
Let i = 40.552817198 - 40.553. What is i rounded to 5 dps?
-0.00018
Let v = -24510 + 24510.000036398. Round v to 7 decimal places.
0.0000364
Let g = 287.15 + 2.85. Let q = g - 290.0000157. What is q rounded to 6 decimal places?
-0.000016
Let b = -740.85 - -740.47703. What is b rounded to 2 decimal places?
-0.37
Let q(h) = -787*h**3 - 5*h**2 - 26*h - 22. Let u be q(7). Round u to the nearest 1000.
-270000
Let o = 1867.205764 - 1867.2. What is o rounded to four dps?
0.0058
Let b(v) = -7*v - 41. Suppose 5 = -3*k - 3*n - 4, -3 = -k - 3*n. Let j be b(k). Let r be 2/j + -31700006 - -4*1. What is r rounded to the nearest one million?
-32000000
Suppose 174*z - 146521500 = 205*z. Round z to the nearest one million.
-5000000
Let p = 335 + -329. Let m be -4 - ((3 - -2) + (-35394)/p). Round m to the nearest one thousand.
6000
Let k = 6083.556 - 6058. Round k to the nearest ten.
30
Let d = 2758762 + -2758761.3599892. Let z = -0.64 + d. What is z rounded to 6 dps?
0.000011
Let k be (799/(-34))/((6 - 3)/(-186)). Suppose k*b - 1456*b = 351300. Round b to the nearest one hundred thousand.
400000
Let n = -8.1 + 8.0186. Let s = n + 0.082206. What is s rounded to four decimal places?
0.0008
Let p(z) = -5*z**2 - 5*z**2 - 474 - z**2 - 18*z + 391. Let r be p(-5). What is r rounded to the nearest 10?
-270
Let m be -2*30/6*(-18)/2. Suppose -2*u + m = 3*u. Let h be u/(-12)*(-8)/(-3). Round h to the nearest ten.
0
Let o = 106.25272 + -105.92. Round o to 2 decimal places.
0.33
Suppose 0 = -34*n + 43*n - 241181208. Let q = 12607912 - n. Round q to the nearest one million.
-14000000
Let z(r) = -r**3 + 53*r**2 - 11*r - 361. Let n be z(48). Round n to the nearest 1000.
11000
Let s = 151 + -222. Let c = -73 - s. Let p = -1.954 - c. Round p to 2 dps.
0.05
Let x = 38747.617 + -38923.5. Round x to the nearest ten.
-180
Suppose -14 = 3*n + 10. Let g be 33/12 + -2 + 942/n. Let r be (4 - g/(-4))/(2/8). Round r to the nearest 10.
-100
Let n = 5071 + -5070.993867. Round n to 3 decimal places.
0.006
Let n = -422.52 - -422. Let a = 0.519488 + n. What is a rounded to four decimal places?
-0.0005
Let j = -324.5 + 324.5000000248. What is j rounded to 7 decimal places?
0
Let v = 5503.56 - 7723.65. Let t = -2237 - v. Round t to the nearest ten.
-20
Suppose -14*v + 1211844 - 161928 = 0. Let c be (v/15 - (-2)/5)*1154. What is c rounded to the nearest 100000?
5800000
Let d = 6272.000013992 + -6272. What is d rounded to 6 dps?
0.000014
Let b = 4710.15 + -4776. Round b to zero dps.
-66
Let d = -0.0817 - -0.081694288. Round d to 7 decimal places.
-0.0000057
Let u = -6462.81 + 6494.39728. Let s = -31.86 + u. Let m = s - -0.27. Round m to 3 decimal places.
-0.003
Suppose 5*u + 38*y = 35*y + 10687, -4*y + 2151 = u. Round u to the nearest ten.
2140
Let i be ((-9)/6)/((-7)/(-14)). Let p be 541188/(-81) + ((-7)/i - 1). What is p rounded to the nearest 1000?
-7000
Suppose -22604*t + 4375 = -22611*t. Round t to the nearest ten thousand.
0
Let p = -2221200271.91181 - -2183668731.916. Let z = p + 37531356. Let b = -184 - z. Round b to 3 dps.
-0.004
Let w = -49335.0047317 - -49335. Round w to three decimal places.
-0.005
Suppose 2*p - 10 = 2*u, -4*p + 5*p - 2 = 4*u. Let a(f) = 18*f**2 - 3*f + 3. Let v be a(p). Round v to the nearest one hundred.
600
Let w = 10252 - 10251.999974796. What is w rounded to 6 dps?
0.000025
Let d = 22372 - 22342.929. Round d to zero dps.
29
Let d = -231.60000695 + 231.6. What is d rounded to 6 decimal places?
-0.000007
Let q = -35.54 - -3.94. Let v = q + -2.4. Let r = 33.9954 + v. Round r to three dps.
-0.005
Let o = -0.1381 + 0.24476. Round o to 2 dps.
0.11
Let t(f) = 8712654*f - 190. Let j be t(-15). What is j rounded to the nearest one million?
-131000000
Let h = 1220.44 - 1104. What is h rounded to the nearest ten?
120
Let t = 112.1 - 1.1. Let m = t - 110.9999568. What is m rounded to five decimal places?
0.00004
Suppose -5*b + 5 = 0, -3*s + 5*b - 5 + 9 = 0. Suppose s*g - 497 = 5*p + 2*g, -3*g + 291 = -3*p. What is p rounded to the nearest 100?
-100
Let c(g) be the first derivative of 43*g**3 - 2*g**2 + 12*g - 18. Let q be c(6). Let v be q/26 + (-6)/39. What is v rounded to the nearest ten?
180
Suppose 13*v = 62*v + 1993540 - 6762220. Round v to the nearest 10000.
100000
Suppose -4*r + w = r - 8, 5*w - 8 = r. Suppose -n + 3*u - 8*u = -r, -10 = -5*n - 2*u. Let k be 32*(150/12)/(n/(-710)). Round k to the nearest ten thousand.
-140000
Suppose -6*s + 380534080 + 370965848 = 0. Suppose 3*z - 3*n = -z + 167000012, -s = -3*z - 3*n. Round z to the nearest one million.
42000000
Let j = -14095.55643 - -15824.5692. Let t = j + -1729. What is t rounded to 4 decimal places?
0.0128
Let j = 39.8 + -94.8. Let h = j - -55.00000333. What is h rounded to seven decimal places?
0.0000033
Suppose -26 = -9*k + 1. Suppose k*t = -0*x - 4*x + 3879985, 0 = -4*x + 2*t + 3880010. Round x to the nearest 100000.
1000000
Let r = 16851 - 16857.3455. Round r to 1 dp.
-6.3
Let v = -357510 + 61810. Round v to the nearest 10000.
-300000
Let v = -26.9946229 - -0.0062729. Let r = v - -27. Round r to three dps.
0.012
Let i = -216068 + 380232. Let a = 86164 - i. What is a rounded to the nearest one hundred thousand?
-100000
Let c = 16.1073 - 0.1073. Let m = -0.0279868473 - 15.9720127137. Let w = c + m. What is w rounded to seven dps?
0.0000004
Suppose 20716103 = -21*s - 11*s - 24775097. Round s to the nearest 10000.
-1420000
Let b(p) = -162*p**3 - 5*p**2 + 11*p + 1. Let n be b(-8). Suppose -7683 + n = 2*y. Let f = 75427 - y. What is f rounded to the nearest 10000?
40000
Let t = 0.03855 - 3.89155. Let c = t - -0.003. Let j = -5.11 + c. What is j rounded to the nearest integer?
-9
Let q = -156526773.5616103891 + 156523803.56161. Let x = 2970 + q. Round x to seven decimal places.
-0.0000004
Let z be (3 - -1) + (31 - 14). Let n be (-6)/(-14) + (-1)/(z/(-17366991)). What is n rounded to the nearest one hundred thousand?
800000
Let c(x) = -1564000*x**2 - x - 5. Suppose -5*m = j - 4*m + 5, j + 5 = -5*m. Let g be c(j). Round g to the nearest one million.
-39000000
Let n = 22 - 13.96. Let r = 8.040507 - n. Round r to four decimal places.
0.0005
Let q(j) = 42535446*j**2 + 4*j - 2. Let v be q(1). Let l be (((-18)/4)/(-3))/(3/v). Let i = 37767724 - l. Round i to the nearest one million.
17000000
Let d = -6727 - -6745.938. Let l = 0.062 + d. Let j = l - 19.00201. Round j to four dps.
-0.002
Let n = 6882210.2299988 + -6882016.23. Let k = n - 194. Round k to six dps.
-0.000001
Let g(t) = -4617*t**2 - 339*t - 20. Let h be g(-12). Round h to the nearest 100000.
-700000
Let n = 1.061 - -46.639. Let p = n + -47.700000267. What is p rounded to 7 decimal places?
-0.0000003
Let n = -7233.5254 - -7237. Round n to zero dps.
3
Let s be 38/8 + 30/(-40). Let p be 8/(-10) + ((-80)/(-25))/s. Suppose 0 = y - 0*y + 5*q + 47, p = -2*y - 3*q - 80. Round y to the nearest 10.
-40
Let i = 451826 - 452488.322. Let r = 663 + i. Round r to two dps.
0.68
Let n = -68.98 - -310.68. Round n to the nearest 10.
240
Let c(g) be the first derivative of -258056*g**3/3 - 7*g**2 - 68*g - 80. Let d be c(-6). What is d rounded to the nearest one million?
-9000000
Let g = 0.41 - 0.419. Let o = 0.008951 + g. What is o rounded to 5 decimal places?
-0.00005
Let w(b) = -5*b + 102. Let c be w(22). Let j be -40804 - (-4)/(-8)*c. What is j rounded to the nearest 10000?
-40000
Suppose 397 = 2*y - 5*c - 226, -4*c - 304 = -y. Suppose 0 = -3*w + 17 + 4. Suppose w*b - 4*b + y = 0. What is b rounded to the nearest ten?
-110
Let x = -2253120466.99999788 - -2253120293. Let v = 174 + x. Round v to seven dps.
0.0000021
Suppose -2*c + 18 = -50. Suppose c*o = 26*o + 24. Suppose 3 = 3*i, o*k - 3*i = 5*k - 17803. What is k rounded to the nearest 1000?
9000
Let s = -261 + 525. Let h be (s - 15)*(-1 + (-3)/9). Round h to the nearest 10.
-330
Let c = 4.7621647 + -4.763. Round c to four decimal places.
-0.0008
Let c be 6/(-21) - 418/7. Let a(w) = w**3 + w**2 - 30*w + 64. Let k be a(3). Let p be (4/k + (-1116)/c)*-1. What is p rounded to 0 dps?
-19
Suppose -6*y = -y + 10. Let p be (y + 12)*(-20)/(-25). Suppose -f + p*f = -63. What is f rounded to the nearest one hundred?
0
Let p = 258 + -12. Let s = 245.749 - p. Round s to 1 dp.
-0.3
Suppose 0 = -21*p + 11*p + 489090. Let q = p + 27491. 