uppose 3*r + c - 3 = 7*r, 5*r - 10 = 4*c. Is r + 0/5 - -2775 composite?
True
Let p = 84669 - 4636. Is p a composite number?
True
Let r = -5581 + 11185. Let p = 607 + r. Is p a prime number?
True
Let o(c) be the third derivative of 1/20*c**5 + 0 + 5/2*c**3 + 8*c**2 + 0*c + 5/12*c**4. Is o(-8) composite?
False
Let t be 77/33 - (-215146)/6. Suppose 15374 = 3*r - 5*l, -5*l + 4*l + t = 7*r. Is r composite?
True
Is (41956/(-10))/((-4)/20*2) prime?
False
Suppose -6 + 30 = 2*d. Let g(x) be the first derivative of 30*x**2 - x + 224. Is g(d) prime?
True
Let o(t) = -104 + 121 + 0*t - 82*t. Suppose -15 = 5*j + 10. Is o(j) composite?
True
Let f be (10/6)/(17/(-82977)). Is ((-3)/(-2))/(-4 + f/(-2030)) prime?
False
Let x(b) = 6814*b + 1229. Is x(26) a composite number?
False
Suppose 0 = 5*w - 23496 - 18369. Let m = 18674 - w. Is m a prime number?
True
Suppose 3 = -0*c + 2*c + o, -c - 4*o + 5 = 0. Let x be (4/5)/(c*4/10). Let r(m) = 185*m**2 + 5*m - 7. Is r(x) composite?
False
Let j = -1895 + -4434. Let g = -4360 - j. Is g a prime number?
False
Let q be 4/(7/(105/(-2))). Let z = q + 43. Suppose -2*d - 38 = -4*o - 7*d, -3*o + 4*d = -z. Is o prime?
True
Suppose 27*v = 2*k + 29*v + 35344, -2*k - 35344 = v. Let c = -6855 - k. Is c prime?
False
Let b(f) be the third derivative of 2*f**5/3 - f**4/3 + 35*f**3/2 - 208*f**2. Is b(13) a prime number?
True
Suppose -31 = -9*b - 58. Let o(n) = 641*n**2 + 21*n + 1. Is o(b) a composite number?
True
Suppose -3*h + 18 = 3*r, -h = -2*h + 3*r - 10. Suppose -b - h = -4*j + 9, 4*j + 4*b - 16 = 0. Suppose -j*n = -2*n - 587. Is n composite?
False
Suppose -31*k + 130 = t - 26*k, 3*k - 540 = -5*t. Suppose 0 = -2*z + t + 889. Is z prime?
False
Let g(o) = -73*o**3 - o**2 + 3*o + 8. Suppose 12*s + 21 = 5*s. Is g(s) composite?
True
Suppose 42 = -2*v + 42. Suppose -3*h + i = -4759 + 22585, v = -i - 3. Let m = -3026 - h. Is m prime?
True
Let c(d) = -25*d**3 - 12*d**2 + 25*d + 161. Let o be c(-10). Suppose -4*t - 15822 - o = -5*j, 5*t + 7894 = j. Is j a prime number?
False
Suppose -n - 5 = -5*n - v, 0 = v - 5. Suppose n = 10*c - 5*c - 8570. Is c prime?
False
Let c(q) = 4*q**2 + 12*q - 145 + q**2 + q + 17*q**2. Is c(-11) a prime number?
False
Let u(g) = -6*g - 1. Let p be u(-2). Suppose 0 = -2*y + 5*k - 28179, 28997 - 773 = -2*y - 4*k. Is (-1 - -3)*(y/(-4))/p a composite number?
False
Suppose 5*z + 0*s = 3*s - 5, -5*z + 4*s - 5 = 0. Let i(m) = 7496*m**2 - 6*m - 7. Is i(z) a composite number?
True
Suppose -34*m + 5138831 = 505209. Is m composite?
True
Suppose -13 = 8*w - 45. Is (-42120)/(-168) + w/14 a composite number?
False
Let d(r) = -2*r**3 + 148*r**2 + 77*r + 485. Is d(-42) a prime number?
True
Let b(l) = l**2 - l - 3. Let w be b(0). Let i(r) = -8*r - 13. Let u be i(w). Suppose -4*v - u*a + 8243 = -6*a, 3 = -3*a. Is v a prime number?
False
Suppose 218*n - 3011447 - 7611911 = 0. Is n a prime number?
True
Suppose -2*h + 4 = -5*z - 1, -3*h + 18 = 3*z. Suppose 6*p - h*p - 3245 = 3*f, 4*p - 12963 = -5*f. Is p prime?
False
Suppose 0 = i - 2*f - 1, 2*i + 2*f + 1 = 9. Suppose 2*v + 24 = -0*c - 5*c, -i*v - c - 10 = 0. Let t(o) = -128*o + 3. Is t(v) a composite number?
True
Let m(u) = u**2 + 15*u - 35. Let d be m(-17). Let i(g) = 2*g**3 + g**2 + 4*g + 4. Let r be i(d). Is r/((1/2)/((-4910)/20)) composite?
False
Suppose -220*y = -140*y - 325040. Is y a prime number?
False
Suppose 27 = -2*k + 2493. Suppose -1213 = -z + 3*z + 5*i, -i - k = 2*z. Let f = z - -1390. Is f composite?
True
Suppose -2*w + 4 = -2. Suppose -5*n - 2060 = -3*u, w*n - 4*n - 3426 = -5*u. Is u composite?
True
Is 2/7 + (-6 - -2 - (-1988733)/203) a prime number?
False
Suppose 8*y - 3*y - 10 = 0. Let s be -1 - -18 - (0 - -2). Suppose -y*t = 2*z - 978, 1 + s = 4*t. Is z a composite number?
True
Let w = 16 - 9. Suppose -w = -5*t + 4*p, -6*p = -2*t - 2*p - 2. Suppose 0 = -2*n - t*n + 110. Is n composite?
True
Let n be (-5)/((-10)/15402) + 14/(-7). Let a = n + -3332. Is a prime?
False
Let j(n) be the second derivative of 107*n**4/12 + 3*n**3/2 + 47*n**2/2 - 32*n. Is j(-8) prime?
True
Let s = 157942 - 95915. Is s prime?
False
Let v(t) = 2*t**2 + 13*t - 15. Suppose k = 3*x + 149, -30 - 182 = 4*x - 4*k. Let d = x + 56. Is v(d) a prime number?
False
Let n = 5763 - 4076. Let t be ((-8)/2)/(0 - -2) + n. Suppose 5*f - 4*g - g = t, 670 = 2*f - 4*g. Is f prime?
False
Suppose -104409 = 80*j - 89*j. Let v = j + -7048. Is v composite?
True
Let i(s) = -2*s + 20. Let o be i(8). Let y(w) = -21*w**3 + 3*w**2 - 10*w + 5. Let j be y(o). Let n = j + 2160. Is n composite?
False
Let w(d) = d**2 + 20*d - 30. Let v be w(-22). Suppose 6*c = v*c + 216. Is (268/(-16) + 0)*(c + -1) a prime number?
False
Let z = 4150 + -2469. Suppose -1610 = 3*x + z. Let a = 1570 + x. Is a composite?
True
Suppose -16 = -4*f - 3*r + r, 2 = 2*f - 2*r. Suppose 3*n + 4*d = -2, -3*n - n - f*d + 2 = 0. Suppose 10*i - n*i = 6280. Is i a composite number?
True
Let k(s) = -306586*s + 2933. Is k(-30) a composite number?
True
Suppose 3*b - 2*b - 2*p = 405, 1215 = 3*b + p. Suppose -4*a = 4*t - 332, -7*t - 5*a = -12*t + b. Is t a composite number?
True
Let v be (6/(-7))/(-3) + 2928/42. Is ((-1588)/5)/((-7)/v*4) composite?
True
Let s(u) = -3056*u**3 - 18*u + 17. Let f be s(1). Let i = 5374 + f. Is i composite?
True
Suppose 0 = 2*w + 4*y + 16, 15 = -5*y + 2*y. Suppose 2099 = 5*o - 4*r, w*o - r - 1352 = -513. Let n = 794 + o. Is n composite?
False
Let d be 2*(-1)/6*42. Let o(g) = -13*g - 136. Is o(d) prime?
False
Let h(d) = -d**3 + 9*d**2 - 10*d + 9. Let n be h(8). Let t(r) = 24*r**2 - 6*r - 37. Is t(n) composite?
False
Let l(j) = j**3 + 14*j**2 + 13*j + 5. Let r be l(-13). Suppose 0 = c + 3*i - 21, -r*c = -2*c + 5*i - 43. Suppose -2*n - c = -4, 0 = -b - 3*n + 284. Is b prime?
False
Suppose -3 = -3*f - 24. Suppose -5*d + 936 = -3*i, 0 = -5*i - 2*d - 144 - 1385. Is i/(-1)*f/(-7) a prime number?
True
Is ((-7*(-9)/(-21))/4)/((-3)/2023676) composite?
False
Let g be (-1696)/(3*(-6)/153). Suppose 3*f + 5*f = -g. Is f/3*24/(-16) composite?
True
Let a = 331135 - 158201. Is a a prime number?
False
Suppose -753277 - 479030 = -3*u + 4*n, 3*n - 1643126 = -4*u. Is u a prime number?
False
Let w(q) = 10*q + 302. Let b(z) = 3*z**2 + 50*z - 17. Let j be b(-17). Let p be w(j). Suppose c + 5*k = 8*k + p, 0 = -c - k + 322. Is c prime?
True
Let r = -10975 - -34472. Is r a prime number?
True
Let b(i) = -293*i**3 + 2*i**2 + 2*i + 1. Suppose 5*j - 24 = 4*s, 3*s = -3*j - j + 13. Let g be b(s). Let k = g - -61. Is k a composite number?
True
Let l(x) = -x**3 + 24*x**2 + x - 20. Suppose -8 = 4*m, s + 3*m - 18 = -0*s. Let c be l(s). Suppose -1948 = -4*b + 3*b - f, 3*b - c*f = 5823. Is b composite?
True
Let f(d) = 1 - 14*d + 12 + 16 - 23*d + 30*d**2 + d**3. Is f(-23) a prime number?
True
Suppose 5*m = -v + 17, 5*v + 7 = -8. Let w be 332/36 + m/(-18). Let j(t) = 10*t**2 + 2*t + 25. Is j(w) a composite number?
False
Let m(f) = -f**3 + 5*f**2 - 3*f + 9. Let v be m(6). Let k = v - -5. Is (-19712)/k - 1/(-5) a prime number?
False
Let f be (-16)/56 - (47424/7)/4. Let x be f/(-10) - 12/(-20). Suppose 2101 - x = m. Is m prime?
True
Let p = 423676 - 205875. Is p a composite number?
True
Let z(h) = -h**2 + 21*h - 99. Let q be z(12). Is (-3 - 1871)*(q/6 + -5) a composite number?
True
Is 4914260/36 - (-6)/189*-7 composite?
True
Let d(m) be the third derivative of m**6/120 + 7*m**5/60 + 5*m**4/24 - m**3/3 - 16*m**2. Let r be d(-6). Is 982/10*(r + 1) a composite number?
False
Suppose -w + 3*t + 17929 = 0, 35818 = 2*w - 6*t + 8*t. Let m = 25731 - w. Is m prime?
True
Let m(l) = 236*l**2 + 6*l + 29. Suppose 4*b + 5*x = -49, 3*b - 3*x + 0 = -3. Is m(b) a prime number?
False
Suppose -3*y + 20 = 41. Let q be 58/14 - ((-8)/y - 1). Suppose -k - 4313 = -3*k + 3*v, q*k = 2*v + 8638. Is k composite?
False
Let d(j) = 123*j**2 - 8*j - 1004. Is d(43) prime?
False
Suppose 18*d + 25 - 7 = 0. Let u(g) = -854*g**3 - 2*g**2 - 2*g - 1. Is u(d) composite?
False
Let b be (9/(-3) - 1) + -39. Let n = b - -29. Is 1 + 541 - (n - -15) prime?
True
Suppose -82*r + 15*r + 253233 = -2104. Is r prime?
False
Let j = 738901 + -476692. Is j composite?
True
Suppose -144 = -4*a - 4*i, 0 = -4*a + 2*a + 2*i + 88. Let c = a - 35. Suppose -c*n + 2*n + 1887 = 0. Is n composite?
True
Suppose 627 = 4*p - l - 759, l + 1039 = 3*p.