
False
Let t be ((-12)/18)/(4/(-186)). Let q = -29 + t. Suppose 2*k = -y + 39, 0 = -q*y + 4*k + 106 - 28. Is y a prime number?
False
Let n = 50 + -45. Suppose 0 = -r + 2*x + 589, 0 = 3*x - 4*x + n. Is r a prime number?
True
Let l = 13 - 16. Let j be 2 + 2/(l - -5). Suppose -j*i + 1172 = i. Is i prime?
True
Let v be (-1)/((-18)/4) + 1120/63. Suppose 5*g - 1073 = -v. Is g a prime number?
True
Let f(m) be the first derivative of -23*m**5/40 - m**4/12 - 3*m**3 - 10. Let j(k) be the third derivative of f(k). Is j(-7) a composite number?
True
Suppose 246 - 906 = 30*k. Let q(i) = -393*i + 3. Let f be q(5). Is f/k + (-4)/22 composite?
False
Suppose -2*s + 6 = -0*s. Suppose 6 + 0 = s*c. Suppose -822 = -4*m - c*v, v - 6*v = 5*m - 1030. Is m prime?
False
Let t = -4 - -12. Suppose t*j = 9*j - 247. Is j a prime number?
False
Let s(v) be the first derivative of -10*v**2 + 3*v - 5. Is s(-4) a composite number?
False
Let w(j) be the second derivative of -j**5/20 - 3*j**4/4 + j**3/6 + 4*j**2 + 5*j. Let v be w(-9). Is ((-2)/1)/(v/67) composite?
True
Let j = 9 - 6. Suppose 18 = -n - 5*i, 5*i + 33 = 2*n + 9. Suppose 595 = j*l + n*l. Is l composite?
True
Is (-6)/(-2)*(4148 + -57) a prime number?
False
Suppose -2*d = -12*d - 60. Let z(h) = -3 - 53*h - 33*h + 4. Is z(d) a composite number?
True
Suppose 5*l - 38581 = -2*y, 7*y - 5*y - 23147 = -3*l. Is l a composite number?
False
Let p = 642 - 616. Suppose -5*v + v = -292. Suppose 3*w + 2*l = -p + v, -2*w + l + 43 = 0. Is w a composite number?
False
Let a = -9929 + 15720. Is a composite?
False
Let z = 6918 + -1205. Is z a prime number?
False
Let z(d) = 33*d**3 + d**2 + d - 1. Let r be 66/15 + 3/5. Suppose -5*m + 15 = r*u - 10*u, 2*m + u = 0. Is z(m) prime?
False
Let i(o) = 4*o**2 - 6*o - 3. Suppose 2*v - 6*v = 112. Let b be (-12)/(-18) - v/(-6). Is i(b) a prime number?
False
Let d be 1/15*5 - (-3)/(-9). Let a = 5 + -3. Suppose n + 4*j = 201, d = n + a*j - 294 + 85. Is n a prime number?
False
Suppose p - 11544 = -2*y, 5*y - 19784 = 3*p + 9098. Is y prime?
False
Let l(g) be the second derivative of -g**4/12 - g**3/2 + 5*g**2/2 + 13*g. Let r be l(-3). Is (549 + r)*(-2)/(-2) composite?
True
Let a(r) be the second derivative of r**3/3 + 15*r**2/2 - 8*r. Let p be a(-6). Suppose -w = -s + 1862, -w = -2*s - p*w + 3744. Is s a composite number?
False
Let n(p) = -1951*p. Let f be n(-1). Suppose 0*d + d + f = 5*z, -3*z = d - 1177. Is z a composite number?
True
Is 3/5 - (13788684/45)/(-3) composite?
False
Let z be (-2)/(2 + (-1360)/679). Let w be (8/(-16))/((-1)/6). Suppose w*s - 4*s = -z. Is s composite?
True
Let j(s) = s - 7. Suppose 4*r - 16 = 3*z, 0 = 4*z - 6*z. Let f be j(r). Let x(v) = -8*v**3 - v**2 - 2*v - 2. Is x(f) prime?
True
Suppose -18 = -3*f + 3*g, f - g - 18 = -4*g. Let y = f - 2. Is y composite?
False
Let z(c) be the third derivative of 6*c**6/5 + c**5/30 - c**4/12 + c**3/6 - 105*c**2. Let i be 2/4 - 2/(-4). Is z(i) a composite number?
True
Let o(z) = z**2 + 5*z + 11. Let x(s) = s**2 + 2*s + 1. Let n be x(3). Is o(n) composite?
False
Let v(s) = -778*s - 33. Is v(-1) composite?
True
Suppose -15*f - 62838 = -21*f. Suppose -5*y = -2*y - f. Is y prime?
True
Let i(c) = 2*c + 15. Let j be i(6). Let y = j - 52. Let t = y - -36. Is t composite?
False
Let q(b) = -21*b - 79. Is q(-8) a prime number?
True
Let t = 1379 - 330. Is t a composite number?
False
Let o = 6 + -1. Let b be 3/(-15) + 31/o. Suppose -h = -b*h + 745. Is h a composite number?
False
Is (-35676)/26*-12 + 62/403 a prime number?
False
Let q = 5835 - 3713. Is q a composite number?
True
Let a = -5894 - -10095. Is a a composite number?
False
Let l = -44750 + 78779. Is (-4 - 110/(-25)) + l/15 a prime number?
True
Let k(w) = 5*w - 5*w**3 + w**3 - 13 + 5*w**3 + 14*w**2. Suppose -4*t = -4*i + 40, 0 = 3*t + 4*i + 3 + 48. Is k(t) composite?
True
Let l = -10 + 4093. Is l composite?
True
Suppose 0 = -101*c + 91*c + 110. Let y(d) = 1 - d + d**2 + 3*d + 2*d. Is y(c) composite?
True
Let k(a) = -43*a - 2. Let l = 3 - 14. Is k(l) prime?
False
Suppose -72*s - 2*h + 25158 = -68*s, -s + h = -6282. Is s a prime number?
True
Is 12/16 - 368043/(-12) a prime number?
True
Suppose 6*y + 506 = -5*y. Let o = y + 713. Is o a composite number?
True
Let l = 423 + -203. Suppose 396 = 3*r + 3*s, 5*s = -r + 3*r - 243. Let i = l - r. Is i a prime number?
False
Let s be (8/(-12))/((-3)/(-2979)). Is s/(-18) - (-46)/207 composite?
False
Let d(p) be the third derivative of -p**6/120 + p**5/3 - 2*p**4/3 + p**3/3 - 34*p**2. Is d(19) composite?
False
Let h(f) = -9*f**2 - 5 + 36*f**2 + 53*f**2 + 0 + 2*f. Is h(-6) composite?
True
Let w(b) = -107*b**3 - 3*b**2 - 7*b - 52. Is w(-5) composite?
True
Suppose -61*j - 2605 = -66*j. Is j composite?
False
Let t(q) = -1472*q**2 + 1. Let b(w) = -1472*w**2 + 1. Let n(d) = 2*b(d) - 3*t(d). Is n(1) a composite number?
False
Suppose -c + 968 + 512 = -3*z, -2*z + 4429 = 3*c. Is c composite?
True
Let a(n) = -40*n**3 - 1. Suppose -4*z = -4*i + 12, 2*i + 7 = -3*z + 3. Is a(z) a prime number?
False
Let q(w) = 4*w**3 - 3*w**2 - 7*w + 4. Let m(r) = -7*r**2 + 0*r**2 + 3*r**3 - r**2 + 4*r**2 + 5 - 7*r. Let b(k) = 3*m(k) - 2*q(k). Is b(9) a composite number?
True
Let p be ((-80)/(-30))/((-4)/(-6)). Let a = 17 - p. Let d(r) = -r**3 + 14*r**2 - 7*r + 17. Is d(a) composite?
True
Let j be 2/(-4)*5*8/20. Is j*(3 + 7310/(-5)) prime?
True
Let r = -4717 - -29156. Is r a prime number?
True
Let p = 9 - 8. Let k be -2*(p - 6*11). Suppose o - 41 + 8 = -t, 4*t + 3*o = k. Is t a composite number?
False
Let m(u) = -96*u + 55. Let r(t) = 4*t - 57. Let y be r(10). Is m(y) prime?
False
Let n(i) = 24*i**2 + 7*i + 340. Is n(-17) a composite number?
True
Suppose 0 = -26*i - i + 1032534. Is i composite?
True
Let m(r) = -r**3 + 14*r**2 - 3*r - 14. Let c = -2 + 10. Is m(c) composite?
True
Let k(d) = 441*d + 1. Let m be k(9). Suppose -5*s = t - 776, 5*t + 3*s - m = 8*s. Is t prime?
False
Is (77806/4)/((-138)/(-12) + -11) prime?
True
Suppose -7*l + 3*x + 89949 = -4*l, -5*x = 2*l - 59966. Is l a prime number?
True
Let u(c) = 2*c + 16. Let m be u(-11). Let j(d) = -12*d - 6. Let g(b) = -6*b - 3. Let q(x) = -7*g(x) + 4*j(x). Is q(m) prime?
False
Let n(y) be the second derivative of 3*y**4/4 - 5*y**3/2 + 35*y**2/2 + 30*y. Is n(7) composite?
True
Suppose 4*x = -0*x + 6572. Is x a prime number?
False
Suppose o + 0*o = 16. Let a = o - 15. Is (-154)/(1 + -2 - a) a composite number?
True
Let x = -104 - 1225. Let o = x + 4236. Suppose -5*z - 4885 = -5*f, 4*f - f - o = -3*z. Is f a composite number?
True
Let l(g) = 2*g**2 - 3*g - 5. Let q be l(9). Suppose 497 - q = m. Is m composite?
False
Suppose -2*v = v + 12. Let r be (-2)/(v - -2) - -3. Suppose -5*s - 131 = -5*b + 219, r*b = -2*s + 262. Is b a composite number?
False
Let d(n) = 2350*n + 13. Let b be d(2). Let k = -206 + b. Is k prime?
True
Let u(c) = 269*c**2 + 16*c - 122. Is u(-11) a composite number?
False
Suppose -2*v - 4 = -5*h, -9 = -h - 2*h - v. Let d be (4/(-5))/(10/(-25)). Suppose -3*a + d*k = -k - 1398, -h*a + k = -933. Is a a composite number?
False
Let k = 1860 - 961. Is k prime?
False
Let v(h) = h**2 + 6*h - 7. Let s be v(-7). Suppose 2*f = -s*i + 3*i + 67, 0 = 5*f - 4*i - 171. Is f composite?
True
Let z be -3 + (1 - 3 - -13). Suppose 5*m - 2*m = -5*q + 14, z = -4*m. Suppose 0 = 5*a - j - 1089, -4*a + 0*j + 852 = q*j. Is a a prime number?
False
Let r be (1 - 52/12)*3. Let w = r - -4. Is (4/w)/(20/(-3450)) a composite number?
True
Suppose 5*a - 130449 = x, -70*a + 75*a = -3*x + 130433. Is a prime?
False
Let q(z) = -4*z**2 - 9*z - 4. Let g(v) = -5*v**2 - 10*v - 5. Let r(w) = -3*g(w) + 2*q(w). Is r(-6) a composite number?
True
Suppose 41*d + 2 = 42*d. Suppose -j + d*w + 468 = 0, 2*j - 6*j - 5*w = -1820. Is (j/25)/(2/5) a prime number?
False
Let h = -18492 + 41105. Is h prime?
True
Let o(z) = -19420*z - 33. Is o(-1) a composite number?
False
Is -4*6/40 - 343876/(-10) a prime number?
False
Is (5 + 5504/(-12))*-3 a composite number?
False
Let m = 41779 + -27992. Is m prime?
False
Suppose -5404 = -4*h - 4*j, -2*h - 5*j + 1242 + 1475 = 0. Suppose 3*r - h = r. Is r a composite number?
False
Let r(c) = 7*c**3 - 8*c**2 + 11*c + 9. Is r(5) a composite number?
False
Suppose -3*t = q - 8, -3*q + 5*q - 3*t = -20. Let o = 4 + q. Suppose o = -8*h + 5*h + 105. 