Rounding Numbers (page 1 of 3)

Sections: General rounding, Rounding and significant digits

When you have to round a number, you are usually told how to round it. It's simplest when you're told how many "places" to round to, but you should also know how to round to a named "place", such as "to the nearest thousand" or "to the ten-thousandths place". You may also need to know how to round to a certain number of significant digits; we'll get to that later.

In general, you round to a given place by looking at the digit one place to the right of the "target" place. If the digit is a five or greater, you round the target digit up by one. Otherwise, you leave the target as it is. Then you replace any digits to the right with zeroes (if they are to the left of the decimal point) or else you delete the digits (if they are past the decimal point).

I'll use the first few digits of the decimal expansion of   pi: 3.14159265... in the examples below.

• Round pi to five places.

"To five places" means "to five decimal places". First, I count out the five decimal places, and then I look at the sixth place:

3.14159 | 265...

I've drawn a little line separating the fifth place from the sixth place. This can be a handy way of "keeping your place", especially if you are dealing with lots of digits.

The fifth place has a 9 in it. Looking at the sixth place, I see that it has a 2 in it. Since 2 is less than five, I won't round the 9 up; that is, I'll leave the 9 as it is. In addition, I will delete the digits after the 9. Then pi, rounded to five places, is:

3.14159

• Round pi to four places.

First, I go back to the original number (not the one I just rounded in the previous example). I count off four places, and look at the number in the fifth place:

3.1415 | 9265...

The number in the fifth place is a 9, which is greater than 5, so I'll round up in the fourth place, truncating the expansion at four decimal places. That is, the 5 becomes a 6, the 9265... part disappears, and pi, rounded to four decimal places, is:

3.1416

• Round pi to three places.

First, I go back to the original number (not the one I just rounded in the previous example). I count off three decimal places, and look at the digit in the fourth place:

3.141 | 59265...

The number in the fourth place is a 5, which is the cut-off for rounding: if the number in the next place (after the one you're rounding to) is 5 or greater, you round up. In this case, the 1 becomes a 2, the 59265... part disappears, and pi, rounded to three decimal places, is:

3.142

This rounding works the same way when they tell you to round to a certain named place, such as "the hundredths place". The only difference is that you have to be a bit more careful in counting off the places you need. Just remember that the decimal places count off to the right in the same order as the counting numbers count off to the left. That is, for regular numbers, you have the place values:

...(ten-thousands) (thousands) (hundreds) (tens) (ones)

For decimal places, you don't have a "oneths", but you do have the other fractions:

(decimal point) (tenths) (hundredths) (thousandths) (ten-thousandths)...

• Round pi to the nearest thousandth.

"The nearest thousandth" means that I need to count off three decimal places (tenths, hundredths, thousandths), and then round:

3.141 | 59265...

Then pi, rounded to the nearest thousandth, is 3.142.

• Round 2.796 to the hundredths place.

The hundredths place is two decimal places, so I'll count off two decimal places, and round according to the third decimal place:

2.79 | 6

Since the third decimal place contains a 6, which is greater than 5, I have to round up. But rounding up a 9 gives a 10. In this case, I round the 79 up to an 80:

2.80

You might be tempted to write this as "2.8", but, since you rounded to the hundredths place (to two decimal places), you should write both decimal places. Otherwise, it looks like you rounded to one decimal place, or to the tenths place, and your answer could be counted off as being incorrect.

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 Cite this article as: Stapel, Elizabeth. "Rounding Numbers." Purplemath. Available from     http://www.purplemath.com/modules/rounding.htm. Accessed [Date] [Month] 2014

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