 y(9). Let x = c + -66. Let f = x + 1774. Is f a composite number?
True
Suppose -4*h = 2*p - 1434, -2*h + 705 = 5*p - 0*p. Is 9/(h/277892) - (-3)/(-10) prime?
True
Let j = 17904 + -6553. Is j a prime number?
True
Suppose 0*w + 2*w + 250 = 5*j, 4*w = -3*j - 526. Let n be -1 + w/(-12) - (-4)/24. Suppose 6*a - b + 2591 = n*a, -a + 650 = b. Is a prime?
True
Is -2578083*(5 - 16/3) a prime number?
True
Let j(p) = 2*p - 6. Let i be j(5). Suppose 37 = 5*q - i*q. Suppose 4*s - 1097 + q = 0. Is s a composite number?
True
Suppose -4671291 = -13*d + 9133109 + 1237887. Is d a composite number?
False
Let k be (2 + 0)*(-29950)/(-100). Suppose -r + 50795 = 2*l, 24791 = l + 3*r - k. Is l prime?
False
Let u(j) = -6*j + 106. Let v be u(0). Let b = v + -720. Is (b/4)/(6 + (-266)/44) composite?
True
Let j = -161845 + 112514. Let q = -28030 - j. Suppose -3*z = -20*z + q. Is z a composite number?
True
Suppose 45*h - 39*h - 12 = 0. Suppose 2*t = -5*z + 5565, -2*z - 2*t = h*t - 2210. Is z a prime number?
False
Suppose 2 = -29*a + 30*a. Suppose -a*j + 3 = -0*j - c, 2*j + 5*c - 9 = 0. Is (-706)/(-4)*1*j a composite number?
False
Let w(i) = 24*i**2 + 57*i + 467. Is w(-38) composite?
False
Let o(k) = -2152*k - 7393. Is o(-90) prime?
False
Let v = -45 - -330. Suppose -5*y + 482 = -h, 3*y + 18*h - 20*h - v = 0. Is y a composite number?
False
Let q(g) = 17*g - 33. Let v be q(3). Suppose 4*y + 4*a + 1000 = 0, -y - 209 = -2*a + 32. Let l = v - y. Is l a composite number?
True
Suppose -24*t + 4572836 = 111*t - 19*t. Is t a composite number?
True
Let f be (-4854)/(-15) - (-18)/(-30). Suppose -3*u + 148 = -f. Is u composite?
False
Let r = -160 - -160. Suppose 3*k + 3*u = 45621, r = 3*k - k - 5*u - 30400. Is k prime?
False
Let b(q) = 30725*q + 5486. Is b(7) a composite number?
True
Let j(h) = 188*h**3 + h**2 + 4*h + 2. Let o(l) = -l**2 + 19*l + 21. Let k be o(20). Suppose 5*i + 12 = 4*s, -2*i - k = -s + 2. Is j(s) a prime number?
True
Let n(g) = -2*g**3 - 7*g**2 - 3*g + 7. Suppose 2*s - 7 = 3. Suppose 2*p - 30 = s*f, 4*p + 9 = -2*f - 3. Is n(f) prime?
False
Let d(q) = q**3 - 4*q**2 - 4*q + 7. Let n be d(9). Let s = 244 - n. Is (39/6)/((-6)/s) composite?
True
Let j be (-44)/55 + 111/(-5). Let p = 19 + j. Let u(t) = -157*t + 3. Is u(p) prime?
True
Suppose s - 701 = 1454. Let y(v) = 180*v + 44 - 46 + s*v. Is y(1) a prime number?
True
Suppose z + 166 = 3*v + 561, 0 = -5*v - 2*z - 640. Let b = -246 - v. Let j = -47 - b. Is j a prime number?
False
Let x(d) = 2414*d + 1358. Is x(36) prime?
False
Let u(i) = 3748*i - 2601. Is u(16) prime?
True
Let v(l) = l**2 - 2*l - 18. Let f be v(6). Suppose f*h = -4449 + 18489. Suppose -h + 789 = -3*p. Is p prime?
False
Let s be (-249)/(1*6 - 874/146). Let z = -12196 - s. Is z composite?
False
Suppose -2*x + 2*u = -1015628, -5*x + 3481999 = -4*u + 942932. Is x a prime number?
False
Suppose 87384 = -379*c + 467*c. Is c a prime number?
False
Let i be (3 + -2 + 1317)*12/8. Let y = i - -5882. Is y prime?
False
Let i(x) be the first derivative of -2*x**2 + 1. Let h be i(-3). Is -1 + 51050/h + 1/(-6) a composite number?
False
Suppose -6 = -6*x - 0*x. Is ((-10)/6 + x)/((-14)/16863) a composite number?
True
Suppose -r - 2*d + 16 = 3*r, 5*d - 24 = -2*r. Suppose -3*t + 6 = -5*z + r*z, 5*t - 8 = 3*z. Is 3*(z + 2) + 6 + 332 composite?
True
Suppose 5*d - 29561 + 10670 = -3*g, -3*g = 3*d - 11331. Suppose 2*h + d = -r + 137, -h = 5*r + 1817. Let p = -1071 - h. Is p prime?
True
Let n be 8 - (8 + 1) - (1 + 1). Is (-3)/2 - -5450*n/(-12) a prime number?
True
Let y be (573/(-2))/(14/((-784)/21)). Let p = y + -457. Is p prime?
True
Suppose 10*t = f - 76057, -647*f - 4*t - 76093 = -648*f. Is f a prime number?
False
Let j(c) = 508*c - 305. Let n(l) = -1018*l + 611. Let x(m) = -13*j(m) - 6*n(m). Is x(-11) composite?
True
Let f be -1 - (2/20 - 762498/180). Let x = f - 262. Is x prime?
False
Let x be ((-258230)/(-45))/(-7) - (-2)/(-9). Let z = 1734 - x. Is z a prime number?
False
Let a(o) = 269*o + 224. Is a(33) a composite number?
True
Let f be -3 - (-6300)/(-52) - 4/(-26). Let n = -39 - f. Is n composite?
True
Let k(i) = -19*i + 2. Let j be k(9). Suppose -3*p + 1581 = 5*h, -2*h + 2*p = -0*h - 642. Let m = h - j. Is m a composite number?
False
Let m = 3051092 - 1823181. Is m prime?
True
Suppose -2*h = -191 + 181. Suppose 2*q = h*i + 3976, -4*q + 8*i - 7*i = -7934. Is q prime?
False
Suppose 152*a = 137*a + 4664805. Is a a prime number?
True
Is 43433 + 1*(-1 + -2) + 99/(-33) prime?
True
Let b be ((-126)/5)/(-3) - (-8)/(-20). Let x(k) = 137*k + 13. Is x(b) prime?
True
Let s(q) = 14*q**3 - 3*q**2 + 11*q + 5. Let u(f) = -4*f - 36. Let m be u(-11). Is s(m) composite?
False
Suppose -183473 = -14*t + 821013. Is t a composite number?
True
Let v be 1/(7/(-2)) - (-6279248)/(-112). Is (0 - -2)/((-10)/v) composite?
False
Let l = 4338 + -1657. Suppose 3*n - l = -s, -5*n + 1374 = s - 1307. Is s prime?
False
Let z(v) = -64148*v + 515. Is z(-3) a composite number?
True
Let n(r) = 0*r - 3*r + 0*r + 14 + 4*r. Let b be n(7). Is (-788)/(-3) + 7/b composite?
False
Suppose -2*v - 61 = -57. Let h = v + 305. Is h a composite number?
True
Suppose -41*q + 244274 = -467887 - 59828. Is q a composite number?
True
Suppose 200*q = 152*q + 3957936. Is q composite?
False
Let o(s) = 45*s**3 - 13*s**2 + 8*s + 15. Let a(b) = 23*b**3 - 7*b**2 + 4*b + 8. Let h(f) = 7*a(f) - 3*o(f). Is h(7) composite?
False
Let t(k) = 7*k**3 - 58*k**2 + 27*k + 125. Is t(34) composite?
False
Let g = -1183 + 2856. Let p = g + -1122. Is p a prime number?
False
Let r(h) = -28*h**2 - 21*h + 1. Let a be r(10). Let g = a - -1536. Let t = g - -2624. Is t a composite number?
False
Let d = -104 - -204. Suppose d = 5*a + 25. Suppose 0 = 19*r - a*r - 1304. Is r composite?
True
Let x(k) = k**3 + k**2 - k - 1. Let p(t) = -591*t**3 + 11*t**2 - t - 7. Let v(r) = p(r) - 6*x(r). Let b be v(-3). Is (-3)/(-8) - b/(-32) a prime number?
False
Let x = -265228 - -511667. Is x a prime number?
True
Let a = 729820 - 331727. Is a a composite number?
True
Suppose -63*m - 90*m + 27784035 = 0. Is m prime?
False
Suppose 29*z - 22497862 + 8276736 = -33*z. Is z a composite number?
False
Let h be ((-4076)/(-18))/((-44)/(-396)). Is h/((0 + 3)*38/399) a composite number?
True
Let o = 1974353 + -572292. Is o composite?
False
Suppose -11 + 29 = -3*h. Let t be h/(9/(27/2)). Let o(q) = -20*q + 5. Is o(t) prime?
False
Let r(v) = 97*v**2 - 26*v - 4. Let s(k) = -97*k**2 + 24*k + 5. Let n(i) = -6*r(i) - 7*s(i). Is n(10) composite?
True
Let q(m) = -15*m - 179. Let o be q(-12). Let u(t) = 27383*t**2 + 4*t - 2. Is u(o) a prime number?
False
Let o(n) = 73*n**2 + 139*n - 735. Is o(34) prime?
True
Let t(p) = 86*p**2 - 17*p - 20. Let h be (-41)/(-123) - 114/(-9). Is t(h) composite?
False
Suppose -4*c = -5*x - 214, -2*c + 81 = -x - 29. Suppose 5*p + 21 = c. Let f = p + 1616. Is f a prime number?
False
Let z be 720/(-100) + (-8)/10. Let j(l) = 72*l**2 - 2*l - 3. Is j(z) prime?
True
Let u(j) = 4*j**2 + j - 1. Let d be u(-1). Let x(h) = 4*h + 106 - h**2 + 4*h**2 - 105 + 3*h**d. Is x(-5) composite?
False
Suppose 6*a + 19 = 11*a - 2*j, 0 = -3*a - 5*j - 1. Suppose a*l - 27544 = p, l + 4*p - 9184 = 7*p. Is l composite?
False
Is -3 + 72/16 - (-18062705)/46 a composite number?
False
Let x(c) = 4*c**2 - 3*c**2 + c + 5*c**2 - 5*c**2 - 37. Let o be x(-7). Let z(y) = 392*y - 11. Is z(o) a prime number?
True
Suppose -2*h = 5*y - 495087, -7*y - 4*h = -9*y + 198054. Is y composite?
True
Let p = 4499 - 6350. Let w = 1352 - p. Is w a prime number?
True
Let f(j) = 167172*j**2 + 327*j + 3. Is f(-2) composite?
True
Let r be -5*(-1)/(-5)*-1. Let x(a) = 3*a**3 + a + 1. Let o be x(-1). Is r + o/12 - (-52230)/24 a prime number?
False
Let i = 1527 - -886. Is i composite?
True
Let v = 1423323 + -637190. Is v composite?
True
Let b(u) = -89*u + 196. Let h be 54/(-36)*(116/(-6))/(-1). Is b(h) composite?
False
Let o = 70802 + -22602. Suppose 9*y = 6*y + 2*l + 36155, -4*y + o = -4*l. Is y prime?
False
Suppose 2*c - 2*w = 12, 5*c = 3*c - 3*w - 8. Suppose -5*r + c*q = -8, 5*q = -4*r + q - 16. Suppose -262 = -2*x - r*x. Is x a composite number?
False
Let j = 162 + -162. Suppose j = -9*i - 4*i + 10387. Is i composite?
True
Suppose 4*o - 88 = 4*n, 8*o + 2*n - 82 = 3*o. Suppose -12887 = -o*p + 11*p. Let r = p - 1063. 