What is the third biggest value in 42, v, 3?
v
Let n = 50 - 46. Suppose -2*s = 3*i - 11, 5*i + 5*s = 21 + n. Let h = -5.5 - -6. What is the biggest value in -1, i, h?
i
Let n be 287/(-28) + 6 + 3. What is the third biggest value in -4, 0.4, n, 2/11?
n
Let o = 0.3 + -0.2. Let g = 83.8 + -83.5. Which is the third biggest value?  (a) g  (b) -0.2  (c) o
b
Let h = 5 - -8. Let x = -31 + 17.5. Let r = x + h. What is the biggest value in r, 0, 0.07?
0.07
Let h = -20 - -35. Let w = -27 - -12. Let q = h + w. What is the biggest value in 2/11, 1, q?
1
Let g be (-1)/(2/(-10)*1). Let l be (4/(-5))/(56/20). Let k = 0.5 - 0.1. What is the third biggest value in k, g, l?
l
Let i = 5.9 - 1.9. Let l be (-2)/(-3) - 228/180. Which is the smallest value?  (a) i  (b) -1/5  (c) l
c
Let x be 2/(-4)*14/4. Which is the fourth smallest value?  (a) -0.1  (b) -1/3  (c) x  (d) 0.3
d
Let w = -288 - -288. Which is the biggest value?  (a) 1/6  (b) w  (c) 0.4
c
Let k = -1285.04 + 1285. Which is the second biggest value?  (a) 0.1  (b) 6/49  (c) k
a
Let m = -582 + 578. What is the third biggest value in -0.2, -0.06, m, 5?
-0.2
Let s be 4/395*((-3)/6 + -2). Let i = 71/316 - s. What is the fourth smallest value in -0.3, -0.1, i, 4?
4
Suppose -3*h - 138 - 129 = 0. Let m = 97 + h. Which is the third biggest value?  (a) m  (b) 2  (c) -2/7
c
Let p(t) = -9*t**2 - 46*t - 4. Let s be p(-5). Which is the smallest value?  (a) 63  (b) 0  (c) -3  (d) s
c
Let t be (-7)/((-35)/31) - 6. Which is the smallest value?  (a) t  (b) -0.1  (c) -4  (d) -3/7
c
Let p = 0.007 + -20.507. Let k = 20 + p. Let c be (104/54 + -2)*3. What is the second smallest value in k, -2/7, c?
-2/7
Let u = 114.3 + -115. What is the smallest value in 0.3, u, 6, -2/13?
u
Suppose 409 + 67 = 119*t. What is the second smallest value in t, 0.11, -18?
0.11
Let r = 373/5 - 75. Suppose -4*p - 29 = k, 5*p - 3*k = -k - 46. Let c = p - -5. What is the second biggest value in c, r, 0?
r
Let k = 0.68 - 0.08. Let p = -414 + 414. Which is the third biggest value?  (a) k  (b) -5  (c) -0.5  (d) p
c
Let d = -1/482 - -485/1446. What is the second smallest value in -1, d, 3?
d
Suppose l = 3*b + 111, -2*l - 3*b + 145 = -59. Suppose 21 - l = -4*t. Suppose 2*u + 4*n = 14, 3*u = -3*n + t - 6. What is the third biggest value in 1, -1/4, u?
-1/4
Let g be (2/7 + 1230/(-42))/1. Which is the third biggest value?  (a) 1/2  (b) 2/7  (c) 0.3  (d) g
b
Let m = 191 + -365/2. Let w = m + -8. What is the fourth smallest value in w, 2/7, 2/9, 5?
5
Suppose 0 = -p - 3*t - 18, -13 = -2*p - 2*p + 5*t. Let r = -0.01 + 8.01. Let m = 3 - r. Which is the biggest value?  (a) 3  (b) p  (c) m
a
Let u = 0.11 - 4.11. Let t be (-2358)/(-42) + 0/2. Let d = t + -56. Which is the biggest value?  (a) u  (b) 1/3  (c) d
b
Let q = -1859 + 1858.7. Which is the third smallest value?  (a) q  (b) -3.3  (c) -5  (d) 3/13
a
Let l = 849 - 849.2. Let x = 1.96 + -2. Which is the smallest value?  (a) l  (b) -2/7  (c) x
b
Let w be ((-1)/2)/(13/234). What is the second biggest value in -2/25, w, -0.5?
-0.5
Let r = 233 - 232.943. Which is the third biggest value?  (a) 4  (b) r  (c) -4
c
Let g = -303 - -2427/8. Let r = 0.6 + -1.9. Let m = -1.3 - r. Which is the third smallest value?  (a) m  (b) 4  (c) g
b
Let f = -1861/12100 - 3/484. Let v = -13/75 + f. Which is the third biggest value?  (a) -0.3  (b) 4  (c) v
c
Let o = 1.8 - 1.95. Let n = 1.85 - o. Suppose 0 = -7*g + 3*g - 16. Which is the third smallest value?  (a) n  (b) g  (c) 2/17
a
Let g be -4 - 30/(-5) - 4. Let n = 4 - 4. Let w be (-6)/8 + (n - 0). What is the second biggest value in g, w, 0.5?
w
Suppose -5*y + 0*t + 903 = -t, -4*y - t = -717. Let m be ((-2)/(-3))/(48/y). Let f = 6.8 - 7. What is the second biggest value in -0.1, m, f?
-0.1
Let o(s) = s**2 - 14*s + 40. Let h be o(11). Suppose -2*u - h = z, -4*z + 2*u - 16 = -2*u. Which is the fourth biggest value?  (a) 1/6  (b) -1/5  (c) z  (d) 1
c
Let x = 37.9 - 38. Suppose 3*o + 1 + 14 = 0. What is the second smallest value in -1.7, x, o?
-1.7
Let i = 179/6 - 91/3. Which is the second smallest value?  (a) 5  (b) i  (c) -5/2
b
Let r be -1 - (-2 - 1)/(-21)*-3. Let g be (8966/(-52))/((-2)/4). Let d = g + -345. What is the third biggest value in -0.1, r, d?
r
Let c be (-2 + 100/45)*12/(-20). What is the third biggest value in c, -0.5, 5, 3?
c
Let g = -6566.1 - -6566. Let a be -1*(-2 - (-5)/2). Suppose 12 = 3*d, 3*d + 16 = -4*b + 2*d. What is the smallest value in g, a, b?
b
Let a be (-4054)/13 + 3 + -3. Let o = 312 + a. Let h = 211/70 - 33/10. What is the second biggest value in 4, h, o?
o
Let p = -2657/15 - -177. Let c = 0.8 - 1.8. Let q = 0.42 + 0.08. What is the biggest value in q, p, c?
q
Let s = 105 + -95. Let n = -9.5 + s. What is the third smallest value in -4, 0.2, n?
n
Let j be (19/(1976/16))/(-1 + 2). Let o = -4 + 3. Which is the biggest value?  (a) -5  (b) o  (c) j  (d) 1/6
d
Let z = 1/451 + -915/5863. What is the smallest value in 3/2, -7, z?
-7
Let q = 1207.5 - 1208. What is the biggest value in 15, -8, q?
15
Let w = -0.3 - -1.3. Let u = 3299 - 3296. Which is the third smallest value?  (a) 4  (b) w  (c) u  (d) -3
c
Let r = -1 - -3. Suppose 0 = -r*c + 7*c. Let l = -1.223 + 1.423. What is the third biggest value in l, c, 3?
c
Suppose 3*w + 7 + 0 = -j, 0 = -2*j + w. What is the smallest value in -13/2, j, 0, -0.12?
-13/2
Let z = -0.6 - -14.6. Let x = z - 10. Let k = 0 - 2. What is the biggest value in x, k, 0.4?
x
Let s be 1 + -2 + 36/32. What is the third smallest value in -3, 1/7, s, -1/5?
s
Let t = -2.6 - -3. Let w = -4979/3 + 1660. Which is the second smallest value?  (a) w  (b) t  (c) 0.2
a
Suppose 0 = -c + 3*c + 12. Let u be c/(-15)*5/(-7). Suppose 3*r + 4*g = -26, -5*r + 3*r - 2*g = 16. What is the third biggest value in u, r, 0?
r
Let n = -5065 + 5065. Let x = 1 + 7. Which is the smallest value?  (a) x  (b) -0.5  (c) n
b
Let f = 728 + -728.2. What is the smallest value in -4, 33, f?
-4
Let u = 0.056 - -2.444. Let z = u + -2. What is the third smallest value in 2, z, -8?
2
Let j = 0.3 + 0.7. Let p = -1.167 + 1.27. Let h = -0.003 + p. Which is the second biggest value?  (a) h  (b) -1  (c) j
a
Let v = -481.8 - -480. What is the smallest value in -3, -3/7, v?
-3
Let g = 43.8 - 38. Let h = g - 13.8. Which is the second smallest value?  (a) 2/3  (b) h  (c) 2/5
c
Let l = -3.03 - -0.03. Let n = 3 + l. Suppose -4 = 4*v, -36 = f + 3*v - 34. Which is the second biggest value?  (a) -6  (b) f  (c) n
c
Let v = -25.4 - -25. Let c = 67/66 - 28/33. Let j be 2/27*3*2. What is the second biggest value in v, c, j?
c
Let f(o) = o**3 + 8*o**2 + 13*o + 12. Let y be f(-6). Which is the second biggest value?  (a) 8  (b) -3  (c) -4  (d) y
d
Let c = 816/2015 + -2/403. What is the biggest value in -0.26, 4/7, c?
4/7
Let l = 682/5 + -137. Let j be ((-2)/8)/(9/12). Which is the smallest value?  (a) -0.4  (b) l  (c) j
b
Let f = 371 + -258. What is the second biggest value in 0.2, 2/9, f, 4?
4
Let h = -4 + 2. Let r = -1/796 + 801/3980. What is the second smallest value in h, -14, r?
h
Let v = -31 + 58. Let l = 27.13 - v. Let r = l - 0.23. Which is the second biggest value?  (a) 0.08  (b) 4  (c) r
a
Let w = 43 - 28. Let m = w + -14.6. Let f = 0.2 - -0.3. Which is the second biggest value?  (a) m  (b) 7  (c) f
c
Let z = -2.97 + -0.03. Let t = -2.134 - -2.334. What is the fourth biggest value in 1, t, 0.5, z?
z
Let t = -2233.7 - -2234. What is the fourth biggest value in t, 2/13, 1/2, -20?
-20
Let p = -38.5 - -39. What is the second biggest value in -19, -5, p, -2?
-2
Let f be (0/1)/(2/(-2)). Let i be -6 + 135/(-25)*20/(-16). Which is the smallest value?  (a) f  (b) 1/2  (c) i
a
Suppose 0 = f + 2 - 6. Let y = 241.8 - 242. Let u = 0.08 + 0.22. Which is the biggest value?  (a) y  (b) f  (c) u
b
Let g = -5.8 + 5.8. What is the smallest value in -0.5, 0.24, g, 1/4?
-0.5
Let c = 63.4 - 63. What is the smallest value in 1/3, c, -0.6?
-0.6
Suppose -5*g - 2 = 3*y, 2*y + 1 + 11 = 2*g. Let c = 221.5 - 222. Let q = 64 + -1986/31. What is the third smallest value in y, q, c?
q
Let s = -152.1 + 154.1. Which is the second smallest value?  (a) 4  (b) 0  (c) s  (d) -3/7
b
Let x = 2.2 - 2. Let n be 56/(-10) + (-18)/45. Let v = 0.98 - -0.02. Which is the third smallest value?  (a) x  (b) v  (c) n
b
Let s = -0.04 - 0.26. 