0016
Let r = -334.0567 - -0.0567. Let i = r + 334.323. Round i to two decimal places.
0.32
Let u = -1.19 + 1.19148. Round u to 4 dps.
0.0015
Let i = -536493361.0000119 + 536493339. Let v = 21.985 - -0.015. Let c = i + v. What is c rounded to 6 decimal places?
-0.000012
Let i = 716 - -284. Let d be ((-90960)/(-1 + -1))/((-12)/i). Round d to the nearest one million.
-4000000
Let k = 38 + -39. Let d be (1 - (-4)/k) + -29970 + -27. Round d to the nearest 100000.
0
Suppose -197639995 = -3*j - a, -3*j - 2*j = 2*a - 329399990. What is j rounded to the nearest one million?
66000000
Suppose -8*o = -11*o. Suppose 2075 = 7*d - 2*d + 5*c, 5*d + 3*c - 2065 = o. What is d rounded to the nearest ten?
410
Let i(q) = -4*q + 17. Let m be i(5). Let d be 0*(1 - m/(-2)). Suppose d*a - 3*a + 87000000 = 0. Round a to the nearest 1000000.
29000000
Let x(i) = 10*i + 5*i + 3 + 9 - 9*i + 27*i**2. Let m be x(6). What is m rounded to the nearest 100?
1000
Suppose -2*x + 2*d + 30 = 0, d + 3 = -5*x + 90. Let p(v) = v**2 + v + 4. Let n be p(3). Let c = n - x. Round c to 0 dps.
-1
Let u = -25.954 - 0.046. Let y = -26.0000289 - u. Round y to 6 decimal places.
-0.000029
Let a = 0.88 + -9.58. Let t = a + 8.699986. Round t to five decimal places.
-0.00001
Let x(g) = 4*g + 64. Let m be x(-16). Suppose m = -6*v + 666 + 594. Round v to the nearest 100.
200
Let z = 61 + -61.02322. Round z to 3 decimal places.
-0.023
Let s = 132361 + -189631. Round s to the nearest ten thousand.
-60000
Let y = 311 + -202. Let u = 1275.2302733 - 1166.230279. Let i = y - u. Round i to 6 decimal places.
0.000006
Let k = -2011.9996035 - -2012. Round k to five decimal places.
0.0004
Let q = 6.42 - -6.72. Let x = q + -13. Let o = x + -0.13938. Round o to four decimal places.
0.0006
Let q = 4816011.50000024 + -4816013.2. Let n = 294 + -295.7. Let h = q - n. Round h to 7 decimal places.
0.0000002
Let c = -1.379 + 1.35988. What is c rounded to three dps?
-0.019
Let f = 265636.73403 - 265646. Let y = f + 9.27. What is y rounded to 4 decimal places?
0.004
Let f = -0.884 + 0.503. Let m = -2.111 - f. Let c = -0.07 + m. Round c to one dp.
-1.8
Let p = 22 + -16.5. Let x = p - -1. Round x to 0 dps.
7
Let v(p) = -2*p**2 + 24*p - 2. Let o be v(12). Let d be 450/(o*1/22). Round d to the nearest one thousand.
-5000
Let j be (-958)/5269 + (-1)/((-11)/(-1111548)). What is j rounded to the nearest one thousand?
-101000
Suppose 26*a + 6*a = 4946560. Round a to the nearest 10000.
150000
Let w = 771.995248 + -772. Round w to 4 dps.
-0.0048
Let z = 1.17433723 - 1.1744. Round z to 6 decimal places.
-0.000063
Let q(k) = 11*k**3 - 7*k**2 + 13*k. Let h be q(14). Suppose 0 = -6*n - h - 38806. What is n rounded to the nearest 1000?
-11000
Let c = 2210.8166 + -2211. Let x = c - -44.1334. Let z = -45 + x. Round z to one dp.
-1.1
Let q = 5284574 + -5284573.88900055. Let v = 0.111 - q. What is v rounded to 7 dps?
0.0000006
Let p = 4152.7 + -3815. Let x = p + -303. What is x rounded to 0 decimal places?
35
Let q = 0.42867331 + -0.4286. What is q rounded to 6 dps?
0.000073
Let w(d) = 16*d**2 - 15*d - 10. Let u = 116 - 96. Let f be w(u). What is f rounded to the nearest 1000?
6000
Suppose -3*z - 6*z = -27. Suppose 4*m + 3*g - 94397 = 0, -2*m + z*g + 47203 = -0*g. What is m rounded to the nearest ten thousand?
20000
Let j = -91026 - -155726. Round j to the nearest one thousand.
65000
Let i = 1.088 + -9.578. Let n = i - -0.59. Round n to the nearest ten.
-10
Let k be (-5)/3*(-3 + -6 + 6). Suppose -k*t - 92400010 = -4*c, -3*c - 2*t + 46199996 = -c. What is c rounded to the nearest 1000000?
23000000
Let z = -4.15 + 4.564. What is z rounded to 2 decimal places?
0.41
Let l = 0.2404595 - 356.2151595. Let f = 10.4 - -345.6. Let y = f + l. What is y rounded to 3 decimal places?
0.025
Suppose -2*l - 658406 = 4*p, -2*p + l + 4*l = 329185. Round p to the nearest ten thousand.
-160000
Let g = -1375 + -2355. Round g to the nearest 100.
-3700
Let a = -301.119 + 303. Round a to one decimal place.
1.9
Suppose -3*i + 5*m = -31, -3*i + 2*i = -3*m - 17. Suppose i*o - 3*o = 26. Let w = -90 - o. What is w rounded to the nearest ten?
-60
Let q(k) be the first derivative of 3783*k**5/40 - k**4/12 + 4*k**3 + 8. Let m(i) be the third derivative of q(i). Let y be m(-2). Round y to the nearest 1000.
-23000
Let w = 15.3 - 15.6245. Let y = w - -0.0275. What is y rounded to two dps?
-0.3
Suppose 4*r = -3*q + 9759, -q = 5*r - 3*q - 12193. Let c = -3459 + r. What is c rounded to the nearest 1000?
-1000
Let s = 7.96 - 8. Let g = s - -0.03. Let t = 0.00997 + g. What is t rounded to four dps?
0
Let s = 6.303 - 5.94. Let c = 26.937 + s. Let m = 27.300151 - c. Round m to 5 dps.
0.00015
Let q = 3012 - 3037.02. Let x = q - -25. Round x to one dp.
0
Let q = -1.198 + 1.64. Round q to 1 decimal place.
0.4
Let k = -2566 - -2502.49. What is k rounded to the nearest 10?
-60
Let s = 52 + -52.074. Let p = s - -0.0677. What is p rounded to 3 dps?
-0.006
Let s = -1934 + 1933.9999922. Round s to six dps.
-0.000008
Let z(n) = -9859*n + 13. Let u be ((-2)/(-4))/(-3 - 86/(-28)). Let l be z(u). What is l rounded to the nearest ten thousand?
-70000
Suppose 97 = -10*t + 347. Suppose t*n = 26*n + 109000. Round n to the nearest ten thousand.
-110000
Let g(o) = 5*o + 17. Let a be g(-3). Let c be (9*-6)/a*300. What is c rounded to the nearest 1000?
-8000
Let t = 46.7531 + -0.1031. Let u = 48 - t. Let n = u + -1.7. Round n to one dp.
-0.4
Let q = 5390 + -5392.367. Let k = -2.3 - q. Round k to 2 decimal places.
0.07
Let k(t) = t**2 + 5*t - 12. Let z be k(-7). Suppose -z*c - 11*c + 6500 = 0. Round c to the nearest 1000.
1000
Let i = 9961 - 6591. Round i to the nearest one hundred.
3400
Let k = 0.0712 - 0.072097. What is k rounded to five decimal places?
-0.0009
Let t = 19 - 18.91. Let y = t - 1.29. Let p = y - -1.1999998. Round p to 7 decimal places.
-0.0000002
Let h = 988.5912 - 988. Let t = h + -0.6. What is t rounded to 3 dps?
-0.009
Let z = 96.7 - 96.699999652. Round z to six decimal places.
0
Let d = -21.1603 - -21.29. Round d to 2 decimal places.
0.13
Suppose 0 = -d - 2*w + 2141, -6*d + 2*w + 8554 = -2*d. What is d rounded to the nearest one hundred?
2100
Let k = -83 + 81. Let d be ((-12)/9)/(0 + k/(-384)). What is d rounded to the nearest 10?
-260
Let x = 79.8 - 79. Let d = 112.7925 - 112. Let b = d - x. Round b to three dps.
-0.008
Let s = -0.375 - 0.512. Round s to one dp.
-0.9
Let j = 3649 - 3706.096. Let o = j + 0.096. Let a = o + 51.7. Round a to 0 dps.
-5
Let s(f) = -1384*f + 406. Let g be s(-6). Round g to the nearest 1000.
9000
Let i be (0 - 28425)/(3 + 369/(-120)). Round i to the nearest 10000.
380000
Suppose -61467 + 5037 = 27*t. Round t to the nearest one thousand.
-2000
Suppose 55*u - 259000 = 54*u. Round u to the nearest ten thousand.
260000
Let w be (-182000020)/35 + 1/(14/8). What is w rounded to the nearest one million?
-5000000
Let b = -676.1091 + 676. What is b rounded to two decimal places?
-0.11
Let z = 0.149143 + -0.15673. What is z rounded to 3 decimal places?
-0.008
Let g = 5.19 + -5.2273. Round g to 3 dps.
-0.037
Let i = 170.83 + 2.17. Let b = -173.00099 + i. Round b to four decimal places.
-0.001
Let w = -105.1 + 105.10000955. Round w to 6 dps.
0.00001
Let k = -118881 + 33781. Round k to the nearest 10000.
-90000
Let a = 5809 - 5808.996151. Round a to four decimal places.
0.0038
Let s(m) = -3568*m**2 + 6*m - 6. Suppose -6*v + 30 = 4*v. Let t be s(v). What is t rounded to the nearest one thousand?
-32000
Let b(y) = -34997*y - 12. Let x(o) = 2*o + 11. Let i be x(-11). Let j be (-18)/(-4) + i/22. Let c be b(j). Round c to the nearest 10000.
-140000
Let s = -120158 + 119599.699. Let d = -558 - s. Round d to two decimal places.
0.3
Suppose 13*l = 8*l + 14200. Suppose l = -29*f + 33*f. Round f to the nearest one hundred.
700
Let f = 68.332 - 68.691832. Let b = f - -3.792692. Let z = b - 3.43. What is z rounded to 4 decimal places?
0.0029
Let f = 575 + -574.99998814. Round f to six dps.
0.000012
Suppose -5*r = -b - 4099977, -2*b + 2*r - 8199998 = 3*r. Let t be 6 - 3 - 1*b. Round t to the nearest one million.
4000000
Let w = 1452307 + -1452306.89900008. Let d = 0.101 - w. Round d to 7 dps.
0.0000001
Suppose -o = 3*f - 3419999, -f = -4*f + 4*o + 3420004. Suppose f = 4*u - u. 