682. Let m = 0.88 - d. Round m to 2 decimal places.
-0.25
Let i = -31.3 - -31.3000231. What is i rounded to 5 dps?
0.00002
Suppose -460160 = -7*n + 2269840. What is n rounded to the nearest 1000000?
0
Let z = -28.48 + 28.48005878. What is z rounded to five decimal places?
0.00006
Let b(x) = -955*x + 5. Suppose -f = 4*p - 1, f = 6*f - 5*p + 20. Let k be b(f). Round k to the nearest one hundred.
2900
Let c = -502 + 501.9999998091. What is c rounded to 7 decimal places?
-0.0000002
Let o = -43.51 + 44. Let i = -28.99 + o. What is i rounded to the nearest integer?
-29
Suppose 4*f + k - 13 = 16, f - 4 = 3*k. Let m = -14 + f. Let o be 45000*(1 + m/(-5)). Round o to the nearest ten thousand.
110000
Suppose 8*r + 4 = 10*r. Suppose -4*k = -r*k - 4. Let d be 0 + 5/k*-40. Round d to the nearest one thousand.
0
Let i(o) = -360*o**3 - o**2 - 2*o - 4. Let l(q) = 359*q**3 + 2*q**2 + 3*q + 4. Let c(x) = -5*i(x) - 4*l(x). Let v be c(2). Round v to the nearest 1000.
3000
Let y be 12/(-15)*115/(-2). Let o = -121 + y. Let w = 111 + o. What is w rounded to the nearest 10?
40
Suppose -i + 40000003 = 12*f - 8*f, i - 3 = 0. Round f to the nearest one million.
10000000
Let t = 0.0451 + -0.0451812. What is t rounded to 5 dps?
-0.00008
Let o = 0.024 - 21.524. Let r = -2.4 + o. Let s = r + 12.6. Round s to 0 decimal places.
-11
Let n = 0.3 - -0.1. Let j = -0.40005 + n. What is j rounded to five decimal places?
-0.00005
Let f = 460.99995175 - 461. Round f to 5 dps.
-0.00005
Let o = -155507.98593 + 155509. Let n = o + -1.008. Round n to four decimal places.
0.0061
Suppose -11*j - 28816000 = -27*j. What is j rounded to the nearest 100000?
1800000
Suppose 0 = 4*b + 2*d + 485040004, -247*b - 242519992 = -245*b - 4*d. What is b rounded to the nearest 1000000?
-121000000
Let o = 8.00018 - 8. Round o to three dps.
0
Let p = 31 + -25. Suppose -9320 = 5*g - 4*h, -h - 7435 = p*g - 2*g. What is g rounded to the nearest one hundred?
-1900
Let l = 71 - 66.7. Let k = -3 + l. Let i = 1.38 - k. Round i to one dp.
0.1
Let r = 380351.43030206 - 380426.4303. Let m = 75 + r. What is m rounded to 7 dps?
0.0000021
Let d = 2.132 + -2.1. Let j = d - 20.032. Let w = j - -20.00194. What is w rounded to four decimal places?
0.0019
Let p = -4.5 - -0.7. Let x = p - -4. Let m = x + -0.205. What is m rounded to three dps?
-0.005
Let o = 422 - -23. Let g = -445.00289 + o. Round g to 4 decimal places.
-0.0029
Let u = -24.6 + 29.3. What is u rounded to the nearest integer?
5
Let y = -36 + 35.993. Let z = y + 0.065. Round z to two dps.
0.06
Let g(k) = 9*k + 79. Let q be g(-19). Let r be (-1*1)/((-1)/(-1)). Let a be q - r - (-6)/3. Round a to the nearest ten.
-90
Suppose 0 = 4*u + 2*i - 26, 3*u + 5*i - 2 = -0. Suppose 1 = u*o - 10*o. Let r be (-292)/(2 + -6)*o. What is r rounded to the nearest ten?
-70
Let f = 1226 - 700. Round f to the nearest ten.
530
Let q = -39911690 + 26154023. Let w = q - -6657667. What is w rounded to the nearest one million?
-7000000
Let i be ((-368)/6 + 0)*(-405)/60. Suppose -81 = -5*r + i. What is r rounded to the nearest 10?
100
Let r = -336 + 646. Round r to the nearest one hundred.
300
Let x(p) = 219*p**3 - 18*p - 16. Let n be x(-8). What is n rounded to the nearest 10000?
-110000
Let p = 0.226 + 0.009. Let s = -40.965 - p. What is s rounded to the nearest 10?
-40
Let h be 4 + (1 - 0)*-2. Let k(g) = -506*g + 12. Let s be k(h). What is s rounded to the nearest 10000?
0
Let b = -344 - -347.74. Let k = b + -39.14. What is k rounded to the nearest integer?
-35
Let z = 6 + -6. Let t = 0.0000026 + z. What is t rounded to 6 decimal places?
0.000003
Let u = -11 - -10.962. Let k = 1263 + -1260.738. Let c = u - k. What is c rounded to the nearest integer?
-2
Suppose 5*j + c - 6950 = 3368, 10330 = 5*j + 5*c. Suppose -6*q = -j - 13837. Round q to the nearest 100.
2700
Let q = 10.37 - -0.63. Let m = q - 11.087. Round m to two decimal places.
-0.09
Let t = -282 + 153. Let n = 129.326 + t. Round n to two dps.
0.33
Let m = 22 - 28. Let w be (-2 - -55502)/(m/56). Round w to the nearest one hundred thousand.
-500000
Let x = 356.78 + 33.92. Round x to the nearest 100.
400
Let x(u) = -17500*u**2. Let k be 5/(4/(-8) + 3). Suppose z = 2*c - 8, 12 = 2*c + k. Let t be x(z). Round t to the nearest 100000.
-100000
Let j = -113.3 - -113.3763. What is j rounded to 3 decimal places?
0.076
Suppose -5*y = -c - 3724, 0 = -y + 3*y - 2*c - 1496. Suppose -y = -3*w + 2*z, 2*z + 1240 = 5*w + z. Round w to the nearest ten.
250
Let q = -82305518.99789 + 82305023. Let h = q + 496. Round h to four dps.
0.0021
Let m = 1344 + -1344.00001625. Round m to 6 decimal places.
-0.000016
Suppose 26*o - 5 = 27*o. Let p be -5*1*(-16)/o*6. What is p rounded to the nearest ten?
-100
Let l = 65.3 + -65.3729. Let v = l + 0.0729331. What is v rounded to 6 decimal places?
0.000033
Let g = 7 - 7. Suppose -r = -3 - g. Suppose 8*p = -c + r*p + 10985, 0 = 3*c - 2*p - 33006. Round c to the nearest ten thousand.
10000
Let l be 1 + -9974 + 4/(3 - 7). What is l rounded to the nearest 100?
-10000
Suppose -1026 = 3*v + 651. What is v rounded to the nearest one hundred?
-600
Let w be -4 - 4 - (0 - 4). Let u be 3/(2/(-16)*w). Suppose -28738479 = u*k + 12061521. Round k to the nearest one million.
-7000000
Let d(v) be the first derivative of 28888*v**3/3 - 2*v**2 + v + 6. Let l be d(-6). Let m be (l + 3)/(-2) + -2. Round m to the nearest 100000.
-500000
Suppose -7*s + 4*s = -9. Suppose 5*i + s*b + 18925 = -226081, 3*i + 3*b = -147006. Round i to the nearest ten thousand.
-50000
Let h(z) = -z**2 - 4*z + 3. Let c be h(-3). Let q(x) = 14*x**2 + 2*x - 2. Let w be q(-2). Let l be c/10 + (-1380)/w. What is l rounded to the nearest ten?
-30
Let g = -1382.04 + 1438. What is g rounded to the nearest ten?
60
Let p(x) = -9796*x + 126. Let t be p(17). Let d = -284442 - 489152. Let h = d + t. Round h to the nearest one hundred thousand.
-900000
Let r = 5.16 + -0.36. Let z = 10.25 - r. Let c = z - 5.45000229. Round c to seven dps.
-0.0000023
Let d = -36.1 + 34.2. Round d to the nearest ten.
0
Let t = -0.1908 + 0.2717. Round t to 2 decimal places.
0.08
Let b(w) = 4 - 3*w**2 - 4 + 8 + 2*w + 5*w. Let i(n) = -8*n**2 + 22*n + 23. Let k(a) = -7*b(a) + 2*i(a). Let h be k(11). What is h rounded to the nearest 100?
500
Let k = 13 - 13. Let h = k + -4. Let a = h + 4.000112. What is a rounded to five dps?
0.00011
Let s = 19.2537 - 16.359. Let c = s + -2.9. Round c to three decimal places.
-0.005
Let g = 847.132558 + -854.13255923. Let i = 7.15 - 0.15. Let w = g + i. What is w rounded to 7 decimal places?
-0.0000012
Let l = 2.6934 + 0.0166. Let g = l - -0.09. Let v = g - 2.80079. What is v rounded to four dps?
-0.0008
Let r = 1.16454 - 1.182. Round r to 4 dps.
-0.0175
Let a = -658.9 - -689. Let v = -36.59 + a. Round v to zero dps.
-6
Suppose 5*g = 1568085 - 175410. Let f = g + -40535. What is f rounded to the nearest one hundred thousand?
200000
Suppose -25*s + 89040 = -4*s. Round s to the nearest 1000.
4000
Suppose 19 = 4*z - 21. Let k = 13 - z. Suppose 0 = -k*g - g - 120000. Round g to the nearest 10000.
-30000
Let x = -0.8 + 0.77. Let s = -18 - -18.088. Let q = s + x. What is q rounded to 2 decimal places?
0.06
Let j = -2.2 + 0.9. Let a = -1.7 + j. Let q = 3.14 + a. What is q rounded to two decimal places?
0.14
Let l = 100 - 101.06. Let h = l - -1.060047. Round h to five dps.
0.00005
Let w = 109.211 + -0.211. Let u = 15293499 - 15293389.999705. Let t = u - w. What is t rounded to five dps?
0.0003
Let a be (-330)/9*6/(-5). Let b(q) = -2185*q**2 + 2*q - 1. Let v be b(1). Let g be 11/(a/v) - 4. Round g to the nearest 100.
-600
Let c = 0 + -0.006. Let b = -0.00562 - c. What is b rounded to 4 dps?
0.0004
Let a = -0.094 + -42.506. Let h = -872 - -919. Let c = h + a. Round c to the nearest integer.
4
Let n = -13451 + 13452.3123. Let q = n + -1.32. What is q rounded to three decimal places?
-0.008
Let f = -1483.02062 + 1483. What is f rounded to 3 decimal places?
-0.021
Let f = 24.94409 - 25577386.94409. Let m = 25577362.46999741 + f. Let q = 0.47 - m. What is q rounded to seven decimal places?
0.0000026
Let z = -19125.009061 + 19125. Round z to 4 dps.
-0.0091
Suppose -3*g + 32112 = 4*t, 4*t + t - 15 = 0. What is g rounded to the nearest ten thousand?
10000
Let q = 12 - 12. 