
Let y be 1212459/33 + 8/(-44). Let c = y - 21741. Suppose -4*g = -3*g + c. What is g rounded to the nearest ten thousand?
-20000
Let d = -15394355 + 6694355. Round d to the nearest one million.
-9000000
Let p = 2.987 - 3. What is p rounded to 2 dps?
-0.01
Let q = -192.16 + 3.16. Let i = -189.091 - q. Let o = i + 0.0967. What is o rounded to 3 decimal places?
0.006
Let t = 198345538859128 - 198345280436480.999927. Let l = t - 258422495. Let r = l - 152. Round r to five decimal places.
0.00007
Let h = -79.2 - -53. Round h to zero decimal places.
-26
Let v = 2.8 - 2.8047. Round v to three dps.
-0.005
Suppose -3*p = -6*w + 3*w + 18, -5*p - 5*w - 70 = 0. Let d(n) = n + 12. Let h be d(p). Let t be h/(-9) - 14408/(-36). Round t to the nearest one thousand.
0
Let m = 2009 + -2008.96499. Let q = 0.66531 + m. Let z = -0.7 + q. Round z to 4 decimal places.
0.0003
Let b(a) be the second derivative of 1024999*a**3/6 + 2*a**2 - 7*a. Let n be b(4). What is n rounded to the nearest one million?
4000000
Let h = 130864.4 + -130864.6200076. Let z = h + 0.22. What is z rounded to six decimal places?
-0.000008
Suppose -5925 = -5*n - f, 2*n + 3*f - 1984 = 373. Let s = 1886 - n. Round s to the nearest one thousand.
1000
Suppose 8529 = -a + 2329. What is a rounded to the nearest one thousand?
-6000
Let g = -0.06 - -0.05996. Round g to five dps.
-0.00004
Let s = -0.03 + -29.97. Let a = -29.812 - s. Let q = a + -0.101. What is q rounded to two decimal places?
0.09
Suppose 998378 = 2*y + 9398378. Round y to the nearest one million.
-4000000
Let g = 0.061 + 0.002. Let c = g - 1.693. Let q = 1.8 + c. What is q rounded to one decimal place?
0.2
Let g = -209 - -208.99867. Round g to four decimal places.
-0.0013
Let z = -1.7 - -21.7. Let c = 19.99972 - z. What is c rounded to 4 dps?
-0.0003
Let t = 3.8037 + -4.7. Let r = -1 - -0.1. Let s = t - r. Round s to 3 dps.
0.004
Let o = 0.0444 - 0.052. What is o rounded to three decimal places?
-0.008
Let h = 382331 - 382333.00099. Let d = -2 - h. What is d rounded to four dps?
0.001
Let u = 5.63 - 6. Let s = u + 0.07. Let k = s - -0.29898. Round k to four dps.
-0.001
Let r = 350 - 638. Round r to the nearest ten.
-290
Let x = -0.112 + -51.888. Let p = 53.92 + x. Round p to one decimal place.
1.9
Let f be 2*(-8)/(16/(-105)). What is f rounded to the nearest ten?
110
Let b = -22.9 + 22.9137. What is b rounded to 3 decimal places?
0.014
Let z = 57.9944 - 58. Round z to three decimal places.
-0.006
Let u be -9*(4/(-6))/2. Suppose 9 = u*v - 0*v. Let k be (10000/v)/(3/(-9)). What is k rounded to the nearest one hundred thousand?
0
Let s = -1 - -5. Let v = -16284 + 316284. Suppose 0 = c + s*c - v. Round c to the nearest ten thousand.
60000
Suppose -5*n = -1394 - 30031. Suppose -2*b + 4*w = 160016, -n = -b - 5*w - 86265. What is b rounded to the nearest ten thousand?
-80000
Let w = -6.388 - 0.012. Let q = 5 + w. Round q to zero dps.
-1
Let s = 7.154 + 0.126. Let v = 7 - s. Let m = 0.2800023 + v. What is m rounded to six dps?
0.000002
Let u = 3374 + 5126. Round u to the nearest one thousand.
9000
Let j(y) = -7*y - 1. Let x(w) = w + 1. Let k(a) = -j(a) - 2*x(a). Let u be k(-6). What is u rounded to the nearest 10?
-30
Let x be 122*(-1 + 8/12)*-6. Round x to the nearest 10.
240
Let w = -1 - -1.4. Let d = -0.8 + w. Round d to 1 dp.
-0.4
Let f be ((-1728000)/2)/(1/(100/(-8))). Round f to the nearest 1000000.
11000000
Let y = 3 - -5. Let t = y - 7.7. Round t to one decimal place.
0.3
Let d = 3610500.900054 + -3610506. Let m = 5.1 + d. Round m to 5 decimal places.
0.00005
Let x = -0.1 - 3.4. Let n = -91297 - -91300.49934. Let y = n + x. What is y rounded to 4 dps?
-0.0007
Let z = 0.32798 - -11.66842. Let x = -12 + z. Round x to three decimal places.
-0.004
Let x = 33.589 - -0.511. Round x to zero dps.
34
Let s = 34.99999866 + -35. Round s to six decimal places.
-0.000001
Let v = -0.00099744 + 0.001. Round v to 7 dps.
0.0000026
Suppose -337 = 3*j - 5*o, 3*j - o = -317 - 24. What is j rounded to the nearest 10?
-110
Let p = 37 + -33.6. Let g = -0.6 - p. Let l = 4.000003 + g. What is l rounded to six decimal places?
0.000003
Let l(z) be the second derivative of 283*z**4/6 - z**3/3 - 2*z. Suppose -3*f - 3*b = 21, 5 - 34 = 3*f + 5*b. Let q be l(f). Round q to the nearest 1000.
5000
Let t = -16 + 40.5. What is t rounded to the nearest integer?
25
Let k = 9903353.20000002 - 9903353. Let c = 18 + -17.8. Let n = c - k. Round n to 7 decimal places.
0
Let g = 81.9904 - 82. What is g rounded to 3 dps?
-0.01
Let h be (-1)/(2/(-30) - 0). Let a be 1002 + 5/(h/(-6)). What is a rounded to the nearest 10000?
0
Suppose 18*x - 2*x = 6768000. What is x rounded to the nearest 100000?
400000
Let v = 201.3875 - 199.387507. Let t = -2 + v. Round t to six decimal places.
-0.000007
Suppose -6*t = -5*t - 1590000. Round t to the nearest 100000.
1600000
Suppose -3*j + 4*j + 5*m + 148 = 0, 2*j + 278 = -m. Round j to the nearest 10.
-140
Let b = -15 - -8. Let v = b - -16.3. Let o = -16.9 + v. What is o rounded to the nearest integer?
-8
Let t = -3.103 + 3.1. Round t to 2 decimal places.
0
Let u = 119242 - -968757. Let l = 387999 - u. Round l to the nearest 1000000.
-1000000
Let p = -0.63 + 0.6. Let d = p + -25.97. Let n = -26.21 - d. Round n to 1 dp.
-0.2
Let c = -69140 - -46340. What is c rounded to the nearest 10000?
-20000
Let d = -313 - -222. What is d rounded to the nearest 10?
-90
Let s = 71 + 11. Let g = 54 - s. Let w = g - -27.9966. Round w to three dps.
-0.003
Let n = -2382796195629.22079942 - -2382256955247.2208. Let v = 539240309 + n. Let d = -73 - v. Round d to seven dps.
-0.0000006
Let n(z) = -492592*z**3 - 3*z**2 + 3*z + 2. Let u be n(3). Round u to the nearest one million.
-13000000
Let g = -84.27 + -0.73. Let t = g + 84.949. Round t to two decimal places.
-0.05
Let y be 0 - (-2 + 1 - 148). Suppose -3*k + 0 = -2*z - 7, 2*z = 5*k - 13. Suppose k*h = -0*i + i + y, 2*h = -5*i - 694. What is i rounded to the nearest 100?
-100
Let y = 3.5 + 3.1. Round y to zero dps.
7
Suppose -3*q = -4*q + 4. Let f be 18/10 + q/20. Let k be -1*f*1 - -1522. Round k to the nearest 100.
1500
Let s be (8/(-5))/((-2694)/1350 - -2). What is s rounded to the nearest 10?
-360
Let t = 8.20712 + 0.79304. Let u = -9 + t. Round u to 4 decimal places.
0.0002
Let v = 7.94 + -8. Let u = -0.3719 - -0.4318984. Let g = v + u. Round g to six decimal places.
-0.000002
Let l = -0.691 + 0.6. What is l rounded to two decimal places?
-0.09
Suppose -3*d = -2*k - 8, -5*k = -2*d - d + 29. Round k to the nearest ten.
-10
Let v = 135.06 + -131. Let m = -0.06 + v. Let u = -4.0029 + m. Round u to 3 decimal places.
-0.003
Let i = 222681.04000075 - 222681. Let f = -0.6 + 0.56. Let h = i + f. What is h rounded to 7 dps?
0.0000008
Let g = -13.34 - 3.36. Let l = g - -12.06. Let d = -3.6 - l. What is d rounded to 1 decimal place?
1
Let n(s) = 4*s + 2. Let v be n(-2). Let c be ((-1506)/(-3))/(-4 - v). Round c to the nearest 10.
250
Let x = 223 + -223.97. Round x to one decimal place.
-1
Let p = 711 + -710.9402. What is p rounded to 2 decimal places?
0.06
Let f(z) = z**2 - 3*z + 2. Let x be f(2). Suppose x = 3*n + 2*n + 6500. What is n rounded to the nearest one hundred?
-1300
Let u(i) = -6*i**2 + 3*i - 6. Let c be u(-4). Round c to the nearest 10.
-110
Let s(k) = -k**2 + k - 9900. Let m = 8 + -5. Let p be 0/((2 - m)*2). Let g be s(p). Round g to the nearest one thousand.
-10000
Let w = -39537 - -23837. What is w rounded to the nearest one thousand?
-16000
Let t be 3/8 - 68003/8. Round t to the nearest 1000.
-9000
Suppose -1 = j - 4. Suppose -3*b + 0*b - 1266 = 0. Let w be (-2*j)/(-3) + b. Round w to the nearest one hundred.
-400
Suppose a + 15000000 = 3*a. Round a to the nearest 1000000.
8000000
Let f = -95 + 60. Let j = f - -34.16. Let w = j + -4.26. What is w rounded to 0 dps?
-5
Let c = -19 + 31. Let u = c + -11.9972. Round u to 3 decimal places.
0.003
Let s = 4.225 + -0.025. Let b = 8 - 8.2. Let p = b - s. What is p rounded to 0 dps?
-4
Let a = 0.011 - 26.011. Let f = -1843600701.00000041 - -1843600675. Let r = f - a. What is r rounded to seven dps?
-0.0000004
Let c = 9371.10034 + -9373.5. Let z = c + 2.4. What is z rounded to 4 decimal places?
0.0003
Let k = 184.676 - 181.6. Let u = k - 2.75. Let a = u + -0.26. 