00
Suppose -729138 = -q - 5*m, -11*q + 4*m = -10*q - 729165. Suppose -q = d + 205847. What is d rounded to the nearest one hundred thousand?
-900000
Let u = -14609145.2399981 - -14609233.24. Let v = -88 + u. Round v to 6 decimal places.
0.000002
Let m = -11.27 - -0.27. Let i = m + 11.8. Let s = i + -0.80000098. What is s rounded to 7 decimal places?
-0.000001
Let m(r) = -13*r**2 - r + 5. Let f be m(5). Let x(k) = -17*k**2 - 5*k + 7. Let s be x(6). Let g = f - s. Round g to the nearest one hundred.
300
Let s = 396 + -396.00000244. Round s to 7 dps.
-0.0000024
Let z = -1354626 - -2333626. What is z rounded to the nearest one hundred thousand?
1000000
Let d = -334.486085 + 0.016085. Let p = 337 + d. What is p rounded to 1 dp?
2.5
Suppose -x - 4*a - 824008 = 0, -5*a + 1647996 = -2*x - 3*a. Let s be x/(381/(-75) + 3 - -2). Round s to the nearest 1000000.
10000000
Let x = 6775 + -6773.6434. What is x rounded to 1 decimal place?
1.4
Let z = -7098 + 7101.429. Round z to 1 dp.
3.4
Let h be (-116192)/28 - 3/(147/14). What is h rounded to the nearest one hundred?
-4200
Let w = -3637.002553 - -3637. Round w to five dps.
-0.00255
Let o = 0.37 + -0.65. Let q = 4.68 + o. Round q to the nearest integer.
4
Let o = 2244 - 2244.002078. Round o to 3 decimal places.
-0.002
Let b = -19 - 56. Let y = -36 - b. Let s = -46.1 + y. What is s rounded to the nearest integer?
-7
Let n = -15.4 - -15. Let q = n - -0.8. Let p = -0.65 + q. Round p to 1 decimal place.
-0.3
Let x = -0.008 + 0.0080004304. What is x rounded to 7 decimal places?
0.0000004
Let w(k) = 375*k + 30. Let q be w(-24). Round q to the nearest 1000.
-9000
Let d = 34 - 16. Let y = d - 17.9994. What is y rounded to three dps?
0.001
Let n = -0.37 - -0.29. Let j = n - 6.12. What is j rounded to the nearest integer?
-6
Let t(i) = -i**2 + 7*i + 12. Let o be t(9). Let h be 8/o*(-24)/(-16). Let l be 1000020/10 + 1*h. What is l rounded to the nearest one million?
0
Suppose -5*r = 5, -9*y = -4*y - r - 166300001. What is y rounded to the nearest 1000000?
33000000
Let w(d) be the first derivative of -11*d**3/3 - 3*d**2 - 4*d - 5. Let t be w(-3). What is t rounded to the nearest 10?
-90
Let x = 3 + -3.16. Let t = -5.16 - x. Let i = t + 4.9915. What is i rounded to three dps?
-0.009
Let v = -52 - -55. Let z be 2 + 57870024/(-9) + 2/v. Round z to the nearest one hundred thousand.
-6400000
Let r be (-2 - -2) + -2 + 3 + 170399. What is r rounded to the nearest 10000?
170000
Let n = 167 - 106. Suppose -5*o - 94 = -5*g + 2*g, -90 = -3*g + 3*o. Let p = g - n. What is p rounded to the nearest 10?
-30
Let v(a) = a**3 - 9*a**2 + 9*a - 5. Let i be v(8). Suppose i*z + z + 3*o = 396015, z - 99020 = -4*o. What is z rounded to the nearest 10000?
100000
Let r = 415.9743 + -416. Round r to two decimal places.
-0.03
Let f = 0.010266 - -35.989334. Let v = -36 + f. Round v to 3 decimal places.
0
Let m = 4318 - 1535318. What is m rounded to the nearest 100000?
-1500000
Let d = 0.216 - -25.384. Let u = d - 25.5743. What is u rounded to two dps?
0.03
Let o = 419.317 + 306850.683. Let z = 307269.000088 - o. Let f = 1 + z. What is f rounded to 5 dps?
0.00009
Let k = -0.026 - -0.02601458. Round k to 7 decimal places.
0.0000146
Let h = -0.2188738 - 108.8498262. Let l = h + 92.06868. Let f = -17 - l. What is f rounded to five decimal places?
0.00002
Let r(x) = -70*x**2 + x. Let t be r(8). Suppose 0 = -3*f + 6 + 6. Let n be t/28 + f/(-14). Round n to the nearest 100.
-200
Let g = -42293.32700078 - -42293.41. Let o = -149.083 + 149. Let f = g + o. What is f rounded to seven decimal places?
-0.0000008
Let i = -46 - -48. Suppose -i*s + 5451 + 3149 = 0. Round s to the nearest 1000.
4000
Let u = 10180 - 18280. What is u rounded to the nearest 1000?
-8000
Let n = -10.5 + 11. Let p = -30.5 + n. Let a = p + 29.99977. Round a to 4 dps.
-0.0002
Let b = 0.081 + 0.659. Let f = -0.35 + b. Let r = f + -0.3881. Round r to 3 decimal places.
0.002
Let v = 35 - -19. Let b = -54.0015 + v. What is b rounded to 3 dps?
-0.002
Let s = -0.051813284 + -64.948188616. Let k = s + 65. Round k to 6 dps.
-0.000002
Let x(s) = -s**3 - 5*s**2 - 4*s + 3. Let k be x(-4). Suppose -k + 6 = f. Suppose -2*z = -f*z - 122. What is z rounded to the nearest 10?
-120
Suppose -68*y - 4680000 = -66*y. What is y rounded to the nearest one million?
-2000000
Let l = 29 - 19. Suppose -2*z = -l*z + 3600000. Round z to the nearest 100000.
500000
Let f = -0.07338 - -0.07346199. Round f to five decimal places.
0.00008
Let d = -3309960.3 + 3308847.85828. Let z = -1107.4417201 - d. Let j = 5 - z. Round j to seven decimal places.
0.0000001
Let o = 120.17 + -118. Let f = 2.170101 - o. What is f rounded to 5 dps?
0.0001
Let n be 6/(-21) - (-1 - 2504389965/49). Round n to the nearest one million.
51000000
Suppose -5*h + 91875 = -5*m, -5*h = -271*m + 276*m + 91825. Round m to the nearest one thousand.
-18000
Let x = 0.05 - 0.1. Let u = -0.91 + x. Let g = -11.84 + u. What is g rounded to the nearest integer?
-13
Let d = 3223552 - 3223553.01248155. Let k = 71.98752215 - d. Let q = k - 73. Round q to six decimal places.
0.000004
Let c = -62 - -42.8. Let k = c - 3. Round k to the nearest 10.
-20
Let k = -2.1 + -5.9. Let t = 2 + k. Let g = t - -6.0000006. What is g rounded to 6 dps?
0.000001
Suppose -951 - 2244 = 15*z. Round z to the nearest 100.
-200
Let u(g) be the second derivative of 32*g - 10*g**3 + 5*g**2 - 26*g - 16*g. Let z be u(-6). Round z to the nearest 100.
400
Let w = 0.0458 - 0.05577. What is w rounded to four decimal places?
-0.01
Let q be (2 - 0/(-2)) + 2. Let k be 2 - 24276/q - -1. Let m be k/30 - 1/(-5). Round m to the nearest 10.
-200
Let l = -2048 - -2048.2418. Let w = 0.7 - 0.45. Let z = l - w. What is z rounded to three dps?
-0.008
Let f = -118413 - -118419.59964. Let s = 6.6 - f. Round s to 4 decimal places.
0.0004
Let s = 420204733.33675046760451 + 497.66324990239549. Let k = 420205229 - s. Let f = k - -2. Round f to 7 dps.
-0.0000004
Let s = -69409797.0000019 + 69409758. Let d = -45 + 84. Let u = d + s. Round u to 6 decimal places.
-0.000002
Let w = 223.441 - 100.674. Let x = w + -112.7704. Let z = 10 - x. Round z to three dps.
0.003
Let q = -0.1963 + 0.196297967. What is q rounded to 7 dps?
-0.000002
Let y = -0.342 - -0.193. Let b = y + -0.819. Let w = b - -0.8. Round w to 2 decimal places.
-0.17
Let p = -72.679 - 2.801. Let t = -75 - p. What is t rounded to 1 dp?
0.5
Let f = -413 + 386. Let g = -341.7476 + 368.747644. Let x = g + f. Round x to five dps.
0.00004
Let f be 75/20 + (2 - (-7)/(-4)). Suppose z = -2*z - d - 600000, -400000 = 2*z - f*d. Round z to the nearest 1000000.
0
Let v = -1941 - -1940.9998394. Round v to four dps.
-0.0002
Let n(j) = -480114*j**2 - 3*j + 17. Let p be n(-3). What is p rounded to the nearest one hundred thousand?
-4300000
Let r = 23 + -21. Suppose -r*l + 8649655 = -2051053. Let v = l + -10350354. What is v rounded to the nearest one million?
-5000000
Let a = 1128.000473 + -1128. Round a to 4 dps.
0.0005
Let h(q) = -802*q + 133. Let v be h(-6). Round v to the nearest 1000.
5000
Let j(o) = -o**3 - o**2 + 4*o. Let i be j(3). Let y be 96*(-4)/(i/(-250))*-415. Round y to the nearest 100000.
1700000
Suppose t - 8 = 2*c + 14, -1 = c. Let w be (-4312956)/(-8)*t/3. Let s = w + -7794130. Round s to the nearest one million.
-4000000
Let k = -90.669544 - -57.6695402. Let s = 8 + -41. Let m = s - k. What is m rounded to 6 dps?
0.000004
Let z = -0.088 + 70.088. Let j = 70.198 - z. Let x = j - 0.107. Round x to two dps.
0.09
Let p = -0.4 - -0.4. Let r = -0.05 + p. Let y = -0.02 - r. Round y to 1 decimal place.
0
Let u(m) = -7100002*m - 2. Let o = 34 - 38. Let c(b) = 14200005*b + 5. Let w(i) = o*c(i) - 9*u(i). Let p be w(-1). Round p to the nearest 1000000.
-7000000
Let p = -21 + 20.95. Let g = 0.05000045 + p. Round g to 7 dps.
0.0000005
Let q(t) = -27334*t + 4. Suppose 4*o - 80 = 4*v, 0 = v + v - 5*o + 37. Let h be ((-18)/v)/(2/14). Let l be q(h). Round l to the nearest ten thousand.
-160000
Let d = -256.00254 + 256. What is d rounded to 3 decimal places?
-0.003
Let q = -2.4 + -11.6. Let p = -189857.00007 + 189843. Let k = q - p. Round k to four dps.
0.0001
Suppose -i - 2*g = 19 + 9, -2*g - 180 = 5*i. Suppose -4*b - 72 = -3*s + 5, -5*s - 3*b + 109 = 0. Let l = i + s. 