hat is f rounded to 7 decimal places?
-0.0000101
Suppose 0*w - 4*w - 18375 = 3*x, 2*w = x + 6135. What is x rounded to the nearest 1000?
-6000
Let m = 42967 - 42967.00019757. Round m to 6 dps.
-0.000198
Let c = 2991971 - 4359561. Round c to the nearest 10000.
-1370000
Let z(q) = 54*q - 64. Let c be z(-4). Let t = c + 196. Round t to the nearest one hundred.
-100
Let z = -8015361 + 8015359.40000544. Let a = 14069 - 14070.6. Let q = a - z. What is q rounded to seven dps?
-0.0000054
Let n = -57695.4 + 47254. Let l = 10550.4156 + n. Let s = -109 + l. Round s to three dps.
0.016
Let l = -405 - -405. Suppose 2*k - 2*i - 2*i + 7330 = l, -k + 3*i = 3664. What is k rounded to the nearest 1000?
-4000
Let g = -524 - -525.223. Let o = 0.13033 + 1.08568. Let v = o - g. Round v to 4 dps.
-0.007
Suppose -10322834 = 4*p - 88045002. Let u = p - 27330542. What is u rounded to the nearest one million?
-8000000
Let i = -441875 + -308833. Let q = -2870708 - i. Round q to the nearest 100000.
-2100000
Let n(p) = -13 - 13*p + 0*p + 11*p. Let x be n(-11). Suppose -190744 + 750544 = -x*z. Round z to the nearest one thousand.
-62000
Let i = -1460.4613 + 1459.8. Let l = i - -0.695. Round l to three decimal places.
0.034
Let u = -14622 + 14621.991361. Round u to four dps.
-0.0086
Let j = 602185.1565 - 602055. Let c = -142.06 + j. Let z = c + 11.9. What is z rounded to three decimal places?
-0.004
Let c(n) = -n**3 + 11*n**2 - 6*n - 28. Let l be c(10). Suppose 3*p + 15*i - 19*i = -17100016, -l = -3*i. Round p to the nearest one million.
-6000000
Let j = 378.358 - 379. Let y = -1.461 - j. What is y rounded to two decimal places?
-0.82
Let m be (12 - 14)/(14/(-1390823)). What is m rounded to the nearest one thousand?
199000
Let f = -13478.00043036 - -13478. What is f rounded to 6 decimal places?
-0.00043
Let i = 19087.73984 + -19091. Let d = i - -4.4801866. Let q = 1.22 - d. What is q rounded to 5 dps?
-0.00003
Let n = 0.3667 + -0.21481. Round n to 2 dps.
0.15
Let t = 221.0074 + -0.0074. Let q = -299.345477 - -78.345283. Let d = t + q. What is d rounded to 5 decimal places?
-0.00019
Suppose 5*y + 1741370 = -214*a + 219*a, 0 = 5*y + 5*a + 1741330. Round y to the nearest ten thousand.
-350000
Let z = -0.16589 - -285.04589. Let c = z - 303. Let u = c + 2.42. What is u rounded to the nearest integer?
-16
Let f = 40.590002394 + -40.59. What is f rounded to 6 dps?
0.000002
Let z = 1525 + -3501.5. Round z to the nearest one hundred.
-2000
Let o = -2108 - -3811. Let q = 1702.237 - o. Let c = -0.66 - q. What is c rounded to 2 dps?
0.1
Suppose -7*t - 21 = -6*t. Let f = -19 - t. Suppose 5*c = z - 2665, -3*c + f*c + 2635 = z. Round z to the nearest one hundred.
2600
Let w = -507017262 + 507017282.7999171. Let y = 20.8 - w. Round y to five dps.
0.00008
Suppose 4*g = m + 6719, 8*m = 6*m - 2*g - 13408. What is m rounded to the nearest one hundred?
-6700
Let p = 686.6 - 687.2978. Let b = -148 + 147.9508. Let q = b + p. What is q rounded to one dp?
-0.7
Let f = -7040 + 7039.99989538. Round f to five decimal places.
-0.0001
Let a = -116.8 + 878.8. Let y = 762.0000321 - a. What is y rounded to six dps?
0.000032
Let u = -7.531 + -12.259. What is u rounded to the nearest integer?
-20
Let l = -23678.9985311 - -23679. Round l to 5 dps.
0.00147
Let t = 0.20581 - -4.33669. What is t rounded to 1 dp?
4.5
Let s = 89008967.999873 - 89008886. Let q = 2093 - 2011. Let o = q - s. Round o to four dps.
0.0001
Let v = -1.13192 - -6.19922. Round v to one dp.
5.1
Let g = 2963.0789 + -2968. Let l = g - -4.82. What is l rounded to two decimal places?
-0.1
Let p = 39.555 - -803.993. Let k = 845 - p. What is k rounded to one dp?
1.5
Let k = -0.01224 + -23.61776. Let m = 0.034 - 0.264. Let z = m - k. What is z rounded to 0 dps?
23
Let a = 1185.6924 + -5.3424. Let l = -1129 + a. Let d = l + -51. What is d rounded to 1 dp?
0.4
Let w = -61.6 - -61.1. Let p = -22.42 + -0.58. Let t = w - p. What is t rounded to the nearest ten?
20
Let w = -1.85 - 1.15. Let n = 41946.7600027 + -41949.76. Let o = n - w. Round o to six decimal places.
0.000003
Let l(h) = h**2 - 7*h + 15. Let o be l(3). Suppose z + 911985 = o*d, -4*d + 5*d = -3*z - 2736005. What is z rounded to the nearest one hundred thousand?
-900000
Suppose -31807 - 26093 = -12*z. Suppose 5*g + 5175 = -z. Let i be (g/(-6))/((-4)/(-1080)). What is i rounded to the nearest ten thousand?
90000
Let v = 13285893.068000146 - 13285893. Let y = -36 + 35.932. Let a = v + y. What is a rounded to seven dps?
0.0000001
Let h be (1 + (-6666)/(-4))/(3/(-18)). Let r be (-1950)/(h/(-2000) - 5). Round r to the nearest 10000.
-780000
Let r = -71028833 + 71033501.11946. Let u = r + -4668.5. Let c = u - -0.38. What is c rounded to four decimal places?
-0.0005
Let q = 1.796 - -1091.204. Let c = q - 1093.00002743. What is c rounded to 6 dps?
-0.000027
Let a = 16531.44 - 17839. Round a to the nearest 100.
-1300
Let y = 214.75 + -1.75. Let d = 213.0925 - y. What is d rounded to three dps?
0.093
Let l = 12.6229 - 0.0029. Let z = -12.61998021 + l. Round z to 6 decimal places.
0.00002
Let s be 13/(-39)*(2 - 3491). Let k = s - 1793. What is k rounded to the nearest 10?
-630
Let b = -175 + 175.089. Let t = 6.989 - b. What is t rounded to zero dps?
7
Let u = 5183275 - 2769275. Round u to the nearest 100000.
2400000
Let h = -688543 - -688812.9784. Let l = h + -270. Round l to three dps.
-0.022
Let y = 19 + -1.14. Let j = 757.14 + y. Let t = 768.42 - j. Round t to the nearest integer.
-7
Let y = 0.03917 + 43.62083. Let g = -44 + y. Let s = g + 0.34000031. What is s rounded to seven dps?
0.0000003
Suppose -35*h + 39*h - y = -73798, -5*h + 5*y = 92240. Round h to the nearest one thousand.
-18000
Suppose -17*a - 7300000 = -19*a. Suppose 0 = 79*v - 74*v - a. Round v to the nearest one million.
1000000
Let f be ((-126)/(-36))/(1 + (-2)/4). Let w be -802 + f + 1 + -2. What is w rounded to the nearest one hundred?
-800
Let c = 33266.927 - 33295. What is c rounded to the nearest integer?
-28
Let w = 346 + -347. Let o be ((-3338500)/(-33))/(w/6). Round o to the nearest 10000.
-610000
Let l(c) be the second derivative of -23*c**5/4 - 2*c**4/3 - c**3/2 + 7*c**2/2 + 7*c. Let k be l(7). Let g = -94851 - k. Round g to the nearest 10000.
-60000
Let v = 94.64 - -0.36. Let n = -2222312.9947 + 2222408. Let w = v - n. Round w to three dps.
-0.005
Let c = -99370.219366 + 99370. Let d = 9.724066 + c. Let q = d + -9.5. What is q rounded to 3 dps?
0.005
Let a(u) = 7601*u**3 - 5*u**2 - 3*u + 11. Let y be a(5). Let n be y/10 - 2*5/(-25). Suppose -7*q + 2*q + n = 0. Round q to the nearest 1000.
19000
Let d = -18 - -23. Suppose 3*q + 3 = -w - 3, 0 = 4*w + d*q + 17. Let z be -90000*(w/2 + 2). Round z to the nearest ten thousand.
-50000
Let w = -67 + 69. Suppose 3*c - 4*c = -w. Suppose -c*z = -7 + 27. Round z to the nearest 100.
0
Let b = -79.4 - 3.6. Let f = b + 152. Let t = 68.999524 - f. Round t to 5 dps.
-0.00048
Suppose 9*n - 10 = 10*n. Let s(d) = -12*d**3 - 12*d**2 + 2*d - 16. Let x be s(n). Let h = x - 16604. What is h rounded to the nearest 100?
-5800
Let q = 19212 + -19211.82016. Let g = 176.174 - 176. Let a = q - g. Round a to 4 decimal places.
0.0058
Let n = 18381.9999982252 - 18382. Round n to seven dps.
-0.0000018
Let w = -27188 - -27480.84. What is w rounded to the nearest ten?
290
Let v = 1.11 - -2.87. Let b = 403.9 + -408. Let p = v + b. Round p to two decimal places.
-0.12
Suppose -60*c + 59*c + 155200 = 0. Suppose f - 155200 = n, -n - 4*f = -f + c. Round n to the nearest ten thousand.
-160000
Let b = -7.621 - -3.3774. Round b to 1 dp.
-4.2
Suppose -k + 7 + 6 = 0. Let j = k - 11. Suppose -j*a = -5*a - 60. Round a to the nearest 100.
0
Let c be -5 + (-8 - (-15576 + 12) - 8). Round c to the nearest 1000.
16000
Let y = -1707170993.9999638 - -1707171316. Let p = y - 322. What is p rounded to six decimal places?
0.000036
Let d = 8207409350.99999746 + -8207409146. Let s = d + -205. What is s rounded to seven dps?
-0.0000025
Suppose 3*r - 4*a + 16051932 = 2*r, -2*a = 3*r + 48155866. Let i = -11141952 - r. What is i rounded to the nearest one million?
5000000
Let k = 10.155 + -2078.955. Round k to the nearest one hundred.
-2100
Suppose 18*c = -2*w + 16*c + 26162670, -5*w = 3*c - 65406679. Suppose 119881337 = -6*d + w. 