01
Let k = -5675.93241 - -5676. Round k to 3 dps.
0.068
Suppose 4*u + 2 = -6, -3*u - 183919316 = -5*a. Let f = 4283862 - a. Round f to the nearest one million.
-33000000
Let u = 91.1 + -91.100823. What is u rounded to 4 dps?
-0.0008
Let k = -0.64 + 0.6448. Let u = 0.008 + k. What is u rounded to two decimal places?
0.01
Let b = 0.721 - 1.1474. Round b to two dps.
-0.43
Let p = -1282 - -1271.42. Round p to the nearest integer.
-11
Let v = -622093 - -358093. Round v to the nearest 10000.
-260000
Let g = 61.7 - 61.700000369. What is g rounded to 7 dps?
-0.0000004
Let b = 2.74 + -2.7399859. What is b rounded to six dps?
0.000014
Let j = -24.62 - 0.38. Let q = j - -25.0000018. What is q rounded to 6 dps?
0.000002
Let z = -0.26 - 211.74. Let j = -480.7338 - -692.7235. Let y = j + z. Round y to three dps.
-0.01
Suppose 5 = -t + 2. Let l be 5 + t - (-1490 - 2). Suppose -1476 = 3*v + l. Round v to the nearest 100.
-1000
Suppose -7*t + 172 = -108. Let d = t - -70. Round d to the nearest 10.
110
Suppose -5*i - 11566 - 15434 = 0. Round i to the nearest one thousand.
-5000
Let c = 196.2 + -39.2. Let u = c - 156.999999818. What is u rounded to 7 decimal places?
0.0000002
Let q = -28.2710023062 - -28.271. Round q to seven dps.
-0.0000023
Let m(f) = 2*f**2 - 3*f**3 + 7*f**3 + 8*f - 3*f**3 - 15*f**2 + 2. Let p be m(14). Round p to the nearest one hundred.
300
Let g = -8686 + 8726.738. Let d = g - 41. Let z = -0.26 - d. Round z to two dps.
0
Let v = 34426167 - 17626167. Suppose -72*h - v = -76*h. Round h to the nearest 1000000.
4000000
Let o = -166.824 - 0.176. Let c = o + 166.99914. What is c rounded to four decimal places?
-0.0009
Let u(i) be the third derivative of 31779*i**4/8 + 11*i**3/6 + 15*i**2. Let m be u(-3). Round m to the nearest one hundred thousand.
-300000
Let d = -37609 - -24319. Round d to the nearest 10000.
-10000
Let c = -759 + 796.168. Let n = c + -36.5. Let k = 0.222 + n. What is k rounded to one dp?
0.9
Suppose 0 = 2*t + f - 29151, 4*f + 58320 = -0*t + 4*t. What is t rounded to the nearest one hundred?
14600
Let o be 3/(-2) - (-142983)/(-2) - 7. Round o to the nearest 10000.
-70000
Let z = 292 + -294.51. Round z to 1 dp.
-2.5
Let n = -0.040814 - 64.506286. Let z = -0.0529 + n. Let l = -59 - z. What is l rounded to the nearest integer?
6
Let b = 11.9 - 0.9. Let r = 25.989214 - 14.98925. Let h = r - b. What is h rounded to 5 dps?
-0.00004
Let c = -20.7 + -118.3. Let d = c + 138.38. What is d rounded to 1 decimal place?
-0.6
Suppose -r - 4 = -64. Let c = 61 - r. Round c to the nearest 10.
0
Let k(u) = 5966*u**2 - 8*u + 30. Let b be k(3). What is b rounded to the nearest 10000?
50000
Let b = 886198 - 885683.231. Let c = b + -515. Round c to two dps.
-0.23
Let j = 373121.239133 + 0.760867. Let s = j + -373137.9943. Let p = 16 + s. Round p to 3 dps.
0.006
Suppose 0 = -8*r + 7*r. Suppose -5*x + 4 + 1 = r, -m = -x + 260001. What is m rounded to the nearest one hundred thousand?
-300000
Let t be -40 + -3907965 + -2 + 7. Round t to the nearest 1000000.
-4000000
Let x = 18218.51 - 18220.010058. Let y = x - -1.5. What is y rounded to 5 dps?
-0.00006
Let i = -1.318 + 0.271. Let s = -8 - -7.977. Let h = i + s. Round h to one dp.
-1.1
Suppose -j - 9 = 2*j. Let o(y) = -407*y**3 + 2*y**2 + 3*y + 2. Let h be o(j). Round h to the nearest ten thousand.
10000
Let l = -22.05 - -0.05. Let o = l - -40. Let g = o - 17.999982. Round g to five dps.
0.00002
Let x = 32 - 43. Let j = -11.088 - x. What is j rounded to 2 decimal places?
-0.09
Let i = -2.1000032 + 2.1. Round i to seven decimal places.
-0.0000032
Let h = 0.9363 - 111.4063. Let o = 112 + h. Let s = -0.79 + o. What is s rounded to 1 dp?
0.7
Let g = 214 - 114. Let f = 122.9 - g. Round f to 0 decimal places.
23
Suppose 4*c - 38 = y, 4*c + 7 = -y + 41. Suppose c*k = 15*k - 30000. Round k to the nearest 10000.
10000
Let f = -185295 + 419995. What is f rounded to the nearest 10000?
230000
Suppose -2164930 = 5*x + 5*m, 0*m = -3*x + 2*m - 1298978. Let c = x - -732990. Round c to the nearest 1000000.
0
Let n(b) = b**2 - 23*b - 21. Let u be n(24). Suppose -4*k + 13082262 = -2*h + 5062262, -u*h = 3*k + 12030000. Round h to the nearest one million.
-4000000
Suppose 4*m - 4*g - 14 = -6, 5*g - 4 = 3*m. Let l(i) = -3*i - 3*i**2 - 4*i - 2 + 3*i**3 - 1. Let s be l(m). Round s to the nearest one hundred.
800
Let a = -11.9733 + 0.7313. Let f = -13 - -12.958. Let p = f - a. Round p to zero decimal places.
11
Let n = 0.496 + -10.776. What is n rounded to the nearest integer?
-10
Let p be -1 + 3/((-6)/4). Let z be -2*(0 + 3)/p. Suppose -z*o + 3*o = 53. Round o to the nearest ten.
50
Let a = 3826 - 2197. Round a to the nearest one hundred.
1600
Let l = 0.359 - 172.359. Let v = l - -172.0000137. Round v to six decimal places.
0.000014
Let n = 9 - -11. Let q = n + -20.025. Let g = 1.665 + q. Round g to one dp.
1.6
Suppose v - 4*t - 2268282 = 1164452, 0 = 3*v + 5*t - 10298168. Let c = v - 7432726. What is c rounded to the nearest 1000000?
-4000000
Let l = 520 - 519.999542. What is l rounded to four dps?
0.0005
Let n = 35 + -50. Let x = -23 - n. What is x rounded to the nearest integer?
-8
Let z = -17 + 25. Let d be (-48)/(-3)*-10*(-92)/z. What is d rounded to the nearest 100?
1800
Let o = 3 - 150. Let x = 37.83 + -201.73. Let g = o - x. Round g to the nearest integer.
17
Let l = 15 + -17. Let y be ((-24)/(-60))/(l/170). Let z be y/(1 + 3/(-6)). Round z to the nearest ten.
-70
Let q(c) = 3*c - 1. Let p be q(2). Let z be ((-344)/p)/(19/(-118750)). Round z to the nearest 100000.
400000
Let l = 77.24583 + 0.18417. Let s = 77 - l. What is s rounded to 1 dp?
-0.4
Let t = 0.69 + 0.31. Let m = -6.2 + t. Round m to the nearest integer.
-5
Let y(p) = -p**2 - 4*p + 8. Let c be y(-5). Suppose -c*s - 773 = -2093. What is s rounded to the nearest 100?
400
Let t(n) = -1369006*n**3 - n**2 + n + 2. Let u = -3 - -5. Let c be t(u). Let z = 4152048 + c. Round z to the nearest 1000000.
-7000000
Let o = -130.34 - -1.34. Let u = o + 106.1. Round u to the nearest integer.
-23
Let z(r) = 12 + 89567*r**3 + 109*r**2 - 114*r**2 - 267691*r**3 + r. Let k be z(4). What is k rounded to the nearest 1000000?
-11000000
Let m = -135.03 + 136. Let a = m - 0.97000183. Round a to seven decimal places.
-0.0000018
Let i = 0.4022 - -266.7678. Let q = i - 266. Let d = -1.17000097 + q. What is d rounded to seven dps?
-0.000001
Let n = 53.000001112 - 53. Round n to 7 decimal places.
0.0000011
Let m = 5967986.5199999 - 5967953.52. Let v = m + -33. Round v to 7 decimal places.
-0.0000001
Let w = -566.00637 + 566. Round w to 3 decimal places.
-0.006
Let r(q) = 77201*q**3 - 4*q**2 + q + 2. Let h be r(1). Round h to the nearest one thousand.
77000
Let z(x) = -x**2 + 24*x + 21. Let f be z(17). Let b = 1140 - f. What is b rounded to the nearest one hundred?
1000
Let w = -411 + 410.863. What is w rounded to one decimal place?
-0.1
Let u be ((-4)/12)/((-2)/24). Let q be (-5 + 7)/(u/(-170)). Let v = q + 2. What is v rounded to the nearest ten?
-80
Let i(v) = -v**3 + 4*v**2 + v - 7. Let s be i(3). Let m be ((-40)/(-50))/(2/s). Suppose -m*q + 3*f + 1 = 141, 4*q - 2*f = -280. Round q to the nearest 10.
-70
Let j = 67391052 + -67391054.8787253. Let a = j - -35.8787387. Let r = a + -33. What is r rounded to six decimal places?
0.000013
Let l = 91604663.000106 - 91604570. Let b = l - 93. What is b rounded to five dps?
0.00011
Let z = -19.02 + 34.636. What is z rounded to the nearest integer?
16
Let v be (28/(-6))/(7 + (-132)/18). Let d(c) = c**2 - 13*c. Let m be d(v). What is m rounded to the nearest integer?
14
Let r be (3 - -3) + -1122*8. Round r to the nearest 1000.
-9000
Let n = 2493 + -2493.02153. What is n rounded to 3 decimal places?
-0.022
Let r = -245.60847278 - 1.41081422. Let h = 264.01931 + r. Let d = -17 + h. What is d rounded to 5 dps?
0.00002
Let x = -0.037 + 0.037. Let u = x - -0.0019. Round u to four dps.
0.0019
Let x be (-1336)/(-64) - 1/(-8). Let w be ((-702)/x)/(4/28). What is w rounded to the nearest 10?
-230
Suppose -2*n + 5*m = n - 11102, 5*n = 4*m + 18512. Suppose 7*d = -n + 344. What is d rounded to the nearest 100?
-500
Let a = -81 + 137. Let v = -55.9999906 + a. What is v rounded to 6 dps?
0.000009
Let j = -8620.000007959 + 8620. Round j to six decimal places.
