
False
Let x(o) = -o**3 + 15*o**2 - 19. Suppose 2*w + y = 26, 4*w - y = -2*y + 52. Let r be (w/2)/(4/8). Is x(r) composite?
True
Suppose -5*w + o + 1913347 = 0, 382665 = w - 100*o + 102*o. Is w composite?
True
Suppose -3*m = -5*b - 150436, 3*m - 6*b - 150386 = -11*b. Is m prime?
False
Let h be (-14 + -1)*(-6)/(-15). Let r(u) = u**2 + 22*u - 66. Let o be r(-25). Is ((-267)/h)/((o/(-42))/(-3)) a composite number?
True
Let c(t) = 18137*t**3 - 8*t**2 + 10*t - 2. Is c(1) prime?
False
Let w(h) = -101*h + 11. Suppose 2*a + 20 = 6*a, 2*r = 5*a - 47. Let f(g) = 203*g - 23. Let q(z) = r*w(z) - 6*f(z). Is q(-10) composite?
False
Let q(n) be the second derivative of -23*n**5/20 + 5*n**4/12 + 2*n**3/3 - 3*n**2/2 + 4*n. Let r be q(-4). Suppose 7*i - 2576 = r. Is i composite?
False
Let u = 16 + -14. Suppose 4*x = -u*l + 910 + 344, 0 = -5*x + 5*l + 1575. Is x composite?
True
Suppose -3*c + 5*c - 3716 = -4*b, b = -3*c + 5589. Let f = c - 3547. Is (f + 12)*2/(-6) a composite number?
False
Suppose 5*p + 5 + 5 = 0, -2*y - 62 = -p. Let s be 8/(-20) - 3634/(-10). Let w = s - y. Is w a prime number?
False
Suppose 13*g + 4*z + 935211 = 16*g, -2*z = -g + 311737. Is g a composite number?
False
Suppose -13*o + 230*o - 30256574 + 9538065 = 0. Is o prime?
False
Is 110867 - (-6)/(-9)*4/(-12)*-18 a prime number?
True
Let q = -230 + 234. Suppose -12995 = -k - q*k. Is k composite?
True
Suppose s + 485 = 6*s + 2*l, 0 = s - 4*l - 97. Let x(a) = a + 7. Let f be x(-3). Suppose -5*u - s = -4*d + 66, -2*d = f*u - 114. Is d a prime number?
True
Suppose 104*z - 93*z - 231 = 0. Suppose z*p = -19*p + 31960. Is p prime?
False
Let d(k) = 52750*k**2 + 25*k + 59. Is d(-2) a prime number?
False
Suppose -p - 2 = -38. Suppose 0*k + p = 4*k. Suppose 2*z - k*z + 1169 = 0. Is z prime?
True
Suppose 0 = m - 5 + 3, 2*m - 92 = 4*y. Let n be (-4)/y + 41787/11. Suppose -1328 - n = -3*q. Is q a composite number?
False
Let w = -236662 - -341111. Is w a composite number?
True
Suppose 101877*i - 101843*i - 42223546 = 0. Is i prime?
True
Let b be 72/(-27)*91593/(-12). Suppose -b + 90744 = 10*q. Is q composite?
False
Let a(f) = 46*f**2 + 3*f - 35. Let y(t) = t**2 - 11*t - 10. Let m be y(11). Is a(m) a composite number?
True
Let v = 261 - 254. Is ((-70)/v - -7) + 3272 a composite number?
True
Suppose 2*v = 15 - 11. Suppose -v*d + 307 = -4767. Suppose d = a + 1072. Is a composite?
True
Let z be 18/8 + 6/8. Suppose 0 = u, -z*q + u - 6*u + 3 = 0. Let i(d) = 793*d**3 - d**2 + d. Is i(q) a prime number?
False
Let c(g) = 0 - 1 + g - 48*g**2 - 361*g**2 - 20*g**2. Let s be c(1). Let i = 643 + s. Is i a composite number?
True
Suppose 0 = 20*n - 6*n + 249242. Let w = -11556 - n. Is w composite?
False
Let q = 109042 - 63357. Is q a composite number?
True
Let q = -252473 + 431452. Is q a composite number?
True
Suppose -6*q + 238781 = -43897. Is q prime?
False
Let w = -34515 - -121868. Is w composite?
True
Let r(y) be the third derivative of -y**4/8 - 7*y**3/3 - 9*y**2. Let g be r(-14). Is -1 - g*15/(-2) composite?
True
Let r = -2669 + 15558. Is r prime?
True
Let b(h) = -6930*h + 1073. Is b(-48) a prime number?
True
Suppose 19 = 6*v + 7. Suppose 4*o + 8645 = v*d + 1719, -d + 4*o = -3471. Suppose -2*p + p + d = 0. Is p a prime number?
False
Suppose 14 + 14 = 2*n. Let b = n + -6. Is -4 + (2792 - (-5 + b)) a prime number?
False
Let x = 3624356 - 1893271. Is x a composite number?
True
Let h be 465/(-27) - 12/(-54). Let f = -13 - h. Suppose 3*b - 4*l - 697 = 0, f*b + 4*l + 227 = 5*b. Is b a prime number?
False
Is (18330 + -1)*19/(-4 - -23) prime?
True
Let j = 84 + 18. Let p = 107 - j. Suppose p*n + 4*u - u = 1329, 275 = n - 4*u. Is n a prime number?
False
Let i = 19 - 15. Let a be (4 - (-42)/(-9))/((-2)/(-6)). Is (-8)/(0 - i) + (-1170)/a a composite number?
False
Suppose -10*w - 17898 = 5712. Let l = -1363 - w. Suppose 3*n + 2*d - 599 = 0, l = -0*n + 5*n + 3*d. Is n prime?
True
Let f(y) = 1169*y - 2143. Is f(18) a prime number?
True
Suppose 5*k = r - 14, -5*k + 2*r = -k + 10. Let c be k - (-9 - (-2 + 2)). Suppose -3*x = -c*x + 762. Is x a prime number?
False
Suppose 103 - 127 = 8*c. Is (-33 - -36)/(c/(-41491))*1 prime?
True
Let n = -466 + 1690. Suppose n = 3*o + h, 2*h + 133 = -4*o + 1767. Is o a composite number?
True
Suppose 3*i + 76343 - 518964 = 27086. Is i prime?
False
Let y be ((-195)/52)/((-15)/72). Is (20 - y) + 7384/(0 + 2) a prime number?
False
Let q(c) = 22*c - 1. Let y be q(-25). Suppose -2*o + 4490 = 3*o. Let r = y + o. Is r composite?
False
Suppose -5*w + 35 = 5*c, -18 - 6 = -4*w - 2*c. Let f(d) = w - 10 - 1 - d - 4*d. Is f(-15) prime?
False
Let l(j) = -38*j**2 - 2*j - 3. Let o be l(4). Let p = 1038 + o. Is p a prime number?
True
Let n(a) = -3*a**3 - 3*a**2 + 7*a + 429. Let b(l) = 2*l**3 + 2*l**2 - 5*l - 286. Let f = 17 - 12. Let w(i) = f*n(i) + 7*b(i). Is w(0) composite?
True
Is 1085074*33/42 + (-4176)/3654 composite?
False
Let b be (3 - 663)/5 - (-1 + -2). Let z = b + 123. Is 4/(-6) + (-1)/(z/3250) a composite number?
False
Suppose 4*z = 5*u + 25, 2*u + 3*u + z = 0. Let o be (u + (0 - 1))/(2/1219). Let r = o + 1956. Is r prime?
False
Suppose -11839 - 23493 = -f. Suppose 5*d = -2*y + 35329, 5*d + 7*y - f = 6*y. Is d composite?
True
Is (-154567)/(-63) - (-5)/((-315)/28) a composite number?
True
Suppose 0 = -32*o + 35*o - 10716. Let b = o + 5933. Is b composite?
True
Let c(k) = 84*k**2 + 18*k - 205. Is c(-34) composite?
True
Let u = 152 - 155. Is (-223190)/(-77) + u/(-7) a prime number?
False
Let a(w) = 48976*w**2 + 24*w + 27. Is a(-5) composite?
True
Let s(m) = -m**2 + m. Let u be s(2). Let y(x) = 45*x**2 - 6*x - 5. Let k be y(u). Suppose 2*v - k = 235. Is v prime?
True
Suppose 2*v = -2*c - 3*v + 19, -2*c + 4*v = -10. Suppose -c*d - 5645 = -1536. Let t = -294 - d. Is t prime?
True
Let a = -49 - -53. Suppose 0 = -a*n + 5*r - 1219, -2*r + 0*r - 596 = 2*n. Let i = -68 - n. Is i prime?
True
Let r(w) = -49 - 2*w**2 + w**2 - 12*w + 63*w - 9*w. Is r(34) composite?
False
Let i(a) = a - 5. Let m be i(-9). Is -113*(m/(-84) - (-79)/(-6)) prime?
False
Let k(m) = 5*m - 7 - 7*m**3 + 3 - m**2 + 9*m**3 - 3*m**2. Let i be k(2). Suppose 0 = i*w - 4*w - 844. Is w a composite number?
True
Let j(w) = 20 - w + 1129*w**2 + 124*w**2 - 31*w**2. Is j(5) a composite number?
True
Let a = -161 - -162. Is a/(2*4/20248) a prime number?
True
Let p be (0 + 1530)*(-468)/(-45). Let b be p/5 + (-3)/(-5). Suppose -8*l + b = -6361. Is l a prime number?
True
Suppose -36*l + 39586 + 408578 = 0. Is l composite?
True
Suppose 6*h = -19*h + 1734025. Is h composite?
True
Let s be ((-2)/(-2))/(-2 - -1). Let a be 1/2*(1 + 1/s). Suppose a = -z - 4*q - 0*q + 669, 0 = 4*z - q - 2710. Is z a prime number?
True
Let x(v) = 1902*v**2 - 79*v + 27. Is x(8) composite?
False
Let j(c) = -13*c + 68. Let q be j(5). Suppose 4*i + q*v = 5428, -3*i - 2*v + 5*v + 4071 = 0. Is i a prime number?
False
Suppose 4*f - 4 = 3*f. Suppose -229 = 6*t - 361. Is (1322/f)/(-1 + 23/t) a prime number?
False
Let p be (-140)/(-910) + 27/26*-4. Let g(b) = -148*b + 1. Is g(p) prime?
True
Let a be (580/40)/(3/4452*-2). Let j = 24280 + a. Is j a prime number?
False
Let o(a) = -13*a**3 - a**2 - 11. Suppose -10*t + 35 = -3*t. Suppose 5*z = u - 31, u - 6*u = -t. Is o(z) a composite number?
True
Let b(m) = m**2 + 8*m + 11. Let d be b(-6). Is d - (-5)/((-15)/(-1764)) a prime number?
True
Let r(g) = 7826*g**3 - 11*g**2 - g + 9. Is r(4) composite?
False
Suppose -16 = -5*s + s, 0 = -5*o + 3*s - 17. Let g be -3909*4/(-8)*-2*o. Suppose -g = -4*u - d, 2529 = 2*u - d + 576. Is u composite?
False
Let j(r) = -12*r**3 - 897*r**2 - 52*r - 182. Is j(-75) a composite number?
False
Suppose v + 4*f = 43, -5 = -5*f + 15. Suppose 0 = -2*c - 17 - v. Let y(d) = -105*d + 23. Is y(c) a prime number?
True
Let q be -2 + -1 + (472 - 0/(-3)). Let y = -269 + q. Let a = y + 23. Is a a composite number?
False
Let f(x) = 4*x**2 + 27*x - 9. Let v be f(-7). Let p(m) = 423*m**2 - 8*m - 19. Is p(v) a prime number?
False
Let r(j) be the third derivative of -j**6/60 - j**5/20 - 5*j**4/8 + 5*j**3/6 - 24*j**2. Let h(w) = -4*w + 34. Let n be h(10). Is r(n) a prime number?
True
Suppose 18*o + 51 - 195 = 0. Is -76*10/o*(-7123)/85 prime?
False
Is (408/(-680))/((-6)/2886550) a prime number?
False
Let g(j) = -21*j**3 - 8*j**2 - 14*j - 4. 