 7 - 3*l**2 + 2*l**2 + 0*l**2 - 2*l. Let n be p(-3). Suppose -g + 3 = 0, a - 239 = -0*a + n*g. Is a a prime number?
True
Is (-15)/((-315)/12) - (-7)/(98/72498) a composite number?
False
Let f be (-1 - 0)/((-5)/(-215)). Let k = f - -48. Suppose -4*q - k*q = -3033. Is q composite?
False
Let t be (-4)/6 + 99/27. Suppose 0*f + t*f + 5*g = 6841, -4*f = 2*g - 9126. Suppose 3*l - o = 3423, -f = -3*l + l + 2*o. Is l composite?
True
Let c(l) = 151*l**3 + 6*l**2 + 24*l - 63. Is c(17) composite?
True
Let v = -978 - -1759. Suppose k + 2243 = 2*a - v, 0 = -2*a + 3*k + 3020. Is a a composite number?
True
Is 138560*1 + 4/(-6 + (-14)/(-3)) prime?
False
Suppose -45*h + 12018 = -39*h. Suppose 6*n - 24815 = -h. Is n prime?
False
Suppose -1 = -4*t - 4*h + 3, -4*h = 2*t - 6. Is (6*t/(-4))/((-12)/(-1160)) composite?
True
Suppose -513*m + 75308109 = -31805778. Is m prime?
True
Suppose 5*i + c = 335819 + 39876, 3*i + c = 225417. Is i prime?
False
Let k(c) = -37*c + 3165. Let s be k(-24). Let t = 4 + -1. Suppose 0 = 4*o - t*j - s, -4*o + 3*j + 2031 = -2*o. Is o prime?
False
Let h(i) = 21*i + 37. Let c(k) = 21*k + 32. Let d(r) = 5*c(r) - 6*h(r). Is d(-33) a composite number?
False
Suppose 7*l - 3*x - 422830 = 0, 0*x = -2*l + 4*x + 120796. Is l composite?
True
Suppose -17*y - 15080 = -30*y. Let w = -669 + y. Is w prime?
True
Suppose 0 = -j - 2*h + 11767, -23564 = 111*j - 113*j + 2*h. Is j prime?
True
Let p(l) = 7*l - 39. Let r be p(6). Suppose -4*f + 5*f = -4, 9515 = q + r*f. Is q a prime number?
False
Let i(g) = -259945*g - 25. Let x be i(3). Is (x/(-40))/((-3)/(-6)) composite?
False
Suppose 25*q - 634376 = 226524. Suppose 4524 + q = 16*g. Is g a prime number?
False
Let k(r) = -r**3 + 8*r**2 + 5*r - 21. Let s(a) = -2*a**3 - a**2 + 2*a + 3. Let o be s(-2). Suppose -3*l = -g - o + 31, 4*g - 5*l = 52. Is k(g) a prime number?
True
Suppose -1973*m + 1966*m + 4230443 = 0. Is m a prime number?
True
Suppose 3*h - 1287134 = 5*j, 53*h + 858091 = 55*h - 5*j. Is h prime?
True
Suppose -4*g + 0*k + 1303 = -3*k, -2*g - 2*k + 634 = 0. Suppose -3*x - 37 + g = 0. Is x a prime number?
False
Let j(r) = r**2 + 3*r + 1. Let b be j(-3). Let n be 8/(-16)*b/((-1)/64). Let d = 171 - n. Is d prime?
True
Let c(a) = -4*a**2 - 4*a - 9. Let h(v) = 3*v**2 + 3*v + 8. Let l(j) = -3*c(j) - 2*h(j). Let i be l(-5). Suppose -k + i = -356. Is k a composite number?
False
Suppose 0 = 3*d + 24*d - 216. Is ((-23774)/d)/((-6)/96*4) a prime number?
True
Let h(l) = -13979*l - 1202. Is h(-3) a prime number?
False
Let j be 5915/10 - (-21)/(-14). Suppose 2*p - 24 = j. Is p prime?
True
Suppose 13193646 + 38420881 = 249*f + 10231474. Is f prime?
False
Let z = -106296 - -178327. Is z composite?
False
Suppose -3*l + 19 - 13 = -b, -4*b + 4*l - 8 = 0. Suppose -4*c + 42169 = 4*t - 5*c, -c - 5 = b. Is t composite?
True
Let v(t) = 103*t**3 - 110*t**3 - 13 + 15*t + 21 + 35. Is v(-6) prime?
False
Let i(b) be the second derivative of -623*b**5/20 + b**3/6 - 9*b - 1. Is i(-1) a composite number?
True
Let g(a) = 9*a**2 + 27*a + 31. Suppose -11*d + 20 = -14*d + 4*j, 2*d + 4*j + 20 = 0. Is g(d) a prime number?
False
Let i(l) = -28*l**3 + 24*l**2 + 163*l + 1708. Is i(-11) a composite number?
False
Let m(z) = 2*z**3 - 36*z**2 - 17*z - 148. Is m(27) composite?
True
Let f(m) = -4*m**2 + 8*m - 12. Let d(i) = -9*i**2 + 17*i - 24. Let z(s) = 6*d(s) - 13*f(s). Let x be z(16). Let r = x - -1269. Is r prime?
False
Suppose 161*r - 706017 = 6426766. Is r a composite number?
True
Suppose 0 = -120*k + 1065080 - 104000. Is k a composite number?
False
Let z(w) = 99*w**2 + 12*w + 157. Is z(16) prime?
True
Let x(j) = -j**3 + 14*j**2 + 36*j - 54. Let d be x(16). Suppose 0 = 15*u - d*u - 35255. Is u composite?
True
Let k(y) = y**2 - 4*y + 6. Let d be k(3). Suppose -d*f + 6 = -3*a - a, -a = -f + 2. Suppose -2*n + n + 26 = a. Is n composite?
True
Let l = -557 - -565. Let x(m) = m**3 + 11*m**2 - 16*m - 15. Is x(l) a prime number?
False
Let w be 78/(-16) - 2/16. Let g be w/(-1) - -2 - 3/1. Suppose -583 = g*v - 1611. Is v composite?
False
Suppose -4*x + 18 - 14 = 0. Let w(m) = 29*m**2 + m + 35. Let t(c) = c. Let z(f) = x*w(f) - 4*t(f). Is z(9) composite?
False
Let y(g) = 3*g**3 + 6*g**2 - 6*g - 8. Let t(w) = w**3 - 3*w**2 + 2*w + 1. Let m(c) = -2*t(c) + y(c). Let x be (-36)/(4*-1) + -2. Is m(x) a prime number?
False
Let o(t) = t + 11. Let y be o(8). Suppose -26*m + 1113 = -y*m. Is m a prime number?
False
Let k = -64568 + 333147. Is k a composite number?
True
Let m(g) = 293*g - 1432. Is m(15) a composite number?
False
Suppose -3*a - 37740 = -m - 4*a, -2*a = -4. Suppose 2*l - 53553 = -t + m, 3*l - 4*t - 136953 = 0. Is l a prime number?
False
Suppose 2*l = 4*k - 261420, -4*l = 207*k - 203*k - 261396. Is k a prime number?
True
Let b(z) = -1 - 61 - 149 - 80 - 163*z. Is b(-34) prime?
False
Let v(k) = -96*k - 23. Suppose 13*w - 19*w = -1362. Suppose 11*h + w = 62. Is v(h) a prime number?
False
Suppose 4*j - 5*c - 8143 = 0, 7*j - 10185 = 2*j + 5*c. Let x = j + -69. Is x composite?
False
Suppose -37601 = -s - n, 2*s = 7*s + n - 188005. Is s a composite number?
True
Let u(b) be the third derivative of -37*b**6/120 - b**5/30 - 5*b**4/24 + b**3/6 + 159*b**2. Is u(-2) a composite number?
True
Let r(f) = 163*f**2 - 5*f + 2. Let z be r(3). Let s = z - -6. Suppose 4*l - 6064 = -s. Is l composite?
False
Let z = -8 - -14. Let c(y) = 37*y - 40. Let v be c(z). Suppose 2*p + v = 1444. Is p a composite number?
False
Let c be 4/(-6) + (-5)/((-45)/(-12)). Let y be c/5 - 120/(-50). Suppose -3*l - 3*h = -1185, y*h - 395 = 2*l - 3*l. Is l a prime number?
False
Suppose 0 = h + 4*n - 6091, 0*h - 5*n - 12117 = -2*h. Suppose 2417 = 2*q - 3*d, -2*d + h = -0*q + 5*q. Is q composite?
False
Suppose 11836 = 12*i - i. Let o = i - 580. Suppose -2*a - 5*p + 744 = 0, -5*a + 5*p + o = -1434. Is a a composite number?
True
Suppose 4916979 = 23*q - 8869828 + 2375978. Is q prime?
True
Let g(r) = 793*r**2 + 197*r + 281. Is g(25) composite?
False
Let x be (3 - (-710)/(-6))*(-18)/12. Let p = -42 - 4. Let m = x + p. Is m a prime number?
True
Suppose 132*i + 5273469 = 141*i. Is i prime?
False
Suppose -j - 1 = 5*a + 4, 3*a - 19 = -5*j. Is (22384/a)/4*(-40)/16 a composite number?
True
Let i(u) = 33*u - 22. Suppose 5*f + 116 = -174. Let l = -51 - f. Is i(l) a prime number?
False
Let i(t) be the third derivative of 7*t**4/6 + 13*t**3/3 + 3*t**2 - 11. Is i(6) composite?
True
Suppose 3*q + 51819 = 4*i, -q - 2*i = -0*q + 17283. Let n = q + 36938. Is n a composite number?
False
Let b = -461 - -466. Suppose -b*g - 18*w + 106045 = -22*w, 0 = g - 3*w - 21220. Is g a composite number?
True
Suppose -5*i + 2022774 = 3*y, 30*i - 25*i - 2697037 = -4*y. Is y composite?
False
Suppose -139 + 43 = 6*i. Is -4 + 688/18 + i/72 a composite number?
True
Suppose -2*s - 10*p = -7*p - 20713, -6*s - 3*p = -62181. Is s composite?
True
Let v be ((-8)/10)/((-20)/(-50)) + 10. Let n(z) = 1113*z - 43. Is n(v) prime?
True
Is ((-17251)/52 + 2)/(4/(-496)) a prime number?
False
Let t(v) = 8 - 11*v + 4 - 37. Let c be t(-6). Let i = 54 - c. Is i composite?
False
Suppose 0 = 6*o + 12*o - 54. Is (-28 - -413) + (6 - (-1 + o)) a composite number?
False
Let k = 428 - 224. Suppose 0 = -k*g + 200*g + 36068. Is g composite?
True
Suppose 17115534 - 3199315 = 23*t. Is t prime?
False
Suppose 864*g = 862*g + 376214. Is g a composite number?
False
Let k(h) = 1697*h. Let g(p) = -3393*p - 1. Let v(s) = -3*s**3 + 3*s**2 - 1. Let z be v(2). Let i(t) = z*k(t) - 6*g(t). Is i(-1) a prime number?
True
Let l = -4036 + 47390. Suppose -9793 = -g - m, 5*g - m - 5635 - l = 0. Is g composite?
True
Suppose 2*x + 24*f = 29*f + 832553, 5*x - 2081351 = 2*f. Is x a composite number?
True
Let t be 7 + -3 + (-148)/(-4). Let c = 42 - t. Is 1*674 - ((-1)/c + 2) a composite number?
False
Let x(y) = -19*y**3 - 67*y**2 + 49*y + 69. Is x(-28) composite?
False
Let v = -22932 - -179369. Is v a composite number?
False
Let n be -3 - -10 - (4 - 0). Let q(s) = -s**3 + 3*s**2. Let p be q(n). Is 91 + 6 + -2 + p a prime number?
False
Suppose -5*r + 152943 = -4*j, -4*r + 40*j - 37*j = -122354. Is r a composite number?
True
Suppose 589*p + 5626570 = 599*p. Is p prime?
False
Let x(q) = -415215*q**2 + 3*q + 3. Let d be x(-1). Is (2/(-4))/(-4 - d/103806) composite?
True
Let a = -13267 + 66456. 