 -0.7342. Round p to 5 dps.
0.00003
Suppose d - 12477 = 6*r, -8*r = -2*d - 10*r + 24940. What is d rounded to the nearest 1000?
12000
Let t = 391 - 390.9913. Let z = t - 0.00868298. What is z rounded to six dps?
0.000017
Let h = -27.8406004 + 27.84. What is h rounded to 4 dps?
-0.0006
Let r(l) = 25*l**2 + 3*l + 8 - 27*l**2 + l. Let a be r(4). Let b be (-6)/a - (-72794)/8. Round b to the nearest one thousand.
9000
Let n = -12.89366 - -12.876. Round n to one dp.
0
Let m = -0.3414 + 0.3414004211. Round m to 6 dps.
0
Let p = 7068859723 - 7068859710.399999116. Let k = -12.6 + p. What is k rounded to 7 dps?
0.0000009
Let w = 610 + -283. Let u = w + -50. Let i = u + -281.07. What is i rounded to one decimal place?
-4.1
Let f = 8.5238 - -389.4712. Let m = f - 398. Round m to 2 dps.
-0.01
Suppose -w = 5*i + 86, 3*w = -i - 41 + 21. Let o(g) = -12*g**2 - 40*g - 437. Let r be o(i). Round r to the nearest 1000.
-3000
Let c = 134789 - 204959. Round c to the nearest one hundred thousand.
-100000
Let z = 86 - 85.94056. Round z to 2 dps.
0.06
Let g = 40731016.22299723 + -40731016. Let v = -0.223 + g. What is v rounded to seven decimal places?
-0.0000028
Let h be ((-2)/(8/(-6)))/(45/120). Suppose 4*z - 3*m - 68730 = -m, 4*z - h*m = 68724. Suppose -4*s + 154816 = -z. Round s to the nearest ten thousand.
40000
Let g = 13629.9518 - 13694.999399. Let x = 185.952837 - g. Let n = x + -251. Round n to five dps.
0.00044
Let n = 5.627 + -5.7. Let l = 1440.388 + -1440.3150093. Let j = n + l. Round j to 6 dps.
-0.000009
Let t = 9093.1 + -3289. Round t to the nearest ten.
5800
Let v = -346.9469604 + 346.95. What is v rounded to three dps?
0.003
Let f = -13109.0114 - -13111. Let n = f - 2.01. Round n to 2 dps.
-0.02
Let z = -0.0061 + -533.5939. Let s = z - -462. Let k = s - -67. Round k to the nearest 10.
0
Let m = -0.087 - -0.192. Let b = 0.1063 - m. Let h = -0.00130498 + b. Round h to 6 dps.
-0.000005
Let h(p) = 131750*p**2 - 2*p + 2. Let s be h(-2). Suppose 0 = 5*d - 637994 - s. Round d to the nearest one hundred thousand.
200000
Let x = -1277 + 1277.009133. Round x to three dps.
0.009
Let d = -74 + 104. Let s be d/(-18) - 65/(-3). Suppose s*j = 16*j - 332000. What is j rounded to the nearest ten thousand?
-80000
Let p = -166.236 - -166. Let b = p - -0.2360159. What is b rounded to six decimal places?
0.000016
Let b be (-27)/((-567)/(-350))*-20571. What is b rounded to the nearest 1000?
343000
Let q = -4836.1793 + 4840. Round q to one dp.
3.8
Let h = -195 + 299. Let f be (-1478)/(-4) + (-260)/h. What is f rounded to the nearest 10?
370
Let t = 335100621 + -335100624.29999254. Let f = t - -3.3. Round f to 6 dps.
0.000007
Let x = 16299518.5554 - 16310510.3424037. Let g = 10991.8 + x. Let p = 0.013 - g. Round p to 6 decimal places.
0.000004
Let i = 26301.0065336 + -26301. Round i to three dps.
0.007
Let h = -35707 + 35707.00131465. Round h to 5 dps.
0.00131
Let t = -0.04907 - 443.15093. Let q = -52.2 - t. Let x = 390.99406 - q. What is x rounded to three dps?
-0.006
Let j(v) = 2930*v**2 - 9*v - 8. Let u be j(2). Let z = 407306 + u. What is z rounded to the nearest ten thousand?
420000
Let d(h) = 98*h**3 - h**2 - 7*h - 7. Let a be d(5). Let x = 6558 - a. Let z be (-4 - -484)/(3/x). Round z to the nearest one hundred thousand.
-900000
Let q = -3588.013744 + 3588. What is q rounded to 3 dps?
-0.014
Let z = 762 - -527. Let y = z - 169. Suppose r - y = -3*r. Round r to the nearest 100.
300
Let y = 726.1552 - 727. What is y rounded to 1 decimal place?
-0.8
Suppose -3*f + 2*o = -3*o - 57, o + 38 = 2*f. Suppose -24*l + 172025 = -f*l + 5*h, -h + 68805 = 2*l. Round l to the nearest ten thousand.
30000
Let j(p) = 8*p - 16 + 24219*p**2 + 7 - 9*p. Let b be j(-8). Suppose 4*i + 2*c = -3100010, -c + b = -2*i - 4*c. Round i to the nearest one hundred thousand.
-800000
Let t = 359876765.9999156 - 359877196. Let d = t - -430. What is d rounded to six decimal places?
-0.000084
Let z(w) = -32908*w**2 - 39*w + 10. Let r(g) = -98726*g**2 - 117*g + 30. Let b(l) = -2*r(l) + 7*z(l). Let c be b(-10). Round c to the nearest one million.
-3000000
Let z = -1.673406 - -1.67. Round z to 4 dps.
-0.0034
Let a = 14065.075 + -14124. What is a rounded to 1 decimal place?
-58.9
Let f = -8919.6745 + 8919. Round f to one dp.
-0.7
Suppose 3 = t + 1. Suppose 4*w = -2*m + 6*m - 10320020, 4*w = -t*m + 5159980. Round m to the nearest one million.
3000000
Let q = -0.066 - -6.316. Let m = 16.5 - q. What is m rounded to 1 decimal place?
10.3
Let l = 520.02491 + -520. What is l rounded to two decimal places?
0.02
Suppose 2*x - 4*p + 6 = 36, -3*x + 3*p + 30 = 0. Suppose 558 = x*r - 52. What is r rounded to the nearest ten?
120
Let l = -0.285 - 93.015. Let m = 99 + l. Let y = m - 7.16. What is y rounded to 1 decimal place?
-1.5
Let x = -32.6 - -31.4764. Let r = -1.437 - x. Round r to two dps.
-0.31
Let q = 0.02298 - -2079.97702. Let h = q - 2080.01437. Round h to 3 decimal places.
-0.014
Let y = -156.229977311 - -156.23. Round y to 7 dps.
0.0000227
Let q = 357 - 392.8. Let x = 35.79896 + q. Round x to four decimal places.
-0.001
Let x = -6246 - -2262. Let z = -3983.999998003 - x. What is z rounded to seven dps?
0.000002
Let c = -32.06477 + 31.62. Round c to 1 dp.
-0.4
Suppose 5*r - 15 = -0*r. Suppose 0 = -4*y + 20, -4*b + r*y + 0*y + 11185 = 0. What is b rounded to the nearest one hundred?
2800
Let r = 58.15236 - -0.50564. Let c = 0.242 + r. Round c to the nearest 10.
60
Let f = -7712.80892 + 7713. Round f to three decimal places.
0.191
Let a = 283726 + -677596. Round a to the nearest 100000.
-400000
Let v = 58.5 - 77. Let h = -6 - v. Round h to zero decimal places.
13
Let s = 0.0844 - -425.9156. Let w = s + -425.999799. Round w to four dps.
0.0002
Suppose 191*f + 26211786 = -47*f - 20631374. Round f to the nearest 100000.
-200000
Let h = 362543 - -1101457. Suppose 0 = -23*m + 15*m - h. Round m to the nearest ten thousand.
-180000
Let r = 3392 + -3249.9. Let j = r + -177. What is j rounded to the nearest integer?
-35
Let z = 119 - 169. Let d = -45 - z. Suppose 5*x - 2665 = 4*r, -584 = r + d*x + 101. Round r to the nearest one hundred.
-700
Let k(j) be the second derivative of -25*j**4/12 - j**3/6 - 39*j**2 - 15*j. Let q be k(27). Round q to the nearest 1000.
-18000
Let d be -1 + (-18)/(-14) + (-340)/1190. Suppose d = 12*h - 493411 + 2714611. Round h to the nearest 10000.
-190000
Let d(m) be the first derivative of 9*m**2 + 3140*m - 23. Let s be d(0). Round s to the nearest 100.
3100
Let w = -13284 - -22489. Let y = w + -16615. Round y to the nearest 100.
-7400
Let w = 26367.0027642 - 26367. What is w rounded to 4 decimal places?
0.0028
Suppose -8017542 = 243*v - 22590009. Round v to the nearest 1000.
60000
Let f(q) = -4231501*q + 20. Let b be f(-2). Suppose 4*o = -o + 46184890. Let m = o + b. Round m to the nearest one million.
18000000
Let q = -493.4 + -94.6. Let h = q + 582.94. Let u = h - -5.0393. What is u rounded to three dps?
-0.021
Let v = 1327.9 + 351.1. Let i = v + -1677.927. Round i to one decimal place.
1.1
Let m = 84460641.143106026 - 84460641. Let d = m + -0.1431. Round d to seven decimal places.
0.000006
Let t = -0.285 - -0.284414. Let g = t + -0.0032. What is g rounded to four dps?
-0.0038
Let t = 0.1 - -3.9. Let i = -15.43 - -12. Let f = i + t. What is f rounded to 1 decimal place?
0.6
Suppose -132*b - 30 = -134*b. Suppose -b = -11*o + 16*o. Let y(s) = 1876660*s - 20. Let i be y(o). What is i rounded to the nearest one million?
-6000000
Suppose 0 = 324*i - 647*i + 345*i + 153406000. Round i to the nearest one million.
-7000000
Let q(y) = -2*y**2 + 2*y + 5. Suppose -4*a = -8 - 0. Let t be q(a). Let h be ((-1526)/3)/7 - t/3. Round h to the nearest 10.
-70
Let h = 398.199981412 + -398.2. What is h rounded to seven dps?
-0.0000186
Let v = -9.93340787 + 9.92901. Let r = -0.0044 - v. Round r to 7 dps.
-0.0000021
Let s be (-1788)/(1*3*(-12)/24). Let f = s + -753. Let n = f + -651. Round n to the nearest 10.
-210
Let j = 576 + -382. Let m = j + -194.00000094. What is m rounded to 7 decimal places?
-0.0000009
Let w = 0.06608 + 0.00578. Round w to two decimal places.
0.07
Let i = -978.994 - -979. Let v = i - 0.0060641. What is v rounded to six dps?
-0.000064
Let l = -54.475 - -91.15. Round l to the nearest ten.
