d thousand?
700000
Let i = -9.3 + 10. Let w = i - 0.69991. Round w to 4 decimal places.
0.0001
Suppose 4*x + 24 = 3*i, -x = 2*x + i + 5. Let o be ((-6414)/x*-1)/1. Let f = 3348 + o. Round f to the nearest one hundred.
1200
Let u be (-2 - (-60)/8)*2*2. Round u to the nearest ten.
20
Let d = 1810 - -319. Let p = d - -2371. What is p rounded to the nearest one thousand?
5000
Let i(o) = -37*o - 11. Let v be i(-18). Suppose 4*y = -g + 225, -4*y = -5*g + y + 1250. Let d = g - v. Round d to the nearest 100.
-400
Let j(g) = -44*g**3 + 2*g + 2. Let h be j(-2). What is h rounded to the nearest 100?
400
Let v(o) be the first derivative of 270001*o**3/3 - 3*o**2/2 + 2*o - 1. Let j be v(2). What is j rounded to the nearest 100000?
1100000
Let s = -43 + 44.64. Let b = s - 1.7. What is b rounded to one dp?
-0.1
Let l = 0 + -0.2. Let i = 0.5 + l. Let s = 0.3000046 - i. What is s rounded to 6 decimal places?
0.000005
Let d = -45.8 + 11.4. Let h = 38 - 76. Let p = h - d. What is p rounded to 0 decimal places?
-4
Let a = 5 + -5. Suppose 3*s + 5*y - 84025 = a, 113403 = 3*s + y + 29398. Round s to the nearest ten thousand.
30000
Let j(m) = 20001*m**3 + 6*m**2 + 6*m + 5. Let x be j(-5). Round x to the nearest one million.
-3000000
Let d = 653.001169 + -653. Round d to four decimal places.
0.0012
Let p = -8651114018.959996 + 8651133553. Let t = 19534 - p. Let j = -0.04 - t. What is j rounded to five dps?
0
Let m = 2.6 + -2.6034. Round m to three dps.
-0.003
Suppose 3*f = 5*c - 455, -3*c + 780 = -5*f + c. Round f to the nearest one hundred.
-200
Suppose 2*r - 4 = 2. Suppose 0 = 5*f - r*y - 4439 - 4326, -2*f + y = -3505. What is f rounded to the nearest 100?
1800
Suppose 5*m - 33385 = j, -m + 2*m = -3. Round j to the nearest one thousand.
-33000
Let y = -896.5 + 746. Let v = 25.5 + y. Let z = v - -124.999878. What is z rounded to five dps?
-0.00012
Let d = 5960.63 - 5900. Let c = d + -61. Round c to one decimal place.
-0.4
Let r be (2 + (-62654)/(-6))*135. Suppose 0*i + r = 3*s + 3*i, 4*s - 1880010 = 2*i. Round s to the nearest 100000.
500000
Suppose 1284561 = 7*n + 164561. What is n rounded to the nearest 100000?
200000
Let v = -0.09 + -0.05. Let n = 0.13999932 + v. What is n rounded to seven decimal places?
-0.0000007
Let f = 10 + -6. Suppose 0 = -0*a - 5*a + 60. Suppose -2*g + 342 = -2*u - a, 4*u = -f*g + 732. What is g rounded to the nearest one hundred?
200
Let g(y) = -13334*y - 6. Let m = 15 + -21. Let h be g(m). Suppose 0*a = -2*b + 2*a + h, -3*b = 4*a - 120004. What is b rounded to the nearest ten thousand?
40000
Let c = -2 - -4. Suppose -c*r = -j + 327 + 423, 4*r - 3750 = -5*j. Round j to the nearest one hundred.
800
Suppose y + 102457 = -5*c - 242546, -3*c = -y + 206997. Round c to the nearest ten thousand.
-70000
Let b be ((-79)/(-1))/(2/(-2206)). Let w = 42863 - b. What is w rounded to the nearest one hundred thousand?
100000
Let n(m) = 88351*m**3 - m**2 - m - 1. Let f be n(-1). Let h = f + 158352. What is h rounded to the nearest one hundred thousand?
100000
Let x = 7.6 - -0.2. Let z = 4 - x. Let i = -2.7 + z. Round i to 0 dps.
-7
Let z(u) = -u**3 - 6*u**2 + 4. Let i be z(-6). Suppose 3*v + 75959 = i*g, 0 = -v + 2 + 1. Suppose 0 = 3*l + 6992 - g. What is l rounded to the nearest 10000?
0
Let k = 173 - 173.000237. What is k rounded to five dps?
-0.00024
Let s = 9.59488 - 9.6. Round s to 3 decimal places.
-0.005
Suppose 2*q + 394 = -0*j - 5*j, j = -4. Let o = -128 - q. Round o to the nearest ten.
60
Let x(d) be the second derivative of -d**5/5 + 7*d**4/6 - 7*d**3/3 + 4*d**2 - 4*d. Let l be x(9). Round l to the nearest 1000.
-2000
Let n = 29.0000054 - 29. Round n to six dps.
0.000005
Suppose -4*u = 4*t - 48, -t + 15 = 2*u - 2. Let a = -4 + t. Let w(h) = 30999*h + 3. Let l be w(a). Round l to the nearest 10000.
90000
Let h be ((-3)/(-6))/((-1)/(-59399994)). Suppose p + 2*p + n - h = 0, -49499997 = -5*p - n. What is p rounded to the nearest one million?
10000000
Let m = 6 - 8.5. Let i = -3794.06989 - -3791.57. Let o = m - i. What is o rounded to five decimal places?
-0.00011
Let c = -38.255 + 38. Let r = c - -0.35. What is r rounded to two dps?
0.1
Let s = -358.938 - 9.257. Let y = s - -350.19572. Let h = -18 - y. Round h to four dps.
-0.0007
Let k = 2 - 2. Suppose k*r + 2880 = -r. Let z = r + -920. What is z rounded to the nearest one thousand?
-4000
Let g = -164 - -163.999753. What is g rounded to 4 dps?
-0.0002
Let c = 49.000272 - 49. Round c to 5 dps.
0.00027
Let x = 208250029918 - 208249944163.951067. Let g = 85754 - x. Let v = g + 0.049. What is v rounded to 5 dps?
0.00007
Let r = 2.4 + 3.11. What is r rounded to 0 decimal places?
6
Let x = 137.792 - 143.7. Let u = x + 6. Let v = -0.0919953 + u. Round v to six decimal places.
0.000005
Let x = -21.982 + -0.018. Let g = -12 - x. Let q = 10.0062 - g. What is q rounded to 3 dps?
0.006
Let r = 175 + -174.999839. What is r rounded to 5 dps?
0.00016
Let x(u) = 5666*u + 2 - 1316*u + 4101*u. Let o be x(-2). What is o rounded to the nearest 1000?
-17000
Let z = -5 + -4.4. Round z to zero decimal places.
-9
Let c = 1182 - 842. Round c to the nearest one hundred.
300
Suppose u = 3*j - 284, -2*u + j = -0*u + 578. Round u to the nearest one hundred.
-300
Let c(z) = -2*z**2 - 4*z**2 + 22*z**3 - 5 + 2*z - 3*z. Let f be ((-2)/1)/(14/35). Let h be c(f). Round h to the nearest 1000.
-3000
Let s be ((-4)/6)/(1/3). Let j be (-68)/(-3)*(s + 5). Let d = j - 32. Round d to the nearest 10.
40
Let x = 12.969 - 0.099. Let j = 13 - x. Let p = -9.43 + j. Round p to the nearest integer.
-9
Let v = 0.252 - 0.013. What is v rounded to 2 decimal places?
0.24
Let o = -2369946 + 2369926.99981. Let i = o - -19. What is i rounded to 4 decimal places?
-0.0002
Let j = 17 + -6. Let v = j + -4. Let t = 7.12 - v. Round t to one dp.
0.1
Let x = 0.04 - 0.09. Let m = x - -0.04983. Round m to 4 dps.
-0.0002
Let i be (1 + 10*5)*-349. Let z = i - 17201. Round z to the nearest 10000.
-40000
Let h be (2/6)/((-2)/10338). Let o = h + 9323. What is o rounded to the nearest one thousand?
8000
Let g = 1343848.099974 + -1343866.1. Let b = -18 - g. What is b rounded to 5 dps?
0.00003
Let q = -0.086 + -20.114. Let a = q - -18. Round a to zero decimal places.
-2
Let p = 2.39984812 - -23.60014798. Let n = -26 + p. What is n rounded to 6 decimal places?
-0.000004
Let x = -3.9 + 0.9. Let r = -0.16732 - 2.832755. Let o = r - x. Round o to five decimal places.
-0.00008
Let p = 52.96 + -125. Let u = 74 + p. Round u to one dp.
2
Let c = -2.8 + 1.6. Let f = -10.8 + c. Let a = -11.9979 - f. Round a to 3 decimal places.
0.002
Let z = -0.1593 + 0.174. Round z to three decimal places.
0.015
Let d(m) = 2*m**2 + 4*m + 3. Let n be d(-2). Suppose -3*j + 2*p = 2246, 0*j - n*j - 2*p = 2254. Round j to the nearest 100.
-800
Let z = 0.13 + -0.93. Round z to the nearest integer.
-1
Suppose 2*r - 2*j - 1294 = r, -5*r + 5*j = -6460. What is r rounded to the nearest one hundred?
1300
Let b be 1 + 2 + -1 + 0. Suppose 128 = b*s - 4*m, 3*s - 173 = -5*m + 52. Round s to the nearest ten.
70
Let f(u) = -6*u**2 + 2*u**2 + 1 - 3*u + 6*u**2. Let y be f(2). Suppose 5*x + 8431505 = -y*i + 1431511, 0 = 2*x + 5*i + 2799990. Round x to the nearest 1000000.
-1000000
Suppose 2*g + 8359452 = 2*h - g, 2*g = 4*h - 16718912. Let p = h + -2779729. Round p to the nearest 1000000.
1000000
Suppose -4 + 1 = 3*l. Let w(f) = -4*f. Let k be w(l). Let n(d) = 43750*d**2. Let o be n(k). Round o to the nearest one million.
1000000
Let d(r) = -r**3 + 4*r**2 + 4*r + 4. Let w be d(5). Let k be w - (3897*1 + 2). Round k to the nearest one thousand.
-4000
Let h = -28 - -27.66. Round h to 1 dp.
-0.3
Let y = 0.44005 - 0.44. Round y to four dps.
0.0001
Let k be (-5)/((-20)/(-144616))*13. Let i be k/(-10) + 2/(-10). Round i to the nearest 10000.
50000
Let f = 9.434 + -4.633. Let s = 1.141 + -1.24. Let g = s - f. What is g rounded to the nearest integer?
-5
Let c(b) = -9998*b**3 + 3*b**2 - 1. Let w be c(-1). What is w rounded to the nearest 100000?
0
Let u(g) = -5432*g - 4. Let k be u(3). What is k rounded to the nearest 1000?
-16000
Let x = 137 + -47. Round x to the nearest one hundred.
100
Let r = -146.79 + 146. What is r rounded to 1 dp?
-0.8
Let p = -58 + 170. Round p to the nearest ten.
110
Let c = 1.60000116 - 1.6. 