smallest value in c, 0.5, -2, y?
0.5
Let w = -3067.13 - -3067. What is the second smallest value in w, 0.8, -2?
w
Let d = -23825 - -119124/5. What is the second smallest value in -2/5, 1/8, d, -215?
-2/5
Let t = -3.0012 + 0.0012. Which is the second smallest value?  (a) t  (b) 0  (c) 5266
b
Let z = 0.02889 + 6.07111. Which is the fourth smallest value?  (a) z  (b) -5  (c) -1  (d) -19/2
a
Let s = 289/1085 - -3/155. Let z = 5.2 - -2.8. What is the biggest value in z, 1, s?
z
Let r = 4 + -8. Let s = -2.8 - 14.2. Let q = s - -16.7. Which is the third biggest value?  (a) r  (b) q  (c) -3/4  (d) -0.5
c
Let n = 2 + -1.8. Let y(x) = -2*x**3 + 5*x**2 + 38*x + 20. Let l be y(6). What is the second smallest value in n, 23, l?
n
Let l be 4/14 - (-8)/28. Let x = 14616.1 + -14616. What is the smallest value in x, -43/3, l?
-43/3
Let d = 1654 - 1657. What is the fourth smallest value in 2/21, 2/5, d, -0.4?
2/5
Let y = -5131.4 - -5131. Which is the fourth biggest value?  (a) -0.073  (b) 0.2  (c) y  (d) -2  (e) -0.2
c
Let k = -3 + 3.1. Let o = -9720 + 9716. Which is the smallest value?  (a) k  (b) 32  (c) -1  (d) o
d
Let j = 4.04977 - 0.04977. Let y = -8 - -5. Which is the second biggest value?  (a) j  (b) y  (c) -6
b
Let y = -2.8629 - 0.1371. What is the smallest value in 1/3, -45, y?
-45
Let p = 160 - 155. Which is the second biggest value?  (a) -25/3  (b) 0.3  (c) -0.2  (d) p
b
Suppose -2*c - 1177 = -m, 4*c + 3*m + 2339 = -0*m. Let k = 2941/5 + c. What is the second smallest value in 2, -10, k, 3?
k
Let r be -1 - (4/3 - (24 - 22)). Which is the biggest value?  (a) r  (b) -0.3  (c) -8/7  (d) -1/2
b
Let k = 0.3 + -0.5. Let h be 3/(-49) + (-143715)/1191729. Which is the smallest value?  (a) 0.1  (b) k  (c) -4  (d) h
c
Let x = -97 + 287/3. Let j be (-1060)/106 - (-16 - (2 + -6)). Which is the biggest value?  (a) x  (b) 1/3  (c) 0.6  (d) j
d
Let y = -9703 + 9710. What is the biggest value in -3/8, 18, -6, 2/11, y?
18
Let n = -8264.935 - -8265. Which is the biggest value?  (a) -1  (b) 4  (c) n  (d) -0.5
b
Let d(k) = -k**3 + 7*k**2 - 7. Let i be d(7). Let r be -8 + -4 + 2464/196. Which is the biggest value?  (a) 3/7  (b) i  (c) r
c
Let z = 12/18965 + 7274938/56895. Let f = z - 128. Let v = 109 + -107. Which is the third smallest value?  (a) -3  (b) 4  (c) f  (d) v
d
Suppose -5*l + 11 = -l + b, -l - 2*b - 6 = 0. Let d(r) = -r**2 - 3*r + 7. Let x be d(-5). What is the second biggest value in -3/5, l, x?
-3/5
Let m = 76.3 - -391.7. Let y = m - 466. Let j = 125/2 + -65. Which is the second smallest value?  (a) j  (b) y  (c) 4
b
Let z be -7*13/156 - (-1)/(-6). Which is the second smallest value?  (a) z  (b) 0.2  (c) 0  (d) -0.74
d
Suppose 0 = -4*z + 5 - 1. Let d = 4342/105 + -881/21. Let m = 0.2 - 0.5. What is the fourth biggest value in z, d, m, -3/7?
d
Let d = -1.92 + -7.08. Suppose 0 = 29*g - 24*g - 25. What is the biggest value in 4/9, d, -1/4, g?
g
Let k = 17 - -45. Let h = k - 66. Let s = 103/3 + -34. Which is the second smallest value?  (a) h  (b) -3  (c) -1/8  (d) s
b
Let s = 12.3 + -25.1. Let u = 9.8 + s. Let r = 5 + -6. Which is the second biggest value?  (a) 4  (b) u  (c) r  (d) -1/4
d
Let v = 111 + -114. Suppose 49 = 63*s - 140. What is the second smallest value in s, 21, v?
s
Let u be (-5)/(-3)*(-15)/(-5). Suppose 3 = u*t - 2*t. Let r = -32.67 - -32.17. Which is the biggest value?  (a) -2  (b) t  (c) r
b
Let s = -20464 - -20464.4. What is the biggest value in 68, 64, s?
68
Let v = 197/858 - 5/66. Let o = 0.011 - 27.811. Let p = 22.8 + o. Which is the third smallest value?  (a) v  (b) p  (c) 0  (d) 5
a
Let l = 11396 - 11402. Which is the smallest value?  (a) -609  (b) l  (c) -0.2  (d) 2  (e) -3
a
Suppose 16 - 20 = 2*l. Let w be 15/l - -3 - -3. Which is the third biggest value?  (a) -1  (b) 0.1  (c) w  (d) -5
c
Let f = 7 + -6.8. Let v = 13021 + -26039/2. Which is the third biggest value?  (a) -1  (b) v  (c) f  (d) 15
c
Suppose 0 = 4*m - 5*j - 59, -28*m - 2*j - 27 = -33*m. Let v = -0.15 - -11.15. Which is the third biggest value?  (a) v  (b) m  (c) -5/4
c
Suppose -43*i - 6027 = -1297. Which is the second smallest value?  (a) 1/6  (b) -0.4  (c) i
b
Let r be (-1 + 3)/(320/22040). Let z = r + -138. What is the third smallest value in z, -0.3, 3, -4?
z
Let h = -33 - -29. Let s = -327 + 327. Which is the third smallest value?  (a) s  (b) -1  (c) h  (d) 0.1
a
Let v = -2850/13 + 2868/13. What is the third biggest value in 5, v, 0.44, -5?
0.44
Let s be (86/3)/(6/72). Suppose -5*i = -i + 5*l - s, -3*i = -2*l - 258. Let v = i + -770/9. Which is the second smallest value?  (a) 2/3  (b) v  (c) 2/5
b
Suppose -2*j = 4*g + 10, 3*j - 3*g = -4*g - 10. Let q be (21/(-63))/(4/12). Let m = 113/4 - 28. Which is the third biggest value?  (a) q  (b) j  (c) m
b
Let w = 9398 + -9401. Which is the biggest value?  (a) -2/5  (b) -5  (c) w  (d) -4
a
Let p = 2.49 - 2.44. Let m = 1/27 + 49/135. What is the second smallest value in -1, m, p?
p
Let k = 226 + -236.4. Let z = 10.2 + k. Which is the smallest value?  (a) -8  (b) z  (c) -4  (d) -0.5
a
Let s = -18755 + 18759. Let d = -57 - -229/4. What is the second smallest value in -0.1, d, s, 0.4?
d
Let v = -8530 - -8533.7. What is the second smallest value in v, 4, 4/7, -3?
4/7
Let h = 25/21 + -6/7. Let x(s) = 524*s - 23955. Let u be x(46). What is the second smallest value in u, -4, h?
h
Suppose 0 = -2*o + 7*o - 15. Suppose -o*b - 6 = 3. Let v = 22 - 22. What is the smallest value in -6/11, b, v?
b
Let p = -273.905 - 0.095. Let u = p - -274.1. Which is the second smallest value?  (a) 0.3  (b) -5/3  (c) u  (d) 4
c
Let t = -13589 - -13592. Which is the second smallest value?  (a) t  (b) 50  (c) -0.3
a
Let o = 0.7894 - 4.7894. Which is the fifth biggest value?  (a) o  (b) -4/11  (c) 6  (d) -1  (e) 2
a
Let o be (-2 + 1)/(-18 - 3 - -24). What is the second smallest value in o, 13/2, 1, -0.1?
-0.1
Let x = -0.0122 + -0.2878. Let k = 10/3 + -7/2. What is the smallest value in k, x, -1/2, -0.2?
-1/2
Let f = 7 + -3. Let s = f + -2. Let u be (2 - 1)*86/301. Which is the fourth biggest value?  (a) u  (b) 0.5  (c) 1  (d) s
a
Suppose -m - 93 = -2*w + 848, 0 = 5*w + m - 2335. Let v be 228/w + -2*(-1)/(-6). Which is the biggest value?  (a) v  (b) 4  (c) 0.5
b
Let h = 0.1238 - -0.0762. Let w = 3.1 - 8.1. Which is the smallest value?  (a) -0.07  (b) h  (c) w  (d) 0.4
c
Let r = 4910 + -4903. Which is the second biggest value?  (a) 28  (b) r  (c) -5
b
Let z = -112379.916 + 112167. Let m = 213 + z. What is the third smallest value in -1/3, m, 2?
2
Let n = 1.7 - -6.3. Let t = n - 5. Let q be ((-1)/(-15) - 0)/((-15915)/(-2122)*(-2)/50). What is the third smallest value in t, q, -1/5?
t
Let p = -3.2747 - 19.7253. Which is the biggest value?  (a) -1/2  (b) 128  (c) p
b
Let a = -6485 - -6357. What is the second smallest value in -4, a, -2?
-4
Let h be 1 - 1 - 96/(-720). Let s = -194.8 + 221.795. Let p = -27 + s. Which is the second biggest value?  (a) p  (b) 0.1  (c) h
b
Let y = 1827 + -1828.786. Let t = -0.214 + y. Which is the smallest value?  (a) 0.3  (b) 0.27  (c) t
c
Let a be (-2 - 0) + (-17)/(-7). Let z = -0.9791 + 2.9791. What is the second smallest value in a, z, 0, 4?
a
Let h(i) = -6*i - 1. Let n(t) = t. Let u(s) = -h(s) - 5*n(s). Let v be u(-3). Suppose 65 = 11*k - 24*k. What is the second biggest value in v, 16, k?
v
Let j = -8353 + 8350. What is the biggest value in -678, j, -2/13?
-2/13
Let m = -0.1 - 0.9. Let i = 510 - 514. Let d be (-1 + (-16)/(-10))*(i - -9). What is the biggest value in d, 0.3, -0.2, m?
d
Suppose -5*m + 2*c - c - 12 = 0, 4*c = 3*m - 3. Let v be m/(-2) - (-1883)/(-14). Let u = v + 1195/9. What is the smallest value in u, 4, -1?
-1
Let s = -43/6 - -47/6. Let r = 535/741 + -22/39. What is the third smallest value in -4, s, r?
s
Let n = -2869 - -131975/46. Which is the third smallest value?  (a) 1  (b) n  (c) 2
c
Let k = -18.61 - -1.61. Let z = -25.2 - -25. Which is the fourth biggest value?  (a) 1  (b) z  (c) k  (d) 2
c
Let v = 2119 + -2121. Which is the biggest value?  (a) -4  (b) 0.013  (c) v
b
Let n = 4.608 + -4.308. What is the biggest value in -0.5, -3, 3/11, 28, n?
28
Let k = -90 + 90.8. Let t = -0.1 + 0.3. Let p = -126 + 126. What is the third biggest value in k, t, p?
p
Let i = -615 + 615.02. Let r = 4 - 3.9. Let n = r - 0. 