Notice the difference between the two rules. When you add or subtract, you assign significant figures in the answer based on the number of decimal places in each original measurement. When you multiply or divide, you assign significant figures in the answer based on the smallest number of significant figures from your original set of measurements.
Tip: Caught up in the breathless drama of arithmetic, you may sometimes perform multi-step calculations that include addition, subtraction, multiplication, and division, all in one go. No problem. Follow the normal order of operations, doing multiplication and division first, followed by addition and subtraction. At each step, follow the simple significant-figure rules, and then move on to the next step.
Rounding off numbers
Sometimes you have to round numbers at the end of a measurement to account for significant figures. Here are a couple of very simple rules to follow and remember:
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Rule 1: If the first number to be dropped is 5 or greater, drop it and all the numbers that follow it, and increase the last retained number by 1.
For example, suppose that you want to round off 237.768 to four significant figures. You drop the 6 and the 8. The 6, the first dropped number, is greater than 5, so you increase the retained 7 to 8. Your final answer is 237.8.
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Rule 2: If the first number to be dropped is less than 5, drop it and all the numbers that follow it, and leave the last retained number unchanged.
If you’re rounding 2.35427 to three significant figures, you drop the 4, the 2, and the 7. The first number to be dropped is 4, which is less than 5. The 5, the last retained number, stays the same. So you report your answer as 2.35.
Examples
Q. Express the following sum with the proper number of significant figures:
A. 671.1 miles. Adding the three values yields a raw sum of 671.05 miles. However, the 35.7 miles measurement extends only to the tenths place. Therefore, you round the answer to the tenths place, from 671.05 to 671.1 miles.
Q. Express the following product with the proper number of significant figures:
A.
Practice Questions
1. Express the answer to this calculation using the appropriate number of significant figures:
2. Express the answer to this calculation using the appropriate number of significant figures:
3. Report the difference using the appropriate number of significant figures:
4. Express the answer to this multi-step calculation using the appropriate number of significant figures:
Practice Answers
1. 114.36 seconds. The trick here is remembering to convert all measurements to the same power of 10 before comparing decimal places for significant figures. Doing so reveals that
2.
The raw calculation yields 4,147.2 inches, which rounds properly to four significant figures as 4,147 inches, or
3. –0.009 minutes. Here, it helps here to convert all measurements to the same power of 10 so you can more easily compare decimal places in order to assign the proper number of significant figures. Doing so reveals that
4. 2.80 feet. Following standard order of operations, you can do this problem in two main steps.
Following the rules of significant-figure math, the first step yields
After completing the first step, divide by 10.0 feet to finish the problem:
You write the answer with three sig figs because the measurement 10.0 feet contains three sig figs, which is the smallest available between the two numbers.
Chapter 2
Using and Converting Units
In This Chapter
▶ The SI system, base units, and prefixes
▶ Creating derived units and examining density
▶ How to use conversion factors
▶ Solving with the factor label method
Have you ever been asked for your height in centimeters, your weight in kilograms, or the speed limit in kilometers per hour? These measurements may seem a bit odd to those folks who are used to feet, pounds, and miles per hour, but the truth is that scientists sneer at feet, pounds, and miles. Because scientists around the globe constantly communicate numbers to each other, they prefer a highly systematic, standardized system. The International System of Units, abbreviated SI from the French term Système International, is the unit system of choice in the scientific community.
In this chapter, you find that the SI system offers a very logical and well-organized set of units. Scientists, despite what many of their hairstyles may imply, love logic and