mber?
False
Let p(o) = 19*o**2 - 5*o - 109. Is p(15) a composite number?
False
Let m be (9/(-36))/((-3)/2568*2). Suppose 3*d - 1634 = -m. Is d prime?
True
Let m be ((2/2)/(-2))/((-28)/775320). Suppose 0 = 3*j - 3*b - m, -b = 5*j - 3*b - 23069. Is j a prime number?
False
Let q(p) = 1722*p - 71. Let u be (2/(-3))/((-11)/198). Is q(u) prime?
True
Let c be (-2)/5 - (-11220)/(-75). Let g be (-1314)/(-4) - (-6)/12. Let v = g + c. Is v composite?
False
Suppose 15*j - 14*j - 3*b = 98233, -b - 491165 = -5*j. Is j composite?
True
Let a = 46630 + -22653. Is a a prime number?
True
Suppose 503 - 511 = -d. Suppose 3*v - 25892 = -q, 2*v = -6 + d. Is q prime?
True
Suppose 21*j = 64*j - 25327. Is j a composite number?
True
Let s(g) = 752*g + 1127. Is s(52) prime?
True
Let q(n) = -2*n**3 + n**2 - 2*n. Let y(w) = 253*w**3 + 6*w**2 - 2*w - 4. Let f(t) = 3*q(t) - y(t). Is f(-3) prime?
False
Let q(c) = -3*c**3 - 2*c**2 - 3*c - 1. Let r be q(-1). Suppose -r*j - 9 = -3. Is (-6)/4 - 1045/j composite?
False
Let w be -6*6/(60/(-1985)). Suppose 3*z = -2*t + w, 5*z - 422 = -t + 170. Is t a prime number?
False
Let s(x) = 8260*x**3 + x**2 - 18*x + 35. Is s(2) prime?
True
Let l be (-527)/(-4) + (-6)/(-24). Let g be (1*1/3)/((-22)/l). Is -4 + (g - -3 - -1001) prime?
False
Let s be 2/(-2) - (-16 - -12). Is s/(-24) + (-1)/((-24)/868059) prime?
False
Let u(s) = -29*s**3 + 3*s**2 - s + 2. Suppose 0 = 5*c + 15, 59 = 4*m - c - 40. Suppose 3 = -9*n - m. Is u(n) a prime number?
False
Let q(x) = -x**3 - 3*x**2 - 13*x + 6. Let p be q(-5). Let v = p - 120. Let b(j) = 698*j**3 + j. Is b(v) a prime number?
False
Let c = 825 - 211. Let t = c - -1991. Is t a composite number?
True
Suppose -137358 = -37*w + 86048. Is w prime?
False
Let r be -6 + 7 + 1 - 8. Let j(w) = -223*w + 5. Is j(r) composite?
True
Let l(t) = -3*t**3 + 47*t**2 - 22*t - 113. Is l(13) a composite number?
False
Suppose 2*u + 4*a = 54518, 5*a = u - 18966 - 8272. Is u prime?
True
Suppose 3*h + 4 = -k, -12 = -2*h - 3*h + 3*k. Suppose 4*d - 10 + 2 = h. Is -7 - -5 - (d - 15) a prime number?
True
Suppose -7*d + 436564 + 446395 = 0. Is d composite?
True
Let v be (-3)/(18/57)*-8. Let t = 649 - 642. Suppose t*b - v = 5*b. Is b a prime number?
False
Is (-2485526)/10*1980/(-2244) - 4/34 prime?
True
Let o(r) = r**3 - 29*r**2 - 3*r - 3. Let f be o(29). Is (-16922)/(-7) - (f/21)/(-10) a prime number?
True
Let f(h) = -h + 47. Let p be f(7). Suppose 8 = -42*j + p*j. Let o(r) = 114*r**2 + 7*r + 41. Is o(j) prime?
False
Let k(q) = 9451*q**2 + 26*q + 116. Is k(-5) prime?
True
Suppose 0 = -5*y + 45 - 30. Suppose s + 2*x - 9 = 0, 2*s + 5*x = 6*s + y. Suppose -2931 = -s*q + r, 3*q - 2*r = -4*r + 2931. Is q prime?
True
Let j(r) be the first derivative of r**4 + 3*r**3 + 33*r**2/2 - 103*r + 157. Is j(15) a composite number?
True
Suppose -w - w = -5*j + 29, 4*j = -w + 18. Let k(m) = 574*m**2 + 7*m + 9. Is k(w) composite?
True
Let u(i) be the second derivative of 0 + 47*i**4 + 1/3*i**3 + 2*i - 3/2*i**2. Is u(2) composite?
True
Let w(i) = -i**3 + 17*i**2 - 31*i + 19. Let v be w(15). Suppose -62 = -v*m + 206. Suppose 6*g = m + 155. Is g prime?
True
Let o = -248771 - -443964. Is o composite?
False
Let a = 14 + -19. Let o be (-122)/(-8) + (a - 23/(-4)). Suppose 0 = -4*i - o, -t + 5*t = 4*i + 2180. Is t composite?
False
Let k = -56 - -62. Suppose k*w - 1270 = -2*a + w, a - 635 = -3*w. Is a a prime number?
False
Let q be (-2)/6 - 1662/9. Suppose x - 3 = 0, 5*x + 21 = -2*a + 12. Is (q/(-4))/((-27)/a - 2) composite?
True
Is 164*5804/(-24)*54/(-36) a prime number?
False
Let r(f) = -11987*f + 8857. Is r(-40) a composite number?
True
Suppose 2*c - y + 17112 = 0, 0*c - 5*c = -5*y + 42780. Let s = c - -15949. Is s a composite number?
False
Suppose 3*g + 4*l - 211647 = 0, 0 = -4*g + l + 2*l + 282146. Is g a composite number?
True
Let l = -1556 - -12595. Suppose 2*o - 29307 - l = 0. Is o a prime number?
True
Let f = -164224 - -298095. Is f a prime number?
False
Suppose -492*a = -494*a + 249478. Is a prime?
True
Suppose -47*p + 42*p - 40 = 0. Let b be -1*6*4/p. Let r(h) = 177*h**2 - 7*h + 19. Is r(b) prime?
False
Let g = -15226 - -37781. Suppose 3*z = -2*q + g + 36518, 5*z - 98442 = q. Is z a composite number?
True
Let m(s) = s**2 - s - 6. Let i be m(3). Let x be (-4)/(-6) + (-178319)/(-69). Suppose i = -d - 2*b + 426 + 85, 5*d + 4*b = x. Is d prime?
True
Let c(a) = 1001*a**3 + 12*a - 31. Is c(4) prime?
True
Let j(v) be the first derivative of v**4/4 - 11*v**3/3 + 21*v**2 - 45*v - 58. Is j(13) a composite number?
False
Let t be (-98)/245 + (-4762)/(-5). Suppose -3*i - 219 - 1308 = 0. Let p = i + t. Is p a composite number?
False
Let p(a) = -a**3 + 8*a**2 - 9*a + 1. Let d be p(6). Suppose -3*f + f + 24 = t, f + 4*t - d = 0. Is f a prime number?
True
Suppose 11*v - 5503431 = 14352259 - 5120409. Is v prime?
True
Suppose -2*x + 6*m - 22 = m, 4*m + 10 = -3*x. Is (14/x)/(10 - (-17437)/(-1743)) a composite number?
True
Let b = -2281 + 4327. Let a = 3197 - b. Is a a composite number?
False
Let b(k) = -352*k - 134. Let f be b(-7). Suppose 33*c - f = 19879. Is c a composite number?
False
Let y(j) = -11*j**2 - 7*j + 3 + 32*j**2 - 2 + 4. Suppose -5*x - 2*k = 42, -x - 3*x - 5*k = 37. Is y(x) a prime number?
False
Let v = -289 + 137. Let x be v/(-14)*2 - 4/(-14). Suppose 25*i - 6477 = x*i. Is i composite?
True
Let t = 175 - 145. Is t/(-75) - (-6)/(-10) - -2020 a composite number?
True
Let k(n) = -6 + 5*n**3 + 6*n**2 - 6 + 5*n - n + 4*n. Suppose 4*s + m = -0*m + 28, 0 = -m. Is k(s) a composite number?
False
Let m(s) = -520*s**3 - 4*s**2 + 8. Let d be m(-2). Suppose -1131 - d = -3*p + 2*v, 3*v - 8786 = -5*p. Is p prime?
True
Let z(g) = -84325*g - 602. Is z(-7) composite?
True
Let c be (-3)/(-84)*-4 + 1411048/14. Suppose c = 630*i - 617*i. Is i composite?
False
Let p(k) = 2*k**2 + 10*k + 4. Let v(a) = -3*a**2 - 11*a - 3. Let u(f) = -4*p(f) - 3*v(f). Suppose 2*j + i = -2*j - 27, -3 = -3*i. Is u(j) composite?
True
Suppose -62*z + 56*z = -30*z + 12912024. Is z a composite number?
False
Let m(c) = 1026*c**2 + 15*c + 160. Is m(-19) a prime number?
True
Let d = -1001062 + 1496371. Is d a composite number?
True
Suppose -409 = 8*j - 137. Let y = j - -37. Suppose 2745 = y*c - 4*w, 0*w = 5*w - 15. Is c a composite number?
False
Suppose 11*s - 40 = 7*s. Suppose 40 = 4*d + 2*z, -7*d + 4*z + 28 = -6*d. Suppose -s*x + d*x - 1082 = 0. Is x prime?
True
Let m = 174254 - 100735. Is m a prime number?
False
Is (-251596 + -10)/(-1*2/1) a prime number?
True
Suppose 5*h - 5*n - 175 = 0, 2*h + 181 = 7*h + n. Let m = h + 967. Is m composite?
True
Suppose -73 = -2*c + h, 5*c = 4*h + 74 + 104. Suppose 35*a = c*a - 5793. Is a prime?
True
Let z(n) = n**2 + 19*n + 65. Let t be z(-15). Suppose l = w + 693, -l = l + t*w - 1372. Is l prime?
True
Let j(q) = -3603*q. Let h be j(-2). Let z = -2096 - -3114. Suppose -4*t - l = -h, -2*t = 4*l - 4628 + z. Is t composite?
False
Let y(l) = 64*l + 19. Let p(z) be the third derivative of 21*z**4/8 + 3*z**3 + 28*z**2. Let m(a) = 5*p(a) - 4*y(a). Is m(13) a prime number?
False
Let q be 19*(2 - 3) + 4. Let c be (-95)/q + (-1)/3. Suppose 5*n - 629 = -2*l, 2*l + 1272 = c*l - 4*n. Is l prime?
True
Suppose 0 = 2*m + 6, 3*h - 43377 = -0*h + 4*m. Suppose 0 = 3*w - 2*o - 13249, -h - 7629 = -5*w + o. Is w a composite number?
True
Suppose 2*u + 12*u = 141050. Suppose -2*h = z - 6725, 3*z - u = -3*h - z. Is h a prime number?
False
Suppose 5*z = -2*o + 246333, -z + 2*z = -4*o + 492675. Is o a prime number?
True
Suppose 6*n - 317 = 7*n. Let r = -705 - n. Let s = r + 807. Is s composite?
False
Let w(o) = -355640*o - 1443. Is w(-2) prime?
False
Suppose 19 + 33 = 4*y. Let v be -1*(1 - y)/4. Let b(a) = 100*a + 7. Is b(v) a composite number?
False
Let f(j) = -5114*j - 7249. Is f(-9) prime?
False
Let g be 29 + 39 - 2/(-2). Suppose -g*a = -73*a + 2492. Is a a prime number?
False
Let a = 2886 - 1882. Let u = 410 + -857. Let x = u + a. Is x composite?
False
Let p(k) = -196*k**2 - 11*k - 30. Let o(w) = -98*w**2 - 5*w - 16. Let j(r) = -5*o(r) + 2*p(r). Is j(9) composite?
True
Suppose 49*y - 4071611 - 2105444 = -808174. Is y prime?
False
Is ((-199645)/60)/(4/32)*6/(-4) a prime number?
True
Let n = 613 + -604. Suppose n*h - 25*h + 390256 = 0. Is h a composite number?
False
Let o(d) = -75*d + 352. 