 -5*p + 6. Which is the biggest value?  (a) 0.1  (b) p  (c) 14
c
Let b = 151 + -151.04. What is the biggest value in -3/2, -35, 2, b?
2
Let c = 0.3 + 0.7. Let g = 96.912 + -97. Let d = -4.088 - g. What is the second smallest value in -2/13, d, c?
-2/13
Let v = 3.7 - 3.5. What is the biggest value in -1/3, 33, v?
33
Let w = -7.2 - -3.3. Let h = -0.1 + w. Let n = -2.3 - -0.3. What is the third biggest value in n, h, 1?
h
Suppose -3*p + 5*p = -4*f + 10, 3*f - 2*p = 11. Suppose o = -f + 1. Let h = 0 + -0.1. What is the second biggest value in h, -4, o?
o
Let m = 0.0069 - -21.2931. Let g = m + -21. Let p = -0.4 + 0.2. Which is the second smallest value?  (a) g  (b) -2/9  (c) p
c
Let x be (16/6)/((-122)/(-61)). What is the second smallest value in -166, 0.3, x?
0.3
Let u = 0 - -5. Suppose u*m = 2*n + 50, 5*n - 3*n + 42 = 4*m. Let a = -25/108 - -1/108. What is the biggest value in a, m, 2?
m
Let p = -0.17 - -4.17. Which is the second biggest value?  (a) 2/21  (b) 4/7  (c) p
b
Let s = 32006/27993 - 2/3999. What is the second biggest value in -1/2, s, 1?
1
Suppose 0 = u - 1 - 1. Let s be 2*u*(-3)/6. Let t = -0.5 + 0.3. What is the third biggest value in t, s, 0.06?
s
Let s = 4907/15 - 327. What is the third smallest value in 2, -0.3, s, 2/5?
2/5
Let r = -3.11 - -3.1. Let z = -0.1 - -0.3. Which is the third smallest value?  (a) 1  (b) z  (c) r
a
Let r = -15.6 - -0.6. Let o = r + 25. Let c = o + -10.4. What is the third smallest value in -1, c, 1/2?
1/2
Let s be 2*1*11/22. Let z = 56.1 + -56. Which is the third biggest value?  (a) 3  (b) -0.5  (c) s  (d) z
d
Let v be (20/(-42))/((-49)/343). What is the biggest value in 9, 0, v?
9
Let t = -925/4 - -230. Let y(z) = -z**2 - 2*z + 1. Let b be y(-2). Let l(x) = x**3 - 3*x**2 + x. Let p be l(b). What is the second smallest value in t, 1/7, p?
p
Let d = 0.06 + -0.46. Let w = 0 - d. Let s = -1110 + 1105. Which is the second biggest value?  (a) s  (b) 2  (c) w
c
Let n be (-19)/(-57) - (-1)/(-4)*2. Which is the third biggest value?  (a) 5  (b) n  (c) -18/11  (d) 0.5
b
Suppose -5*d + 0 - 15 = p, 4*p = -4*d + 4. Let f = -144364 - -12559516/87. Let x = -12/29 - f. Which is the second biggest value?  (a) x  (b) p  (c) 0
a
Let b = 2866 + -2865.5. Let v be 1*(9 + 1 - 1). What is the third biggest value in b, 0.3, v?
0.3
Let t = 0.1 + 0.8. Let s = 49 - 50. What is the third biggest value in 5, t, s?
s
Let h = -35.8 - -39.8. Which is the second biggest value?  (a) 1/5  (b) 0.5  (c) 1/4  (d) h
b
Suppose 3*q - 2*q = s + 1, -5*s - q - 23 = 0. Let c = 0.13 - 0.05. What is the third smallest value in c, -0.4, s?
c
Let q = -3 + 3.1. Let k = q - 0. Let t = -0.5815 - 0.0185. What is the third biggest value in k, t, 2?
t
Let x = 8 - 6. Let o = -2.5 + x. Let g be 4 - (3 - (84/(-16))/7). Which is the third biggest value?  (a) -0.2  (b) g  (c) o
c
Let r be -55*4/68 + 3. Let q = -30 - -30. What is the second smallest value in r, -0.4, q?
r
Let t = 228 + -227. Let x be 3/(-6) - (-39)/18. Which is the second biggest value?  (a) 0  (b) t  (c) x
b
Let i be (12/(-165))/(8/(-20)). Let n = 0.04 - 0.04. Which is the third biggest value?  (a) n  (b) i  (c) -0.5  (d) -2/13
d
Let w = 0.2 - 0. Let q = -72.8 - -69. Let i = -3.8 - q. What is the second smallest value in w, i, 1/7?
1/7
Let j = -51.7 + 52. Which is the fourth smallest value?  (a) 0.1  (b) j  (c) 3  (d) 8/9
c
Let s be -1 - 6/45*-10. Let o be (-1)/(1/((-8)/(-14))). Which is the third smallest value?  (a) s  (b) o  (c) -2/7
a
Suppose 4*b - 2*r = -52, 3*r - 37 - 15 = 4*b. Let s be b/(-3) - 3*16/12. What is the third biggest value in -0.1, s, 30?
-0.1
Let p = 60.1 - 56.1. What is the smallest value in -50, -5, p?
-50
Let p be (-90)/510*2/3. Which is the second biggest value?  (a) -1/2  (b) p  (c) -8
a
Let v(t) be the first derivative of t**2 + 26*t - 9. Let f be v(-11). Let o be f/(-48)*-1*4. Which is the smallest value?  (a) -1  (b) o  (c) -6
c
Suppose -5*z = -i - 2, -14 = 3*i - 5*z - 18. Which is the biggest value?  (a) i  (b) 0.09  (c) 0.2
a
Let h = -0.4182 + 0.0182. What is the third smallest value in -40/7, 4, h?
4
Let o = -6942 + 6789.05. Let t = o - -153. Which is the fourth biggest value?  (a) t  (b) 5  (c) 3  (d) -4
d
Let v be (-36)/27*(-42)/(-2). Which is the second biggest value?  (a) -0.6  (b) 2/7  (c) v
a
Let u = -103 - -101. What is the third biggest value in -0.15, u, -3?
-3
Let o = -9.72 + -0.18. Let u = o - -10. Let q = -0.37 + -0.03. Which is the second biggest value?  (a) 1  (b) q  (c) u
c
Suppose h = p + 7, 4*p = -4*h + p. Let c = -8.79 + -0.21. What is the biggest value in h, -4, c?
h
Let f be (-7)/6*((-279)/84 + 3). Let l = 0 + -13. Let i = l + 40/3. Which is the smallest value?  (a) f  (b) i  (c) -0.7
c
Let i(q) = -q**3 - 7*q**2 - 6*q - 2. Let h = -43 - -60. Suppose h = -5*v - 13. Let k be i(v). What is the second smallest value in -2/3, 5, k?
-2/3
Let o = 35.064 - 35. Let y = o + -4.064. Which is the third smallest value?  (a) -33  (b) y  (c) -0.3
c
Let b = -8 + -2. Let t be 6/70 + (-2)/b. Let v = -1367 - -1367.4. What is the third biggest value in -2/9, t, v?
-2/9
Let y = 2521.74 + -2522. Let l = -0.24 + -0.06. What is the third smallest value in -5, l, y?
y
Suppose m + 0 = -4*h - 11, -h + 16 = 4*m. Suppose -m*l + 0 = z - 1, -3*z = l + 11. Which is the second smallest value?  (a) 5  (b) z  (c) -0.2
c
Let x(b) = -b**2 + 2*b + 1. Let r be x(-1). Let a be 1/9*(0 - r). Let y(g) = g**3 - 4*g**2 + 4. Let n be y(4). What is the second biggest value in n, -2, a?
a
Let y = 42.7 - 45. Let u = -0.3 - y. Which is the second smallest value?  (a) u  (b) 1/5  (c) 6
a
Let c = -0.114 - -0.034. Let m = 4.92 - c. What is the fourth smallest value in m, 3, 0.7, -0.3?
m
Let m = 41.3 + -36.3. Let f = 0.2 - 0.2. Let s = f + -0.5. Which is the biggest value?  (a) m  (b) s  (c) 4
a
Let b = -29.5 - -29.5. Let h be (-6)/10 - (-23)/5. Suppose o - 12 = h*o. What is the smallest value in b, o, 1?
o
Suppose -f + 4*f = -36. Let q = f + 10. Which is the smallest value?  (a) q  (b) -17  (c) -1  (d) -4/3
b
Let r = 113 + -113. Let n = 1 - 2. Which is the third biggest value?  (a) 4  (b) r  (c) n  (d) 3/8
b
Let l(v) = -v**3 - v**2 + 1. Let t be l(0). Let o = 620 + -624.03. Let n = 0.03 + o. What is the second biggest value in -5, t, n?
n
Let d be -3 + (-246)/261*-3. Let z = d - 23/203. Which is the second biggest value?  (a) -4  (b) 1/3  (c) z
c
Let z = 0.116 - 46.116. Let i = z - -42. Which is the second biggest value?  (a) -1/4  (b) -0.3  (c) i
b
Let m be (-3)/16*-8*(-51)/(-162). Let q = m + -2/9. What is the fourth biggest value in -0.2, q, -4, 2/13?
-4
Suppose 0 = g - 6*g + 20. Suppose 1 = -x + g*o, 5 = -2*o + 7*o. Let v = 3.9 + 0.1. Which is the second smallest value?  (a) -3/4  (b) x  (c) v
b
Let f be (-4)/(-42) - (-100)/175. Let t = 0.02 - 0.1. Let i = t - 1.92. Which is the third smallest value?  (a) f  (b) i  (c) -5
a
Let l = 0.08 + 4.92. Which is the second smallest value?  (a) 1  (b) -37  (c) l
a
Let y = 13/6 - 11/12. Which is the second smallest value?  (a) -3/4  (b) y  (c) -0.5  (d) -0.4
c
Let r be 4/(-4)*6/(-15). Let b = 0.5 + 8.5. What is the third smallest value in b, -3/4, r?
b
Let o = 126.74 + -142.6. Let r = -16 - o. Let y = 1213 + -1216. Which is the biggest value?  (a) -2  (b) r  (c) y
b
Let b = 5 - 5. Let x = 0.1 + b. Let f = 1617 - 1613. What is the second biggest value in -0.2, f, x?
x
Let g be -5*12/(-120) - (-6)/(-18). Let z = -0.12 + -17.88. What is the fourth biggest value in -3/5, -0.1, g, z?
z
Let x(o) = 15*o - 582. Let s be x(39). Which is the second biggest value?  (a) 3/4  (b) 0  (c) 2/3  (d) s
a
Let u = 628 - 631.9. Which is the third biggest value?  (a) -1  (b) u  (c) -2  (d) 2/17
c
Let k = 0.28 + -0.144. Let h = -0.036 + k. Let t = 0.6 - 0.3. What is the second smallest value in h, t, -0.06?
h
Let d = 96/5 - 1258/65. Let r be 8*4/(-306) + (-64)/544. Which is the third smallest value?  (a) r  (b) d  (c) -0.11
c
Let a be 416/256 - (-2)/((-16)/(-3)). What is the smallest value in 0.3, 0, a?
0
Let i = -0.24 - -0.07. Let l = 0.07 + i. Let y = 1/467 - 3739/1401. Which is the second smallest value?  (a) y  (b) 3/5  (c) l
c
Let d be 2/(-9)*(-13)/(-2). Let c = d + 82/63. Let h = 569/4296 + -4/537. What is the third smallest value in h, -2, c?
h
Let w = 1109 - 1103.81. 