Let v = n - -4.8000074. Round v to 6 decimal places.
0.000007
Let x = -1115225.31289 - -1115159.312889423. Let q = 66 + x. Round q to seven dps.
-0.0000006
Let v = -79.159 + 0.159. Let m = v + 77.98. Let y = -1.36 - m. What is y rounded to one decimal place?
-0.3
Let f = 8754.913568 - 8755. Round f to three decimal places.
-0.086
Let g = 0.07145 - 0.0714423416. Round g to seven decimal places.
0.0000077
Let z = 10612.4715 + -10613. What is z rounded to one decimal place?
-0.5
Let r = 9101.00032805 - 9101. Round r to 6 decimal places.
0.000328
Let j = 0.096 + -0.291. Let q = 0.1950182 + j. Round q to 6 dps.
0.000018
Let t = 8044.799533638 - 7965.7995339. Let h = -79 + t. What is h rounded to seven decimal places?
-0.0000003
Let m be 36/30 - (-12)/15. Suppose -3*z + 1 = m*t, t + 3*z - 4 = -5. Suppose t*x + 5*f = 1400010, 5*x - 3499992 = f + 3*f. Round x to the nearest 100000.
700000
Let n be (-3)/(-18)*2*12. Suppose n*y - 2*k = -8, 0 + 4 = -2*y - 2*k. Let b be (3 - -7)/y*600. Round b to the nearest 10000.
0
Let t = -28.2 - 93.8. Let z = 1449.1 + -1571.96. Let p = t - z. What is p rounded to one decimal place?
0.9
Suppose 0 = -13*c - 7*c + 1432811 + 1388409. Round c to the nearest one thousand.
141000
Let a = 633.299956 + -632.92. Let r = -14.38 - -14. Let n = a + r. Round n to 5 dps.
-0.00004
Let d = 405.97 + 106.73. What is d rounded to the nearest 100?
500
Suppose k = -5, 19 = 4*x + 2*k - 11. Let v(p) = 2*p**2 + 21*p - p + p**2 + 5*p**2 - 498*p**3. Let r be v(x). What is r rounded to the nearest ten thousand?
-500000
Let p = -95 + 108.6. Let j = -13.62 + p. Let a = 0.019954 + j. Round a to 5 decimal places.
-0.00005
Let d = 70.72 - 69. Let g = d - 1.13. Let a = -0.589758 + g. Round a to five dps.
0.00024
Let y = 302 - 197. Let m = 115.4 - y. Let r = m + -10.323. Round r to 2 dps.
0.08
Let w = 36247 + -36245.179999. Let a = w - 1.82. Round a to 7 dps.
0.000001
Let q = -356 + 353. Let d(r) = 52*r**3 + 12*r + 7. Let u be d(q). What is u rounded to the nearest one hundred?
-1400
Let p = 0.694 + -0.6912. Let x = -0.1404 + p. Round x to two dps.
-0.14
Let l = 1349.2 - -272.8. Let c = l + -1621.9291. Let p = 0.068 - c. What is p rounded to three decimal places?
-0.003
Let z = -1.764 - -1.72. Let t = z + 0.043623. Round t to five decimal places.
-0.00038
Let k = 246 + -360. Let q = 112.69 + k. Round q to the nearest integer.
-1
Let m = 12485 + -12517.47. What is m rounded to the nearest integer?
-32
Let y(k) = 2292*k - 163. Let h(g) = -1147*g + 81. Let f(x) = 7*h(x) + 3*y(x). Let n be f(6). Round n to the nearest one thousand.
-7000
Let v = 1485.995 - 1443. Let j = 42.893 - -0.107. Let t = v - j. Round t to 2 decimal places.
-0.01
Let f = -7.5 - 436.5. Let t = f - -444.00001514. What is t rounded to 6 dps?
0.000015
Suppose -4*s = 3*u + 477, 5*s - u - 230 = -850. Let v = -123 - s. Suppose w - x - 2*x - 1713 = v, w + 2*x - 1708 = 0. What is w rounded to the nearest 100?
1700
Let q = 798.99965575 - 799. Round q to 5 dps.
-0.00034
Let u = -27190 + 27139.924. Round u to 1 decimal place.
-50.1
Suppose 0*p = 2*p - 3*f - 31426, 3*f + 78556 = 5*p. Round p to the nearest one thousand.
16000
Let o = 44283.64275 + -44282. Round o to 2 decimal places.
1.64
Let v = 1512.5 - 1512.43669. Let b = v + 0.31099. Let i = b + -0.326. What is i rounded to two decimal places?
0.05
Suppose 8*n - 61949765 = -17829765. Round n to the nearest 1000000.
6000000
Let w be (-61)/9 - 0 - 2/9. Let q(x) = x - 8. Let h be q(w). Let l(y) = 23468*y + 20. Let m be l(h). What is m rounded to the nearest 10000?
-350000
Let t = -0.3319 - 263.7681. Let w = t + 373. Let m = w - 56. What is m rounded to the nearest integer?
53
Let c = 383.064 - 383. Let r = c - 0.0955. Round r to two decimal places.
-0.03
Let h = -2.740994716 - -2.741. What is h rounded to 7 decimal places?
0.0000053
Let j = -9.04 - -8.9755. Let t = 0.0243 - j. Round t to 2 dps.
0.09
Let r = 3.89 - 0.19. Let z = 7.2 - r. Let k = -3.5000084 + z. What is k rounded to six decimal places?
-0.000008
Let t = 37653.1900055 + -37652.4. Let w = t + -0.79. What is w rounded to six decimal places?
0.000006
Let m be 35 + -28 + 139*(-3 - -2646190). What is m rounded to the nearest one million?
368000000
Let s = 219 - 439. Let n = -131 - s. Let u = n + -51.5. What is u rounded to the nearest 10?
40
Let m(j) = 11*j - 41. Let a be m(4). Suppose n + 41108 = -5*s + 3*n, a*s = -5*n - 24640. Round s to the nearest one thousand.
-8000
Let x = 36.4535 + 0.9465. Round x to the nearest one hundred.
0
Let n = -125 + 111. Let b(z) = -2376*z - 64. Let r be b(n). Round r to the nearest 10000.
30000
Suppose -76 = 7*f - 293. Suppose -f*b - 4015018 + 234345018 = 0. Round b to the nearest one million.
7000000
Let s = 2616 - 1504. Let p = -1048.1 + s. What is p rounded to the nearest ten?
60
Let y = -541.03 - -545. Let a = 3.877681075 - -0.092338625. Let m = a - y. What is m rounded to six dps?
0.00002
Suppose 6 = -b + 2*b. Suppose -17*i - 7 - 27 = 0. Let t be (0 + i)*(b + -56)*-47. Round t to the nearest one thousand.
-5000
Let g = -70457.5898 + 70439. Round g to 0 dps.
-19
Let r = 35.40873 + -35.35382529. Let f = 717.9451 + -718. Let u = f + r. What is u rounded to 6 dps?
0.000005
Let o = -6 - -6.000073825. Round o to six dps.
0.000074
Let z = 1970.4 + 761.5. Round z to the nearest 1000.
3000
Let o = 92.869 + -152.96. Let j = -0.091 - o. Let h = 59.87 - j. Round h to 2 decimal places.
-0.13
Let m = 4912.038 + -4901. Let r = 11 - m. Let h = r + 0.03800088. Round h to seven decimal places.
0.0000009
Let z = 32523772.4966 - 32520550. Let n = -3223 + z. Let l = n + 0.5. What is l rounded to three decimal places?
-0.003
Let u = -1156.899 + 1.099. Round u to the nearest one hundred.
-1200
Let o = 4.536 - 4.1. Let l = o + -0.4. Let m = -0.0373 + l. What is m rounded to 3 decimal places?
-0.001
Let s = -2864543 - -2864547.099899. Let c = s + -4.1. What is c rounded to five decimal places?
-0.0001
Let t = -41 + 65. Suppose -2*b = -16*b + 896. Let d be (b/t)/(3/1946250). Round d to the nearest 100000.
1700000
Let u = -9998.44948 + 10074.51. Let w = 76.23 - u. Let j = -0.17 + w. Round j to 4 decimal places.
-0.0005
Let i = -5622 + 2439. Let w = -3183.3247 - i. What is w rounded to 2 dps?
-0.32
Let u = -354.6 - -451. Let z = -85.9018 - 0.0982. Let o = u + z. What is o rounded to the nearest integer?
10
Let r = 31.12 - 107.64. Round r to the nearest ten.
-80
Let z = 10.04 + -14.3248. Let a = -4.27 + -0.03. Let l = a - z. Round l to 3 dps.
-0.015
Let g(p) be the third derivative of 0*p + 152941/24*p**4 - 1/2*p**3 + 0 - 5*p**2. Let d be g(-17). Round d to the nearest 1000000.
-3000000
Let x = 160.34 + -1484.6. Let y = 1309 + x. What is y rounded to the nearest integer?
-15
Let t = -0.27035 + 0.2644628. Round t to 3 decimal places.
-0.006
Let g = 105898.119 + -106765. Let v = -860.9 - g. Round v to the nearest integer.
6
Let g = 141.17 - 5855.17. Let f = g - -5676.03. Round f to the nearest integer.
-38
Suppose 2*a - 58678944 = -2*a. Let f = -10149740 + a. Suppose -4*k + 2260004 = -0*j + j, 2*j - 4*k - f = 0. Round j to the nearest 100000.
2300000
Let q = 0.067 + -0.0075. Let j = q - 0.6105. Round j to one dp.
-0.6
Suppose -80150 = -889*r + 882*r. Let u be r*16/(-3 - (-93)/30). Round u to the nearest one hundred thousand.
1800000
Let s = -526 - -527.432. Let m = s + -0.887. What is m rounded to one decimal place?
0.5
Let y = -172959.819 - -173096. Let l = -0.481 + y. Round l to the nearest ten.
140
Let s(z) = -71*z**3 + 7*z**2 - 78*z - 13. Let u be s(-12). Round u to the nearest one thousand.
125000
Let x be (-3)/(1 - 0)*(-2)/6. Let s(g) = 25916*g - 16. Let k be s(x). Round k to the nearest one thousand.
26000
Let y = -1184 + 1184.00001273. What is y rounded to 6 dps?
0.000013
Suppose -180*v + 17780807 + 816717193 = 0. What is v rounded to the nearest 100000?
4600000
Let z = -18593.491 - -18601. Let c = z + -7.5. Round c to 2 decimal places.
0.01
Suppose -q = 4*q - 5*z + 56785020, 5*q = 4*z - 56785016. What is q rounded to the nearest 1000000?
-11000000
Let z = 109 - 102. Let p be z/(-7) - -542004 - 3. What is p rounded to the nearest one hundred thousand?
500000
Let w be 54/(-4)*(-2202266)/33. Suppose -25*x + 28*x = -w. Let s = x + 135309. Round s to the nearest 10000.
