est 100?
-1300
Let t = 6.7 - 6.795. Round t to two decimal places.
-0.1
Let m = 34.2 + 4.8. Let v = m + 79. Let c = v + -109.3. What is c rounded to zero decimal places?
9
Suppose -2*k = y + 63 - 209, -4*y + 604 = 3*k. Suppose 0*v + 2*v = -3*i + 303, 4*i - y = -v. Let u be (24/(-9))/((-4)/v). Round u to the nearest 1000.
0
Let j = -6 + 11. Suppose -5*m = -3*p - 56 + 1, -j*p - 65 = 5*m. Let b be (-2)/6 + (-132000005)/p. What is b rounded to the nearest 1000000?
9000000
Let q = -1.66 - 0.14. Let o = 794 + -790.57. Let i = q + o. What is i rounded to one decimal place?
1.6
Let l = -12339645.00043 - -12339743. Let h = -98 + l. Round h to 4 dps.
-0.0004
Let o(m) = -8188*m**3 - 14*m**2 - 7*m - 1. Let q be o(11). Round q to the nearest 1000000.
-11000000
Let q = -53243 + 52877.47. Let w = q + 363. Let s = w + -0.77. What is s rounded to the nearest integer?
-3
Let g = -211118144.893 + 211528778. Let i = g - 410427. Let n = -206 + i. What is n rounded to 2 dps?
0.11
Suppose -v = -i + 6*i - 19701, -4*v + 7884 = 2*i. Round i to the nearest one hundred.
3900
Let d = -31.1 + 35. What is d rounded to the nearest integer?
4
Let l = 7.058 - 1813.558. Let g = l - -1818.471. Let i = g + -12. What is i rounded to 2 dps?
-0.03
Let q be (-2937678)/(-4)*(-8)/(-6). Let v(x) = -790259*x - 3. Let n be v(-3). Suppose n = 5*r - q. What is r rounded to the nearest one hundred thousand?
700000
Let d(i) = -699995*i**2 - i. Let g(u) = 2099986*u**2 + 3*u. Let f(l) = 11*d(l) + 4*g(l). Let n be f(1). What is n rounded to the nearest 1000000?
1000000
Let h = 24182173.00189 + -24182307. Let c = 134 + h. Round c to four dps.
0.0019
Let v = -6642 - 16158. Round v to the nearest one thousand.
-23000
Suppose 5*v + 4*x + 500 = v, v = 4*x - 100. Let h be (5500/6)/((-2)/v). Round h to the nearest ten thousand.
60000
Let z = -11.91 + 10.8. Let q = 0.4 + 0. Let w = z + q. What is w rounded to 1 decimal place?
-0.7
Let p = 138 + -237. Let a = p + 99.0252. Round a to 3 dps.
0.025
Let d = 143.113 + -0.113. Let o = -3333566191.00000119 - -3333566048. Let n = o + d. Round n to seven dps.
-0.0000012
Let v(r) = r + 8. Let q be v(-9). Let n be -5 + 4 + 4 + q. Suppose 2*h = 4, -3*y - 5*h = n*y - 100010. What is y rounded to the nearest 10000?
20000
Let q = -36 - -36.000905. What is q rounded to 4 decimal places?
0.0009
Let h = -49 - -49.0047. Round h to 3 dps.
0.005
Let o = 329 - -12. Let n = o - 216. Let v = -110.6 + n. What is v rounded to zero decimal places?
14
Let r be 15263299/(-3 - -4) - 1. Let s = 1436702 + r. Round s to the nearest one million.
17000000
Let c be ((-163840)/(-96))/(2/30). Round c to the nearest 10000.
30000
Let i = 16.352 + -15.9. What is i rounded to two decimal places?
0.45
Let s be (4/3)/(2/3). Let x(o) = s*o - 2*o**2 - 600001*o**3 - 2*o. Let i be x(-2). Round i to the nearest 1000000.
5000000
Let a(m) = m**3 - 23*m**2 - 3*m - 25. Let y be a(17). Let v = -3410 - y. What is v rounded to the nearest 1000?
-2000
Let d = 128151 + -128154.99932. Let i = 4 + d. What is i rounded to four decimal places?
0.0007
Let a = -7 + 7. Let m = a + 2. Suppose 0 = -g - 2*w + 399992, -4*g - m*w + 1313679 = -286313. Round g to the nearest one million.
0
Let y = 105.3 - 96. Round y to zero dps.
9
Suppose t + 4*q - 14 = 0, -4*q - 56 = -5*t - 10. Suppose t = -3*c - 2*c. Let f(g) = 174*g**3 - 2*g**2. Let r be f(c). What is r rounded to the nearest 1000?
-1000
Let i = 0.21 + -0.12. Let l = i - -0.79. Round l to 1 decimal place.
0.9
Let l = 15 + -14.9999966. Round l to six dps.
0.000003
Suppose -3*y - i = -2822 - 2277, -4*y - 3*i = -6797. Round y to the nearest one thousand.
2000
Let c = 0.176 - 0.17600461. Round c to six decimal places.
-0.000005
Let j = 121.277 + -0.277. Let h = 120.9882 - j. Round h to three decimal places.
-0.012
Let d = -0.07 + 0.1. Let q = d - 0.18. Let h = q + 0.1499971. What is h rounded to 6 decimal places?
-0.000003
Let o = 0.182209968 - -39.817787752. Let j = 40 - o. Round j to seven dps.
0.0000023
Let q = -0.08 + 0.08011. Round q to four dps.
0.0001
Let m = 93.51 - 93. Let a = m + 62.49. Let y = a - 69.9. What is y rounded to 0 decimal places?
-7
Let p be 12/9*(-90)/4. Let l be (-341999992)/(-60) + (-4)/p. Round l to the nearest 1000000.
6000000
Let x = 158.06 - 160. Let n = x + 2. Let v = n - 0.06000003. Round v to 7 dps.
0
Let t = 156554 + -38556. Suppose 2*y + m - t = 212006, -825008 = -5*y - 3*m. Suppose -o - d = 2*o - 164996, 3*o - y = d. What is o rounded to the nearest 10000?
60000
Let n = -57.8 + 21.64. Let h = n - -37. Round h to one decimal place.
0.8
Let a = 0.86952 + -0.87. What is a rounded to three decimal places?
0
Let t(r) = r**3 - 12*r**2 - 16*r + 8. Let m be t(14). Let c = 46 - m. What is c rounded to the nearest 100?
-100
Let w = 29340.5 + -29382.4897. Let f = w + 42. What is f rounded to three dps?
0.01
Let k = -0.129 + 0.067. Let y = k - -0.05. What is y rounded to two dps?
-0.01
Let z be (-3)/((-12)/20*1). Suppose z = -4*s - 7. What is s rounded to the nearest ten?
0
Let h be (-2)/(4/(-16)*2). Suppose 2*s + 4*w + 460025 = -w, -h*s - 3*w - 920015 = 0. What is s rounded to the nearest one hundred thousand?
-200000
Let x = 8.85 - 1.76. Let q = -0.21 - x. Round q to 0 decimal places.
-7
Suppose 4*i = 10425755 + 9174229. Suppose -3*t = -7*t + 8. Suppose 0 = t*k + z - 9799998, -2*k - 2*z = -k - i. Round k to the nearest one million.
5000000
Let m = -0.596 + 0.097. Let o = m - -0.5. Round o to 3 dps.
0.001
Suppose 5*y - 8*y = 18756048. Let d = 152016 + y. Round d to the nearest 1000000.
-6000000
Let c(h) = 18*h**3 - 11*h**2 + 8*h + 9. Let q(g) = 27*g**3 - 17*g**2 + 12*g + 14. Let v(l) = 7*c(l) - 5*q(l). Let b be v(-7). Round b to the nearest 1000.
4000
Suppose 17 = 3*k - 2*p, 3*k - 5*p = -k + 32. Suppose 4*z + 20 = 0, k*x + 0*x - z = 35. What is x rounded to the nearest integer?
10
Let t = -9.04 + 9. Let l = t + 0.04. Let b = l + 4.5. Round b to the nearest integer.
5
Let q = -1.7 + 1. Let c = q - -0.655. Let t = -0.0450029 - c. Round t to 6 decimal places.
-0.000003
Let o = 44 - 45.95. What is o rounded to 1 decimal place?
-2
Suppose 5*d - 155 = -2*s + s, 0 = 3*s. What is d rounded to the nearest 10?
30
Let t = -4.392 + 0.092. Let i = t - -0.2. Let a = -4.061 - i. What is a rounded to 2 dps?
0.04
Suppose -4*u = 3*m + 19, -2*u = -4*m - 3*u - 34. Round m to the nearest integer.
-9
Let a be 20/(-25)*(19 + 1). Let c = a - 171. Round c to the nearest ten.
-190
Let y = 45.8 + 1041.2. Let a = 1086.5092 - y. Let r = a + 0.5. Round r to 3 dps.
0.009
Let x = -64.6 - -1.6. Let n = 8351 + -8288.59. Let m = x + n. Round m to one dp.
-0.6
Let k(h) = 7*h - 9*h - 53*h. Let c be k(-1). Suppose 0 = 4*x - 323 + c. Round x to the nearest ten.
70
Let w = 8 - 3. Suppose 0 = -4*g + 3*g + 3, w*f = 5*g - 575015. What is f rounded to the nearest 10000?
-120000
Let p(f) = 8100000*f. Let w be p(2). What is w rounded to the nearest one million?
16000000
Let k = -32.0000038 - -32. Round k to six dps.
-0.000004
Let x = 405 + -405.1995. Let s = -0.7 + 0.5. Let v = x - s. Round v to 4 decimal places.
0.0005
Let p = 23.45 + 0.55. Let r = -9 + p. Let c = r + -15.00056. What is c rounded to four decimal places?
-0.0006
Let s be -377989*(1 + -2) - -3. Suppose u = 5, -4*t + s = 5*u + 3177967. Round t to the nearest one million.
-1000000
Let g = -0.17 - -10.17. Let d = 2 - g. Let f = -7.99995 - d. Round f to 5 dps.
0.00005
Let s = 0.05 + -0.285. Let m = -0.058 - s. What is m rounded to 2 dps?
0.18
Let s(d) = -2062*d**3 + 2*d**2 + d + 4. Let m(u) = u - 4. Let l be m(0). Let h be s(l). Suppose -7*n = -9*n - h. What is n rounded to the nearest 10000?
-70000
Let b(c) = -c**3 + 6*c**2 + 2. Let a be b(6). Let g be (-2 + a)/(1 - 2). What is g rounded to 2 dps?
0
Let a be 28/(-35)*(-4670)/4. Let p = a - 1314. Round p to the nearest one hundred.
-400
Let b = 0.01053729 - -95.98907271. Let k = 96 - b. Round k to 4 dps.
0.0004
Let t be (28/7)/((-1)/(-2)). Suppose t*f + 4800 = 5*f. What is f rounded to the nearest one thousand?
-2000
Let m = 0.33999933 + -0.34. Round m to seven dps.
-0.0000007
Suppose -4*w = -1852 - 41128. Suppose -1 = 3*r + 5, 0 = 3*y + 2*r - 50831. Let n = w - y. Round n to the nearest 1000.
-6000
Suppose -2*t = -7*t + a + 667599, t + a - 133515 = 0. Suppose 4*g = -43519 + t. 