-r = 4*r + y*i - 1251, 255 = r + 3*i. Suppose -w = -680 + r. Is w composite?
False
Let a(z) = 290*z**2 - 2*z - 7. Is a(-15) a prime number?
False
Is (26 + 8)/((-2)/(-1307)) composite?
True
Let b(h) = h**3 + 7*h**2 - h - 2. Let o be b(-6). Let r = 57 - o. Let t = r - -80. Is t a prime number?
True
Let q = -9435 - -13896. Is q a prime number?
False
Let q(u) = -6*u**3 + u**2 + u. Let l be q(-1). Suppose -3*c - l = -6*c. Suppose -c*x = -2*g - 0*g + 54, -g - x = -35. Is g prime?
True
Suppose -3*b - 168889 = -5*i, 4*b - 5*b = 3*i - 101339. Is i a prime number?
False
Let s = -10 + 13. Let g(p) = 10*p**3 - 3 + 3*p**2 + s*p - p**2 - 5*p**2 + 4*p**2. Is g(2) a prime number?
False
Let g = 3629 - 88. Is g prime?
True
Is (-20)/100 - 95662/(-10) a composite number?
True
Let o(g) = -g**2 - 2*g + 1822. Is o(0) prime?
False
Let g(s) = 51*s**3 - 5*s**2 - 3*s - 2. Let m be g(4). Suppose -5*t + m = 5*i - 2*t, 3145 = 5*i - 2*t. Is i a prime number?
True
Is (-4)/(-14) - 148/28 - -12786 prime?
True
Let c be (-1)/(-8) - 181051/(-104). Let b = c - 1155. Is b composite?
True
Let v(j) = 2 - 4 + 1 - 256*j + 2. Let k(o) = -o**2 + 5*o - 5. Let n be k(4). Is v(n) a prime number?
True
Suppose -18*z + 768327 = 3*z. Is z prime?
True
Let h(w) = -12*w**3 + 3*w + 3*w + 11*w**3 - w**2 - 1. Is h(-12) a composite number?
False
Let a(s) = -361*s + 234. Is a(-19) a composite number?
True
Suppose 0 = -j + 2 - 4, -o = 4*j + 1828. Let p = o + 3387. Is p a prime number?
True
Let o be 1 + -4 + 4 + 3. Suppose -14 = -2*m - o. Suppose -m*v + 1422 = v. Is v prime?
False
Suppose 3*u + 90 = 6*u. Let v = u - 66. Let t = v - -82. Is t prime?
False
Let y(j) = -22*j - 8. Let f be y(5). Let d = 5 + -2. Let h = d - f. Is h a composite number?
True
Let h(a) = 2*a**2 + a + 3. Let o be (-1 - -9)/(1/1). Is h(o) a composite number?
False
Let w = -35 + 40. Suppose 5*u = 3*k + 329 + 419, -w*k = -5*u + 750. Is u a prime number?
True
Is 1/((-111315)/(-55655) + 1 - 3) composite?
False
Let a(z) = z**2 - 9*z + 8. Let s be a(8). Suppose s = -f - 0*x - 4*x + 1535, 3*x + 6178 = 4*f. Is f a composite number?
False
Suppose 18529 = 44*k - 348651. Is k a prime number?
False
Let v be 1 - 1 - 22/(-1). Let y = v - 17. Suppose y*f + 0*d - 2*d - 2887 = 0, 2*f = 3*d + 1146. Is f a prime number?
False
Let d(f) = -7*f. Let c(r) = r - 1. Let b(a) = -4*c(a) + d(a). Let g be b(2). Is 2403/g*(-4)/6 prime?
True
Let a = -1542 - -6395. Is a composite?
True
Suppose -2*o + 252 = 2*o. Let q = -278 + 472. Suppose b + 2*v = 63, 5*v + o = -2*b + q. Is b prime?
True
Is (-9 - 30605/(-10))/(1/2) prime?
False
Suppose 250 + 1486 = 4*h. Let m be h/4 - (-6)/(-4). Is (m - 1)/((-10)/(-25)) prime?
False
Suppose 4*a = -3*q + 66128, -2*a + 7492 + 25582 = 4*q. Suppose -3*y - 5*m + a = -6316, -38075 = -5*y - m. Is y a prime number?
False
Let p(l) = 16*l**2 - l + 20. Let k be p(6). Suppose -8*f - 2*f + k = 0. Is f a composite number?
False
Is (-3 + 15/3)*(-9249)/(-6) prime?
True
Suppose 5*p - 50693 = 55202. Is p a prime number?
True
Suppose 2*i - 16 = -2*q, -9 = 2*q - 5*i + 3. Let y be 18/(-24) - 2933/q. Let r = y - -1065. Is r composite?
False
Let a = -61 + 64. Suppose -a*c + 4*w + 4023 = 0, -2*w = c - 364 - 967. Is c prime?
False
Let p(j) = 428*j + 1. Let d(v) be the third derivative of -107*v**4/3 - v**3/2 - 6*v**2. Let r(n) = 2*d(n) + 5*p(n). Is r(3) a prime number?
True
Let r = 0 - -6. Let a be 9/27 + 130/r. Is a/(-2*(-4)/20) a composite number?
True
Let r(m) = -5*m**3 - 13*m**2 - 3*m + 4. Suppose -3*w = l - 6*w + 20, 3*w = -2*l + 5. Is r(l) a composite number?
True
Suppose 3*h = 6*h - 6. Suppose 0 = m + h*m. Suppose m = 4*a + a - 2425. Is a prime?
False
Suppose -277*q = -289*q + 21612. Is q prime?
True
Let k(j) = -112*j - 289. Is k(-9) a prime number?
True
Let t be (-9)/(-9) + 73*-1. Suppose 5*x - 174 = 461. Let j = x + t. Is j composite?
True
Let f(w) = -8964*w + 33. Is f(-1) prime?
False
Let f = 35 - 33. Is f*2/(-12) + (-3788)/(-6) a composite number?
False
Let o(a) = 2178*a - 32. Is o(3) prime?
False
Let y = -41 + 38. Is y/2*1996/(-6) a composite number?
False
Suppose 4*u + 3*u - 206381 = 0. Is u a composite number?
False
Let f(h) = 41*h**3 + 2*h**2 + h + 7. Let g be f(3). Is g*((4 - 2) + (-10 - -9)) prime?
False
Suppose -90*q + 88*q + 2338 = 0. Is q a prime number?
False
Let n(j) = -4*j + 230. Is n(34) prime?
False
Let n = -4596 - -12907. Is n prime?
True
Let p(z) = -z**3 + 2*z**2 + 3*z - 4. Let q be p(2). Suppose 6455 = 3*f + q*f. Is f a prime number?
True
Let j(c) = -c**2 - 6*c - 2. Let p be j(-6). Let b be (-3093)/12 + p/8. Let y = b + 407. Is y composite?
False
Is (-3)/(-6) - (5 - (-186230)/(-20)) composite?
True
Let g(a) = -154*a**2 - 2*a - 7. Let w be g(3). Let q = w - -3134. Is q prime?
False
Let n(g) = 18*g**2 + 7 + 9 + 4 + g**3 + g - 2*g**2. Let h be n(-16). Suppose h = -d, -r = -5*d - 4 - 357. Is r a prime number?
False
Suppose -4*d + 7679 = -g, 0*g + 3*g + 1917 = d. Suppose -v - d = v. Let j = -623 - v. Is j a composite number?
False
Let a = -188403 - -314708. Is a composite?
True
Let f = -15011 + 41584. Is f a composite number?
False
Is ((-12)/(-3) + 3)/((-1)/(-17159)) prime?
False
Let n(z) = -2662*z + 61. Is n(-4) a composite number?
False
Let f(g) = -g**3 - 6*g**2 - 5*g + 6. Let a be f(-5). Suppose -a = 2*h - 2. Is (-12 + -7)*2/h composite?
False
Let v be 3*2*2/4. Suppose -3*m - y + 1009 = -2*y, -5*m + v*y = -1687. Is m a prime number?
False
Let y(g) = -2*g**2 - 7*g + 11. Let n be y(-5). Is 74844/48 + 1/n prime?
True
Suppose 88*p = 818181 + 401411. Is p a composite number?
False
Let v = -11369 + 17248. Is v composite?
False
Let r(b) = 44*b**2 - 25*b + 11. Let h(m) = m**2 + 1. Let w(d) = -4*h(d) + r(d). Is w(-12) prime?
True
Let m = 9468 - 6383. Is m a prime number?
False
Let r(c) be the first derivative of -c**4/4 + 20*c**3/3 + 5*c**2/2 - 11*c + 18. Is r(15) prime?
False
Let v(d) = 214*d + 63. Is v(22) a composite number?
True
Let j = 1604 - 1120. Suppose -t = -5*t + j. Let f = 174 - t. Is f a composite number?
False
Let j = 4322 + -1717. Let z = -428 + j. Is z a composite number?
True
Let q be ((-6)/(-9))/(4/18). Let z = 61 - 19. Suppose -q*w - 8 = y - z, 0 = 4*w. Is y a prime number?
False
Let a(c) = 7 + 5*c - 5 + c**2 + 2*c + 7. Let g be a(-6). Suppose q + g*q - 721 = 5*d, -3*d + 176 = q. Is q prime?
True
Let u = -1883 + 2970. Is u prime?
True
Let r(k) = 43*k**2 + 6*k - 5. Let i be r(-5). Suppose 2*h - i = -38. Suppose -m - h = -4*m. Is m prime?
True
Is (-1968960)/(-175) + (-2)/10 a composite number?
False
Let y be 0/(-5 + 9/3). Is (4 - y/(-3)) + 3 a composite number?
False
Suppose 18 + 14 = -2*w. Let c(p) = 6*p**2 + 7*p + 53. Is c(w) composite?
True
Suppose 12 = 4*o + w - 4, 0 = 2*o - w - 2. Let v = 124 - 124. Suppose t = -q + 149, v = -q + o*q. Is t a composite number?
False
Suppose 8222 + 79681 = 9*a. Is a a prime number?
True
Let j = -52 - -54. Suppose 3*n = 3*g + 2*n - 2272, -j*g - 4*n + 1510 = 0. Is g prime?
True
Let w(q) = 4*q**3 + 4*q**2 + 10*q + 13. Is w(9) composite?
False
Let n(t) = -2*t**3 + 8*t + 13. Let f = 26 + -32. Is n(f) a prime number?
True
Let x(q) = 10*q**2 - 3. Suppose 5*m - 4*h = -46, -m - h - 5 - 6 = 0. Let n = 7 + m. Is x(n) composite?
True
Suppose 219 - 1436 = -3*x - 2*v, -4*x + v + 1641 = 0. Suppose 3*f = r - 5*r + 152, -5*f = r - 38. Let b = x - r. Is b a prime number?
False
Suppose -3*w = 1781 + 247. Let g = 1055 + w. Suppose o - g = -0*o. Is o a composite number?
False
Let w = 4468 - 2287. Is w a composite number?
True
Let m = 21 + -60. Let u = m - -98. Is u a composite number?
False
Suppose 5*r = 7*r + 448. Let n = 119 + r. Let j = 22 - n. Is j prime?
True
Let s be (6 - 3/1)*(-6673)/(-3). Suppose -s = -4*q + 531. Is q a prime number?
True
Let h = 37 - 53. Let k be (9/24)/((-2)/h). Suppose k = t - 3. Is t prime?
False
Is (27850/15)/(16/24) prime?
False
Let t = 6283 - -5194. Is t prime?
False
Suppose 5*n - 115480 = -3*p, 4*n + 2*p = 31549 + 60837. Is n a composite number?
False
Let z = 446 - -507. Is z prime?
True
Suppose 5*x = 2*a + 14, -2*x + 4*a = -x + 8. Let n be (-30)/9 + 2 + (-14133)/(-9). Suppose -2107 = -x*k + n. Is k prime?
True
Let a(b) = 89*b**2 + 40*b - 204. Is a(5) composite?
False
Is (-6)/87 - 37497206/(-2146) a prime number?
False
Suppose 5*v + 5*n = 4570, 0*v = 2*v - 2*n - 1832. 