ue?  (a) g  (b) v  (c) f
c
Let s = -22 - -20.5. Let h = -1.8 - s. Let d = 3368/11 + -306. What is the third smallest value in h, d, -3/7?
d
Let g = -392.2 + 392. What is the second biggest value in 2, -1/2, -0.1, g?
-0.1
Suppose 5 = -3*k - 3*m + 29, -2*k - 5*m + 31 = 0. Suppose k*g = 2*g. Suppose g = n - 2*n + 3. What is the third biggest value in -0.2, 0, n?
-0.2
Let f = 0.723 - 0.723. What is the third biggest value in -1/6, f, -4?
-4
Let y = -23.4 - -23.8. What is the smallest value in -4/5, 3, y?
-4/5
Let s be 1*10*(282/(-150) + 2). What is the third smallest value in -4, -5, 12, s?
s
Suppose 1 = 4*y - 7. Suppose 3*r = y*r. Which is the second biggest value?  (a) r  (b) 1/4  (c) -3
a
Let g = 2.12 - 2.32. Let t = 23 + -68/3. What is the biggest value in g, -2/17, t?
t
Let j(z) = -z. Let s be 0/(-1 - 8/4). Let x be j(s). Let w be ((-2)/(-6))/((-4)/6). What is the smallest value in x, -1, w?
-1
Let x = 0.6 - -0.1. Let t = 0.5 - x. Let l = -165 + 1153/7. Which is the second smallest value?  (a) t  (b) -2  (c) l
c
Let l = -299/105 - -19/7. Which is the second smallest value?  (a) -0.2  (b) l  (c) -3
a
Let u = 131 + -130.7. Let l(z) = 2*z + 14. Let b be l(-9). What is the biggest value in b, u, -3, -0.4?
u
Let c = 1595/3 - 532. What is the third smallest value in 2, 0.13, 0.3, c?
0.3
Suppose 39*b + 468 = 3*b. What is the smallest value in -1/3, 4, b, 3?
b
Let z = -191/3 + 63. Let f be 2/(-11) - (-24)/11. Let y be 2/(-8)*(-1 + f). What is the smallest value in 3, y, z?
z
Let x = 185.1 + -184.6. Which is the second smallest value?  (a) x  (b) -19  (c) 6
a
Let w = 37 + -35. Suppose 8 = r + 2*y, -6*r = -3*r + w*y - 8. Which is the fourth smallest value?  (a) -1  (b) -5  (c) 2  (d) r
c
Let z = -29/93 - -20/31. Which is the third biggest value?  (a) -5  (b) -2  (c) z  (d) -1
b
Let i = -0.042 - 0.278. Let n = i + 0.52. Which is the biggest value?  (a) 1/4  (b) -2/7  (c) 7  (d) n
c
Let n = 192 + -191.7. Let g = -1 - -5. Which is the fourth biggest value?  (a) 5  (b) 0.6  (c) n  (d) g
c
Let u be (-5 - (-28)/6)*7/(-28). What is the biggest value in u, -2, 0, -2/7?
u
Suppose i - 16 = -4*s, -2*s = -s - 1. Suppose -b + 0 + i = 5*u, 4*b - u = -15. What is the second biggest value in -0.2, b, 3?
-0.2
Let d = -0.13 - -0.25. Let g = d - -5.88. What is the third smallest value in g, -0.3, 0.4?
g
Let h be 27/(-72) + 1/8*43. Which is the fourth biggest value?  (a) 95  (b) 0.4  (c) h  (d) 4
b
Let i = -1.699 - 76.301. Which is the smallest value?  (a) i  (b) -2/7  (c) 4
a
Let x = -4/131 + 401/262. What is the fourth smallest value in -1/2, -4, -3, x?
x
Let b = 2128 - 2135. What is the third smallest value in -14, b, 4?
4
Let l = 13/263 + -11699/7890. Let p = l + 5/6. What is the biggest value in p, 0.2, 4/7?
4/7
Let m = -108.97 - -109. What is the second biggest value in m, -4, 2?
m
Let m = 0 - -4. Let p = 321 - 316. What is the smallest value in p, 3/7, m?
3/7
Let t = 0.09 - -0.21. Let w = -0.14 - 0.16. Let y = t + w. What is the third smallest value in y, 1, -10?
1
Let u = 810.5 + -810. What is the second smallest value in 2/13, 40, u?
u
Suppose o = 2*o + q - 2, o = 4*q + 7. Let y = 712 + -708. Let f be (-1)/12*45/10. Which is the third biggest value?  (a) y  (b) f  (c) o
b
Let q = 0.5 - -4.5. Let v = -25 + 38. Let s = -12.9 + v. Which is the biggest value?  (a) s  (b) q  (c) 0.5
b
Let f = -0.056 + 2.056. What is the second smallest value in -1/7, f, 0?
0
Let s = 2995/3 - 998. What is the second smallest value in s, 5, -179?
s
Let h = 2177 - 2180. What is the third smallest value in 1/5, h, 1/12, -8/13?
1/12
Let s = 26 + -25.72. Let h = s + -0.08. What is the fourth smallest value in -1/3, -0.4, h, 0.5?
0.5
Let z = 45.4 + -45.8. Let n be (-2)/(-7) + 40/(-42). What is the biggest value in -3/4, n, z?
z
Let q = 3.73 + -3.66. Which is the second smallest value?  (a) q  (b) -0.5  (c) 9
a
Let w = -1.7 + -16.3. Let g = 17 + w. Let d = 0 + -5. Which is the second smallest value?  (a) g  (b) d  (c) 1/4
a
Let a = -179.03 + 180. Let y = a - -0.03. Let x = y + -2. What is the third smallest value in 0.3, x, -0.7?
0.3
Let p = 0 + 0. Let h = 16.631 + -17.131. What is the third smallest value in p, 1/12, h, -0.2?
p
Let i = 75/142 + -2/71. What is the third biggest value in i, -0.07, -23?
-23
Let z = 3784 + -3784.19. Suppose 2*u - 8 = 6*u. Which is the second biggest value?  (a) 0.1  (b) u  (c) z
c
Let a = 1.16 + 4.84. Let w be ((-6)/(-15))/((-6)/(-75)). What is the second smallest value in a, 1, w, -1/6?
1
Let r = 4.08 - 4. Let a be (7/(-3) + 2)*(-3)/(-4). What is the fourth biggest value in -1, r, a, 0.3?
-1
Let r = 64.899 - -0.101. Let a = 61 - r. Let i = 1169/10 + -117. What is the second smallest value in -4/3, i, a?
-4/3
Let y = -7.4 + 4.21. Let z = 40.81 + -41. Let l = y - z. Which is the third biggest value?  (a) l  (b) 6/7  (c) 3/2
a
Let j = -1631/9 + 181. Which is the smallest value?  (a) 4/7  (b) 4  (c) j  (d) -1/4
d
Let g = 2120 + -6356/3. Let i = -2 - -1.5. Which is the second biggest value?  (a) 3  (b) g  (c) i
b
Suppose r = -0*r + 4. Let x(n) = -r + 8 + 1 + n. Let a be x(-6). What is the biggest value in 2, 0.2, a?
2
Let a = 13 + -9. Let n = 8.9 + -9. What is the biggest value in 7/5, n, a?
a
Let o be (-4)/(-4)*0 + -6. Let l be o/(3 + (-2 - -1)). Let g = -4 + 6. What is the second biggest value in -1, l, g?
-1
Let t(x) = 2*x**2 + 6*x - 6. Let q be t(-6). Let i = -29 + q. What is the third biggest value in -4, 1/8, i?
-4
Let s(z) = 8*z + 29. Let o be s(-4). What is the fourth smallest value in o, -40, 2, 1?
2
Let x = 2.2 - -0.8. Let v = -6 + 15. Let h = 8.6 - v. Which is the second biggest value?  (a) x  (b) 0.1  (c) h
b
Let k be 24/(-84)*(-3)/(-9). What is the biggest value in -1.8, -1/7, k?
k
Let n be 6/(-4) + 11/44*12. Which is the second smallest value?  (a) n  (b) 3/7  (c) -19  (d) -5
d
Let i = 493/5 - 99. Let d = 28 + -111/4. Let p(u) = u**3 - 7*u**2 + 5*u + 2. Let h be p(6). Which is the smallest value?  (a) i  (b) h  (c) d
b
Suppose t + 4*b = 7, -3*b + 14 - 4 = -4*t. Let d = 0.4 - 0.3. Let q = -0.4 - d. What is the second biggest value in 3, q, t?
q
Let s be 4/10 + (-80)/450. Let g be (-1*(-2)/(-8))/(-2)*6. Which is the second biggest value?  (a) g  (b) s  (c) 0.2  (d) 6
a
Let p be (-40)/(-16) + (-1)/2. Which is the fourth smallest value?  (a) -1  (b) -1/2  (c) 1.2  (d) p
d
Let h = -20.39 + 17.39. Which is the biggest value?  (a) -14  (b) -0.5  (c) h  (d) -1/4
d
Let f = 403/690 + -33/46. What is the biggest value in 8/9, f, -0.1?
8/9
Let c = 0.23 + 8.77. Let j = 8.8 - c. Let x be 4 + (-76)/18 - (-34)/(-9). What is the smallest value in x, j, 1?
x
Suppose 0 = 3*d - 0*y + 4*y, -5*d = 4*y. Let g = 0 - 0.4. What is the third smallest value in -0.1, g, d, 0.1?
d
Let q = 312.36 - 312.3. Let n = -2.5 - -2. Which is the biggest value?  (a) q  (b) n  (c) 0
a
Suppose 4*p + 9 = 21. Which is the third biggest value?  (a) p  (b) -7  (c) 2/5
b
Let p = 4.0434 - 0.0434. Let v = 3 + -2. Which is the third smallest value?  (a) 3  (b) v  (c) -0.2  (d) p
a
Let g = -69.46 + 69.5. Which is the third biggest value?  (a) 2  (b) g  (c) 1  (d) -0.5
b
Let p be (1/(-3))/(29/58). What is the third smallest value in 0.3, p, 3/5?
3/5
Let f = -143.21 + 149.6. Let u = 0.41 + f. Let q = -1.8 + u. Which is the biggest value?  (a) q  (b) -0.1  (c) 0
a
Let d = -75 - -102. What is the smallest value in 2, d, -1?
-1
Let o = -521 - -520.5. What is the fourth biggest value in -1/3, 0.1, o, -0.02?
o
Let a = -280 - -841/3. Let l be (40/18 - 2)*-2. What is the second biggest value in a, l, 4?
a
Let q be ((-6)/(-4))/(1020/80). What is the third biggest value in 5, q, 15?
q
Let j = -40 + 16. What is the second smallest value in -1/5, j, 1/6?
-1/5
Let a = -0.14 + -1.86. Let h = 0 + a. Let y = h - -2.2. What is the third smallest value in 5, 4/5, y?
5
Let f = -1 - -1.2. Let z(u) = 2*u**3 - 3*u**2 + 4*u - 6. Let x be z(2). Suppose 66*y + x = 63*y. What is the smallest value in f, 0.04, y?
y
Let n = 1.6 + 2.4. Suppose -5 = 5*j - 10. Let p = j + -7. What is the third biggest value in 0, p, n?
p
Let h = 0.2 + 0.3. Let m = -3.8 + 4.6. Let f = h - m. Which is the third biggest value?  (a) 0.2  (b) f  (c) 3
b
Let n be ((-4)/3)/((-40)/90). Suppose 14 = n*i - 3*q - 2*q, 5*i + 4*q = -26. Let u = -139/6 - -23. 