 + 69686428. Is s prime?
False
Let r(j) = 2026*j**3 + 93*j**2 - 603*j + 19. Is r(7) prime?
False
Let y be ((-21)/(-14))/(-1 - 249/(-246)). Let f = y + -21. Suppose f = 5*v - 1433. Is v a prime number?
True
Suppose -6*k + 2*k + 24 = 4*n, -k + 3*n + 6 = 0. Suppose 11*v - k = 14*v. Is (3303/6)/(v/(-4)) a composite number?
True
Let a = -1257 - -1777. Let m(b) = 2*b**2 - 4*b - 2. Let t be m(-1). Suppose -t*j - 4*j = -a. Is j a prime number?
False
Suppose -n + z + 1155 = 0, 3465 = 3*n - 7*z + 3*z. Let d = 174 + 14. Let h = n - d. Is h composite?
False
Let u(p) = 1494*p**2 + 10*p - 79. Is u(3) a composite number?
False
Let g = 41 + -35. Suppose g*p - 15*p + 15237 = 0. Is p prime?
True
Let a = 47 + -15. Suppose 0 = -3*u + 22 + a. Suppose -12*j + u*j = 978. Is j a composite number?
False
Suppose 9*y - 33 = -15. Suppose -y*g = -437 - 321. Is g prime?
True
Is 486/1215 + 10060146/10 a composite number?
True
Let i(f) be the first derivative of 189*f**2/2 + 151*f - 66. Is i(6) a composite number?
True
Suppose y + 7 = -0. Let d = y - -8. Is -1 + 130 - (0 + (d - -1)) a prime number?
True
Suppose 0 = -0*u + 3*u - 2*u. Suppose 5*n = 3*v - 1078, u = 5*v - n - 173 - 1587. Let b = 658 - v. Is b composite?
False
Suppose -177 = 2*t + 425. Let b be -2 + (0 - -6) - t. Suppose -5*d - 3*m = -2450, -5*m - b - 213 = -d. Is d prime?
False
Suppose 7*p + 105 = -0*p. Let o be 2 - 3*20/p. Is 332 - (-6)/(o/(-3)) composite?
True
Let o be (315/70)/(((-10)/33068)/(-5)). Suppose -21*r = -12*r - o. Is r prime?
False
Let x(o) = -10 - 16 + 87*o + 72 - 19 - 22. Let i = 4 - 2. Is x(i) prime?
True
Let v be -2*(-2 + (-21)/6 + 3). Suppose v*t - f - 34 = 0, 3*t - 2*f = -6*f + 2. Is 1 + (-297)/t*(-4)/3 composite?
False
Let m = 18756 - 10891. Let c = m - 1396. Is c prime?
True
Suppose 38558 = 5*v + 3*t, 0*t = -2*v + 4*t + 15418. Is v composite?
True
Let g(c) = 126*c**3 - 2*c**2 - 12*c + 185. Is g(15) prime?
False
Suppose 4*r = 4*k + 12, -3*r + 4*r + k = 1. Suppose 0 = 3*g - 4*o - 3945, -2*g + r*o = 3*g - 6589. Suppose -2*w + g = -w. Is w prime?
True
Let t(b) = -7*b**2 - b - 10. Let u = 47 + -50. Let z(n) = -1. Let a(w) = u*z(w) - t(w). Is a(-12) a composite number?
False
Suppose -20*l - o = -19*l - 270007, 3*l = o + 810045. Is l a prime number?
False
Suppose 1126578 = -4*d - 8*d + 14*d. Is d prime?
False
Let f(a) = a**3 - 9*a**2 + 15*a - 9. Let s be f(6). Is (801/s)/(-2 - (-5)/3) a composite number?
False
Let b(a) = a. Let h be b(-3). Let z(r) = 945*r + 11*r**2 + 943*r - 1888*r - 2 + 260*r**2. Is z(h) prime?
True
Let i be (-60871)/6 + 15/90. Let w = -6560 - i. Suppose 4*y = v + w, -4*v - 2829 = -3*y - 124. Is y a composite number?
True
Suppose -a - 10*x = -13*x - 13287, -5*x = 5*a - 66535. Let s = a - 5743. Is s prime?
True
Is (-2)/6 - -8*(-75152)/(-66) a composite number?
False
Let i(j) = -j**2 - 45*j + 140. Let l be i(-37). Let s = -287 + l. Is s composite?
False
Let a(t) = -150*t - 7*t**2 + 11*t**2 + 113 + 164*t. Is a(-26) a composite number?
True
Is (-11 - 1) + -15 + (7 - -10743) a composite number?
False
Let g(s) = -s**3 - 7*s**2 - 6*s. Let k = -26 - -20. Let y be g(k). Suppose -2*f + 816 + 190 = y. Is f prime?
True
Suppose -12*y + 180518 - 39842 = 0. Is 13 - (-246)/(-18) - y/(-3) a prime number?
True
Let o be 3/(-12)*2 + (-111)/2. Let b = o - -50. Is 4/b*(-10140)/40 composite?
True
Is 1041 + 2 - (-8 - (-19 - (-4 + -5))) prime?
False
Let n = 213254 - 131251. Is n a prime number?
True
Let k be ((-80)/(-16))/(2/58). Suppose 148*o = k*o + 1770. Suppose 22684 = 18*j - o. Is j a prime number?
False
Suppose 0*z + 23512 = 4*z. Let m = 3521 - 2348. Suppose -5*w = m - z. Is w composite?
False
Suppose 23*u + 312 - 3233 = 0. Suppose 5*g + 78 = -12. Let a = u + g. Is a a prime number?
True
Suppose -47 = 35*h - 39*h + 3*m, -m = 3*h - 19. Is 2177 + (-7)/((-28)/h) composite?
False
Suppose 15*v - 121736 = 219799. Is v/(-3)*(9 - 6)*-1 a composite number?
False
Let m(r) = -r**2 - 17*r. Let p(x) = -x**2 - 17*x. Let y(h) = 3*m(h) - 2*p(h). Let f be y(-10). Is -1 - 813*f/(-15) composite?
False
Suppose -2*l - 15 = -k, -3*l + 6*l = 2*k - 26. Suppose -3*a - 5*c + 3 = -2*c, -5*a - c - k = 0. Is -254*(4/(-8)*-2)/a composite?
False
Let w be ((-336)/(-72))/((-4)/(-7254)). Suppose -5*k - 5*o - w + 893 = 0, -k - 2*o - 1511 = 0. Is k/(-6) + 3/18 a prime number?
False
Suppose -d + 2*d - 39 = 0. Let s = -37 + d. Suppose -5*u = -s*g + 4*g - 4385, -1754 = -2*u + 3*g. Is u prime?
True
Let v = -863049 - -1366298. Is v a composite number?
False
Let b = 895832 - 489663. Is b a composite number?
False
Is 30/(-2) + 16 + 230*269 a composite number?
False
Suppose 0 = -w + i + 30725, 13*w + 2*i = 9*w + 122924. Is w a prime number?
False
Is 974205/30 + 84/24 a prime number?
False
Let h = 689 - 672. Suppose 144051 = 20*b - h*b. Is b prime?
True
Let z(d) be the first derivative of -13*d**2/2 + 262*d - 33. Let t be z(0). Suppose -92 = -3*l + t. Is l a prime number?
False
Suppose 2*g = 4*i + 4, -17*g + 2*i - 6 = -20*g. Let x(c) = -1. Let w(j) = -123*j + 27. Let z(t) = -w(t) - 18*x(t). Is z(g) prime?
False
Let n(p) = 4*p**3 - 5*p**2 + 4*p - 10. Let a be n(4). Suppose -o = -159 - a. Suppose -o = -3*i + 5494. Is i prime?
False
Let k be (-4)/(12/9) + 36/4. Suppose k*w - 1 = 533. Is w composite?
False
Suppose 27 = -13*d + 4*d. Let n be 5 - 1 - (-18)/d. Is (-392547)/(-187) - 3/((-33)/n) a composite number?
False
Let g = 11 + -6. Let l(a) = 2*a**2 - 10*a + 4. Let h be l(g). Suppose -h*p - 5*w = -116, -3*p - 3*w = -0*p - 90. Is p prime?
False
Let m = 116066 + -21987. Is m a prime number?
True
Suppose -10*u + 2*u - 29656 = 0. Let g = u + 5680. Is g a prime number?
True
Suppose 4*j - z - 3991 = 4*z, 1014 = j + 2*z. Let x = -125 - j. Is x/(-7) - (-3)/(-42)*4 a prime number?
False
Let h(v) = -v**3 - 14*v**2 - 285. Let d be h(0). Let l(n) = -70*n. Let u be l(-5). Let t = u - d. Is t a prime number?
False
Let y(j) = -194*j**2 + j + 202*j**2 + 288*j**2. Let f be y(-1). Suppose -762 = -m - f. Is m prime?
True
Let i = 115 - -43. Let o = 277 - i. Is o a composite number?
True
Let f = -266156 + 535099. Is f prime?
False
Suppose -5*g + 46282 = 3*l, 2*l - 6*l + 61711 = 5*g. Let j = -10726 + l. Is j a composite number?
False
Let u = 122 - 42. Let p be u/6*(1062/(-4))/(-1). Let r = 10043 - p. Is r prime?
False
Suppose -10*i + 15*i = -15, u - i = 102152. Is u composite?
False
Let m(u) = -11364*u - 1193. Is m(-6) prime?
False
Suppose 1166642 = 29*d - 957231. Is d prime?
True
Let p(n) = 15*n**3 + n**2 - 2*n - 2. Let q be p(-1). Let h = -20 - q. Let x(b) = -5*b**3 - 7*b**2 + 9*b - 5. Is x(h) a composite number?
False
Suppose -5*d + 5*w = 2*w - 88124, -3*d + 52872 = -w. Is d prime?
True
Suppose -4*w + 6*w = -16. Is 10892/8 + w/16 a prime number?
True
Let o = -11 - 30. Let u = -41 - o. Suppose 2*n + u*n = 2354. Is n prime?
False
Let z(d) = -d**3 + 2*d**2 + 7*d + 1. Let q be z(-2). Suppose 5*f = -q*t + 18, 0*t = -4*t + 4. Suppose h = -3*n + 199, 2*n - 215 = -h + f*n. Is h prime?
True
Let i = 591029 - 319458. Is i composite?
False
Let k(q) = -6*q**3 - 2 + 34*q**3 + 17*q**3 + 3 + q**2. Let v be k(2). Suppose x - 388 = v. Is x composite?
True
Let t(i) = 31*i - 14. Let d(q) = -31*q + 14. Let f(z) = 5*d(z) + 6*t(z). Is f(5) composite?
True
Suppose -3*x + x + 19652 = -d, 0 = -d + 5*x - 19658. Let r = 30551 + d. Is r a prime number?
True
Let s = 2453 - 3794. Suppose -12996 = 5*d - q, -2*d - 3*q = 3334 + 1878. Let j = s - d. Is j prime?
True
Let d(q) = 135315*q**2 + 74*q - 76. Is d(1) composite?
True
Suppose c + c = 0. Let v(w) = -w**3 - 9*w**2 + 4*w + 94. Let g be v(-4). Is (1 - 3) + c - 3522/g prime?
True
Suppose -24*j + 6914546 = -7*j + 17*j. Is j a prime number?
False
Is (1678/(-2))/((-83)/4399) composite?
True
Let h = 798 + -791. Suppose -118532 = -h*p + 67325. Is p a composite number?
True
Let f = 95823 - -18371. Is f prime?
False
Suppose 10904 = 4*w + 3344. Suppose w = -6*y - 4*y. Is (y + -3 + 1)*-1 composite?
False
Let m = 5668 + 4994. Suppose -5*f - m = 2*y - 3*y, 5*y + 2*f - 53445 = 0. Is y composite?
False
Let r(f) = -f + 9. Let z(u) = -u + 18. Let h be z(11). Let k be r(h). Suppose -2563 = -k*l + 159. Is l a prime number?
True
Is (-54)/12*10/15*(-621047)/21 composite?
False
Let n(z) = 278*z + 12. Suppose -4*a = -6*a + 24. Let o be n(a). Let r = o + -1039. 