 t. Is g prime?
False
Let u = 2 - -5. Suppose 12 - u = 5*i. Suppose -5*g + 5*p = -3605, 0 = -3*p - 5 - i. Is g composite?
False
Suppose 6 + 4 = 5*d. Let p(f) = d + 0 - 60*f - 269*f + 38*f. Is p(-1) a prime number?
True
Let h(a) = 3*a**2 + 7*a - 9. Let q = 25 - 29. Let n(p) = 2*p + 15. Let f be n(q). Is h(f) a prime number?
False
Let c = 52 - 72. Let m be 5*86/c*(-20 + 8). Is (m*2)/2 + -1 composite?
False
Is (5 - (-27)/3) + 27371 composite?
True
Suppose 11*o = 236465 + 1319826. Is o a prime number?
True
Is (555661/3)/(115/345) prime?
True
Suppose 82*r - 18231283 = 46*r - 13*r. Is r prime?
True
Let g = -130 - -139. Suppose 0 = d + f - g, 0*f - 5*f + 31 = 3*d. Is 16496/28 - 1/d a composite number?
True
Is (-22)/55 + (-2833326)/(-90) a prime number?
True
Let c = -617 + 616. Is c/(-10) + (-1319148)/(-120) composite?
False
Let u(f) = -29*f + 134. Let b(c) = 14*c - 66. Let g(v) = -7*b(v) - 3*u(v). Is g(-31) prime?
True
Suppose -2*r + 63 - 55 = 0. Suppose r*i + 3*u = 20162, -2*i + 0*u + 4*u + 10070 = 0. Is i a composite number?
False
Suppose 2*o + 206917 = 5*d, 54 = -d - 3*o + 41434. Is d prime?
False
Suppose -27*h + 105*h = h + 4412639. Is h prime?
False
Let l(i) = i**2 + 17*i + 3. Let a be l(-17). Suppose a*h = 26 + 1. Suppose h - 2539 = -10*f. Is f a prime number?
False
Suppose 0 = 5*v + 3*h - 1166427 - 864563, -4*v - 3*h = -1624792. Suppose -40*z + v = -6*z. Is z prime?
False
Is ((-49111385)/(-68))/5*4 a prime number?
True
Suppose -227*z - 87*z = -37*z - 23445557. Is z composite?
True
Let y be 10/20 - (-6)/4. Let i be (1/y - 2)*2*1. Let w(h) = -8*h**3 + 8*h**2 + 14*h + 5. Is w(i) a composite number?
False
Let a = 75998 - -1151. Is a a composite number?
True
Suppose -2*b + 118256 = -2*x, 38*b + 295661 = 43*b + 2*x. Is b prime?
False
Suppose 0 = 5*d - 5*h - 15, 5*d + 3*h = 7*h + 18. Let j(r) = 534*r + 145. Is j(d) a composite number?
True
Let l be (-80)/(-12)*2*(-6)/(-16). Is (0 - 4) + l/(25/69435) a prime number?
True
Suppose -38988 = -77*i + 649469. Is i a prime number?
True
Let f(i) = 394*i**3 + 2*i**2 + 5*i + 2. Let w be f(-1). Suppose -2*r = 4*x - 4738, 974 + 3734 = 4*x - 4*r. Let j = w + x. Is j prime?
True
Suppose -15225 = -4*k - 2253. Let i = k + 3046. Is i a composite number?
True
Let a = 26 + -24. Suppose -q - a*q - i = -5087, 0 = 2*i - 4. Suppose 0 = -6*p + 11*p - q. Is p a prime number?
False
Suppose 4*w - 16 = -4*b, -b = 5*w + 13 - 45. Suppose 0 = w*h - 14667 + 4328. Is h a composite number?
True
Let n = 2841905 + -988996. Is n prime?
True
Is (-33)/(-462) - 51960753/(-126) a composite number?
False
Let a = -234993 + 365074. Is a a prime number?
False
Let c(v) = 6*v**3 - 90*v**2 + 194*v - 5. Is c(21) prime?
False
Suppose 54*z + 131*z - 15734065 = 0. Is z prime?
True
Suppose 1962628 = 18*r - 1234586. Is r composite?
False
Let h be 46/((-1)/(-2 + 0)). Suppose -5*x + 4*c + h = 0, 2*x - 4*c = -0*x + 32. Let m(g) = 33*g + 41. Is m(x) a composite number?
False
Let d be (-1 - -2)*-2*87/(-58). Let q(v) = -d - 2*v + 6*v**2 - 5 + 10 - 3. Is q(6) prime?
False
Let w(u) = 11*u - 7. Let d(c) = 10*c - 6. Let k(z) = 7*d(z) - 6*w(z). Let t be k(-3). Is 3 + 32/t - (-482)/3 a composite number?
True
Is (-6)/36 + 961516/72*3 composite?
False
Let w(d) = -2981*d + 14. Let z be w(-4). Suppose o = -2*o + 4*y + z, -3*o - 2*y = -11914. Suppose -5*g + o = -1001. Is g prime?
False
Let f(r) be the second derivative of 189*r**4/2 - r**3/3 + 7*r**2/2 - 59*r + 2. Is f(-2) a composite number?
False
Suppose 220*v - 562222 = -9646 + 3195124. Is v composite?
True
Suppose 4*m - 3*q = -19581 + 73407, 5*m - 2*q - 67286 = 0. Suppose 0 = -9*p + m + 19905. Is p a prime number?
False
Suppose -39*n - 19*n + 846050 = -354492. Is n composite?
True
Let q(m) = 13*m**2 + 117*m + 327. Is q(44) a composite number?
False
Suppose -2*g - 2*g - l + 10 = 0, 0 = 2*g + 3*l. Suppose g*b = -b + 1860. Suppose 8*n - b + 97 = 0. Is n composite?
True
Let u(l) = 9*l**2 + 117*l + 22. Let t be u(-14). Let f = -10 + 7. Let n = t + f. Is n a prime number?
False
Suppose -z = -3*j, -4*j + j + 3*z = 6. Let i be -1 - -4 - (2 + j + -5). Suppose -8*v = -i*v - 741. Is v a composite number?
True
Let b be 3*(-1)/3*-2. Suppose -b*t = y - t - 1397, -2*y + 2*t + 2802 = 0. Is y prime?
True
Let r(k) = 3*k + 185 - 6*k**2 + 212*k**3 - 55 - 64 - 64 + 0*k. Is r(1) prime?
True
Let p(b) = -40*b**3 + 4*b**2 - 2*b + 1. Let y be p(2). Let k = 316 - y. Is k a prime number?
False
Let d = 62 + -49. Let i = d + -9. Suppose 0 = 3*v + z - 2*z - 289, i*v + 3*z = 394. Is v prime?
True
Let s be 1458/(-10) - 12/60. Let c = 83 + s. Let u = c + 96. Is u prime?
False
Let t(r) be the third derivative of -17*r**7/5040 - r**6/24 + 11*r**5/60 + 29*r**2. Let a(u) be the third derivative of t(u). Is a(-13) a composite number?
False
Let f(g) = -g**3 - 3*g**2 + 3*g. Let a be f(-4). Suppose l - 3*u - 793 = 0, 4*l - u - 3142 = -a*u. Is l a prime number?
True
Let h(v) be the second derivative of v**3/6 + 13*v**2/2 - 7*v. Let o be h(-13). Suppose o = -5*i + l + 2*l + 1018, -3*i = -2*l - 611. Is i a composite number?
True
Suppose -4*n + 61572 = u, -14*n = -15*n - 4*u + 15408. Let y = -6973 + n. Is y prime?
True
Let r(s) = 3 - 1328*s + 0 + 1502*s + 2 + 1902*s. Is r(6) a prime number?
False
Let v be 3/((-6)/(-10)) - 4/(-2). Suppose v*s - 3408 = s. Suppose -14*g - s = -18*g. Is g a prime number?
False
Suppose 0*o + 3*o = 4*d + 5, -3*d + 5*o - 12 = 0. Suppose d = -2*a - 1. Is (-106)/a*(-3 + (-7)/(-2)) prime?
True
Let b(j) = -j**3 - 19*j**2 + 20*j + 19. Let v be b(-20). Suppose v = -9*i + 55. Suppose 2*q - w - 508 = -0*q, q - i*w = 261. Is q a prime number?
False
Let b = 23411 - -26328. Is b composite?
False
Suppose -78*v - 51*v + 4827567 = 0. Is v prime?
True
Suppose -499*b + 616*b - 19963359 = 0. Is b a prime number?
True
Let s(b) = 280*b + 891. Is s(71) prime?
True
Let s(h) = 1064*h - 4317. Is s(89) prime?
True
Suppose -354962 = -3*z - 22*t + 23*t, 2*z - 236756 = 15*t. Is z prime?
False
Is -6*(-14)/252*988329 composite?
True
Let j = 117 - 77. Is 873/6 + j/(-16) a prime number?
False
Let q(r) = 12*r + 75. Let x be q(-2). Suppose -5234 = -x*s + 50*s. Is s composite?
True
Let q = 1486554 + 1402373. Is q a composite number?
True
Is (-2)/(-5) + (1870712/20 - -17) a composite number?
False
Suppose -4*g - 4 = 0, g - 5*g = 3*q - 35. Is 111267/q - (-5 + -3) prime?
False
Suppose 6*t - 3*t - 4*f + 4 = 0, -t - 8 = -3*f. Suppose 4*h - 230 = 2*y, -t*y = y + h + 520. Is ((3704/3)/4)/((-10)/y) a composite number?
True
Suppose 2*s - 49357 = -4*p + 18159, -2*p = -s + 33758. Suppose -7*r = -5*r - s. Is r composite?
False
Suppose 0 = 20*x - 9*x - 110. Suppose x*t - 3*t = 11998. Is t a prime number?
False
Is (-219041)/(-11) - (136/1122)/((-2)/3) a prime number?
True
Let t = 5650 + -3669. Suppose -309 = -5*o + t. Is o a composite number?
True
Is (24 - 10616404)/10*(-1)/2 prime?
False
Suppose 99 = -2*n + 117. Suppose -1433 = -3*h + 4*g + 8135, 5*h = 3*g + 15943. Suppose -h = n*d - 13*d. Is d a prime number?
True
Let v(j) = j**3 - j**2 - 10*j + 14. Suppose b = -3*a + 9, -5*a - 4*b + 6*b = -15. Let r be v(a). Suppose 0 = r*g - 4*u - 6762, 3*g - 10135 = u + u. Is g prime?
False
Let d = -1817 + 2502. Is d a prime number?
False
Let p = -11 + 2. Suppose -25*d = -43*d - 324. Is (-8080)/d - 1/p a prime number?
True
Let j = -22 + 37. Let w(y) = 184*y - 38. Is w(j) a prime number?
False
Is ((-8)/40)/(32/(-25067360)) a prime number?
True
Suppose 72945 = 5*s - 18*o + 23*o, 29172 = 2*s + 5*o. Is s a prime number?
True
Let h(w) = -2*w**3 + 50*w**2 + 11*w - 48. Let c(m) = -m**3 - 2*m**2 + 22*m + 9. Let r be c(-6). Is h(r) a prime number?
False
Suppose -4*i + 67148 = 3*p, -3*i + 4*p + 38493 = -11868. Is i a prime number?
True
Suppose 9 - 49 = -5*a. Let m be ((12/a - 0) + -3)*-2. Suppose 2*t + 3*z - 1607 = 0, 4*t + m*z - 4004 = -t. Is t composite?
True
Let h(c) = -6*c - 208. Let u be h(-35). Suppose 3*n = -5*x + 57067, 4*x = u*n + 52688 - 7052. Is x a prime number?
True
Let z be (-2)/11 - (-6)/33. Let n(u) = z - 119*u + 2878*u + 2. Is n(1) a prime number?
False
Suppose -u + 335931 - 65829 = -s, 3*u - s - 810296 = 0. Is u composite?
False
Suppose -d - 21*m + 431725 = -19*m, -2*d - 5*m = -863449. Is d a prime number?
False
Let c(b) = 20*b - 1175. Let r be c(0). Let x = 42 + 9. Let k = x - r. 