Let h(y) = 5*f(y) + 8*k(y). Let u be h(-5). Suppose -u - 1 = -q. Is q prime?
False
Suppose -31*a + 4044 = -14029. Is a a composite number?
True
Let o(i) = -2*i**2 - 39*i - 25. Let p be o(-19). Is (9 - 9 - (-2 - p)) + 321 composite?
False
Suppose 125 = 5*u + 45. Let j be (-4)/u*0 + -26. Is (-6 - j) + 0 + 3 a prime number?
True
Let m = -157 - -273. Let n = m - -261. Is n prime?
False
Let i(q) be the second derivative of -7*q**3/6 + 5*q**2 + 12*q. Let k be i(4). Is (12/k)/(6/(-2151)) composite?
False
Suppose -8*v = -4*v + 4. Is (-15104)/(-10) - v - 6/15 composite?
False
Let p be 2/(-6)*(-9 - 12). Suppose p*m = 8*m - 187. Is m composite?
True
Suppose 0 = -5*m - x - 100 + 2848, 4*m - 2204 = 2*x. Suppose k - 3*n - m = -2*n, 2771 = 5*k + 2*n. Let i = -32 + k. Is i composite?
False
Let k(h) = -54*h**3 + 8*h**2 - 12*h - 20. Let g be k(-7). Suppose 127*z - 129*z + g = 0. Is z composite?
True
Let k(f) = f**2 - 2*f + 4. Let y be k(3). Let j = y + 2. Let m(o) = o**3 - 8*o**2 - 7*o - 3. Is m(j) composite?
True
Suppose 2*f - 24 = -x + 45, 0 = 2*f - 5*x - 39. Suppose -l = 2*o + 2 + 2, 5*o = l + f. Let y(r) = -r**3 - 2*r**2 + 17*r + 17. Is y(l) a prime number?
False
Let m(f) = -f**3 + 34*f**2 - 26*f + 28. Is m(25) a prime number?
True
Let q(j) = -30*j**3 + 2*j**2 - j + 1. Let v be 2/(-11) + 138/33. Suppose -v + 6 = -n. Is q(n) a composite number?
False
Let u = -11 - -15. Suppose -u*s - 16 = 16. Let d(c) = -6*c + 7. Is d(s) composite?
True
Is (5 - 1) + 12719 + 58 prime?
True
Suppose 0 = 9*m + m - 51580. Suppose 3*q - 5*q = -m. Is q composite?
False
Let u(l) = 20*l**2 + 11*l - 23. Let t(p) = -10*p**2 - 6*p + 12. Let f(d) = 5*t(d) + 3*u(d). Let q(x) = -26*x + 654. Let g be q(25). Is f(g) a composite number?
False
Suppose 4*u + 29 = u - 5*d, 4*d = 8. Let k = u + 24. Let w(h) = -h**3 + 11*h**2 + 4*h - 5. Is w(k) composite?
True
Let k(m) = 13*m**2 + 5*m + 5. Let y = 7 - 5. Let f be ((-24)/9 + y)*3. Is k(f) composite?
False
Let o(v) = v**2 + 2*v - 15. Let c be o(-5). Suppose m - 2*m + 221 = c. Is m a prime number?
False
Suppose 20*c = 13*c + 111293. Is c a prime number?
False
Is 1865*2 + -3 + -11 + 6 composite?
True
Suppose -2*d = -4*u - 12432, -24*d = -28*d + 4*u + 24868. Is d a prime number?
False
Let f(q) = -q**3 - 14*q**2 - 10*q + 6. Let g be f(-12). Let x = 635 - g. Is x a prime number?
True
Let o = 42809 - 23670. Is o composite?
False
Let z be 3 + (2 - 5)/3. Let r be 4/8*(z + -2). Suppose r*x + x = -2*f + 105, -4*f + 305 = 3*x. Is x a composite number?
True
Let f = 7933 + -3856. Suppose 0 = -5*v + f + 488. Is v prime?
False
Suppose 2*k + 20 = 1162. Is k composite?
False
Let u(m) = -287*m**2 + 280*m**2 - 8*m**3 - m + 3*m. Is u(-5) composite?
True
Let a = 83 + -15. Let c = a + -25. Is c a prime number?
True
Suppose 24*i - 40*i = -755536. Is i composite?
False
Let u(t) = -t**3 + 19*t**2 + 45*t + 19. Is u(-18) a composite number?
False
Let i = 1439 - 276. Is i a composite number?
False
Is (6/(-27))/((-8)/2260836) composite?
False
Let k(w) = w**3 - 6*w**2 + 6*w. Let m be k(5). Let h(g) = 2 + 6*g + 10*g - 10*g + 7*g. Is h(m) composite?
False
Let w(y) = 4*y**3 + 5*y**2 + 9*y + 9. Let p be w(-6). Let v = p - -374. Let u = v + 618. Is u a prime number?
True
Let c = -100 - -60. Is 30/c + (-6247)/(-4) composite?
True
Let m(q) = -q**2 - 4*q + 2. Let x be m(-4). Let r be (-99)/(-15) + x/5. Let p(t) = 2*t**3 - 5*t**2 + 2*t - 8. Is p(r) a composite number?
True
Let x(a) = -2*a**2 + 9*a - 2. Let i be x(4). Is -5 - -135 - (i - -1) prime?
True
Let z(r) = -3*r**3 + r**2 - 9*r - 6. Let a = -10 + 3. Is z(a) a prime number?
False
Let s(b) = 139*b**2 - 4*b - 36. Is s(-7) a composite number?
False
Suppose 127836 = 4*o + 32*o. Is o a prime number?
False
Suppose -1236 = -3*k + 3*r, 7*k = 8*k + 3*r - 416. Is k - -1*2/(-1) a composite number?
True
Let n be (4/(-6))/(2/(-6)). Suppose -4*x - 5*l = -2*x - 159, 3*x + n*l - 211 = 0. Is x a composite number?
False
Let x(v) = 27*v**2 + v + 3. Let w be x(3). Let z(j) = -13*j**2 - 13*j - 14. Let s be z(-4). Let i = w + s. Is i prime?
True
Let l(u) = -2*u**3 - 4*u**2 - 3. Let h be l(-3). Let w be 8/6 - (-10)/h. Suppose w*k + k = 141. Is k composite?
False
Suppose 5*m + 7*g + 7 = 3*g, 4*m - 2*g = 10. Let y(p) = 935*p**2 - p - 2. Let b be y(-1). Is b/5 + m/5 composite?
True
Suppose 104178 = 29*u + 23645. Is u composite?
False
Suppose 6181 + 1820 = 3*k. Suppose 0 = 5*l, 3*h + k = 6*h - 5*l. Is h composite?
True
Let w(m) be the second derivative of 43*m**4/6 + m**3/2 + 2*m**2 + 10*m. Is w(3) a composite number?
False
Let v(s) = -17*s**3 - 5*s**2 - s + 2. Let o = -15 + 29. Suppose -2*c + 2*h - o = 0, 3*c + 2*h = c + 2. Is v(c) prime?
True
Let n be (-30)/(2 - (-8)/(-3)). Suppose 77 = 4*x + 2*l - 59, 5*l = 2*x - 44. Let p = n - x. Is p composite?
False
Suppose -3*w + 3*z = -8196, 6*z = 3*w + 9*z - 8190. Is w a prime number?
True
Let l be 6/((-120)/(-18035)) + 1/4. Suppose -1205 = -7*n + l. Is n prime?
False
Let q = -8 - -13. Suppose 3*i - 1 = 5*y - 2, 0 = 3*y - 4*i - q. Is (27/36)/(y/(-148)) a prime number?
False
Suppose 3*z = d + 4*z - 14, z = 5. Let f = d - 7. Is (-15)/(-10) + 283/f a prime number?
False
Let g(p) = 5*p**3 - 7*p**2 + 4. Suppose -q + 3*c + 9 = 2*q, 3*c - 6 = 0. Is g(q) composite?
True
Let h(k) = k**2 + 2*k - 7. Let r(j) = j**2 + j - 7. Suppose 5*t + 3 = 28. Let o(i) = t*r(i) - 4*h(i). Is o(9) a composite number?
False
Let h(u) = -u**3 - 4*u**2 - 3*u + 1. Suppose 5*p = -2*w + 32, -5*w + 27 = -2*p - 24. Let o be -5 + 0 + -10 + w. Is h(o) a composite number?
False
Let g = 14037 - 6632. Is g prime?
False
Suppose -20*y - 178 + 14118 = 0. Is y prime?
False
Suppose -1 = h - 5. Suppose h*k - 3*k - 511 = 0. Is k a prime number?
False
Let j = -14 + 40. Is j composite?
True
Let l(b) = -88*b**3 + 5*b**2 + 3*b + 3. Let w be l(-3). Suppose -2002 - w = -7*g. Is g prime?
True
Suppose 2*y - 4308 = k, -y + 2*k = -5*y + 8616. Suppose -7*c - 236 = -y. Is c prime?
False
Is (1 - -11900) + (-6 - (8 + -16)) a composite number?
False
Let v = 86 - -50. Let g = 37 - -25. Let i = v - g. Is i a composite number?
True
Let a = 1139 + -3098. Let w = a - -4112. Is w a composite number?
False
Suppose -3*w + 62138 = u, -4*w - 33*u + 82836 = -28*u. Is w prime?
False
Let q = 43 + -40. Let h be (-2)/(-4) + q/2. Suppose -x = h*s - 505, -4*s + 486 = -2*x - 528. Is s prime?
False
Let a(s) be the first derivative of 59*s**4/4 + 2*s**3/3 - s**2 + 3*s - 6. Is a(2) prime?
True
Let r = -41775 - -106436. Is r composite?
False
Let y(f) = f + 5. Let s be y(-5). Let x be (-152 - s)*(-1)/2. Is x/3 + (-7)/21 a prime number?
False
Let z(q) = 99*q**3 - 2*q**2 + 4*q - 6. Let r(m) = -m + 8. Let u be r(5). Let s be z(u). Suppose 3*w - s = -3*d, -2*d + 1774 = 4*w - w. Is d a composite number?
False
Let i(k) = 181*k**2 - 11*k - 40. Is i(-3) composite?
True
Let n(p) = p**2 + 6*p - 4. Let j = 0 + -7. Let g be n(j). Suppose d - 624 = -d + 2*i, g*i = 4*d - 1243. Is d composite?
False
Let j(g) = -7*g - 56. Let a be j(-8). Suppose a = -3*l - 2*b + 3*b + 3616, 2*b + 2404 = 2*l. Is l a prime number?
False
Let x be (2 - 9/6)*4. Let y(w) = 2*w + w - x - w - 7*w. Is y(-11) a prime number?
True
Let f(y) = 564*y - 6. Let j be f(8). Suppose 16*g + j = 18*g. Is g prime?
False
Suppose -325998 = -121*u + 103*u. Is u composite?
True
Suppose 4*s = k - 2574, 4*s - 5103 = -2*k + 3*s. Is k prime?
False
Suppose -7 = -4*k + 1. Suppose i = y - 64, -3*y + 59 = -k*i - 73. Is (-109)/(-5) + (-12)/i prime?
False
Let d be (-120)/(-16)*(-6)/(-5). Let p = -3 - -1. Is (p/6)/(d/(-3186)) a composite number?
True
Suppose 3*b + 11 = -5*u, 3*u - 4*b + 0 = 5. Is 28/2 - (-3)/u a prime number?
True
Suppose 4*j - 707 = 8105. Is j a prime number?
True
Suppose 52*a - 18*a = 990182. Is a a prime number?
True
Suppose -2*v = -2*b - 14270, -2*b = 2*v - b - 14264. Is v a prime number?
False
Suppose -2*z = 2*c - 75250, 0 = c + c + 4. Is z composite?
True
Is 9372 + 5 + 20/4 a composite number?
True
Let q = -35 - -442. Is q prime?
False
Suppose -5*c + 24 = c. Suppose -4*m + 2*g + 2536 = 0, 4*g - 1203 + 3739 = c*m. Is m a prime number?
False
Let w(f) be the third derivative of 19*f**5/30 + f**3/2 - 8*f**2. Let i be w(6). Suppose 5*c + i = 2*y, 0*y + 2*y + 4*c = 1362. Is y composite?
False
Suppose h = 4*o + 9 + 2, 3*o = -3*h + 3. Let i = 8 - h. 