-8)/72) a composite number?
False
Let k = 2 + 2. Let n(s) = s**2 + 24*s - 100. Let p be n(4). Is p/k*(-62)/(-6) composite?
False
Let p(v) = -2*v + 10. Let z be p(5). Suppose -o = -3*s + o, z = 2*s + 2*o. Suppose s = 7*w - 13*w + 5262. Is w a prime number?
True
Suppose c - 3*r = -42, -c + 6*c + 265 = 4*r. Is (97546/c)/((-2)/3) a prime number?
False
Suppose 3*r + 12 = 0, -4*q + 3*r - 8*r + 12 = 0. Suppose n + 13 = i, -4*i + 5*n + q = -43. Is ((-9502)/(-14))/1 + 4/i prime?
False
Suppose -a + 3563 = -k + a, 3*a - 3561 = k. Is k/(-12) + (-6)/(-8) prime?
False
Suppose -5*b + 897148 = -w, -456*b + 2*w = -458*b + 358852. Is b composite?
False
Let w(l) = -981*l - 10. Suppose 7*n - 12 = 8*n + 3*b, 4*b = -5*n - 27. Is w(n) prime?
False
Let o(d) = d**2 - 2*d + 1. Let j be o(3). Suppose 0 = 3*k - j*g + 3 + 11, -2*k - 1 = -g. Suppose 3*c = 4*w + 1391, k*c - 4*w = 422 + 500. Is c composite?
True
Let v = -331 - -338. Suppose 677 + 212 = v*g. Is g a composite number?
False
Let b(a) = 722*a - 11. Let w(r) = -16*r - 4. Let d be w(-1). Is b(d) a prime number?
False
Let m(a) = -110*a - 16 - 33 - 18. Is m(-23) prime?
False
Let m(j) = 102*j**3 - 8*j**2 - j + 7. Let o(h) = 203*h**3 - 17*h**2 - 2*h + 15. Let x(c) = 13*m(c) - 6*o(c). Let i be x(1). Suppose 2*z - 332 = i. Is z prime?
False
Suppose 51932 = -15*g + 528827. Is g a prime number?
True
Let d = 152 + -147. Suppose h = q - h - 557, d*h = 3*q - 1673. Let g = 1010 - q. Is g a prime number?
True
Let v(g) = 2538*g**2 + 5*g - 15. Let q(d) = 7617*d**2 + 15*d - 44. Let j(z) = -2*q(z) + 7*v(z). Is j(2) composite?
True
Let p(s) = -16460*s - 1903. Is p(-15) prime?
True
Suppose -7*w + 44*w - 3808891 = 0. Is w a prime number?
False
Is ((-21)/(-6))/(11*11/1641002) prime?
False
Let g(v) = 7*v + 90. Let b be g(12). Suppose -j - b = -3*s + 527, -2*s + 470 = -2*j. Is s prime?
True
Let a(s) = -273*s**3 - 2*s**2 - 8*s - 13. Let t(j) = j**3 - 12*j**2 + 18*j + 2. Let g be t(2). Is a(g) a prime number?
True
Let g(s) = -s**3 + 13*s**2 + 2*s - 14. Let p be 5 + (-138)/(-18) + 1/3. Let z be g(p). Is 6/21 + z/7 + 899 composite?
True
Let i be (-386)/(-6*(-3)/(-387)). Let q = 17886 - i. Is q prime?
True
Suppose -9*z = -13*z - 4. Let h(x) be the second derivative of -75*x**3/2 + 4*x**2 - 2*x. Is h(z) a composite number?
False
Let m(p) = -76942*p**3 + 2*p**2 - 89*p - 90. Is m(-1) prime?
True
Let g(u) = -11*u + 27 + 12*u - 10. Let o be g(-11). Let m(l) = 12*l + 23. Is m(o) composite?
True
Suppose -42 = -4*u + 11*u. Let h = 10 + u. Suppose 16 = -h*w, -3*l - l + w + 1008 = 0. Is l a composite number?
False
Let r = -341235 + 519596. Is r a composite number?
False
Let v be (-3)/(15/235) - (0 - 5). Let d(x) = x**2 + 22*x + 103. Is d(v) prime?
False
Let w(x) = x + 2. Let r be w(-2). Suppose r*n + 3 = n, 2*f - 5*n - 2993 = 0. Let c = -827 + f. Is c prime?
True
Let t be ((-198)/(-55))/((-4)/(-10)). Suppose -32*k + t*k = -64561. Is k composite?
True
Let p(w) = -18*w**3 - 42*w**2 + 22*w - 13. Let j be p(37). Is j/(-187) - 2/(-17) composite?
False
Let p = 176186 - 38031. Is p composite?
True
Let p(l) = 0*l**2 + 4*l - l**2 + 0*l - 17. Let g be p(5). Is (589/3 + -1)/(g/(-33)) a prime number?
True
Suppose 0 = -12*d + 7*d + 5*q + 1573800, 3*d - 4*q = 944273. Is d a prime number?
False
Let f(b) = 1040*b**2 - 50*b - 227. Is f(-5) a prime number?
False
Suppose -20 + 6 = -7*z. Suppose z*s + 10214 = -12*o + 14*o, -3*s = -5*o + 25531. Is o a prime number?
False
Let n(i) = 8909*i**2 + 74*i - 707. Is n(10) a composite number?
False
Let a = -5477 - -9827. Suppose -5*b = -3*g + 78984 + a, g = -b + 27770. Is g composite?
False
Let s be ((-12)/20)/((2 + -5)/555). Let k = s + -113. Is 4 - (-10)/k - -1400 composite?
False
Let b = -19582 - -43833. Is b a composite number?
False
Suppose 373886 + 893944 = 2*s - 5*h, 3*s = -h + 1901711. Is s a prime number?
False
Let y be 1 - (-21)/(4 + 3). Suppose 0*q + 16819 = y*q + 5*b, 3*q + b = 12606. Is q prime?
True
Suppose 3*h + 10*t - 14*t - 77237 = 0, -3*h - 2*t = -77189. Is h a prime number?
False
Suppose 0 = -166*l + 161*l + 10. Suppose -s + 11 = 4*q, -l*s + 4*q - q + 55 = 0. Suppose s = -y + 60. Is y a composite number?
False
Let y be -3 + 0 + (-56)/(-8). Let t = 2704 + 904. Suppose y*s = -1132 + t. Is s a composite number?
False
Is (-1)/4 + (-34639245)/(-356) composite?
False
Suppose 0 = 2*z - 2*q - 2 - 12, 55 = 5*z + 5*q. Suppose z*h - 19285 = 12242. Is h prime?
False
Let s = 188892 - 32491. Is s prime?
False
Let g be (4/8)/(4/24 - 0). Suppose g*n = 0, -4*n + 7*n - 583 = -c. Is c prime?
False
Let a = 614 + -609. Suppose a*x - 944 = 366. Is x prime?
False
Suppose -24 = s - 3*s. Let o(v) = 2*v**2 - 24*v + 2. Let a be o(s). Suppose -a*t + 1595 = 3*t. Is t composite?
True
Let j be (-469*3)/(-3)*4. Let g = j - 606. Suppose 5*a = 1975 + g. 