 = -42.27594 + 42.32. Let u = -0.1 + t. Let m = u + 0.055. What is m rounded to 4 dps?
-0.0009
Let d = 38 + -38.0656. Round d to 3 dps.
-0.066
Suppose 0 = -3*i - 110 + 1280. Suppose -3*s + i = 2*s. Round s to the nearest 10.
80
Let s be (66/(-24) - -2) + 30874/(-8). Round s to the nearest 100.
-3900
Let g = -0.094 - 11.106. Let r = g - -11.19772. What is r rounded to 4 dps?
-0.0023
Suppose 81 = -4*q - 3*a + 6*a, 5 = -a. Round q to the nearest 10.
-20
Let i = -116 + 240. Let t = -18.35 - -142.301. Let d = t - i. What is d rounded to two dps?
-0.05
Let l = -33.7 - -2.7. Let q = l + 30.81. Round q to 1 dp.
-0.2
Suppose 3*g + 13292 = 3*c + 130298, 0 = -5*c - 2*g - 194996. Round c to the nearest 10000.
-40000
Suppose 5*b - 2*q + 28 = b, 5*b + 35 = -4*q. Let j = b - -10. Suppose -3*w = 3*c + 156, 4*w - 2*c = j*w - 58. Round w to the nearest 10.
-50
Let t = 8 + -3.55. Let s = -8.08 + t. Let p = 0.23 + s. What is p rounded to the nearest integer?
-3
Let u = -247.673 - -248. Let c = 7.63 - 8. Let j = u + c. What is j rounded to two decimal places?
-0.04
Let x = 72 + -71.999999927. What is x rounded to 7 decimal places?
0.0000001
Suppose -2*y = -y - 3100970. Suppose -3*x = -4399030 - y. Round x to the nearest one hundred thousand.
2500000
Let z be (3/(-2))/((-1)/2). Suppose 0 = 5*l - m + 14005, z*l - 2*m = -0*l - 8396. Let i = -1902 - l. Round i to the nearest one thousand.
1000
Let f = 111 - 111.135. Round f to two dps.
-0.14
Suppose -5*g + 5 = -2*z, 0*g - 2*g = 5*z - 2. Suppose -4 = -4*m, -4*i + z = 3*m + 1. Let t be 1/(i/(-799998)) - -2. Round t to the nearest one hundred thousand.
800000
Suppose -a + 37836 = 2*a. Suppose 6 = 2*s, 5*s + a + 10573 = -2*l. What is l rounded to the nearest 1000?
-12000
Let d = -8849.59934 + 8870.6. Let t = d - 21. Round t to four dps.
0.0007
Let g = -1.6 + 12.6. Let z = -8 + g. Let r = 3.0000006 - z. Round r to 6 dps.
0.000001
Let j = -17 - 10.3. Let y = j - -0.3. Let w = 31.6 + y. What is w rounded to 0 decimal places?
5
Let i(m) = m**2 + m - 4. Let f be i(2). Suppose -5*l - 10415 = 2*u, 2*u - 2*l + 10388 = f*l. What is u rounded to the nearest 1000?
-5000
Let r(h) = 141*h - 47. Let f be r(7). Round f to the nearest one hundred.
900
Let n = 0.95 + -2.42. Let o = 1.469831 + n. What is o rounded to 5 decimal places?
-0.00017
Let h = 3 + -1. Let a = 2.8 - h. Let g = -0.8000037 + a. Round g to 6 dps.
-0.000004
Suppose -z - 3*g - 1 = 0, z - g - 6 = -3. Suppose 4*j - 182 = -z*a, -7*j + 3*j + 271 = 3*a. Round a to the nearest 10.
90
Let w = 2.984 + -3. Round w to 2 decimal places.
-0.02
Let r = 0.33 - -115.67. Let b = 103.6 - r. What is b rounded to zero decimal places?
-12
Let k = -219.404 + 220. Let s = k + -0.086. What is s rounded to 1 decimal place?
0.5
Let v = -8520166 + 3920166. What is v rounded to the nearest one million?
-5000000
Suppose 4*h = 2*h. Suppose -2*y - 673684 + 5295390 = h. Suppose -5*n = 4689147 + y. Round n to the nearest 1000000.
-1000000
Let h = -0.021 - 1.599. What is h rounded to one decimal place?
-1.6
Let d = -20.9995 - -21. Round d to 3 decimal places.
0.001
Let a = -19763.88 - -19765.880002. Let b = a - 2. Round b to six decimal places.
0.000002
Let r be 2*((-10)/(-4) - 1). Suppose -b + 7*u + 65290 = 2*u, 0 = r*b - u - 195814. Suppose -5*g = -74730 - b. What is g rounded to the nearest 10000?
30000
Let c = 17031 - -37669. What is c rounded to the nearest ten thousand?
50000
Let q = -21.45 - -21. Let b = q + -0.223. Let w = -0.057 + b. Round w to one dp.
-0.7
Let k(y) be the third derivative of 25*y**4/24 + y**3/2 + y**2. Let q(g) = g**2 - 7*g - 3. Let s be q(7). Let z be k(s). Round z to the nearest ten.
-70
Let i = 2679543 + 1250457. What is i rounded to the nearest one million?
4000000
Let r = -0.05023 - -0.48963. Let w = -70.43 + 70. Let f = w + r. What is f rounded to 3 dps?
0.009
Let q = -0.74953 - -0.753. Round q to 4 decimal places.
0.0035
Let l = 4.2 + -4.199916. What is l rounded to five decimal places?
0.00008
Let v = -14 - -13.84. Let j = v - -0.16008. Round j to 5 dps.
0.00008
Suppose 2*d = -2*v + 268518, -5*d - 134253 = -v - 3*d. Suppose n - 3*z - v = -34260, 0 = -3*n + 5*z + 299995. What is n rounded to the nearest 100000?
100000
Suppose 3*z - 5*j = -144905 - 391460, -2*z + 2*j = 357570. Let l = z + 325974. Let i = l - 97194. What is i rounded to the nearest one hundred thousand?
100000
Let a = -0.035 + -25.965. Let y = a - -25.9892. What is y rounded to 3 dps?
-0.011
Let l = -6648 + 11601. Suppose -l = -g + 347. Round g to the nearest 1000.
5000
Let v = 1959329 - -3035329. Let b = v + -4994657.6679853. Let z = 0.332 - b. Round z to six decimal places.
-0.000015
Let f = -156.0068 - -156. What is f rounded to 3 decimal places?
-0.007
Let a = -9241 + 5361. What is a rounded to the nearest one hundred?
-3900
Let r = -4 - -11. Suppose 5*z = r + 8. Suppose -2820 = -v + 5*v + 4*o, -z*v + 3*o - 2145 = 0. Round v to the nearest 100.
-700
Let n = -15.91 - -16. Let l = -0.25 + n. What is l rounded to one decimal place?
-0.2
Suppose -4*i = 4*h + 6468612, 5*i = 3*i - h - 3234310. Let v = 1782843 - i. Round v to the nearest one million.
3000000
Let z = -3219 + 8957. Let n = z - -362. What is n rounded to the nearest 1000?
6000
Suppose 4*b = 3*b + 1. Let q = b + 3. Suppose 4*k - z = -2*z + 3279, -4*z = q. Round k to the nearest one hundred.
800
Let f = 0 - 5. Let n = 73 + f. Let g = n + -67.38. What is g rounded to 1 decimal place?
0.6
Suppose -2*i = -3*i. Suppose 4*l - 5096915 + 1896915 = i. Round l to the nearest one hundred thousand.
800000
Let s(g) be the third derivative of 7417*g**4/12 + g**3/3 + g**2. Let t be s(3). Suppose -5*x = n + t, 3*n - 1 + 13 = 0. Round x to the nearest one thousand.
-9000
Let y = 0.0025 - 0.002500243. Round y to seven dps.
-0.0000002
Let c = -1699008.8 + 1698791.80103. Let m = 217 + c. What is m rounded to four decimal places?
0.001
Let x = -171 - -244. Let k = x - 73.59. What is k rounded to 1 dp?
-0.6
Let s = -0.01799668 - -0.018. Round s to 6 dps.
0.000003
Let c = -7846.7 - -7510. Let r = -157 + -197. Let y = r - c. What is y rounded to zero decimal places?
-17
Let n = -39.999966 - -40. Round n to 5 decimal places.
0.00003
Let n be -2 - 0 - 2*-1. Suppose 2*w + n*i - 19 = -3*i, -5*w = 2*i - 31. Suppose -w = g, -5*g + 0*g + 3475 = -b. Round b to the nearest 1000.
-4000
Let p = 7434 + -5284. Round p to the nearest one hundred.
2200
Let d be (9/(-6))/((-2)/(-4)). Let a = d + 5. Suppose 5*j + 1325 = -2*o, a*o - 4*j + 888 + 392 = 0. Round o to the nearest one hundred.
-700
Let f = -7 + -2. Let z = f - -9.003. Let b = z - 0.002946. What is b rounded to five dps?
0.00005
Let a = -94 - -90.3. Let v = -0.4 + 0.2. Let b = a - v. Round b to zero dps.
-4
Let r = 127 + -126.31. Let s = r - 0.6. Let i = -0.089999 + s. Round i to 5 decimal places.
0
Let j = -6324405 - -3654405. Round j to the nearest one hundred thousand.
-2700000
Let g = 6.99999695 + -7. What is g rounded to six decimal places?
-0.000003
Let m(a) = 46*a**2 + a + 2. Let s be m(2). What is s rounded to the nearest ten?
190
Let t be 12/9*(-6)/4. Let g be (-4)/(-14) - (-38)/14. Let j be (-280)/(-6) + t/g. Round j to the nearest ten.
50
Let s = -20 - -29. Let t = 72 - s. Let f = t - 63.000027. Round f to five decimal places.
-0.00003
Let x = -5.876 - -6. Let i = 14.324 - x. Round i to 0 decimal places.
14
Let h = -79 - -77.9. Let y = -1.10610069 + 0.00609789. Let u = y - h. Round u to six decimal places.
-0.000003
Let j = -4989.833 + 4990.64299943. Let v = j + -0.81. What is v rounded to 7 decimal places?
-0.0000006
Let r = 27629695.942613 + -27629677. Let s = -6.942755 + r. Let n = -12 + s. Round n to five decimal places.
-0.00014
Let i = -304 + 447. Let z = -143.000063 + i. What is z rounded to five decimal places?
-0.00006
Let f = -2.32 + 1.2. Let k = 3.6 + f. Let g = k - 2.7. Round g to 1 decimal place.
-0.2
Suppose 0*v + 6 = 2*v. Suppose -2*g = 1 + v. Let d be g + 1804 - (-1 - -3). What is d rounded to the nearest 1000?
2000
Let q(t) = -22*t + 1. Let g be q(7). Let m = -81 - g. Round m to the nearest 10.
70
Let g(y) = -64*y**2 + 10*y + 6. Let w(d) = 64*d**2 - 9*d - 5. Let m(l) = 4*g(l) + 5*w(l). Let v be m(7). What is v rounded to the nearest one thousand?
3000
Let p = -7 - -5. Let z be (0 - p)/(1/70). 