x*12/4. Round c to the nearest 10.
-60
Suppose 5756 = 4*c - t, 0*c + 2*c - 2860 = 5*t. What is c rounded to the nearest 100?
1400
Let k = 459473.15 - 515646. Let p = -56117.8500029 - k. Let o = p - 55. Round o to six dps.
-0.000003
Let l(z) = -2785715*z + 5. Let u be l(7). What is u rounded to the nearest one million?
-20000000
Let l(i) = 7416*i + 960*i + 5624*i. Let z be l(4). What is z rounded to the nearest 10000?
60000
Let a = -48 - -9. Let d = a - -40.7. What is d rounded to one decimal place?
1.7
Let s = 892.11 - 886. Let x = -6 + s. Let w = 0.022 - x. What is w rounded to 2 dps?
-0.09
Let x = -1.56 + 0.16. Let a = 1.39987 + x. Round a to four dps.
-0.0001
Let i = 10.000015 + -10. Round i to 5 decimal places.
0.00002
Let z = -43.01 + 55.039. Let l = -20 + 8. Let u = z + l. What is u rounded to two decimal places?
0.03
Let h = 5 + -2. Suppose -y = -h*y - 400. Round y to the nearest 100.
-200
Let q = -672.00323 - -672. Round q to 4 dps.
-0.0032
Let i = -0.67 - 0.14. Let x = i - -69.81. Let l = x - 68.99999959. Round l to 7 dps.
0.0000004
Let d(n) = 3*n. Let u be d(2). Let y(t) = -t**2 + 8*t - 7. Let s be y(u). Round s to the nearest integer.
5
Let x = -82 + 53. Let b = 0.04231386 - -28.95785614. Let l = x + b. Round l to four decimal places.
0.0002
Let r be (2/(-3))/(2/6). Let n be 2880/(2/1250*r). What is n rounded to the nearest 1000000?
-1000000
Let v = 0.03682 - 0.037. Round v to 5 decimal places.
-0.00018
Let v(q) = -q**2 - 48370*q**3 - 101630*q**3 + 1 + 0. Let t be v(-1). What is t rounded to the nearest one hundred thousand?
200000
Let o = -279 + -821. Round o to the nearest 1000.
-1000
Let s = -1.6322 + 1.6. What is s rounded to 3 dps?
-0.032
Suppose -5*k + 70000 = -12*k. What is k rounded to the nearest one thousand?
-10000
Let v = 67.73 - -0.27. Let i = v - 68.079. Let b = 0.819 + i. Round b to one dp.
0.7
Let d = -0.19 + 0. What is d rounded to 2 dps?
-0.19
Let r = 4346.05 + -4446. Let w = -98 - r. What is w rounded to one dp?
2
Let x = -12.6 - -24.7. Let r = 9.66 - x. What is r rounded to one dp?
-2.4
Let g = 0.119446 - 0.12. What is g rounded to 5 decimal places?
-0.00055
Let r = 77 - 76.01. Round r to 1 dp.
1
Let u = -1.25 + 0. Let k = u - 91.75. Let i = k - -92.999903. Round i to 5 decimal places.
-0.0001
Let u = -32 - -32.0000036. What is u rounded to six decimal places?
0.000004
Let m = -70 + 143. Let f = 73.074 - m. What is f rounded to 2 decimal places?
0.07
Let m(y) = 204*y**3 - 11*y**2 + 5*y + 12. Let s be m(12). Round s to the nearest 10000.
350000
Suppose 4*c + 18402 = -g, -3*c - 8*g + 5*g = 13806. What is c rounded to the nearest 10000?
0
Suppose 5*k = 4*i - 0*k - 370, 3*i + 4*k - 262 = 0. Round i to the nearest 100.
100
Let f = 11 - 7. Let k = 1.4 + f. Round k to 0 decimal places.
5
Let q be 27/(-6)*(-2)/3. Suppose -3*g = q + 12, f = g - 51. What is f rounded to the nearest 10?
-60
Let x = 7 - 5. Suppose -p = x*p. Suppose p = j - 6*j - 320000. What is j rounded to the nearest ten thousand?
-60000
Let b(g) = -9*g**2 + 8*g - 23. Let d(j) = -5*j**2 + 4*j - 11. Let u(l) = -6*b(l) + 11*d(l). Let y be u(-7). Round y to the nearest 10.
0
Let o(l) = 9*l**3 + 2*l**2 + l + 7. Let f be o(-5). Let a = f + 3623. Suppose -5*u = p - 2*p + a, -u + 3*p = 510. What is u rounded to the nearest 100?
-500
Let z = 18.31 + -0.31. Let q = -17.97 + z. What is q rounded to two decimal places?
0.03
Let m be ((-14)/21)/((-2)/3). Let d(q) = -4 + 1001*q + 4 - m. Let s be d(1). Round s to the nearest 10000.
0
Suppose 2*p - 22 = 62. Let r(n) = 29*n**3. Let z be r(-1). Let m = z + p. What is m rounded to the nearest integer?
13
Let i(h) = -h**2 - 7*h + 5. Let v be i(-7). Round v to one dp.
5
Let g = -42795.114 - -42758. Let v = g + 37.753846. Let a = v + -0.64. Round a to five decimal places.
-0.00015
Let s = 3.19 - 2.9. Let j = s + -0.290017. What is j rounded to five dps?
-0.00002
Let m(w) = -2802*w**2 + 2. Let z be m(1). Round z to the nearest one thousand.
-3000
Let z = 52 + -51.99999752. Round z to 7 dps.
0.0000025
Let o = -0.0539947 - -0.054. Round o to six dps.
0.000005
Let g be 2/(0 + 2 + 0). Suppose -d = p - g, 0 = d + 4*d + 10. Let u(o) = 386*o + 2. Let v be u(p). Round v to the nearest one hundred.
1200
Let c = -33887 + 20802. Let j = 6585 + c. Round j to the nearest 1000.
-7000
Let q be 683/2 + (-3)/2. Round q to the nearest one hundred.
300
Let o be (28827/(-12))/(3/12). Let a be (-375)/(2 - o/(-4800)). What is a rounded to the nearest one hundred thousand?
200000
Let r = 25557.427 + -25542. Let y = -0.073 - r. What is y rounded to zero decimal places?
-16
Let j = -2.2 + 0.72. What is j rounded to zero decimal places?
-1
Let m = -0.070009 + 0.07. What is m rounded to six decimal places?
-0.000009
Let i(q) = 1200*q**3 - 6*q - 5. Let p be i(-1). Round p to the nearest 100.
-1200
Let x be 1696/56 + (-2)/7. Let v be ((-16100)/x)/((-1)/3000). Round v to the nearest 100000.
1600000
Let l = 3 - 6. Let n = -5 - l. Let j = n - -6.5. What is j rounded to the nearest integer?
5
Let d = -0.74 - -0.740037. What is d rounded to six decimal places?
0.000037
Let h = 127.75 + -0.75. Let a = 127.0000119 - h. Round a to 6 dps.
0.000012
Let x = -2398 + -2312. What is x rounded to the nearest 100?
-4700
Suppose -s = 2*j - 5800, j - 3507 + 607 = -4*s. Round j to the nearest one thousand.
3000
Let s = 30.00000064 - 30. Round s to 7 dps.
0.0000006
Let n(f) = -43*f**3 - f**2 + f. Let m = 0 + 1. Let q be n(m). Let y be (0 + q)/(3/(-30)). Round y to the nearest 100.
400
Let y = 3870217 - -3781060. Suppose -2056287 = -2*m + y. Let q = m + 846218. Round q to the nearest one million.
6000000
Let y = 6 - 0. Let z = 5.99985 - y. Round z to four decimal places.
-0.0002
Let w = -8 + 4. Let k be ((-750)/w)/((-4)/(-1920)). Round k to the nearest one hundred thousand.
100000
Let o = 25.87229986 - -0.12768914. Let t = o - 26. Round t to five decimal places.
-0.00001
Let i = -56.56506398 + 53.565064. Let z = 3 + i. Round z to 7 dps.
0
Let a(n) = -630000*n**2 - n + 1. Let j be a(1). Round j to the nearest one hundred thousand.
-600000
Let b = -472185 - -2372185. Round b to the nearest one hundred thousand.
1900000
Let o = 236 + -235.9999016. What is o rounded to 5 decimal places?
0.0001
Let n(p) = p**3 + 4*p**2 - 2*p - 5. Let b be n(-4). Suppose -20 = b*h + 2*h, -2*h = 3*t + 3074. Let a = -98 + t. What is a rounded to the nearest 100?
-1100
Let r = -0.155 + -0.004. What is r rounded to two decimal places?
-0.16
Let b = -0.9600235 + 0.96. Round b to 6 dps.
-0.000024
Let t = 14140.058423688 - -96.926378912. Let v = -14264.9848 + t. Let y = v - -28. What is y rounded to 6 dps?
0.000003
Let d be (-1)/2 + 4/((-48)/2802). What is d rounded to the nearest 100?
-200
Let n = -0.04 + 0.03972. What is n rounded to 5 decimal places?
-0.00028
Let n = 0.09 - 0.1. Let k = n + 0.009928. Round k to 5 dps.
-0.00007
Let v = -0.0009351 + 0.0516325. Let t = -3.6503674 + v. Let d = t + 3.6. What is d rounded to four decimal places?
0.0003
Let i be 8/10*(-1 - 4). Let p be (-1359998)/i - (-8)/16. Round p to the nearest 100000.
300000
Suppose 0*j = -j + 1960. What is j rounded to the nearest one hundred?
2000
Let f(v) = 3*v - 1. Let q be f(2). Suppose 2*k - k - 4933979 = -2*x, -q*x = -2*k + 9867913. Let g = -14833969 + k. What is g rounded to the nearest 1000000?
-10000000
Suppose -2*b = -3*b + 25. Round b to the nearest integer.
25
Let w(l) = 4*l**3 + 11*l**2 + 7*l + 12. Let p be w(-12). What is p rounded to the nearest one thousand?
-5000
Let k = -0.13840144 + 0.0784006. Let s = 0.06 + k. What is s rounded to 7 dps?
-0.0000008
Suppose 200 + 374 = 2*v. What is v rounded to the nearest ten?
290
Let a(c) = -c - 3*c + c**2 + c + 0*c**2. Let r be a(3). Suppose -4*j + 3*j - 7000000 = r. Round j to the nearest one million.
-7000000
Let b = -0.22798 + 0.231. What is b rounded to 4 dps?
0.003
Let d = 200.774 - 201. Round d to two decimal places.
-0.23
Let v = -130 - -221. Let a(y) = -1 - v*y**2 - 30*y**2 - 3*y - 1. Let z be a(3). What is z rounded to the nearest one thousand?
-1000
Let c = -1.8 - 0.1. Round c to zero dps.
-2
Let b = 22 + -22.00029. What is b rounded to 4 dps?
-0.0003
Let v = 25.96001197 - 25.96. What is v rounded to six decimal places?
0.000012
Let u = 82.8 + -42.6. Let z = -3 - 44. 