composite?
True
Suppose 3*i + 681846 = 3*q, 74*q - 4*i = 73*q + 227285. Is q composite?
False
Let m(x) = 412*x - 21. Suppose b + 51 = 5*q, -33*q + 53 = -30*q + 5*b. Is m(q) composite?
True
Let b = -317 + 527. Let t be (b/(-28))/(-1 - (-770)/776). Is (-8)/2 + t + -1 a prime number?
False
Let f(s) = 847*s**3 + 5*s**2 + 2*s - 11. Let y be f(3). Suppose 21*p - 1892 = y. Is p prime?
True
Let r = -30414 - -60673. Is r a prime number?
True
Let u be (-10)/35 - (-180344)/(-14). Let o = -9079 - u. Is o a prime number?
True
Let q(d) = 981*d**2 + 22*d + 734. Is q(-27) prime?
True
Let t(p) = -3*p - 43. Let d be t(-16). Suppose 19*j - 22*j + 20256 = -3*s, -33733 = -d*j - 4*s. Is j prime?
False
Let v(j) = -64*j + 34841. Is v(0) prime?
True
Let f be (-6 - 220/(-35)) + 1865735/35. Suppose 14*w - f = 5*w. Is w composite?
False
Let u be 4/(-18) + 87/27. Let l be u/(15/(-5)) - -266. Let s = 414 - l. Is s composite?
False
Let o = 189 + -187. Is o/(-11) + 272853/231 a prime number?
True
Suppose -21*f = 78 + 27. Let m(c) = -14*c**3 + c**2 + 4*c - 22. Is m(f) composite?
False
Is (29/(-116))/((-77179)/115764 - (-6)/9) composite?
True
Let t(r) be the second derivative of 125*r**4/6 + 5*r**3/6 - r**2 - 7*r. Is t(1) a prime number?
False
Let y = 129331 - 77438. Is y prime?
True
Suppose -3*d - 259 = -73. Let q = d + 67. Suppose -4*t = -j - 276, -4*t - 4*j = -281 + q. Is t composite?
True
Suppose 643109 = 26*r + 12895. Is r a prime number?
True
Suppose 13*y = 21*y - 48. Suppose -6*c + 3*c = -y. Suppose 5922 = c*g + 1052. Is g a composite number?
True
Let t(l) = l**3 + 18*l**2 + 699*l - 707*l + 28 - 3. Is t(-18) prime?
False
Is ((-32117)/5)/(233/(-12815)) composite?
True
Suppose -6*g + 3*g - 5*f = -447449, 3*f = 2*g - 298274. Is g a prime number?
True
Suppose o - 1858 = y, 0 = -4*o - 8*y + 9*y + 7429. Let d = 4228 - o. Is d a composite number?
False
Let y(h) = -163*h + 59. Let k be y(-14). Suppose 2*j + 461 = z, -2*z = -7*z + j + k. Is z a composite number?
True
Is 284*4662/(-36)*(-1)/14 prime?
False
Suppose -4*b = 13*p - 149941, 2*b - 96491 = 3*p - 21492. Is b a prime number?
False
Let b(v) = -v**3 + 2*v**2 + v + 10. Let c be b(0). Suppose 9*w + 50929 = c*w - 4*i, -4*w - 2*i = -203626. Is w a composite number?
False
Suppose -260*j = -208*j - 1561612. Is j a prime number?
False
Let l(k) = -k**2 + 3. Let m be l(1). Let t be 96/(-54) - (40/18 - m). Let x(u) = -473*u**3 + 3*u**2 - 2*u - 7. Is x(t) a composite number?
False
Let u(w) = 1064*w**2 - 20*w - 39. Is u(-5) a prime number?
False
Let q be (3 - 8 - -3)/((-10)/40). Is (314/q)/(-5 - 84/(-16)) a prime number?
True
Suppose 2 = 2*j + 3*m, 0 = -2*j - 2*m - 3*m - 2. Let x(y) = -4 + 0 + j + 1 + 825*y. Is x(2) a composite number?
True
Suppose -5*c = -80*k + 77*k + 190799, -4*k = -4*c - 254388. Is k a composite number?
True
Let s(n) = -149*n + 147. Let z be s(1). Let d = 1287 - 1817. Is ((-8)/(-2) + d)/(z + 0) a prime number?
True
Let f be (-4 - 125/(-10) - 0)*2. Suppose -f*z - 8312 = -25*z. Is z a composite number?
False
Let o(k) = 53*k**2 - 7*k - 34. Let v be o(-3). Suppose 0 = -m + 10231 - v. Is m prime?
True
Let h(b) = 102*b**3 - 8*b + 13. Let x = 76 - 73. Is h(x) prime?
False
Suppose 4*s = -32, -m + 78520 = 5*s - 1391. Is m a prime number?
False
Suppose 0 = -95*p + 110*p - 210. Suppose -4*d + 7053 = u, 10*d = 2*u + p*d - 14110. Is u composite?
False
Let f(k) = 624*k**2 + 15*k + 13. Let t be f(-10). Suppose -s + 2*l + t = 4*s, 2*s - 24886 = -4*l. Is s a composite number?
False
Let l(p) = 165*p**2 - p - 1. Let x be l(-1). Suppose -7*q + 2*q = -x. Let g = q + 22. Is g prime?
False
Let w be 3 + 44/(-6) + 4/3. Is (1/4)/(-3*w/44964) prime?
True
Let b(f) = 2*f**2 + 26*f + 45. Suppose 3*v - 366 = 3*x, v + 2*x - 6*x = 110. Suppose -7*m = -7 - v. Is b(m) a composite number?
True
Suppose 17 = -w + 2*o, -3*w - 36 = -2*o + o. Let f(m) = -3*m**3 - 6*m**2 - 12*m - 10. Is f(w) composite?
False
Suppose 3*t = 3*z + 4389, -92 = 3*t + 4*z - 4474. Suppose -3*n - 2*r = -897 - 200, 4*n - t = -2*r. Is n prime?
False
Suppose 0 = 59*y - 25672383 - 17367704. Is y prime?
True
Let h = -237189 + 582518. Is h composite?
False
Is (-11442865)/70*2*4/(-4) prime?
True
Suppose 4*f = -4, -f = u - 3 - 1. Suppose -2*k + 4645 = -u*y + 6*y, -3*y = 2*k - 4651. Is k prime?
False
Let c(h) = -12*h. Let r be c(-7). Suppose 4*w - 4*b - r = -28, -5*b + 35 = 2*w. Let f(g) = 15*g - 40. Is f(w) prime?
False
Suppose -2*j + 123 + 7 = -2*f, -4*j + 260 = 3*f. Suppose 41558 = 67*c - j*c. Is c a prime number?
False
Let u(s) = 3308*s + 103. Let h be 1/(7 - (-39)/(-6)). Is u(h) a composite number?
False
Let b(i) = 4*i**2 + 11*i - 1. Let w be ((-35)/(-10))/(1/(-2)). Let u be (8/(-3))/(w/(-21)). Is b(u) a prime number?
True
Let f(b) = -77*b - 17. Suppose -3*n - 13 = -0*n + 2*z, -3*n + 2*z = -7. Let k = n + -11. Is f(k) composite?
False
Let m be (-1)/6 - 465/(-90). Let t be m/15 - -13*(-44)/(-12). Let s = t + 151. Is s composite?
False
Let n(p) = 3*p**2 - 39*p + 5. Let l be 3/3 + -4 - (-4 + -20). Is n(l) prime?
True
Suppose 0 = h - 2*k + 3*k + 24, 4*h + 2*k + 92 = 0. Let q be (-4 - h/5)*-5. Is (-10)/15*(q - (-2897)/(-2)) prime?
True
Let v(n) = 4*n - 57. Let f be v(16). Is 2 - (-15195 + -2)/f a prime number?
False
Let z = -146 - -142. Is z/4 + (0 - 5334/(-1)) prime?
True
Suppose 5*q = -25, 2*z = 5*q + 55 + 28. Let r = z + -35. Is ((-21)/r)/((-3)/(-29466)*3) a composite number?
True
Let m(b) = 3*b**2 - 5*b - 24. Suppose -2*d + 4*n + 152 = 2*d, 3*d - 4*n = 111. Let g be d/(-4) - 13/(-52). Is m(g) composite?
True
Let a(t) = 23*t**2 - 3*t - 11. Let y = 94 - 94. Suppose y*o - o - 22 = -3*m, 3*m - 30 = 3*o. Is a(m) prime?
False
Let x be 40/(-4) + -5 + 5. Let u be x/(-6 + (1 - -3)). Suppose u*z - 37 = 138. Is z a prime number?
False
Let j(p) = p**2 - 15*p - 65. Let k be j(20). Let r = 40 - k. Suppose 1039 = r*i + 4*s, -2*i + 3*i - 227 = 4*s. Is i a prime number?
True
Let y = -340 + 353. Suppose 0 = -y*i + 7*i + 17526. Is i composite?
True
Suppose r + 2*a + 3*a = 23, -20 = -5*a. Suppose 0 = r*x + x - 8, 5*s - 23 = x. Suppose -3*p - 4367 = -s*k + p, 2*p = -6. Is k prime?
False
Let o be 3/(-1 + (-26)/(-20)). Let s(z) = -6876 + 3446 + 40*z + 3447. Is s(o) a composite number?
True
Let k = 3223765 - 2177136. Is k a prime number?
False
Suppose 0 = -5*v - 33*c + 31*c + 215999, c = 5*v - 216008. Is v a prime number?
True
Let w(z) = -2*z + 9. Let d be w(-3). Let o = -10 + d. Is 5/4*(287 + o) composite?
True
Let c = 7 + -5. Suppose p + 10697 = 2*g, 4*g - p + c*p = 21385. Is g composite?
False
Let v(x) = 140*x**2 + 570*x**2 + 136*x**2 - 9 + 6*x. Is v(2) a composite number?
True
Suppose -40233450 = -142*m - 4825892. Is m a prime number?
False
Let v(w) be the second derivative of 877*w**3/6 - 119*w**2/2 + 20*w + 2. Is v(10) composite?
True
Let i = 282 - -13612. Is i prime?
False
Let g(x) = -6*x**2 - x + 8788. Let c(j) = -9*j**2 - 3*j + 17577. Let i(o) = 3*c(o) - 5*g(o). Is i(0) composite?
True
Let w be (-5)/5*(-12 - -9). Is 30/20*26210/w a prime number?
False
Suppose 77112 + 62357 = 11*j. Is j prime?
False
Let w(x) = 8884*x + 1413. Is w(34) a prime number?
True
Suppose 4*g = 6*g - 9664. Let l be 5 + (5504*5)/4. Let a = l - g. Is a a composite number?
False
Let f(g) = 3*g - 45. Let a be f(15). Suppose -4*b + 2539 - 523 = a. Let z = b + -67. Is z a prime number?
False
Let h be ((0 - 0)/(-1))/((-20)/(-10)). Suppose 4625 = 5*p - 4*i, h*i + 4*i = -p + 901. Suppose 0 = 5*d + 3*b - 0*b - 4601, d - p = -b. Is d a composite number?
False
Suppose -668219 = -3*d + 4*l, -5*l - 129175 - 93539 = -d. Is d a composite number?
True
Let a be (0 + (-2 - -1))/((-1)/7855). Suppose 3*r - 3941 = 2*u - 0*u, -4*u - a = 3*r. Let s = u - -3623. Is s a composite number?
False
Suppose 0*d = 3*d, 2*f - 3*d = -562. Let p(q) = 108*q + 48. Let x be p(5). Let o = x + f. Is o composite?
False
Let w(o) = 398*o + 9. Let v be w(-3). Let t = 1718 - v. Is t a composite number?
False
Suppose -r = 5*j - 530, -r - j = -139 - 399. Suppose 0 = -4*v + 4*l + 6304, -4*v + 463*l = 464*l - 6279. Let q = v - r. Is q a prime number?
True
Suppose -77*f = -55*f. Suppose 2*b = 3*r - b - 12582, 4*r - b - 16785 = f. Is r prime?
False
Suppose -4*r - 4*s - 28 = 0, -r + 2*s = 3*r + 16. Is 1 + r + 3022 + -1 composite?
True
Let j be ((-20)/3)/((35/(-2145))/(-7)). 