 to 6 dps.
-0.000007
Let d = -99634.9882039 + 99635. Round d to 4 decimal places.
0.0118
Let v = 16271.0050295 - 16271. What is v rounded to 4 dps?
0.005
Let z = 0.46693 + -0.502. Round z to two dps.
-0.04
Let q = -1652.52926 - 21.71374. Let j = q - -1675. What is j rounded to two dps?
0.76
Let x = -3.978 - 2481.022. Let z = x + 2484.999995817. Round z to 7 decimal places.
-0.0000042
Let y = -0.078111337 + 0.0781. What is y rounded to six decimal places?
-0.000011
Let o = 1.6295 + 0.732. Round o to 2 decimal places.
2.36
Let u = -530.06 - -6.06. Let j = u + 523.99998445. What is j rounded to 6 decimal places?
-0.000016
Let h be (-188)/36 + 5 + (-256)/(-18). Let a(s) = -s + 2. Let p be a(h). Let y be -40 + 1/(-2) + (-6)/p. What is y rounded to the nearest 100?
0
Let j = 0.32219705 + -0.05127475. Let w = -0.271 + j. Round w to five dps.
-0.00008
Let f = 24.4537 - 24.53. What is f rounded to three dps?
-0.076
Let d = -0.0846 + 0.0843274. What is d rounded to five decimal places?
-0.00027
Suppose 269254488 = 76*s + 782862488. Round s to the nearest one hundred thousand.
-6800000
Let f = 23210.90543 + -23211. What is f rounded to 3 dps?
-0.095
Let f = -228.979277 - -228.869. What is f rounded to two decimal places?
-0.11
Let n = -114 - -109.3. Let r = 25.7 + n. Let b = 28.5 - r. Round b to the nearest integer.
8
Let b = 0.6727 + 5088.3273. Let m = b - 5088.97323. Round m to 3 decimal places.
0.027
Let u = -0.30056226 + 12577.19246226. Let x = -12577.012899846 + u. Let p = x + 0.121. Round p to 7 dps.
0.0000002
Let s = -0.29107 + -355.44893. What is s rounded to the nearest 100?
-400
Suppose 9*y - 10872 = 27*y. Let a = y - -666. Round a to the nearest 100.
100
Let d = 150.091 - 150. Let n = d - 0.09099144. Round n to 6 dps.
0.000009
Let z = -0.1336 - 735.8664. Let d = z - -1409. Let k = -673.000313 + d. What is k rounded to 5 decimal places?
-0.00031
Let q = 17160.00000012481 - 17160. What is q rounded to seven decimal places?
0.0000001
Let a = 1079925276.9999857 + -1079925439. Let p = 25 + 137. Let v = a + p. Round v to five decimal places.
-0.00001
Let b = -0.04 - -0.15. Let d = -0.08 - b. Let z = d + 0.059. What is z rounded to 2 decimal places?
-0.13
Let n = 2095 - 2094.99999897. What is n rounded to 7 dps?
0.000001
Let z be (3 - (-6)/(-4))/((-2)/44). Let g(v) = -v**3 - 32*v**2 + 12*v + 105. Let r be g(z). Round r to the nearest one hundred.
800
Let p = -341 - -342.26. Let k = 109.94 + -114. Let i = k + p. What is i rounded to one decimal place?
-2.8
Let b(u) be the second derivative of u**5/10 - 2*u**4/3 + 11*u**3/6 - u**2/2 + 7*u - 3. Let j be b(5). What is j rounded to the nearest 10?
100
Let d = 1.62 + 5.034. Let x = -6.8 + d. What is x rounded to two decimal places?
-0.15
Let o be (-328*6/(-4))/((-23)/13110). Round o to the nearest 100000.
-300000
Let a = -8270.4878 - -8269. What is a rounded to 2 dps?
-1.49
Let w(i) = 32337*i**3 - 15*i**2 + 16*i + 32. Let g be w(-9). Round g to the nearest 1000000.
-24000000
Let f = -65689126 + 92105126. Round f to the nearest one million.
26000000
Let u = -169 - -172. Suppose 0 = 4*q - u*j - 45212, 4*q + j - 33896 = q. What is q rounded to the nearest 10000?
10000
Let v = -5489.00002834 + 5489. Round v to six decimal places.
-0.000028
Let w be (-138)/(-184) + (-163317)/(-4). What is w rounded to the nearest 100?
40800
Let i = -4.633599 + 4.5618. Round i to 3 dps.
-0.072
Let g(i) = -i**2 - 21*i - 46. Let j be g(-15). Suppose j = 3*n - 397. Suppose n*u - 142*u = 114500. Round u to the nearest ten thousand.
20000
Suppose 5*z - 4*p + 16 = -4, -5*p + 25 = 2*z. Let n be (-6)/2*(z - -537). Let s = n + 2481. What is s rounded to the nearest 100?
900
Let s be (-5901)/(-14)*-745*80/(-6). What is s rounded to the nearest one million?
4000000
Let q = -5577621.05249498 - -5577621. Let t = 0.0525 + q. What is t rounded to six dps?
0.000005
Let n(x) be the first derivative of -1971433/2*x**2 + 9 + 62*x. Let t be n(14). Round t to the nearest 1000000.
-28000000
Let q = -1641029 - -1647495.632. Let s = q - 6443. Let v = s - 0.532. What is v rounded to zero dps?
23
Let c = -20609.7 - -20429.382. Let k = c - -180. Round k to one dp.
-0.3
Let g = 494041854588327.999767 + -494041263172023. Let m = 591416064 - g. Let l = -241 - m. Round l to 4 dps.
-0.0002
Let v = 30.645 - -3.247. Round v to the nearest ten.
30
Let z = 36.957 - -0.043. Let x = z - 26. Let i = x + -11.000048. What is i rounded to 4 dps?
0
Suppose 0 = -o + 5*i - 33565, o - 6*o + 3*i = 167847. Round o to the nearest ten thousand.
-30000
Suppose 5292 = -7*f - 1638. Let d be (-1)/4 + f/(-24). Suppose d*p = 36*p + 11000. Round p to the nearest one thousand.
2000
Let r(o) = -91*o - 1817. Let c be r(-20). Let d(n) = 108*n**2 + 9*n - 2. Let l be d(6). Suppose -c*u = -14660 - l. Round u to the nearest 1000.
6000
Let c = 98060.000066473 + -98060. What is c rounded to six decimal places?
0.000066
Let u = 120 - 131. Let y = u + 10.989. Let r = 0.011059 + y. Round r to 5 decimal places.
0.00006
Let s = -1.3261 - 611.5739. Round s to the nearest 10.
-610
Let n = -98 + -200. Let a = -297.99999886 - n. Round a to six decimal places.
0.000001
Let z be (-7)/(-2) - (-28)/(-56). Suppose 0 = -3*s + o + 696, -4*o + 687 = z*s - 8*o. Let l = s + 133. What is l rounded to the nearest ten?
370
Let g = -57688.0762905 - -50.0656905. Let o = g - -57646.58059198. Let x = o - 8.57. Round x to six decimal places.
-0.000008
Let n be -3*1/((-4)/((-7656)/(-9))). Let m = -11408 + n. What is m rounded to the nearest 100?
-10800
Suppose 2*k = -g, -4 = 3*g + 3*k - 10. Suppose -g*b + 704510 = -35695490. Round b to the nearest one million.
9000000
Let c(i) be the second derivative of -331*i**5/20 + 7*i**4/12 - 3*i**3/2 - 39*i**2/2 + 25*i. Let z be c(-7). Round z to the nearest ten thousand.
110000
Let l = -0.14181 - -0.05333. Round l to 2 dps.
-0.09
Suppose n + 5*y = 19, 3*y + y - 12 = 0. Suppose -10*g = -n*g - 18. Suppose 76001 = g*h - 94999. What is h rounded to the nearest ten thousand?
60000
Let z = -1048682923051 + 1048682923734.999999461. Let d = z + -684. What is d rounded to 7 dps?
-0.0000005
Let y be (9 + 0)*3286/(-12)*3600/54. Round y to the nearest 100000.
-200000
Let f = 21.02 + 1692.98. Let x = 1684.32 - f. Let h = -29 - x. Round h to one decimal place.
0.7
Let i = -46052.4829 - -46062. Round i to one decimal place.
9.5
Let m = 0.339 + 52.861. Let u = m - 53.2000099. What is u rounded to 6 dps?
-0.00001
Let w = -95.918 - -96. Let a = -15.168 - -15.15. Let z = w + a. Round z to 2 decimal places.
0.06
Let v = 8.054 - 8. Let z = v - 0.194. Let o = z + 0.489. What is o rounded to 2 dps?
0.35
Let k = 612 - 318. Let v = -292.785 + k. Round v to one dp.
1.2
Let m(v) be the second derivative of 7*v**4/6 - 5*v**3/3 - 2*v**2 - v. Let w = -1861 - -1870. Let x be m(w). What is x rounded to the nearest 100?
1000
Let c = -36195278.46500151 - -36195279. Let o = c + -0.535. Round o to six dps.
-0.000002
Let c = -1167 + 644. Let b = c + 483.1. Let f = b + 39.9466. Round f to two decimal places.
0.05
Let d = 204293.9995 + -204234. Let b = -89 - -149. Let v = b - d. Round v to 4 decimal places.
0.0005
Suppose 53*c = 41*c - 2232. Let s = c + 986. What is s rounded to the nearest 10000?
0
Let g = 6954 - 6954.22448. Round g to 2 decimal places.
-0.22
Let z = -13829546 + 4166995. Let k = z + 9662592.000104. Let i = 41 - k. Round i to 5 dps.
-0.0001
Let s = -18754.99958375 - -18755. What is s rounded to six decimal places?
0.000416
Let h(u) = 29863*u + 3. Let z(w) = -w + 2. Let m(b) = -h(b) + 4*z(b). Let j be m(15). Round j to the nearest ten thousand.
-450000
Let g = -30929.9 + 28783. What is g rounded to the nearest one hundred?
-2100
Let z = -3003.166 - -3013.5. Round z to one dp.
10.3
Let g = 96 + -95.65. Let h = g - -1.26. Round h to one dp.
1.6
Suppose 19*g + 3*g = 22. Let m(p) = 1639999*p**3 + p**2 - 2*p + 2. Let x be m(g). What is x rounded to the nearest 100000?
1600000
Suppose 29*o - 26*o = 2*c - 358439997, -2*o = c - 179220002. What is c rounded to the nearest 1000000?
179000000
Let s = 735.9 - 737.2466. Round s to 0 dps.
-1
Let c be 0/(16/4)*3/9. Suppose -r + c*g + g = -3, 3*r - 7 = g. Suppose -3*m - 4*m - r*m = 0. Round m to the nearest one million.
0
Let t = -0.2 + -1.38. Let i = t + -271.42. 