decimal places?
0.0000103
Let s = -406.0587 + 406. Let c = s + 0.6941. Let t = -0.63 + c. What is t rounded to two dps?
0.01
Let d = 33.5 + -33.4863. Let k = d - -4.4463. Let m = 1.99 + k. Round m to the nearest integer.
6
Let q = -454772.16099852 - -454772. Let v = q - -0.161. What is v rounded to seven dps?
0.0000015
Let z = 65.87 - 96. Let p = z - 1.37. Let j = -82 - p. What is j rounded to the nearest integer?
-51
Let a = -946.6 - -946.6006466. What is a rounded to 5 dps?
0.00065
Let i = 4.78 - 4.783894. Let y = 265 + -264.996. Let g = i + y. Round g to 5 decimal places.
0.00011
Let i = -129 + 156.3. Let x = i - 27.299999395. Round x to 7 dps.
0.0000006
Let u = 1769257.01337 - 1769244. Let k = u + -13.02. Round k to 3 decimal places.
-0.007
Let f = 3680141653 + -3680143950.310039. Let z = -2297.3 - f. Let d = 0.01 - z. What is d rounded to 5 dps?
-0.00004
Let v be 12 + (154620008 + -17 - 3). Round v to the nearest one million.
155000000
Let d(x) = 1922*x + 5364. Let u be d(-20). Round u to the nearest one hundred.
-33100
Let r(t) = t**3 + 2*t**2 - 2*t + 150. Let u be r(0). Let g be (u/(-200))/(1/(-320)). What is g rounded to the nearest one hundred?
200
Let x = 16457 - 16457.07452. What is x rounded to 1 decimal place?
-0.1
Let a = -12751841137169.999765 - -12751807999107. Let r = 33137967 + a. Let q = 96 + r. Round q to five decimal places.
0.00024
Let d be ((-6)/10)/((-1)/5). Suppose -117268 + 536968 = -d*z. What is z rounded to the nearest ten thousand?
-140000
Let g = 0.05516 - -733.14484. What is g rounded to the nearest 10?
730
Let o = 0.89 - -1.31. Let s = 40.4 - o. What is s rounded to the nearest ten?
40
Let f = -63.1 + 55. Let q = 6 + f. Let k = q - -1.09. What is k rounded to one decimal place?
-1
Let j = -5.688 + 5.688010138. What is j rounded to seven dps?
0.0000101
Let i(w) = -w. Let f(o) = 3*o + 2. Let g(b) = b + 21. Let s be g(-17). Let k(n) = s*i(n) + f(n). Let y be k(2). What is y rounded to the nearest 1000000?
0
Let i be (62/8 - 8)/(2/(-8)). Let n be 0 + i - (17 - 18). Suppose 3*j = -3*r + n*r - 33240000, -2*r + 33240000 = -3*j. Round j to the nearest 1000000.
-11000000
Let m = -0.49 - 6.01. Let x = 25.5 + m. Let b = x - 19.4. Round b to one dp.
-0.4
Let u = 410 - 410. Let s(p) = 12*p - 16150. Let m be s(u). Round m to the nearest 1000.
-16000
Suppose 13*a = -4*o + 11*a, -5*o = 4*a. Let u(p) = -2*p + 140000. Let k be u(o). Round k to the nearest 100000.
100000
Let h = -43437 - -43437.017094. Round h to 2 dps.
0.02
Suppose -9*q + 18154 = -11915. Suppose 5*b - 6675 = -2*v, v + 3*b = 4*b + q. Suppose -4*a + s - 4600 = 0, -5*a - v - 2410 = -2*s. Round a to the nearest 100.
-1200
Let a be 471500/(13167/(-2622) - (-2 - 3)). What is a rounded to the nearest 100000?
-21700000
Let c be ((-1200036)/(-8))/((-12)/(-24)). Suppose 3*u = -2*b + c, 3*b + b - 600012 = -4*u. Round b to the nearest ten thousand.
150000
Let k(j) = -29751*j - 3. Let b be k(-8). Suppose -4*l = -3*d + 2*d - b, 3*l + 5*d - 178475 = 0. Suppose -3*g + l = 4*g. Round g to the nearest 1000.
9000
Let n = -14.10271872 + -1.49727708. Let f = -15.6 - n. What is f rounded to five decimal places?
0
Let k be 2 + 34/(-16) + (-1659)/168. Let j(w) = -13*w - 2 - 15801*w**2 + 22 + 5*w. Let f be j(k). What is f rounded to the nearest 100000?
-1600000
Let q = 92.3222 + -1.9322. Let n = -160 - -238. Let d = q - n. Round d to the nearest integer.
12
Let a = -2858759949947.18892929 - -2874791071918.188928. Let c = a - 16031121892. Let o = c - 79. Round o to seven decimal places.
-0.0000013
Let n = 5425.9121 + 0.0879. Let d = -5426.3037 + n. Round d to two decimal places.
-0.3
Let l = 60231 + -60231.087146. Let k = 136 - 136.087. Let v = l - k. What is v rounded to 5 decimal places?
-0.00015
Let t = 0.424 - -242.576. Let a = 241.9 - t. Round a to 1 dp.
-1.1
Let r = 1234.9989 - 1235. What is r rounded to five dps?
-0.0011
Let c = 8.04 - -624.96. Let s = -632.99999939 + c. What is s rounded to 7 decimal places?
0.0000006
Suppose 0*s + 3990 = 5*s. Let f = -114 + s. Suppose -11*i = -7*i - f. What is i rounded to the nearest ten?
170
Let s(w) be the second derivative of -104167*w**3/3 + 2*w**2 + 88*w. Let i(x) = x - 1. Let u be i(7). Let k be s(u). Round k to the nearest 100000.
-1300000
Let d = 0.913 - 14.733. Let b = d + 13.820703. What is b rounded to four decimal places?
0.0007
Let c = -637.7398560199 + -0.2600054801. Let m = 638 + c. Round m to five dps.
0.00014
Let k = -85232.548 + 85482. Let h = -0.548 - k. Let j = h - -256.93. Round j to the nearest integer.
7
Let w = -0.644643 + 0.087333. Round w to three decimal places.
-0.557
Let q = -16147.32 - -16004. What is q rounded to the nearest ten?
-140
Let x be (64/96)/((-2)/(-12)). Suppose x*h = -0*h + 25280. What is h rounded to the nearest 1000?
6000
Let p = 501 + -500.9981. Let z = -0.00569 + p. Round z to 3 decimal places.
-0.004
Let r(h) be the third derivative of h**5/60 + 3*h**4/8 + 15*h**3/2 - 5*h**2 + h. Let j be r(-7). Round j to the nearest 100.
0
Let l = -252.6 + 263.13. Let w = 10.52997492 - l. What is w rounded to six dps?
-0.000025
Let j be (-3606)/(-8) + -2 + 45/20. Let q = 24 + j. Round q to the nearest 100.
500
Let l = 0.09468631 - 0.09447. Round l to six decimal places.
0.000216
Let z = 380075 + -192485. Round z to the nearest 10000.
190000
Let y = 308 + -185. Let q = y - 164.5. Let k = q - -41.499666. What is k rounded to four dps?
-0.0003
Let k = 53 + -46. Suppose -2*w + k*w = 0. Suppose 4*a - 451 = 2*d + 97, w = 4*d - 3*a + 1081. Round d to the nearest ten.
-270
Let d = -0.23 - -0.004. Let p = 0.288 - d. Let g = p - 0.014. What is g rounded to the nearest integer?
1
Let y = -2344.439 + 29.539. What is y rounded to the nearest 10?
-2310
Let h be (-109472168)/44 + (-3)/((-132)/(-8)). Let n = h + 1210004. Round n to the nearest one hundred thousand.
-1300000
Let h = -1157 - -1150.91. Let z = 5.052 + h. What is z rounded to two decimal places?
-1.04
Let t = -0.53 - -18.63. Let o = -17 + t. Let l = o + -0.958. Round l to two decimal places.
0.14
Let p = 1953.36 - 2022. Round p to the nearest 10.
-70
Let i = 380662 - 706652. Round i to the nearest one thousand.
-326000
Let d = -14794 - -14793.984275. Round d to four decimal places.
-0.0157
Let z = -200.98325 - -201. Let g = z + -0.013. What is g rounded to 3 dps?
0.004
Let r = 15600 + -15585.698. Round r to one dp.
14.3
Let b = 1201 - 851. Let g = -350.0317 + b. Round g to 3 dps.
-0.032
Let c = 68 - 103. Let v = -36.5 - c. Let m = v + 1.49895. Round m to four decimal places.
-0.0011
Suppose -81 = 17*q - 26*q. Let r be (-68)/6*50*q. Round r to the nearest 1000.
-5000
Let u = 81.43999955325 - 81.44. What is u rounded to 7 dps?
-0.0000004
Let a = -3.90277 - -3.5919. What is a rounded to 2 dps?
-0.31
Let h be (-2948)/(-6) + 68/(-51). Let y = -72190 + h. Round y to the nearest ten thousand.
-70000
Let t(g) = 1493*g + 4845. Let l be t(-29). What is l rounded to the nearest ten thousand?
-40000
Let v(k) = 2*k - 13. Let f be v(8). Suppose f*a - 8 = -a, -2*y - a - 964 = 0. Round y to the nearest one hundred.
-500
Suppose -10 = 20*l + 30. Let q(f) be the second derivative of 273331*f**3/2 - 7*f**2 + 4*f. Let d be q(l). What is d rounded to the nearest 100000?
-1600000
Let v = 28.319 - -0.281. Let p = 28.59424 - v. What is p rounded to 3 decimal places?
-0.006
Let s = 0.1731 + 1.5835. Round s to two dps.
1.76
Let h = -62951 - -62950.999756572. What is h rounded to six dps?
-0.000243
Let h = -891 - 379. Let c = h - -1270.00733. What is c rounded to 4 decimal places?
0.0073
Let d = 6.2 - 38.2. Let j = 0.162 - -31.438. Let v = d + j. What is v rounded to one decimal place?
-0.4
Suppose -3*w + 20634223 + 18792329 = 0. Let l = -9278508 + -9623676. Let k = w + l. What is k rounded to the nearest one million?
-6000000
Let a = 346.3573 + -347. What is a rounded to one dp?
-0.6
Let z = 71 - 64.9. Let w = 6.09999787 - z. What is w rounded to 6 dps?
-0.000002
Let n = 270 + -270.289. Let d = -0.171 + n. Round d to 1 decimal place.
-0.5
Let i = 14469 - 14493.455. Round i to one dp.
-24.5
Let f = 0.601077 + 0.146333. What is f rounded to three decimal places?
0.747
Let d = -642 - -285. Let w = 357.0000322 + d. Round w to 5 decimal places.
0.00003
Let r = -594 - -675.8. Let n = 77 - r. 