 -3*c + 3*r = -6 - 0. Suppose -5*h - 20 = c, -285 = -o + 4*h - 6*h. Is o a prime number?
True
Suppose 2*d = 3*l - 1 + 16, -4*d + 3*l + 27 = 0. Is 734 + 0 + 4/(8/d) a prime number?
False
Let r be (-18)/(-5) + 21/(-35). Suppose 2*j - 4 - 4 = 0, -4*c = -r*j - 376. Is c a prime number?
True
Let j(t) = -131*t**3 - 5*t**2 - 8*t - 8. Let q be j(-3). Suppose 0 = 4*f - 3*y - q, -f + 877 = y + 3*y. Is f prime?
True
Suppose -5*t + 8 - 38 = 3*q, 4*t + 22 = -2*q. Is ((-2)/t)/((-74072)/(-18516) - 4) a prime number?
True
Let b be (-2)/(-5) + 4/(-40)*-46. Suppose -4*u + 630 = -b*f, f - 6*f + 300 = 2*u. Is u composite?
True
Let i be (81/4)/((-5)/(-20)). Let f be -6*(16/12 + -2). Let o = i + f. Is o a prime number?
False
Let d(t) = -2339*t + 4. Suppose 3*p + 0*p = -9. Let r be d(p). Is (-2)/13 - r/(-91) a composite number?
True
Suppose 214 = -15*w - 506. Suppose -4*h - 266 = 2*j, -248 = 2*j - h - h. Let z = w - j. Is z a prime number?
True
Let t = 30 + -21. Let u = 4 + t. Let l(p) = 3*p**2 - 15*p - 17. Is l(u) prime?
False
Let h(z) = -2*z + 14. Let v(b) = -b**2 - 13*b + 20. Let l be v(-14). Let x be h(l). Suppose 2*w + x*u - 196 = -0*u, 4*u = -5*w + 489. Is w prime?
True
Let i be ((-8)/10)/((-74)/(-185)). Let z(c) = -55*c**3 + 3*c**2 + 5*c + 16. Let f(o) = 18*o**3 - o**2 - 2*o - 5. Let v(d) = -7*f(d) - 2*z(d). Is v(i) composite?
False
Let f be (-7 - -1)*8/(-12). Suppose -4*s + 2*h + 1560 = 0, -2*h + 0*h = -f. Is s composite?
True
Is -374422*((-135)/18 - -7) a composite number?
False
Let f(t) = 26*t**2 - t + 1. Let u(o) = -o**2 + o + 2. Let p(c) = f(c) - 4*u(c). Is p(-2) prime?
False
Let s = -46 - -76. Suppose -4*y - 2*y - s = 0. Is 10/((-2)/685*y) a prime number?
False
Suppose 2*x = -c + 3287, -4*x + 3*c - 8217 = -9*x. Suppose 3*a = 7*a - x. Is a a prime number?
False
Let d be (0 - -4) + 140/(-20). Is (5/(-10))/(d/2514) composite?
False
Suppose 11*a = -535 + 93408. Is a composite?
False
Suppose 95*w = 20*w + 3974925. Is w a prime number?
True
Let o(i) = -37*i + 16*i + 2*i**3 - 17 - 31*i**2 + 5*i**3. Let f(z) = -3*z**3 + 15*z**2 + 10*z + 9. Let p(d) = -9*f(d) - 4*o(d). Is p(-12) composite?
True
Let c(i) = 2*i**3 - 25*i**2 + 124*i - 8. Is c(15) a prime number?
False
Let k(u) = 181*u - 2 + 38*u + 17*u - 11*u. Let v be k(1). Suppose -h + 3*l + l = -v, -4*l + 446 = 2*h. Is h composite?
False
Suppose 4*t + 2163 + 7458 = 3*w, -5*w + 3*t = -16024. Is w composite?
False
Let z = 0 - -58. Let k = z + 331. Is k prime?
True
Suppose -2*b = -5*b - s + 1804, 3*s + 15 = 0. Let z = 2510 + b. Is z a composite number?
True
Let n(x) = -32532*x**3 + 8*x**2 + 8*x - 1. Is n(-1) composite?
False
Suppose -2*i + 60322 = -t, i = -7*t + 5*t + 30161. Is i composite?
False
Suppose 0 = -3*u + u - 4. Let t be ((-19)/u)/(3/150). Suppose 7*f - t = 2*f. Is f a prime number?
False
Let f be (-8547)/(-189) + 4/(-18). Is 2534/10 - (-6)/f*-3 composite?
True
Let s(p) = 2*p**3 - 7*p**2 + 4 - 27*p + 9*p - 3. Is s(10) composite?
True
Let o be 4 + 0 + (-5 - 102). Let p = 108 - o. Suppose p = 6*v - 347. Is v a prime number?
False
Suppose -f + 5*b = -6*f, 2*b = 0. Suppose 30 = -f*z + 6*z. Suppose -5*g + 1769 = -2*g + 2*d, -z*g + 2955 = 5*d. Is g prime?
True
Let z = 1877 + -974. Suppose 0 = -2*a + 1083 + z. Is a a prime number?
False
Let y = 16 - 7. Let t be (-3)/y*-1*9. Suppose -t*v + 95 = a, 4*a = -3*v + v + 360. Is a prime?
True
Suppose 5*r - 276846 = 3*b - 0*b, -4*r + 3*b + 221475 = 0. Is r a composite number?
True
Suppose o + 1 = -4*l, 0 = 2*o + 3*o + l + 81. Let n = o + 22. Suppose -2*s + 4*s - 295 = -v, -s = n*v - 1466. Is v composite?
False
Let z = 2438 - -10323. Is z a prime number?
False
Let s(d) = 16*d**2 - 10*d - 15. Let h be 15/20*-2*2. Let t(j) = -16*j**2 + 9*j + 14. Let i(o) = h*s(o) - 4*t(o). Is i(-5) prime?
True
Let j = -105 + 355. Suppose u = 11*u - j. Is u prime?
False
Let k = 24 + -28. Is (-1774 + 2)*1/k composite?
False
Let s(g) = 4*g**3 + g**2 + 7. Let x(u) = 4*u**2 + u. Let q be x(-1). Let y(r) = -7*r**3 - 3*r**2 - 13. Let v(i) = q*y(i) + 5*s(i). Is v(-7) prime?
False
Let f be (-2015)/45 - (-2)/(-9). Let s be ((-66)/4)/(f/330). Suppose 5*w + 5*k = 200, 3*w + k - s = -3*k. Is w prime?
False
Let k = -10 + 9. Let s be 133/35 - k/5. Suppose s*w = -4*y + 256, -w + 3*y + 48 = -28. Is w a prime number?
True
Let w(d) = 3*d**3 - 11*d**2 + 12*d - 7. Let q = -26 - -34. Is w(q) a prime number?
False
Let u be (-28)/(-6)*(-48)/(-56). Suppose -u*y + y + 1749 = 0. Is y prime?
False
Let s(f) = 44*f**2 + 16*f - 5. Is s(19) a composite number?
False
Let o(v) = -390*v - 27. Is o(-5) composite?
True
Let z(g) = 120*g**2 + 23*g + 2. Is z(-11) prime?
False
Let j = 18 - 16. Suppose -137 - 51 = -m - h, -388 = -j*m - 5*h. Is 20/5 + m + 3 prime?
True
Suppose 4*q + 46 = m + 143, -3*q + 3*m = -75. Let h = 22 - q. Is 2/h*(5 - 322) a prime number?
True
Suppose -21*f = -24*f - 1020. Let q = f + 591. Is q composite?
False
Suppose 156 = t - 573. Suppose 9 = 3*u + t. Is 0 + (-4 + 1 - u) prime?
False
Let r(m) = 5*m**2 + 5*m - 288. Is r(-26) composite?
True
Let u = -28 - -30. Suppose u*z = -3*l + 23, l = -l + z + 6. Suppose -2*p - l*o = 3*p - 40, 0 = -3*p + 4*o + 38. Is p composite?
True
Is 1680528/(-192)*(-2 + -2)/1 a composite number?
True
Let t = -64615 - -98981. Is t a prime number?
False
Suppose 2*a + y = -0*a + 2, 0 = a + 4*y + 13. Let n(j) = j**2 - 3*j. Let w be n(a). Suppose w = -5*v - 57 + 392. Is v a composite number?
False
Let n(c) = 2*c**3 - 44*c**2 + 118*c + 19. Is n(37) a composite number?
True
Let x(w) = 3853*w**2 + 61*w - 167. Is x(3) prime?
True
Let i(f) = -7816*f**3 + f**2 + f + 1. Is i(-1) composite?
False
Suppose 0 = k + 3*j + 11, -6*k = -k + 2*j + 3. Let x(d) be the second derivative of 78*d**3 - d**2/2 + 14*d. Is x(k) a prime number?
True
Suppose a + 8 = 14. Suppose m - 43029 = -a*m. Is m/21 - (-4)/14 a prime number?
True
Let b = -13216 + 18681. Is b a prime number?
False
Let k(m) be the second derivative of m**5/10 - m**4/2 - 2*m**3/3 + 7*m**2/2 + 14*m. Is k(7) a composite number?
True
Let h be 0 + -2 + -1 + -95. Is (-1)/(1 - h/(-97)) a composite number?
False
Suppose -f + 158 + 66 = 0. Suppose -5*a + 24 - f = 0. Let g = -29 - a. Is g a prime number?
True
Is (-63)/273 + 292470/39 a prime number?
True
Let m(v) = -4*v + 20. Suppose 2*w + 7 = 19. Let a be m(w). Is (166/(-4))/(2/a) composite?
False
Let n(h) = h**3 + 14*h**2 + 14*h + 18. Let d be n(-13). Suppose -4*i + 647 = 5*a, -d*i + 799 = -0*a + 3*a. Is i a prime number?
False
Let d = -25 + 20. Is 18324/60 + 2/d composite?
True
Let u(b) = -78*b**3 + 3*b**2 - 2*b - 2. Let m be u(2). Let h be (-1)/5 - m/15. Let w = 78 + h. Is w prime?
False
Let c = -30 + 31. Is c*(1046 + -5 + 2) prime?
False
Let i(j) = 6*j - 43. Let f be i(8). Let m be 28/5*(-15)/(-2). Suppose -m + 172 = f*a. Is a a prime number?
False
Let j(m) = m**3 - 11*m**2 + 7*m + 5. Let q be j(6). Let a = 524 - q. Let g = a - 100. Is g prime?
True
Let r(j) = j**2 + 3*j - 9. Suppose -6 = d + 1. Is r(d) prime?
True
Suppose 2*a - 6 = 0, 2*i - 3*a = 6*i - 17. Suppose -607 = 2*z + 5*s - 7338, 4*s = -5*z + 16785. Suppose -o - y = -671, -i*y - 2*y = 5*o - z. Is o composite?
True
Let m = 562 - 1842. Is (-3)/(1 - m/(-1265)) composite?
True
Suppose 5*g - 1767 = -232. Is g a composite number?
False
Let u(m) = 151*m - 58. Let j be u(7). Let q = 1496 - j. Is q a prime number?
False
Suppose -10*i - 26 = 3*i. Is (822 - 1)*(-8 + 6)/i a composite number?
False
Suppose 0 = -4*f - 2*b + 8, 5*f - 2 = -b + 8. Suppose -f*p + 93 + 273 = 0. Is p a prime number?
False
Let l(x) = -81*x + 2 + 101*x - 3. Suppose -n - n + 8 = 0. Is l(n) composite?
False
Let o(n) = -45*n + 1. Let f(s) = 91*s - 2. Let p = -16 - -13. Let m(t) = p*f(t) - 5*o(t). Is m(-3) a composite number?
True
Let a = 32351 + -22290. Is a composite?
False
Let p(u) = 4*u**2 - 1. Let m = 34 + -28. Is p(m) a composite number?
True
Let x(l) = -3*l + 15. Suppose -24 + 0 = -4*n. Let z be x(n). Let u(a) = 70*a**2 - a + 2. Is u(z) a composite number?
True
Let u = 92 + -94. Is 8/u - (-379 + -4) prime?
True
Let y = -163 + 341. Suppose -3*m - 1 = -y. Is m prime?
True
Let t be (-2)/(-6) + -9439*(-4)/(-12). Let i = 7195 + t. Is i composite?
False
Suppose b + 3*b - 13892 = 0. Suppose 3*i - 1426 - b = 0. Is i composite?
True
Suppose -5*r + 15 = 0, -72 = 3*c + 4*r - 1035. 