- 11. Is (-123)/(d/(-2))*(-2 + 9) a prime number?
False
Suppose -o + 3*t + 3 = 0, 5*o + 0*t = 5*t - 5. Let n be (-30)/3 - 9/o. Is (1018/(-3))/(n/21) a prime number?
False
Let f(m) = 263*m**2 - 56*m + 355. Is f(6) prime?
False
Let b = 196 - 160. Is 50412/b*((-8)/(-4) + 1) composite?
False
Let k(h) = 1109*h**2 - 5*h - 7. Let t be k(-1). Let j = -473 + t. Is j composite?
True
Let z be (-5)/(-10)*-6*(10985 - 6). Is z*((-1)/(-2))/((-21)/14) composite?
False
Suppose 0*n - q + 6177 = 2*n, 10 = -2*q. Let y = 5393 - n. Is y prime?
False
Is (55914/(-8))/(57/(-1292)) a composite number?
True
Let t(r) = 3*r**2 - 5*r - 17. Suppose -3*q = 5*p - 4*p + 20, 0 = -2*q - p - 15. Is t(q) prime?
True
Let s = -19 - 3. Let o = 23 + s. Is ((-4)/14)/o - 14317/(-7) a prime number?
False
Let o be 4/14 - (-423)/63. Suppose 0 = o*t + 2*t - 5661. Is t a prime number?
False
Suppose 14 = -17*c - 275. Let b(o) = -2*o**3 - 23*o**2 + 16*o - 28. Is b(c) prime?
True
Let n = 394974 + 210129. Is n composite?
True
Let c = -255403 + 391459. Is (c/60)/((-6)/15*-1) a prime number?
True
Let q(v) = v**3 + 6*v**2 - 4*v - 4. Let u be q(-6). Let x(h) = 6*h**3 - 13*h**2 - 8*h - 29. Is x(u) a prime number?
True
Let n = -1171 - -135. Let a = -363 - n. Is a a composite number?
False
Suppose -5*u - 3*r + 529769 + 285740 = 0, 10 = -5*r. Is u a prime number?
False
Let m(n) = 27*n + 6. Let r be m(-1). Let a(b) be the second derivative of -4*b**3 + 17*b**2/2 + 2*b. Is a(r) composite?
False
Suppose 0 = 11*l - 6*l - 245. Let d = -48 + l. Let b(o) = 7045*o**2 - 2*o + 2. Is b(d) composite?
True
Let f = -69 - 12. Let p = f - -84. Is p/6*2 - -525 a prime number?
False
Suppose 136*k - 13127551 = -126359. Is k composite?
False
Let x(y) = -5*y**2 - 2*y + 3. Let j be x(3). Let l = j + 46. Let m(v) = -17*v**3 + v**2 + 6*v + 3. Is m(l) prime?
True
Let h(w) be the second derivative of w**3/3 + 2559*w**2/2 - w. Suppose 288*i = 293*i. Is h(i) composite?
True
Let j = 15115 + -21811. Let x be (-12 - -6) + 4 + (-4842)/(-2). Let z = x - j. Is z a prime number?
False
Suppose -120*t + 201*t - 1083699 = 0. Is t a prime number?
False
Let z(s) = -64*s + 38. Suppose -4*p - 10 - 14 = 0. Is z(p) composite?
True
Let b be 4 + (-2)/(0 + 2) + -458. Let p = 817 + b. Suppose 0 = 5*s - 6993 - p. Is s a prime number?
True
Let m(x) = -14*x**2 - 162*x + 5 - x**3 + 162*x. Let i be m(-14). Suppose 3381 = i*y + 1146. Is y prime?
False
Let g be -16223*((-4)/14 + 10/(-14)). Let w = -8434 + g. Is w composite?
False
Let x(z) = -13236*z + 5087. Is x(-9) prime?
False
Suppose 0 = -c + 2*h + 1137557, 2*c - 1906863 = 3*h + 368257. Is c composite?
False
Suppose m + 4*n - 78505 = 3*n, 0 = 5*n + 20. Is m prime?
True
Suppose 0*b - 5*k = 3*b + 2508, 0 = -4*b - k - 3361. Suppose 0 = 4*n - 4971 - 3429. Let l = b + n. Is l a prime number?
True
Suppose 764*x - 756*x - 1608056 = 0. Is x composite?
False
Let a be (1/(-1))/((-1560)/(-174) + -9). Suppose a*r = r + 42196. Is r composite?
True
Let u(g) = -2*g**2 + 7. Let b be u(3). Let d = 25 + b. Is 11 - d - (-2 - 6*42) a prime number?
True
Let u(k) = -5*k**2 + 3*k**2 - 8*k**2 + 9*k + 4621*k**3 + k**2. Is u(1) a prime number?
True
Let k be (3/4)/(2/(-392)). Let f be ((-126)/k)/(2/(-14)). Let r(u) = 40*u**2 + 7*u + 1. Is r(f) a prime number?
True
Let t = -638 - -640. Suppose m = -4*u + 679, t*m - 1340 = -2*u - 0*u. Is m a prime number?
False
Let c(v) = 405*v**2 - 29*v - 46. Let j be c(-7). Let q = j - 9405. Is q a prime number?
True
Suppose -20 = -5*b, -3*d + 21 = 9*b - 6*b. Suppose -l = -4*x - 479 - 418, 0 = 2*l - d*x - 1769. Is l prime?
True
Let q(i) = i**3 - 4*i**2 - 50*i + 179. Is q(26) a prime number?
True
Let o = 891 + -520. Suppose o*k = 365*k + 100026. Is k prime?
False
Suppose 4*r + 7904 = 2*p + 2*p, 4*r + 4 = 0. Let d = p - 50. Suppose -2020 = -3*u + d. Is u a composite number?
True
Let u(j) = -2*j**3 - 15*j**2 + 7*j - 3. Let s be u(-8). Suppose 0 = s*r - 5852 - 1443. Is r prime?
True
Let o be -9*14/(-315)*(-70 - 0). Let w(v) = 10*v**2 - 5*v - 17. Is w(o) composite?
False
Suppose 4*c + 30903 + 154756 = 35*c. Is c composite?
True
Suppose -b + 35446 = -n + 3*n, 4*n = -b + 70896. Is 3/(60/n) + (-1)/4 composite?
True
Suppose 4106 + 2518 = 3*p + t, 2204 = p - t. Let h = 4054 - p. Is h prime?
True
Let o(g) = 2. Let y(z) = 518*z + 32. Let d(x) = -5*o(x) + y(x). Is d(12) a composite number?
True
Let f = -467 + 473. Suppose -f*k - 177775 = -31*k. Is k prime?
False
Suppose 178255 + 1081932 = 38*g - 427659. Is g composite?
False
Let z be (-2 + 9 - 5) + 54093. Let x = z - 29650. Is x prime?
False
Suppose -502041 - 2099372 = -18*k + 4221181. Is k a prime number?
True
Let b(a) = -6*a**3 - 38*a**2 - 21*a - 705. Is b(-26) a composite number?
False
Let o(w) = -181*w - 3. Let a(x) = -1. Let p(i) = -2*a(i) + o(i). Let v be p(-2). Let c = -68 + v. Is c prime?
True
Let i(c) = 4*c + 9. Let q be i(-3). Is (-2 + 20065/15)*q/(-1) composite?
False
Suppose 291 = i + 2*n, -221 = -4*i - 3*n + 933. Is i a prime number?
False
Is (110/(-10) + 12)*(-2)/2*-203503 prime?
False
Suppose 35*r - 723450 - 1630195 = 0. Is r composite?
False
Let q(d) = 7292*d**3 + 7*d**2 + 12*d - 64. Is q(3) composite?
False
Suppose -2196989 = -3*h - 2*b, 73*h + 6*b = 68*h + 3661651. Is h composite?
True
Let l(t) = -73*t**3 + 6*t**2 + 6*t + 7. Let b = -163 + 159. Is l(b) a prime number?
True
Let q = -57 + 47. Let y be (0 - q/(-6))*(471 + 0). Let l = y - -1328. Is l a prime number?
False
Let v(p) = 227*p - 49. Is v(13) prime?
False
Let k(g) = -3*g**3 + 28*g**2 - 71*g + 183. Is k(-32) a prime number?
False
Let g(c) be the first derivative of 83*c**3/3 - c - 2. Let y(h) = -h**3 - 9*h**2 - 7*h + 9. Let p be y(-8). Is g(p) composite?
True
Let w(a) = a**3 - 5*a**2 + 3*a - 8. Let m be w(5). Let c be (-1 + m)*(-213)/(-6). Suppose c = 11*r - 8*r. Is r a prime number?
True
Suppose 10*c + 3*c = 10266 + 17775. Is c a prime number?
False
Is 66/9 + 2/(-6) + 376386 a composite number?
False
Suppose 229 = 2*b - 5*u, 0 = -5*b + 8*u - 6*u + 604. Suppose -7 = 5*n + 3, a - 2*n - 59 = 0. Let z = b - a. Is z composite?
False
Let p = 8944 + -13686. Let v = -2695 - p. Is v prime?
False
Suppose 2471 = 3*i + 2*m, 3*m = 8*m + 25. Suppose 0 = 13*j - 50406 - i. Is j prime?
False
Let d = -102 + 102. Suppose d = -2*x - 5*w + 10, 3*w + 3 = 3*x + 9. Suppose 12*t - 16*t + 2612 = x. Is t a composite number?
False
Suppose f + 4*z = -11, 14 = -2*f + 4*z + 40. Suppose -f*j - n + 0*n + 17783 = 0, -5*j + 5*n = -17795. Is j prime?
True
Is (-641)/(-1*4/(4912/(-4))*-1) a composite number?
True
Suppose 0 = 3*o + 34 - 136. Let f = -35 + o. Is 66*2 + (0 - (-1)/f) a composite number?
False
Suppose o = 15*o + 143*o - 58253123. Is o composite?
True
Let l(f) = -f**2 - 19*f + 15. Let i be l(-24). Let p = 135 + i. Let m = p + 244. Is m a composite number?
True
Suppose -b - 1533 = -5*a + 643, -2*a + 5*b = -875. Let t = -223 + a. Let g = 391 - t. Is g a prime number?
True
Suppose v - 704 = 2*v. Suppose 9848 = 187*z - 179*z. Let p = v + z. Is p a composite number?
True
Suppose -55*d = -78*d - 82*d + 14450835. Is d a prime number?
False
Suppose 0 = 155*q - 164*q + 147087. Let l = q - -854. Is l a composite number?
True
Is (20/240*-4)/(((-15)/6592419)/5) a prime number?
True
Let l(a) = -5*a + 3. Let w(x) = -2*x + 1. Let c(p) = -3*l(p) + 8*w(p). Let h(g) = -26*g - 8. Let z(b) = 3*c(b) - h(b). Is z(4) a composite number?
False
Suppose -1 = 4*s - 53. Suppose -15 = -7*m + s. Suppose -g = 2*g + 3*y - 2097, 0 = -4*g + m*y + 2764. Is g prime?
False
Let n(m) = 2*m**3 + 2*m**2 + 3*m - 11. Let w = -7 - -25. Let b be (-26)/(-6) + (-6)/w. Is n(b) composite?
True
Suppose 4*g - 42 = -3*g. Let w be (g - 9)/(3/(-4)). Suppose w*b - 5*x - 14563 = 0, b + 3*x - 3622 = 8*x. Is b prime?
False
Suppose 0 = -8*m + 13 + 67. Suppose m*d - 8*d = 3110. Is d a composite number?
True
Suppose 5*z - 2*z = -2*t - 12835, -4*z = 2*t + 17110. Let j = -80 - z. Is j a composite number?
True
Suppose 0 = 3*q - 2*q - 28. Let g = q + -25. Suppose -g*t = t - 3*w - 12277, -4*t + 5*w + 12267 = 0. Is t prime?
False
Let v(m) = -320*m - 127. Let h(n) = -161*n - 64. Let z(a) = 5*h(a) - 3*v(a). Is z(32) a composite number?
False
Suppose -136*d = -129*d - 7. Is -3 - -26591 - (-1 + -3 + d) prime?
True
Let k(a) = 2*a**2 - 2*a + 5. Let f be k(0). Suppose -249 = -f*q