ue
Let c = 7 + -2. Suppose 1 = 3*i - c. Suppose 0 = 3*q + 4*o - 139, i*q = 6*q - 4*o - 204. Is q a composite number?
True
Suppose 13*p - 10*p = 6477. Is p a prime number?
False
Let l(r) = 53*r + 82. Is l(5) a composite number?
False
Suppose -m - 10 = 2*f + 2*m, -4*f + 5*m - 64 = 0. Let d(o) = 6*o - 3. Let h(w) = -31*w + 15. Let x(n) = f*d(n) - 2*h(n). Is x(-8) composite?
True
Let f be 77 + 6 + 4 + -1 - -1. Suppose -n = -2*w - 0*w - f, w + 261 = 3*n. Is n prime?
False
Let t(a) = -4*a**2 + 108*a - 31. Is t(24) a composite number?
False
Is 7 - 6114*3/(-3) prime?
True
Let a = -741 + 496. Let t = a + 456. Is t a prime number?
True
Let p(c) = -4*c - 31. Let o be p(-8). Let f(t) = 1940*t**2 - 2*t - 1. Is f(o) a composite number?
True
Let h be (-6)/(-7 + 4) + -6 + -1. Is (3 + 0 - 856)*5/h a composite number?
False
Let x(q) = 49715*q**2 + 5*q + 6. Let g be x(-1). Is g/30 + (-4)/20 composite?
False
Let l(s) = -2*s - 3 + 5 - 1. Let i be l(-1). Suppose -i*g - 218 = -5*g. Is g a prime number?
True
Is -2 + 12819/4 - (-1)/4 a composite number?
False
Let o(x) = 499*x + 17. Is o(18) a prime number?
True
Suppose -45*k + 44*k = -8795. Is k composite?
True
Let s(u) = -9 + 2*u**3 - u**3 + 14*u**2 + 12*u + 2 - 5. Let i be s(-13). Is 1*(2*18 + i) a composite number?
False
Suppose 3*w + 2*j + 3*j = 58184, 4*w + 3*j = 77597. Is w a composite number?
False
Let d be ((-3508)/(-6))/(-4 - (-56)/12). Let z = d + -434. Is z a composite number?
False
Let f be 2/(0 + 4/178). Suppose -4*x + 23 = -f. Suppose -o = w - x - 192, -1095 = -5*w - 4*o. Is w a composite number?
True
Let q(v) be the second derivative of -11*v**3/3 - 15*v**2/2 - 24*v. Is q(-3) composite?
True
Suppose 5*g - 32502 = -5*k + 9893, -5*g = k - 42395. Is g prime?
False
Let m = -21 + 24. Suppose -m*c + 894 = 3*f, -2*c + 4*c = 4*f + 602. Is c composite?
True
Suppose 319 = h + 2*r, -5*h - 2*r + 1270 = -h. Is h a composite number?
False
Let w be (6/4)/((-30)/(-40)). Let z be (5/w)/(-5)*-482. Suppose -2*y + z = -85. Is y composite?
False
Suppose 0 = -4*u + 5*d + 30, 5*u + 2*d + 0*d - 21 = 0. Is 2349/15 - -6 - (-2)/u prime?
True
Is -2 - 2 - (35 + -992) a composite number?
False
Let n = 10 + -10. Let l(u) be the second derivative of u**5/20 + u**4/12 - u**3/6 + 163*u**2/2 - u. Is l(n) prime?
True
Let j be ((-3)/(-2))/(-3)*8. Is 4/16 - 2163/j a composite number?
False
Let u = -952 - -2361. Is u prime?
True
Let h be (-1 - (-28)/(-12))*204. Let z = h - -1315. Is z prime?
False
Suppose 5*p + 0*h - 58 = 2*h, 5*h - 5 = 0. Let a be (388/12)/((-4)/p). Let s = a - -224. Is s composite?
False
Let u = -2714 + 9717. Is u prime?
False
Let y = -478 + 506. Let m(l) = -l + 1241. Let t be m(0). Let o = t - y. Is o prime?
True
Suppose 3*a + 8855 = -2*n, -5*a - 5982 - 11729 = 4*n. Let p = 6502 + n. Is p a composite number?
True
Suppose 247005 = 30*m + 15*m. Is m a composite number?
True
Let g be ((-48)/(-4) + -2)/2. Suppose -442 = -4*f - p, -g*p - 111 = 2*f - 323. Suppose w + 3*h = -2*w + f, -h = 2. Is w a prime number?
False
Let m(b) be the first derivative of -b**4/4 + 11*b**3 - b**2/2 - 14*b - 32. Is m(13) a prime number?
False
Let s(a) = 93*a**2 - 6*a - 2. Let g be s(3). Suppose -3*b + 3*j + g = -167, 316 = b - 5*j. Is b composite?
False
Let u(d) = 19*d + 5. Suppose 4*h - 2*p = 2*h + 8, -48 = -5*h - 2*p. Is u(h) prime?
True
Let d = -8 + 4. Suppose 18 = -2*o - o. Is o/d - (-323)/2 composite?
False
Is (4265/(-2))/(4 + 63/(-14)) a composite number?
True
Let b(d) = 36*d**3 - d**2 + 5*d - 1. Let p be 4/8 - (-3)/2. Is b(p) a prime number?
True
Let d(l) be the second derivative of l**4/6 + l**3/3 - 4*l**2 + 5*l. Let t be d(-5). Suppose -5*u = -p + t + 8, 5*p - 272 = u. Is p composite?
True
Suppose -5*l + 5 = -4*l. Let u be 4 + -1 + (-15)/(0 + 5). Suppose 12 = 3*q, -l*q = -u*r + 5*r - 765. Is r composite?
False
Let n(j) = j**3 + 11*j**2 + 2. Let s be n(-11). Let w(h) = 17*h**2 - 3*h + 5. Is w(s) composite?
False
Let z(j) = 69*j + 43. Let l = -18 + 22. Is z(l) a composite number?
True
Suppose 14 = 5*l + 4*u, 2*l = -l + 2*u + 4. Let k be (l - 0) + 0 - 0. Suppose -212 = -2*f - k*f. Is f a composite number?
False
Let c be (253 + 56)*((-1)/3 - -1). Suppose z - 268 = 1037. Let u = z - c. Is u a prime number?
False
Let j(t) = -t**3 - 8*t**2 - 6*t + 9. Let y be j(-7). Suppose -y*c + 2518 + 7023 = 5*p, -9553 = -5*p + 4*c. Is p a composite number?
True
Let b = 578 + -101. Suppose 4*m - 472 = -4*q, b = 4*q - 2*m + m. Let k = q - -72. Is k composite?
False
Let y(q) = 40*q**3 - 3*q**2 + 6*q - 8. Is y(7) composite?
True
Let z = -2320 - -4227. Is z composite?
False
Let w(x) be the third derivative of -10*x**6 + x**5/30 + x**4/24 + 2*x**2. Is w(-1) a composite number?
False
Is -2 + (-7 - -106) + -3 prime?
False
Let p(i) = -2*i + 11. Let w be p(6). Is 1256/6 - ((-12)/(-9) + w) a composite number?
True
Let b(p) = 326*p**2 + 5*p - 28. Is b(-7) a composite number?
True
Let n(y) = -226*y - 5. Suppose 3 + 5 = 2*x. Suppose 5*c = -x*i - 27, c = 5*c + 5*i + 27. Is n(c) a composite number?
False
Let w(r) = r**3 - 31*r**2 - 20*r + 121. Is w(33) prime?
False
Suppose c + 6*c - 138845 = 0. Is c composite?
True
Let x = 5 + -3. Suppose 22 + x = -3*s. Let y(w) = 2*w**2 + 10*w - 1. Is y(s) a composite number?
False
Is (-1061 - 2)*-1 - (3 - 1) prime?
True
Let b(k) = -2*k - 2. Let z be b(-7). Let i = z - -3. Is (-9)/i - 836/(-10) prime?
True
Let a(x) = -3*x**3 - 40*x + 6*x**2 - 10 + 45*x - 1. Is a(-5) composite?
True
Let c be (-14)/4 - (-14)/(-28). Is 6105/(-10)*c/6 a composite number?
True
Let s(c) = c - 3. Let n be s(5). Is n/(-3) - 3980/(-12) composite?
False
Let g be 10/((-1)/(-88)*1). Let o = g + -571. Is o composite?
True
Let v be 14/3 - (-10)/30. Suppose -v*s = -4*m + 258 + 124, s - 370 = -4*m. Is m composite?
True
Suppose 68*w = 62*w + 176862. Is w composite?
True
Let d(i) = i**3 - i + 36. Let l be d(0). Suppose 32*a - l*a + 2668 = 0. Is a a prime number?
False
Suppose -16*l + 11*l = -5*s - 10870, 0 = 4*l + s - 8721. Is l a composite number?
False
Let x = -2 - -6. Suppose 3*b + x*h + 11 = 0, 2 = 5*b - 4*h - 1. Is 9685/26 - b/2 a prime number?
True
Let s(o) = 3*o - 34. Let v(f) = -8*f + 102. Let r(z) = -11*s(z) - 4*v(z). Let b be r(0). Let d = 345 - b. Is d composite?
False
Suppose o = 6*o. Suppose 5*g - 489 - 1156 = o. Let b = g + -214. Is b composite?
True
Let i be 2/(-6)*14/14*-15. Suppose -87 = m + 4*d - 3170, i*d = -m + 3079. Is m prime?
False
Let x(o) be the first derivative of 113*o**2 + 9*o - 2. Is x(4) composite?
True
Suppose 0 = -5*j - 2*i + 6*i + 5635, 3*j + 5*i = 3418. Let z = -615 + j. Is z/8 + 1/2 prime?
False
Let r(i) = -487*i + 513. Is r(-8) composite?
False
Suppose 8*b + 545780 = 5*s + 9*b, 545800 = 5*s - 3*b. Is s composite?
True
Let n = -77 + 55. Is (4/(-6))/(n/1749) a composite number?
False
Let r = -194 - -511. Let i = r + 102. Is i prime?
True
Suppose 5*h - 999 = -g, 2*g - 3*h + 4*h - 2016 = 0. Is g prime?
True
Let t(l) = 2830*l + 41. Is t(2) prime?
True
Let m(s) = s**2 + 4*s + 2237. Is m(0) prime?
True
Let c(m) = -m + 12. Let t be c(9). Let p be (-8 + 9)*1*t. Suppose -p - 11 = -q. Is q composite?
True
Suppose -5 = s - 2*s. Suppose -s*n + 6404 = 829. Suppose 4*w + w = n. Is w a composite number?
False
Let g(r) = r**3 + 10*r**2 - 13*r - 10. Let n be g(-11). Suppose 9 - n = 3*v. Is (-2)/(-2)*v - -390 composite?
False
Suppose -2*s - 34 = 2*n, 3*n + 38 = -2*s + 2*n. Is (-29071)/s + 2/3 a composite number?
True
Suppose 68*y = 81*y - 2067. Is y a prime number?
False
Let p(l) be the first derivative of 2*l**3/3 + 7*l - 1. Let f be p(-3). Suppose -w - f = -68. Is w a composite number?
False
Let x(c) = -2*c**3 - 29*c**2 + 80*c + 102. Is x(-32) prime?
False
Let z(w) be the second derivative of 5*w**4/4 - w**3/2 + w**2/2 + 10*w. Is z(-4) prime?
False
Is 33245 + (4/22 - (-20)/11) prime?
True
Let z(h) = 12*h + 75. Let v be z(-8). Suppose -29 + 85 = -4*i. Is (-768)/v + (-6)/i a composite number?
False
Let o = -6 - -2. Is -571*(-2 - (o - -3)) a prime number?
True
Suppose 12*v - 1481 - 2923 = 0. Is v a composite number?
False
Suppose -5*a + 52*g - 48*g = -9529, 5747 = 3*a + 5*g. Is a prime?
False
Suppose 61*p - 60*p + 1035 = 0. Let o = p + 2512. Is o prime?
False
Suppose -m = -825 - 54963. Is m/21 - 3/(-7) composite?
False
Let x = 19 + -14. Let v = x + -15. 