t is r rounded to the nearest 10000?
320000
Let h = 41404.929734 - 41405. Round h to 4 decimal places.
-0.0703
Let i = 0.015154658 + -94.210910658. Let a = i + 94.2. What is a rounded to 3 decimal places?
0.004
Let p = 315 + -299.7. Let n = p + -15. Let q = 1.55 - n. Round q to 1 decimal place.
1.3
Let x(v) = -39*v + 139 - 50*v + 58*v. Let s be x(47). Round s to the nearest one hundred.
-1300
Let b = 58515940.599513 + -58515914. Let u = b + -26.6. Round u to four dps.
-0.0005
Let u = 103.95 + 6.65. Let p = 559.9 + -592. Let b = p + u. What is b rounded to the nearest ten?
80
Let k be 26549958/5 - (7 - (-333)/(-45)). Suppose 3*g = 2*z - k, -g = g - 5*z + 3539980. What is g rounded to the nearest 1000000?
-2000000
Let b be (-42707720)/550 + (-2)/(-5). What is b rounded to the nearest 1000?
-78000
Let u = -3.43 + -41.57. Let r = -48.42 - u. What is r rounded to one decimal place?
-3.4
Let u = -500187.9 - -499938.3059. Let j = u - -0.0941. What is j rounded to the nearest ten?
-250
Suppose p = -5*a + 3*p + 3496, 2*a - 2*p = 1396. Let h be 44800/(2804/a - 4). Round h to the nearest one million.
8000000
Let y = -72253 + 179417. Suppose -5*j = 9614 - y. What is j rounded to the nearest one thousand?
20000
Let r = -170.4 - -50.9. Let d = r + 119. Round d to the nearest 10.
0
Let b = -3 + -32. Let c = -35 + b. Let j = -69.99983 - c. Round j to four dps.
0.0002
Let n = 0.783483 + -0.7812. What is n rounded to four decimal places?
0.0023
Let b = 167658171 + -167658174.20000323. Let j = -3.2 - b. Round j to 6 decimal places.
0.000003
Let y = -39 + 42. Suppose y*q + 1278 + 36 = -3*m, -447 = q + 4*m. What is q rounded to the nearest ten?
-440
Let f = 1280.0428 + -0.0428. Let t = f - 1279.999999007. Round t to seven dps.
0.000001
Let f = 26709891 - -112437267. Let t = -139147145.3000263 + f. Let a = t - 12.7. Round a to six dps.
-0.000026
Let v = 1486 - 1486.7092. Let p = 1.553 + -0.833. Let y = p + v. What is y rounded to two decimal places?
0.01
Let s = -0.5728 - -1.1138. What is s rounded to one dp?
0.5
Let k = 851782 - 512826. Let a = k - -54544. What is a rounded to the nearest 100000?
400000
Let u(h) = 7890044*h - 880. Let m be u(20). Round m to the nearest 1000000.
158000000
Let n = 0.396 + 0.036. Let v = 0.696 + n. Round v to one dp.
1.1
Let d = 255842999674.599997522 - 255842999959. Let z = 284.4 + d. What is z rounded to 7 decimal places?
-0.0000025
Let d = 447.572068 - 399.71093. Let x = -0.140422 - d. Let w = 48 + x. Round w to four decimal places.
-0.0016
Let y be (4/(-5) - 0)/(6/15). Let d be 1/y - (-7)/((-70)/15). Let c be (10*d)/(2 + (-537)/270). What is c rounded to the nearest 1000?
-2000
Suppose 1 = -4*o + 4*g - 3, -5*g = 2*o + 2. Let h be 22677 + o/(1/(-2)). Let x = h + -72679. What is x rounded to the nearest one hundred thousand?
-100000
Let r = -1.3348 + -0.2969. What is r rounded to two dps?
-1.63
Let h = 0.4301843 - 0.4294. Round h to 5 decimal places.
0.00078
Let x = 1.8495 - -82.1505. Let g = 12328796.00023 - 12328712. Let f = g - x. What is f rounded to 5 dps?
0.00023
Let n = -147.49 + -0.51. Let t = n + 143.11. Let w = t + -50.91. What is w rounded to the nearest ten?
-60
Suppose 76210 = 6*w + 1042. Let x = w - 7065. What is x rounded to the nearest one hundred?
5500
Let t = -23.0387 + 19.98. What is t rounded to two dps?
-3.06
Suppose -k - u = 3*k - 4, -u - 2 = k. Let q(y) = k*y - 14*y**3 - 10 - 22*y**3 + 6*y**2 - 16 + 14. Let a be q(-9). What is a rounded to the nearest one thousand?
27000
Let i = 510.219 - 510. Let r = -0.019 + i. Round r to 1 decimal place.
0.2
Let z = -99 + 65. Let y = z + 33.96. Let v = y - -0.04000064. Round v to 7 decimal places.
0.0000006
Let h = -289.91600056 - -289.93. Let l = 0.056 + -0.07. Let u = l + h. Round u to seven dps.
-0.0000006
Suppose 5*a - 295592 - 509989 + 75581 = 0. Round a to the nearest one thousand.
146000
Let a = 0.6359 + -0.628893. What is a rounded to 4 decimal places?
0.007
Let f = 8294920399704.9999925 + -8294968704784. Let g = f - -48305160. Let j = g - 81. Round j to six decimal places.
-0.000008
Suppose -10*j + 17 = -343. Let a be 12/j - (-64799974)/6 - -2. Suppose -b - 4*b - 26999997 = -3*n, 2*b - 2*n = -a. Round b to the nearest 1000000.
-5000000
Let c = 1.8263934 - 1.8874. Let b = -148.061 - -148. Let i = c - b. Round i to six dps.
-0.000007
Let o = -7.91 - -4.08. Let q = o - -3.8300372. Round q to six decimal places.
0.000037
Let c = -129188 + 253583. Suppose 3*u + 38295 - c = 0. Round u to the nearest ten thousand.
30000
Let d = -5.51693496 + -1128778.69506504. Let m = 1128678.2119922 + d. Let h = m - -106. What is h rounded to six dps?
-0.000008
Suppose -3*l = -5*v - l + 3591498, l - 1 = 0. Round v to the nearest one million.
1000000
Suppose 4*m + 52*h = 47*h - 89327990, 3*h + 111659994 = -5*m. Round m to the nearest 1000000.
-22000000
Let h = 6.249 + 238.591. Let z = -256 + h. Round z to the nearest integer.
-11
Let f(q) = -q**2 - 12*q - 1. Let i be f(-12). Let c be -7 + (-47349970)/5 - i. Round c to the nearest one million.
-9000000
Let k = -513945.17371 - -513948. What is k rounded to 1 decimal place?
2.8
Let w = 15657279.1 + -15657328.1000158. Let o = -0.068 + 49.068. Let l = o + w. What is l rounded to six decimal places?
-0.000016
Let z = 14910776 + -14910778.35000495. Let h = z + 2.35. Round h to 6 decimal places.
-0.000005
Let a = 19420.9971392 - 19421. Round a to four dps.
-0.0029
Let p = -0.282 + 1.282. Let c = -17.02121 + 18.025. Let m = c - p. Round m to 3 dps.
0.004
Let m(q) = -q**2 - q + 3. Let b be m(0). Suppose 5*l + 2*o = -115063171, 4*o + 31865558 = b*l + 100903445. Let v = 41512633 + l. Round v to the nearest 1000000.
19000000
Let x = -8041 + 8041.22535. What is x rounded to two decimal places?
0.23
Let r be -84283 - (24/(-32))/((-2)/(-8)). Round r to the nearest 1000.
-84000
Let f = 55.1 - 318.1. Let g = f + 126. Let s = g + 137.081. Round s to two dps.
0.08
Let k = 8393 - 7958.7. Round k to the nearest 10.
430
Let k(c) be the first derivative of c**4/4 + 13*c**3/3 + 7*c**2/2 - 29*c - 3. Let i = -86 + 73. Let m be k(i). What is m rounded to the nearest 10?
-120
Let y be 18/2 + -45611 + 12/(-4). What is y rounded to the nearest 10000?
-50000
Let p = 13 - 14. Let u be (370/(-25))/(p/4250 + 0). Round u to the nearest 10000.
60000
Let d = 351673881 - 100463881. Round d to the nearest one million.
251000000
Suppose 15*l - 11*l = -36. Let i be 8 + 1/(3/l). Suppose 0 = -i*y + s - 3*s - 45990, -3*y - 27580 = 4*s. What is y rounded to the nearest one thousand?
-9000
Let a = -11676.024 + 11572. Let n = 105 + a. What is n rounded to one dp?
1
Let x be 1 + -1 + (2 - 3 - -3). Suppose -4*h + 4*n - 1077 = -5417, 4340 = 4*h + x*n. Let w = h - 1747. Round w to the nearest one hundred.
-700
Let p(b) = -42*b**2 - 4. Let l be (21/63)/(1/(-3)). Let m be l*5 - (1 + -3). Let q be p(m). What is q rounded to the nearest 10?
-380
Let g = -117.077 - -0.077. Let d = g - -128.2. Let n = 11.199435 - d. Round n to four dps.
-0.0006
Let m be (-6)/4*96/(-144). Let y be (-1980002)/(-15) + m + (-68)/60. Round y to the nearest one hundred thousand.
100000
Let b = -34414789254 - -34414789414.80002311. Let d = -160.8 + b. What is d rounded to six dps?
0.000023
Let p = -0.71699910671 - -526917.21696910671. Let q = -526924 + p. Let h = -7.5 - q. What is h rounded to four dps?
0
Let c = 137 - 136.825. Let r = 0.1654 - c. Round r to 3 dps.
-0.01
Let f = -86.7 + -316.3. Let g = f - -402.9999854. Round g to five decimal places.
-0.00001
Let v(t) = -2*t**2 + t. Suppose 0 = 2*s - 3*l - 8, 4*l = -3*s - 10 - 12. Let k be v(s). Let p be k/(-1 - 4)*110000. What is p rounded to the nearest 100000?
200000
Let y(x) = -x**2 + 2*x + 1. Let m(f) = -65*f**2 - 4*f + 15. Let r(j) = -m(j) - y(j). Let k be r(-5). What is k rounded to the nearest one hundred?
1600
Let i = 21.642 + -21.6434971. Round i to 5 dps.
-0.0015
Let r = 15541.5768 + -15559. Let x = -17.4 - r. What is x rounded to three decimal places?
0.023
Let s = -159427625.51198739 - -159425344.512. Let z = -2281 - s. Round z to 6 dps.
-0.000013
Suppose 0 = -a - 69 + 73. Suppose 13919984 = -4*o + 4*f, a*o - 3*f = -14309999 + 390011. What is o rounded to the nearest 100000?
-3500000
Let v = -0.0465722 + -966734.9534278. Let j = -966736.079766 - v. 