-1.3?
m
Let i = 50.7 - 31. Let y = i + -5.7. Let a = y + -5. What is the third biggest value in 1/3, -1/4, a?
-1/4
Let t = 1.7312 - 1.7722. What is the second biggest value in -0.4, -0.5, t, -5?
-0.4
Let f = -2084 + 2088. Which is the second smallest value?  (a) -3/7  (b) -2/13  (c) -217  (d) f
a
Let k = -13.48 - -10.6. Let l = k - 0.12. Which is the third smallest value?  (a) l  (b) 4  (c) -3/8
b
Let w = 29.9 + 8.3. Let m = 6.73 + 31.27. Let p = m - w. Which is the third smallest value?  (a) 0.7  (b) p  (c) 3
c
Let l = 1503/5 - 304. Let h = l + 202/55. Which is the smallest value?  (a) -5  (b) -2/5  (c) 5  (d) h
a
Let g = -0.27 + -1.13. Let h = 1.6 + g. What is the smallest value in h, -2, -1?
-2
Let g = -19.1 - -19.262. Let x = -75.162 + g. Let r = x + 78. Which is the second biggest value?  (a) -5  (b) r  (c) 5  (d) -0.2
b
Let t = -4.08544 - -0.08544. Which is the fourth smallest value?  (a) 0.3  (b) -0.5  (c) t  (d) 4/3
d
Let n be 7/(-6)*18/126. What is the third biggest value in -1, 0.9, n, 5, -0.074?
-0.074
Let j be 75/20*(100/27 - 4). What is the fourth smallest value in 0.6, 1, j, 2/7?
1
Let q = -6 - -5.6. Let f = 473.7 - 474. Which is the second biggest value?  (a) q  (b) 0.2  (c) 2/19  (d) f
c
Let z be 3 - (8 + -7 - -39). Let p(n) = n**3 + 39*n**2 + 75*n + 41. Let d be p(z). Which is the second smallest value?  (a) d  (b) 4/3  (c) -577
b
Let h be (-2900)/(-320) + -9 + 110/(-1248). Which is the fifth biggest value?  (a) -0.2  (b) 6  (c) 0.1  (d) h  (e) 5
a
Let j = -185 + 182. Let s = 49 + -933/19. Let p = 2 + -1. What is the third smallest value in s, -2, p, j?
s
Suppose -273 = -76*x + 217 - 110. Suppose -2*o + 5*t + 15 = 3*o, o = -4*t - 2. Let y = o - 0. What is the smallest value in y, x, 3?
y
Let o = 0.56 + -3.56. Let n = 0 - 2. Let r = n - o. Which is the second biggest value?  (a) 1/8  (b) r  (c) -0.1
a
Let y be ((-1)/18)/(7/((-357)/10)). Let v = -8/15 + y. What is the second smallest value in v, 49, 0.3, -4?
v
Let f = 0.2 + -0.5. Let y = 180.4 + -2.4. Let n = y + -178.5. What is the smallest value in -6, n, f, 0?
-6
Let j be 14 + -11 + 444/(-156). What is the smallest value in 2/21, j, 24?
2/21
Let i = 91 + -88. Suppose -5*g + 7 = -i. Suppose -2 + 0 = -2*y. Which is the third biggest value?  (a) -5  (b) g  (c) y
a
Let d = -148 + 147.99. Let i be (4/24)/(4/(-6)). What is the second biggest value in 0, i, d, 2/5?
0
Let r be -6*((-12)/45*-5 - 3). Suppose 4*o - r*o = 18. Let f = 0.2 + 3.8. Which is the third smallest value?  (a) o  (b) f  (c) -6
b
Let v be 22/(528/36)*2. Which is the smallest value?  (a) -3/8  (b) -5  (c) 0.3  (d) 1.267  (e) v
b
Let o = -2.431 - -2.631. What is the third smallest value in -0.6, 0.3, o, 3, -3?
o
Let j = -0.42978 + 0.42878. What is the third smallest value in j, 9, -0.6?
9
Let q = -334 - -403.2. Let n = -811 + 880. Let k = n - q. Which is the third smallest value?  (a) -9/2  (b) -2/5  (c) k
c
Let a = -8202 - -8190. What is the third smallest value in 0, a, -4/9?
0
Let g = -148 + 140.86. Let k = g + 2.14. Which is the second smallest value?  (a) -0.14  (b) k  (c) -7
b
Let h = -75.999 + 76. Let u = h + -48.001. What is the second biggest value in 2, u, 0.3?
0.3
Let y be -1 - 0 - 112/(-36). Let u = y + -1928/909. Let w = -98/303 + u. Which is the second smallest value?  (a) 0.4  (b) w  (c) 4  (d) -2/7
d
Let z be (-4)/((-140)/65 + 2). Suppose -2*k - 2*b - z = 2*b, -2*b = 3*k + 19. Let v be (-2)/(-10)*(k - 0). What is the third smallest value in -0.4, v, -2/13?
-2/13
Let i = -1158 - -1158.4. Which is the smallest value?  (a) i  (b) 2  (c) -32  (d) 0.3
c
Let k = 5807.6 + -5808. Which is the fifth smallest value?  (a) -1/5  (b) k  (c) 0.1  (d) 25  (e) -3
d
Let j = -2293 + 2292.7. Which is the biggest value?  (a) 18  (b) 2/9  (c) j  (d) -2/13
a
Let t = -1263 + 1332. Let z = 4 + 63. Let p = z - t. Which is the smallest value?  (a) -3  (b) 1/4  (c) 1/7  (d) p
a
Let p = 0.58 + -0.98. Let m = -1.783 + 6.783. Which is the biggest value?  (a) 4  (b) m  (c) p  (d) -3
b
Let u be 5/2 + 10*(-102)/312. What is the smallest value in -5, u, -4/5, 0.5?
-5
Let y = -25187 + 25187.2. What is the biggest value in -9/14, 14, -1/2, y?
14
Let s be 391/(-51) - (-7 - 0). What is the second smallest value in 1/5, 183, -0.1, s?
-0.1
Let k be 42/6 - (-4 + 9). Which is the fourth biggest value?  (a) -3  (b) k  (c) -0.1  (d) 0.43
a
Let r = -1.0032 + 50.7032. Which is the second biggest value?  (a) -2  (b) 0  (c) r
b
Let p = 118.5 - 118. Let q = -0.6 + -36.4. Let f = 15 + q. What is the second biggest value in f, p, 3, 0.3?
p
Suppose 0 = -12*n + 18*n - 54. Suppose -n*g + 18*g - 45 = 0. Which is the second smallest value?  (a) -0.2  (b) g  (c) 2/3  (d) 3/7
d
Let m = -13754 + 14511.1. Let x = m - 757. What is the second smallest value in x, -5, 1/2?
x
Let h = -0.7 - -0.1. Let r = 10301 + -10298. Which is the second smallest value?  (a) h  (b) r  (c) 0.9
c
Let q be 6/20*2/(-6). Let l = 480 - 368. Suppose 44*n - l = 58*n. What is the second smallest value in n, -3, q?
-3
Let b = 11 + 19. Suppose -b*y - 192 = -34*y. Let s be y/(-4)*6/(-84). What is the second biggest value in 1/3, 3, s?
s
Let l = -2160 - -2159.8. Let g = -5 - -3. Let v be g/3 - 78/(-36). Which is the second biggest value?  (a) 2/7  (b) l  (c) v
a
Let g = 10.14 - 10.783. Let b = 0.943 + g. Let n = 0.01 - 3.01. What is the fourth biggest value in -0.5, n, b, 4?
n
Let t = 0.5 + -5.5. Let m = 18499 + -18495. Which is the second biggest value?  (a) -0.4  (b) t  (c) m  (d) 1/4
d
Let w = -0.00183 - -2.00183. Which is the second smallest value?  (a) w  (b) -160  (c) 3
a
Let l = -5.5 + 5. Suppose -5*r + 29 = -4*m, -r = -m - 4*m - 10. What is the third smallest value in 0, l, m?
0
Let g = 436 + -411. Let m be (g/8)/(460/368). Which is the fourth smallest value?  (a) 1/5  (b) m  (c) -2  (d) -0.2
b
Suppose -47*w = 49*w + 6*w + 306. Which is the third smallest value?  (a) -4  (b) 4  (c) w  (d) -52  (e) 8
c
Let m = -2.324 - -2.124. Which is the fourth smallest value?  (a) 2  (b) 0  (c) 3  (d) m  (e) 0.1
a
Let v be (440/70 - 6)*(-5 - (-1 + -3)). Let u = 6/5 - 23/15. Which is the second smallest value?  (a) u  (b) v  (c) -8/9
a
Suppose -5*n + 10*n + 5 = 0. Let x = -647 + 645. Which is the smallest value?  (a) -4/5  (b) x  (c) n  (d) 0.2
b
Suppose u + 3*u = 16. Let r = 849 + -1423. Let s = -572 - r. What is the biggest value in s, 1/4, u?
u
Suppose -v - 9 = 2. Let b = 8.3 - 8. Let q = -23404.4 - -23404. What is the biggest value in v, b, q?
b
Suppose 0 = -v + 4*k + 48, 4*k = -3*v + k + 69. Let i be (-38)/88 - (-7)/v. Let d = -3127/11 + 284. Which is the biggest value?  (a) 4  (b) i  (c) d
a
Let c = 25.4 + 0.6. Let s = 26.07 - c. What is the biggest value in -1/3, s, 6?
6
Let o = -3 - -6. Let a = -16613/2 - -149521/18. What is the smallest value in a, -2, o, 0?
-2
Let k = 14.13 + -14. Suppose -290 + 326 = 6*d. Let j be -10 + 25/5 + 28/d. Which is the third biggest value?  (a) j  (b) k  (c) 0.3
a
Let z be 4958/(-629) - (3 - 11). Which is the second biggest value?  (a) 1.5  (b) z  (c) 0  (d) 8
a
Let v = -0.8 + 1.1. Let k = v + -10.1. Let t = -10.4 - k. What is the third smallest value in 4, -2/11, t?
4
Let g(w) = -17 + 16 - 5*w - 9 - 61. Let k be g(-14). Which is the second biggest value?  (a) k  (b) -4  (c) 3.1
a
Let u = -355.73 + 349. Let x = 67.93 + u. Let w = -61 + x. Which is the second biggest value?  (a) 1/4  (b) 3  (c) 0.08  (d) w
a
Let x be (-492)/(-2) + 1 + 43/129. Let w = x - 249. Which is the biggest value?  (a) 2/9  (b) 4  (c) w
b
Let v(d) = -d**3 + 10*d**2 + 113*d + 99. Let y be v(-6). Which is the biggest value?  (a) -14/123  (b) 0  (c) y
b
Let w = 53.53 + -49.53. Which is the second smallest value?  (a) w  (b) 6/7  (c) -4/13
b
Let w be ((-3)/5)/(3/(-2)). Let f = 0.81 + 187.19. Let m = -187.8 + f. What is the third smallest value in m, -2, -4, w?
m
Let k = -0.020669 + 0.020669. Let p = 0.1 + 0.3. What is the second biggest value in -1.6, k, p?
k
Let v = -3450 - -3448. What is the third biggest value in 0.3, 2432, v, 0?
0
Let o = 52 - 51.947. Let k = -0.1 + o. Let w = k - 4.953. What is the second biggest value in w, 3, 4?
3
Let y be -29*(-1)/(-30) + (-76)/(-456). Let q = -2666 - -2668. Let i = 1 + -1. What is the third biggest value in q, y, 0.1, i?
i
Let i be -1*(0 + 2/22). 