et k be 6/h - 79199996/(-18). What is k rounded to the nearest one million?
4000000
Let h be (2 - -6)*(-1 + 25/20). Let k be (-1)/h*-5*404000. Round k to the nearest 100000.
1000000
Let d = -567 + 567.000242. Round d to 5 decimal places.
0.00024
Let b = 56.5 + -3.5. Let n = b + -51.76. Round n to 1 decimal place.
1.2
Suppose -4*w - 3*s - 14658 = 7779, -3*w + 2*s = 16849. Let v = -9343 - w. What is v rounded to the nearest one hundred?
-3700
Let v = -1.56 + 3.25. Let n = -1.3 + v. Round n to 1 decimal place.
0.4
Let o(j) be the first derivative of 17*j**4/4 - 13*j**3/3 + 8*j**2 + 4*j - 1. Let g be o(12). Round g to the nearest one thousand.
28000
Suppose 2*d = -4*b - 217648, -54422 = 6*b - 5*b + 3*d. Round b to the nearest 1000.
-54000
Let c = -3483 + 3274.875. Let n = c - -0.125. Let i = n - -207.99999783. Round i to 7 decimal places.
-0.0000022
Let m(b) = 63*b + 44. Let o be m(-4). Let t be 318208/o + (-2)/13. Round t to the nearest one hundred.
-1500
Suppose 24*h = 45768 - 1572168. Round h to the nearest one thousand.
-64000
Let o(b) = b**2 + 19*b - 49. Let a be o(-21). Let d be (-1 - 290001) + a + 9. Round d to the nearest 100000.
-300000
Let p = 49.9155 - 49.9. Round p to three decimal places.
0.016
Let b(l) = l**3 + 7*l**2 - 9*l - 4. Let i = 18 + -26. Let n be b(i). Suppose 2*y = -n*o + 144000, -216000 = -2*y - y - o. Round y to the nearest ten thousand.
70000
Let t = -179085471.0000236 + 179085405. Let b = -38.2 + -27.8. Let q = b - t. Round q to 6 dps.
0.000024
Let t(r) = -1019971*r - 116. Let g be t(4). Round g to the nearest 100000.
-4100000
Let t(f) = -2797*f - 2107*f + 15 + 5. Let q be t(5). What is q rounded to the nearest one thousand?
-25000
Let b = 2771.9194 + -3056.886. Let f = 285 + b. Round f to 2 decimal places.
0.03
Let o = -18.999984 - -19. Round o to 6 decimal places.
0.000016
Let z = -5.76 + 0.38. Let f = z - -6. Round f to 1 decimal place.
0.6
Let y = 18.6 - -5.4. Let t = -1178.63293 - -1202.633. Let x = y - t. What is x rounded to four dps?
-0.0001
Let d(j) = j + 2. Let n be d(-2). Let z = 2 - n. Suppose 6*a = z*a - 47200000. Round a to the nearest 1000000.
-12000000
Let d = 6431610 + -41559. Suppose -8763396 - 10856706 = -2*h. Let r = d - h. Round r to the nearest one hundred thousand.
-3400000
Let r = 42725.4 + -42810.39775. Let z = r - -85. What is z rounded to 4 decimal places?
0.0023
Let g = -27717 - -13187. Let o = g + -1870. What is o rounded to the nearest one thousand?
-16000
Let a = 8.61809 + -8.68. What is a rounded to 2 dps?
-0.06
Let y = 3119 - 3117.5612. Let b = -1.39 + y. Let k = b - 0.048589. What is k rounded to 5 decimal places?
0.00021
Let i = 96349.434 - 23.434. Let x = i - 96324.20093. Let o = x - 1.8. Round o to four decimal places.
-0.0009
Suppose -1 + 16 = -5*u, 0 = -5*c + 5*u - 1915985. What is c rounded to the nearest 100000?
-400000
Let x(k) = -133330*k - 40. Let r(a) = a + 7. Let p be r(5). Let s be x(p). Round s to the nearest one hundred thousand.
-1600000
Let c = 0.2289 + -114.1289. Let d = 126 + c. Round d to 0 dps.
12
Let p = 398 - 397.99538. What is p rounded to three dps?
0.005
Let v = -1164.9999433 + 1165. What is v rounded to five dps?
0.00006
Let t = -30349 - -5288. Suppose 6*m = 2*m + 41444. Let n = t + m. What is n rounded to the nearest 1000?
-15000
Let a = -178.0667916 + 178.5668. Let i = 0.5 - a. Round i to six decimal places.
-0.000008
Let r be ((-3)/9)/((-1)/3). Let m = -3 - r. Let c be 3/m + 1439997/(-4). What is c rounded to the nearest one hundred thousand?
-400000
Suppose -11 + 5 = -3*r. Suppose r*o = 5*p - 430 - 74, 102 = p - o. What is p rounded to the nearest 1000?
0
Let n = -0.94 + 5.596. Round n to 1 dp.
4.7
Let p = 356.000549 - 356. Round p to 4 dps.
0.0005
Suppose t + 0*o + o = 0, -3*t - 2*o + 1 = 0. Let u = 59 - 62. Let b be ((-20)/(-6))/(t/u). Round b to the nearest integer.
-10
Let b = 502 - 501.789. What is b rounded to 1 dp?
0.2
Let s = -6510145.718 + 6519490. Let a = s + -9343.8719969. Let g = 0.41 - a. Round g to six dps.
-0.000003
Let o = 33.769992 - -3.2300085. Let m = -39.33 - -2.33. Let x = o + m. What is x rounded to 6 dps?
0.000001
Let z(o) = -1038*o**3 + 30*o**2 - 13*o - 39. Suppose -6*n - 6 = -132. Let u be z(n). Round u to the nearest one million.
-10000000
Suppose -2*f - 2*j = -10, -2*f + 2*j + 4 = j. Let t be (-32)/40*30/f. What is t rounded to 0 decimal places?
-8
Let x be (-3908)/(-8) - (-5)/(-10). Round x to the nearest one hundred.
500
Let d = -105.13 + 183. Let c = 0.87 - d. Let q = -76.999901 - c. Round q to five decimal places.
0.0001
Let b = 0.989 - 450.989. Let h = b + 392.4. Round h to the nearest ten.
-60
Suppose -75 = 2*i - 3. Let c be 8/i + (-4)/(-18). Suppose c*z - 55000 = -z. Round z to the nearest 10000.
60000
Suppose 0 = 4*i + t - 6*t - 316, -3*i = -2*t - 237. Suppose -68 = -3*s + i. What is s rounded to the nearest ten?
50
Let v = -578647 + -470353. What is v rounded to the nearest 100000?
-1000000
Let d = 5149737 + -1369737. Round d to the nearest 1000000.
4000000
Suppose -w = 5*a - 4*w - 27, 0 = -5*w - 20. Suppose -14 - 22 = -3*d - a*b, 0 = 4*d + b - 45. Let t = d + 43. What is t rounded to the nearest ten?
50
Let j(h) = -195*h**3 + h + 2 + 1420*h**3 + 996*h**3. Let q be j(-1). Round q to the nearest one thousand.
-2000
Suppose -5*o + 14 = -1, 5*u - 2*o = 7449. Suppose -4591 + u = 10*y. Round y to the nearest 10.
-310
Let l = 20.562 + -0.462. Let p = -22 + l. What is p rounded to the nearest integer?
-2
Suppose -71688881 = 2*t + 3*f - 7348869, 3*f - 96509988 = 3*t. What is t rounded to the nearest one million?
-32000000
Let m(o) = o**3 - o + 53. Let f be m(0). Let l = f + -38. Suppose -3*u = 2*u + l. What is u rounded to the nearest ten?
0
Let g = 0.624415 + -0.628. Round g to four dps.
-0.0036
Let j = -148213 - -155771.24. Let f = 7723.2218 - j. Let y = f + -165. What is y rounded to 3 dps?
-0.018
Let g = 51.600015328 + -51.6. What is g rounded to six dps?
0.000015
Suppose y = -4*y. Suppose -4*h + 11116 = -3*t - 16896, y = -3*t - 12. What is h rounded to the nearest ten thousand?
10000
Suppose -2*c = -106*q + 102*q + 7254, 5*c + 1809 = q. What is q rounded to the nearest ten?
1810
Let b = -2040.58 + 2052. What is b rounded to the nearest integer?
11
Let s = -53.605 + 53. Round s to 1 decimal place.
-0.6
Let k = 1536782 + -1536934.99923. Let w = k + 153. Round w to 4 dps.
0.0008
Let c = -816 + 795.94. Let q = -20 - c. Round q to 2 dps.
0.06
Let b(a) = -a + 7. Let j be b(5). Suppose 5*x + 21 + 4 = 0, -j*w + x = -1660005. Round w to the nearest one hundred thousand.
800000
Let b(u) = u**2 - u. Let i be b(-2). Suppose 3*h + 51 = 5*r, -i = 5*r + h - 49. Suppose -4*k = -r*k + 50. Round k to the nearest 100.
0
Suppose 111 = -4*y + q, 118 = -5*y - 5*q - 27. Let x = -17 - y. Suppose -x*d = -10*d + 4400. Round d to the nearest 1000.
-4000
Let c = -1123 + 1122.9997228. Round c to five decimal places.
-0.00028
Let t = -23.986 - 0.014. Let m = t + 23.9989. Round m to three dps.
-0.001
Let h = -178.1925281985 - -0.1925382985. Let g = 178 + h. What is g rounded to six decimal places?
0.00001
Let u = -350 + 349.99767. What is u rounded to 3 decimal places?
-0.002
Let i = 152 - 147. Suppose -4*j + j + l = -37795, 62990 = i*j - 2*l. Round j to the nearest 1000.
13000
Let x = 59947 - 59916.061. Let s = -0.061 - x. Let h = s - -30.99979. What is h rounded to 5 decimal places?
-0.00021
Let b = 819 + -819.00003213. What is b rounded to five dps?
-0.00003
Let v = 148 + -146. Let g be 7 - 3/(-6)*-6. Suppose -v*n - 330000 = 5*u, 0*n + 264000 = -g*u + n. What is u rounded to the nearest 10000?
-70000
Let j = -1.18 + 1.2. Let w = 27.9 - 27.880025. Let u = j - w. Round u to five decimal places.
0.00003
Let j = -23.959 + -0.041. Let t = 24.00000027 + j. Round t to seven decimal places.
0.0000003
Let a = -0.05 - -0.049999996. Round a to 7 dps.
0
Suppose 0*s = s. Suppose -3*d + 5*d - 10 = s. Suppose -d*h - 4993970 = 1706030. What is h rounded to the nearest 100000?
-1300000
Let w = -1.75 + 2.102. What is w rounded to two decimal places?
0.35
Suppose 4*c = -c. Suppose 7*u + 396 - 1796 = c. Round u to the nearest 100.
200
Let n = -2420 + 2420.001109. Round n to 4 dps.
0.0011
Let k = -0.006 - 7.094. Round k to zero decimal places.
-7
Let o = 0.5 - 0.44. 