the second smallest value?  (a) 2/15  (b) t  (c) v
b
Let i = 565 - 563. Which is the third smallest value?  (a) -1  (b) i  (c) -28.7
b
Let w = -5839/11 + 531. What is the third smallest value in 1/8, w, 2.1, 3/5, -0.5?
w
Let d(f) = f**3 - 14*f**2 - 14*f - 9. Let t be d(15). Let l = 17.9 - 18.1. What is the second biggest value in -2/17, t, l?
-2/17
Let s = 0.107 + 428.893. Let x = 395 - s. What is the second biggest value in x, 2/5, -3, -2?
-2
Let y = 1/1130 - -2241/21470. Let q = -5/2 + 8/3. Which is the smallest value?  (a) -2  (b) 3  (c) y  (d) q
a
Let f = -372 + 2602/7. Which is the second biggest value?  (a) f  (b) -0.1  (c) 2  (d) 0.2  (e) -2/3
d
Let k be (-18)/108 - ((-66)/(-36) + 4 - 3). Let d be (-10)/104*(-186)/113. Let c = d - 1/226. What is the third biggest value in -0.16, c, k?
k
Let m(t) = t**2 - 100*t + 1234. Let v be m(94). What is the biggest value in v, -0.1, 0?
v
Let b = -105 - -53. Let k = 47 + b. Let v be (-4)/18 - (-3)/297*16. What is the smallest value in k, 0.3, v?
k
Let g = -28299943/62805 - -2/12561. Let r = g - -451. Let u = 0.3 + -0.1. Which is the fourth smallest value?  (a) r  (b) u  (c) -2/19  (d) -1/3
a
Let u be 6/(-15) + 46/40. Let i = -67 - -60. Let p = 12 + i. What is the third smallest value in -0.01, u, p?
p
Let p = 111.84 - 116.84. Which is the biggest value?  (a) 3  (b) -5/4  (c) -438  (d) p
a
Let t(g) be the first derivative of -1/3*g**3 + 10*g**2 - 20 + 39*g. Let h be t(22). Which is the biggest value?  (a) -3  (b) 0.024  (c) h
b
Let z = -118 + 403. Suppose -94*o = -37*o + z. Let x = -3 - -1. What is the second smallest value in 1, 1/14, x, o?
x
Let p(y) = -2502*y + 25024. Let v be p(10). Let q = 3 + 4. Let a = 14 - q. What is the second smallest value in a, v, -4?
v
Let r = -148 + 421. Let t = 240 - r. Which is the second smallest value?  (a) 0.4  (b) t  (c) -3  (d) -1
c
Let n = -2 + 2.2. Let l = 1196744 + -20344650/17. Which is the fourth smallest value?  (a) l  (b) -0.4  (c) n  (d) 3/13
d
Let k = -791/5423 - -9/319. What is the biggest value in 0.321, 3/5, k?
3/5
Let l(d) = d**2 - 8*d + 3. Suppose -3*j - 5*g + 34 = 0, 3 - 19 = -j - 4*g. Let c be l(j). Let a = -161 - -479/3. What is the second smallest value in -4, c, a?
a
Let c = 0.4 + 0.1. Let n = -82960/39 - -27610/13. What is the second smallest value in n, c, -0.5, -1?
-1
Let p = 110.5 - 109.4. Which is the fifth biggest value?  (a) 0  (b) -7  (c) p  (d) 1/4  (e) 1/14
b
Let r(u) = -3*u + 13. Let x be r(4). Let k = -2/945 - -272/945. What is the fourth biggest value in 1/2, x, k, -0.13?
-0.13
Let k = -0.5229 + -0.1771. Which is the smallest value?  (a) k  (b) -4  (c) -5  (d) -3  (e) 3
c
Let h = -2307 - -2303. Which is the third biggest value?  (a) 3  (b) h  (c) 0.1  (d) -37
b
Let d be 3/6 - 3/(-2). Let t = -289.656 + 290. Let z = t - -0.656. Which is the second smallest value?  (a) z  (b) 0.4  (c) d
a
Let f = -271 - -272. Let a = 0.231 + 0.069. What is the second biggest value in -5, f, 28, a?
f
Suppose 10*t - 60 = 20. Let u be (t - -1) + 11 + 126/(-9). What is the second smallest value in u, 7, 5?
u
Let b = 7775 + -7774.9. What is the second smallest value in -3/2, 1, b, -9?
-3/2
Let y = 4503/7721 - 13/1103. What is the second biggest value in -5, -109, -1, 0, y?
0
Let n be 30/170 - (13 - 8052/612). Suppose 2*k + k = 6. Let s = -7 + k. Which is the second smallest value?  (a) s  (b) n  (c) -1/2  (d) -2/7
c
Let c = 1036 - 4141/4. What is the second biggest value in -32/9, 0.1, -3/7, c?
0.1
Let d(b) = -3*b + 58. Let s be d(19). Let t be (-1 - (1 - s))/(12 + -11). Let k be -5 - (-1 - (t + 4)). What is the third smallest value in k, -2, -0.23?
-0.23
Let f = -12.43 + 9.33. What is the fourth biggest value in 0.1, f, -3, 4, 13?
-3
Let w = 94 - 90. Let d be 2/8 - 1*(-7)/w. Suppose -3*y = -5*j - y - 11, 0 = -4*j - d*y + 2. Which is the third smallest value?  (a) j  (b) -1/11  (c) 1
c
Let l = -6.6 - 2.4. Let f = -1825.5 - -1825. What is the third biggest value in -0.1, l, 0.3, f?
f
Let o = -804.3 - -804.36. Which is the fourth smallest value?  (a) o  (b) 0  (c) -0.3  (d) -0.5
a
Let v = 845 - 26206/31. Let g = -95/93 - v. Which is the second biggest value?  (a) 2/65  (b) 1  (c) g
a
Let c = -847 + 848.2. Let a be 19/30 - (-2)/(-4). Let z = -12 - -11. What is the fourth biggest value in 2, z, a, c?
z
Let p be (8/(-6) - -1)*36/(-4). Let h be ((-1)/45)/(p/87). Let r = -4/9 - h. Which is the third smallest value?  (a) r  (b) -5  (c) -1  (d) -1/3
d
Let x be (6 - (-816)/(-132))/(1/(-26)). Let i = x - 167/33. Which is the second smallest value?  (a) -3/4  (b) 0.029  (c) i
c
Let y be 18/(-4) + 563/130 - 4/(-10). What is the third smallest value in -5, y, -2/11, -6?
-2/11
Let x = 6 + -8. Let i = 0.0522 + 2.9478. What is the third smallest value in 0.5, 19, x, i?
i
Let s be (-488)/10*(-22992)/(-4032). Let n be (-1336)/(-6)*15/(-12). Let x = n - s. Which is the smallest value?  (a) x  (b) -1  (c) 3  (d) 1
b
Let w = -22.22 + 22. Let p = w - 0.28. Let z = -51 - -49. Which is the fourth biggest value?  (a) 0.4  (b) -1/10  (c) z  (d) p
c
Let t(y) = y**3 + 9*y**2 - 2*y - 8. Let s be t(-9). Let o be -5 + 66/s + -5. Which is the smallest value?  (a) -3/5  (b) o  (c) -5
c
Let r = 16 - 48. Let t = -30 - r. Let x = 0.1 - 0.1. Which is the fourth smallest value?  (a) t  (b) x  (c) -0.1  (d) -0.3
a
Let l = -2/63 - -148/693. Let i = 35/58 - 3/29. Which is the third biggest value?  (a) l  (b) i  (c) 3
a
Let q = -301 - -715. Let m = -413.9 + q. Which is the third smallest value?  (a) m  (b) 1  (c) 4/15  (d) 3
b
Let d = -21 - -23.6. Let j = d + -3. Let v = -2119.6 - -2119.5. What is the third smallest value in j, v, 3/5?
3/5
Let x = 135 - 58. Let u = x - 26. Let t = u + -47. Which is the second smallest value?  (a) 0.1  (b) t  (c) -2  (d) -5
c
Let q = -3526 - -3526.3. What is the second smallest value in 2/3, -0.3, -215, q, 4?
-0.3
Let w = 6 + -5.75. Suppose -12 = x + 5*l, -10*x + 15*x - 85 = 4*l. Let p(c) = 10*c - 134. Let f be p(x). What is the smallest value in w, f, -2?
f
Let l be -1 + -1 - (-5 - 48/(-18)). Let m be (-231)/121 - (0 - 2). Which is the second smallest value?  (a) l  (b) m  (c) -2/3
b
Suppose -3*r = -4*c - 893, c - 422 - 461 = -3*r. Let b = r + -295. Let s = 0.28 + -0.3. What is the second smallest value in 0.3, s, b?
b
Let t = -18 - -17.3. Let v be ((-1817)/(-237))/23 - 46/(-204)*-2. What is the biggest value in t, 3, -4, v?
3
Let y = -292.24 + 289.24. Let o = 0.11 - 0.4. Which is the second biggest value?  (a) -2/3  (b) o  (c) y
a
Let f(w) = 18*w - 690. Let h be f(38). Which is the third smallest value?  (a) -1.1  (b) h  (c) -3  (d) 1
a
Let x = -38.92926 - 0.07074. Which is the fourth smallest value?  (a) -5  (b) x  (c) 1/4  (d) -8  (e) 0.4
c
Let z(h) = 23*h - 116. Let i be z(12). Let g be 2/(-10)*(i/84)/(-4). Which is the second biggest value?  (a) 0.2  (b) g  (c) -0.12
b
Suppose -y + 160*l = 157*l - 420, -5*l = -2*y + 832. Which is the biggest value?  (a) 0.1  (b) y  (c) -7
b
Suppose -5*l - 4*k = -1825, 3*l - 5*l = 6*k - 752. What is the smallest value in -1, l, -2?
-2
Let g = 0.026 - 0.426. Which is the second smallest value?  (a) -15/2  (b) -4  (c) g
b
Let p = -0.5438 + -0.4562. What is the second smallest value in -5, p, 0, -3, -0.31?
-3
Suppose -3*h + 8 = -5*s - 7, h + 2*s - 16 = 0. Suppose -13*u + h*u = 0. What is the fourth biggest value in 0.32, 5, u, 0.5?
u
Let s = 329 + -328.8. Let b = -53 - -51. What is the third biggest value in 0.6, 4, b, s?
s
Let c = 2078 + -8315/4. Let s = 1634 - 106208/65. What is the third biggest value in c, 0, s?
c
Let o = 60.304 + -62.1. Let y = -1.83 - o. Which is the third smallest value?  (a) y  (b) 2  (c) -2/3
b
Let n be ((-14)/(-8) - 2)/(1/(-2)). Let x = -45.4 + 45.1. Which is the fourth biggest value?  (a) 2/17  (b) -5/6  (c) n  (d) x
b
Let t = 0.6607 + -0.8607. What is the biggest value in -0.129, 2, t, -5, -5/4?
2
Suppose -74*c = -4*h - 71*c + 396, 0 = c - 4. What is the fourth smallest value in -3, 0.3, h, -5, -1?
0.3
Let k = -32971 - -32968. What is the smallest value in k, -1, -1.1, -0.5, -4?
-4
Let k = -5587/1492 + -2/373. Let z = -199111/5 + 39822. What is the fourth smallest value in k, -1, 1/6, z?
1/6
Let b(v) = 7*v**2 + 2*v + 19. Let y(c) = 13*c**2 + 5*c + 37. Let u(x) = 11*b(x) - 6*y(x). Let q be u(-6). 