ed to the nearest one million?
7000000
Let c = -8.96 + -10.26. What is c rounded to the nearest integer?
-19
Let s = 474446.3240564 - 474649.324. Let v = s - -203. Round v to five dps.
0.00006
Suppose -l - 354 = -2*n, 6*l - 354 = -2*n + 3*l. Suppose -n = -a - 4*c, 4*a - a - 466 = c. Round a to the nearest 10.
160
Let q be (35/(-4))/((-6)/600). Let z be ((-16510)/91)/((-2)/48)*q. Round z to the nearest 100000.
3800000
Let k = 96 + -80.55. Round k to the nearest integer.
15
Let k = -1142.15529 - -910.157. Let g = -232 - k. What is g rounded to four dps?
-0.0017
Let o = -823497472931.0000015 - -823496808601. Let s = o - -664331. Let j = s - 1. Round j to six dps.
-0.000002
Let b = 10 + -11. Let f be (b - 1691)*(3 - 124). Suppose -f - 1055256 = 2*i + 4*v, -3*i - 4*v - 1889988 = 0. Round i to the nearest 100000.
-600000
Suppose -2*t = t - 6948. Suppose -2*o = 3*h + 4588, 0*o + t = -o + 4*h. Round o to the nearest 1000.
-2000
Let s = 3 - 3.025. Let v = 11.8 + -11.824946. Let u = s - v. Round u to five dps.
-0.00005
Let h = 1300232 + -675443. Suppose -15*d = -17*d - 4*j - 1849586, -5*d = -2*j + 4623941. Let v = d + h. What is v rounded to the nearest one million?
0
Let z = -23.8 + 22.194. What is z rounded to two decimal places?
-1.61
Let y = 307.7212945 + -291.7213. Let m = y - 16. Round m to 6 dps.
-0.000006
Let z = -0.14800088 - -0.148. Round z to 7 decimal places.
-0.0000009
Let n be (4/(-10))/((-5)/50). Let r be -224*(n - (-641)/(-4)). Round r to the nearest 10000.
40000
Let l(x) = 716*x**2 + 4. Let y be l(9). Suppose 0 = -3*h + h + y. Round h to the nearest 10000.
30000
Suppose 2200*h - 20350 = 2190*h. Round h to the nearest 100.
2000
Let u(h) be the third derivative of 9*h**2 - 17/24*h**4 + 0*h + 0 + 2*h**3 - 1/40*h**6 + 2/15*h**5. Let m be u(11). What is m rounded to the nearest 1000?
-3000
Let k = -430.559 - -430. Round k to 1 decimal place.
-0.6
Let u = 2.9 - 12.7. Let p = u + 9. Let v = -0.799993 - p. Round v to 5 decimal places.
0.00001
Let u = -0.82 + -0.6. Round u to one decimal place.
-1.4
Let p = -158423828 - -233673306. Suppose p = -4*k - 40750522. Round k to the nearest one million.
-29000000
Let d = 77434 + -18458. Let j = 92976 - d. What is j rounded to the nearest ten thousand?
30000
Suppose -x - 5*p - 25 = -6*x, 4 = -4*x - 4*p. Suppose 3*w - 1234 = -2*w + 3*o, -x*w + 498 = o. What is w rounded to the nearest ten?
250
Let m = 0.1249039 + -0.1249. Round m to five decimal places.
0
Let r = 0.41554837 - -0.22445175. Let j = r + -0.64. What is j rounded to seven decimal places?
0.0000001
Let h be 40/(-3)*(-25131 + 6). What is h rounded to the nearest 10000?
340000
Let g = -0.82050309 - -1.1905033. Let k = -8.9 - -8.53. Let h = k + g. What is h rounded to 7 dps?
0.0000002
Suppose -3*z + 3 = -2*z. Suppose 3*k + z = 0, 2*j - k - 112 = -j. Round j to the nearest ten.
40
Let o = -0.088 - 113.912. Let l = 112.89 + o. Let m = 1.1 + l. Round m to 2 decimal places.
-0.01
Let m = -0.7906 - -0.77. Let r = m + -0.1788. Let p = r + 0.2. Round p to 3 decimal places.
0.001
Let g be (1/(-2))/(1/(-2)). Let y be -3273*(g - -2 - 152). Let h = y - 1017677. What is h rounded to the nearest one hundred thousand?
-500000
Suppose -4*y + 26199992 = -4*u, -4*y + 3*u + 26199994 = -0*u. Round y to the nearest 1000000.
7000000
Suppose 0*c - u + 11888004 = 2*c, 0 = 2*c + 3*u - 11888012. Round c to the nearest 100000.
5900000
Let w = 188254.8 + -188254.9156231. Let c = 23.1160931 + w. Let z = -23 + c. What is z rounded to 4 decimal places?
0.0005
Let y = -165.8841 - -166. Round y to 2 decimal places.
0.12
Let g(f) = 19262*f - 28. Let q(n) = 57785*n - 85. Let h(v) = 10*g(v) - 3*q(v). Let u be h(-15). What is u rounded to the nearest one hundred thousand?
-300000
Let q = -488.617 - -488. Let k = -0.67 - q. Round k to two dps.
-0.05
Suppose -r = 47*z - 48*z - 2828001, -z + 2*r = 2828002. What is z rounded to the nearest one hundred thousand?
-2800000
Let o = -2699 + 2698.999998429. What is o rounded to six decimal places?
-0.000002
Let k = 0.65 + 0.05. Let a = k - 0.884. What is a rounded to two decimal places?
-0.18
Suppose 2*k + 4*f = 14984692, -5*k = -3*f - 18531854 - 18929811. Let q = k + -4862336. Round q to the nearest one million.
3000000
Let q be (-1927732)/119 + 4/(-7). Round q to the nearest 1000.
-16000
Let f = 12 + 3. Let s = f + -11.4. Let a = s - 3.17. What is a rounded to one decimal place?
0.4
Let x be 3 + 80/(3 - -1). Suppose -4*j = 3*o - x, 0*j - 3*j = 3*o - 15. Let d be (-289 + -1)/((-16)/j). Round d to the nearest 10.
150
Let r be -3*25/15 + -28. Let s be -3825000*(-11)/(r/20). Round s to the nearest one million.
-26000000
Let q be 440/(-55)*(71601 + (-2 - -1)). Round q to the nearest 100000.
-600000
Let p be 4/16 + 3*(-22247995)/(-60). What is p rounded to the nearest one hundred thousand?
1100000
Let j = -0.208 + 0.2080059. Round j to 6 decimal places.
0.000006
Suppose 6*l + 3*l = 0. Suppose q - 9*q + 4224 = l. Round q to the nearest 10.
530
Let m(p) be the third derivative of -p**4/24 - 200*p**3/3 - 10*p**2. Let c be m(0). Round c to the nearest 1000.
0
Suppose -8*u + 39 = -9*u. Let s = 127 + u. What is s rounded to the nearest 10?
90
Let x be (18/(-21))/(3/(-14)). Let j be 5/(-20) - (-46281)/x. Round j to the nearest 1000.
12000
Let b = 73.16 + -63. What is b rounded to the nearest integer?
10
Let c = -7.13 + 319.13. Let a = 312.298 - c. Let l = 0.29800137 - a. Round l to seven decimal places.
0.0000014
Let p = 1167.007451 - 1167. What is p rounded to 4 dps?
0.0075
Let h = -28.47 - -28.2413. Round h to 2 dps.
-0.23
Suppose q - 6*q - 3003 = 4*s, -5*s + 1188 = -2*q. Round q to the nearest 10.
-600
Let r = -4.4 - -4.656. Let h = 0.2 - r. Round h to 2 dps.
-0.06
Let m = 57 - 20. Let j = -20 - m. Let h = j + 57.61. Round h to one dp.
0.6
Let y(d) be the second derivative of 0*d**2 + 11/12*d**4 - 8*d - 2/3*d**3 + 0 - 7764/5*d**5. Let g be y(8). What is g rounded to the nearest one million?
-16000000
Let h = -0.061 - 0.069. Let a = -0.129933 - h. Round a to five dps.
0.00007
Let v = -73 - -48. Let d = v + 24.856. Let b = d - -5.844. Round b to the nearest integer.
6
Let z be (-1250)/3*(-31440)/50. Round z to the nearest ten thousand.
260000
Let m = 22 - 5. Let g = -16.924 + m. Round g to 2 dps.
0.08
Let c be (1400*20)/((-40)/(-7840)). What is c rounded to the nearest one hundred thousand?
5500000
Let k = -0.0741 - -0.07410721. What is k rounded to seven dps?
0.0000072
Let r = -51.6232 - -117.6214. Let i = r + -66. Round i to four decimal places.
-0.0018
Let l be 4/(-10) - 42293979/15. Let v = l + 1729603. Let m be -4 + 11/(11/v). What is m rounded to the nearest 100000?
-1100000
Let w = -2.68 - -2.6345. What is w rounded to 2 decimal places?
-0.05
Let h = 118.73 - 99.8. What is h rounded to the nearest integer?
19
Let x = 100 - 89.8. Let a = x - 10.199571. What is a rounded to five dps?
0.00043
Suppose -10*u = -3*u - 1169. Let y = -308 + u. What is y rounded to the nearest ten?
-140
Let s = -2941 - -4364. Let i = s + -833. Round i to the nearest 100.
600
Let r = 0.017061619818 + 331946.082930380182. Let n = 331945 - r. Let p = 1.1 + n. Round p to six decimal places.
0.000008
Suppose 48840000 = 655*b - 643*b. What is b rounded to the nearest 100000?
4100000
Let m = 0.14 + -0.04. Let s = 12.9 + m. Let h = s - 12.9999998. What is h rounded to six dps?
0
Suppose 0 = 5*h - h + 40. Let g(q) be the third derivative of -q**4/12 - 13*q**3/6 + 17*q**2. Let l be g(h). What is l rounded to zero dps?
7
Let d = 267.49 - 265. Let g = -2.4539 + d. Round g to three dps.
0.036
Let y = 49.4 - 46. Let o = y + -3.399986. Round o to five dps.
0.00001
Let f = 168 - 239. Let i = f - -208. Let r = -136.9999823 + i. What is r rounded to six dps?
0.000018
Let x = -5.300305 + 5.3. What is x rounded to 4 dps?
-0.0003
Let j = -0.5858 - 0.1632. What is j rounded to 2 decimal places?
-0.75
Let y = 0.03447 - 0.0365. Round y to 3 decimal places.
-0.002
Suppose -4*x + 16 = -3*o, 0 = -o + 3*o. Suppose x*w + 3 - 39 = 0. Let f = -541 - w. What is f rounded to the nearest 100?
-600
Let s be (-6)/(390/(-44585)) - (-8)/104. What is s rounded to the nearest 100?
700
Let z(r) = 565*r + 13. Let c be z(4). Let h = c - 1433. Round h to the nearest 100.
800
Let c(m) = -m + 9. Let q be c(9). 