It would be 50.
In rounding up, we add one and truncate the digits after the decimal point.
In rounding down, we just truncate the digits.
http://en.wikipedia.org/wiki/Rounding#Common_method
50
750.4 if rounding to the nearest whole number. 754, if rounding to the nearest 10. 774, if rounding to the nearest 50. 874, if rounding to the nearest 250.
The answer depends on the level of rounding. For example, to the nearest unit (or smaller) the number is rounded to 3,746. To the nearest thousand, to 4,000. To the nearest ten thousand (or larger) it is 0.
rounding numbers is to nearest ten or hundred and compatible numbers are when you can do nearest 5
If you are rounding to the nearest whole number, .9 is rounded to 1.
Estimating sumsUse rounded numbers to estimate sums.Example 1Give an estimate for the sum of 19.61 and 5.07 by rounding to the nearest tenth.Round each number to the nearest tenth.Example 2Estimate the sum of 19.61 + 5.07 by rounding to the nearest whole number.Round each number to a whole number.Estimating differencesUse rounded numbers to estimate differences.Example 3Give an estimate for the difference of 12.356 - 5.281 by rounding to the nearest whole number.Round each number to the nearest whole number.Now subtract.So 12.356 - 5.281 ≈ 7.Estimating productsUse rounded numbers to estimate products.Example 4Estimate the product of 4.7 × 5.9 by rounding to the nearest whole number.Round each number to a whole number.So 4.7 × 5.9 ≈ 30.Again, in decimals, as in whole numbers, if both multipliers end in .5, or are halfway numbers, rounding one number up and one number down will give you a better estimate of the product.Example 5Estimate the product of 7.5 × 8.5 by rounding to the nearest whole number.You can also round the first number down and the second number up and get this estimate.In either case, your approximation will be closer than it would be if you rounded both numbers up, which is the standard rule.Estimating quotientsUse rounded numbers to estimate quotients.Example 6Estimate the quotient of 27.49 ÷ 3.12 by rounding to the nearest whole number.Round each number to the nearest whole number.
750.4 if rounding to the nearest whole number. 754, if rounding to the nearest 10. 774, if rounding to the nearest 50. 874, if rounding to the nearest 250.
982,400 is 982404 rounded to the nearest rounding number.
The answer depends on the level of rounding. For example, to the nearest unit (or smaller) the number is rounded to 3,746. To the nearest thousand, to 4,000. To the nearest ten thousand (or larger) it is 0.
This round to the nearest thousand calculator will help for school students to find the result rounded in thousand numbers. Round to the Nearest Thousand; Rounding Numbers; Round to the Nearest Thousand Calculator . Enter Number. Round Number to Nearest . Given here an online rounding calculator which is used for rounding the numbers to the nearest thousandth number. To round decimal numbers
5000
If rounding to the nearest ten. . . . . . 80,004 If rounding to the nearest 100. . . . . . 80,049 If rounding to the nearest 1,000 . . . . 80,499 If rounding to the nearest 10,000 . . . 84,999
It is rounded to 2.5 or 3 to the nearest whole number.
rounding numbers is to nearest ten or hundred and compatible numbers are when you can do nearest 5
Estimating sumsUse rounded numbers to estimate sums.Example 1Give an estimate for the sum of 19.61 and 5.07 by rounding to the nearest tenth.Round each number to the nearest tenth.Example 2Estimate the sum of 19.61 + 5.07 by rounding to the nearest whole number.Round each number to a whole number.Estimating differencesUse rounded numbers to estimate differences.Example 3Give an estimate for the difference of 12.356 - 5.281 by rounding to the nearest whole number.Round each number to the nearest whole number.Now subtract.So 12.356 - 5.281 ≈ 7.Estimating productsUse rounded numbers to estimate products.Example 4Estimate the product of 4.7 × 5.9 by rounding to the nearest whole number.Round each number to a whole number.So 4.7 × 5.9 ≈ 30.Again, in decimals, as in whole numbers, if both multipliers end in .5, or are halfway numbers, rounding one number up and one number down will give you a better estimate of the product.Example 5Estimate the product of 7.5 × 8.5 by rounding to the nearest whole number.You can also round the first number down and the second number up and get this estimate.In either case, your approximation will be closer than it would be if you rounded both numbers up, which is the standard rule.Estimating quotientsUse rounded numbers to estimate quotients.Example 6Estimate the quotient of 27.49 ÷ 3.12 by rounding to the nearest whole number.Round each number to the nearest whole number.
This depends if you're rounding to the nearest tenth or the nearest whole number. If you're rounding to the nearest tenth, then it would be 10.2. If you're rounding to the nearest whole number, then it would be 10.
If you are rounding to the nearest whole number, .9 is rounded to 1.
If you are rounding to the nearest one, it is 999.5 . If you are rounding to the nearest ten, it is 995. If you are rounding to the nearest hundred, it is 950. If you are rounding to the nearest thousand, it is 500.