Calculations with significant figures

Calculations with significant figures
So now you know how to determine the number of significant figures in a number and how to round numbers off, what good does that do?

Well, let’s consider the rectangle below. If we want to determine the area of the rectangle, the easiest way would be to measure the length and the height, and then multiply these two numbers together. (For rectangles, Area = Length x Height.)

First let’s measure the length: a correct reading might be something like 36.3 cm (…or 36.2 cm or 36.4 cm) 10 20 30 40 50 cm

Now let’s measure the height: for height, a correct reading might be some thing like 6.7 cm (…or 6.6 cm or cm). 10 cm 20

So let’s multiply these two numbers:

So let’s multiply these two numbers: 36.3 x 6.7 = (and cm x cm = cm2). So we have cm2. But if we state the area to be cm2, we are stating a pretty high level of precision.

But if we say the area is cm2, we are saying we know the area to a very high level of precision.

But if we say the area is cm2, we are saying we know the area to a very high level of precision. We are saying that we are certain of the “ ” and that we are guessing the “1.”

But if 36.2 cm long and 6.6 cm high were also correct measurements, then 36.2 cm x 6.6 cm = cm2 would have to be a correct area for the same rectangle.

But if 36.2 cm long and 6.6 cm high were also correct measurements, then 36.2 cm x 6.6 cm = cm2 would have to be a correct area for the same rectangle. That implies we are certain of the “238.9…” and only guessing the “2.”

And if 36.4 cm long and 6.8 cm high were also correct measurements, then 36.4 cm x 6.8 cm = cm2 would also have to be a correct area for the same rectangle.

And if 36.4 cm long and 6.8 cm high were also correct measurements, then 36.4 cm x 6.8 cm = cm2 would also have to be a correct area for the same rectangle. That implies we are certain of the “247.5…” and only guessing the “2.”

cm2, cm2 and cm2

cm2, cm2 and cm2 These three values cannot all be correct.

cm2, cm2 and cm2 These three values cannot all be correct. The only digit that seems to be definite is the first “2” (in the hundreds place). After that the values are not at all consistent with one another.

This would mean that our guess should be the second digit (in the tens place), and that the values should all be rounded there – to two significant figures.

cm2 rounds to 240 cm cm2 rounds to 240 cm and cm2 rounds to 250 cm2.

240 cm2, 240 cm2 and 250 cm2.

240 cm2, 240 cm2 and 250 cm These are all consistent with one another.

240 cm2, 240 cm2 and 250 cm These are all consistent with one another. They all have two significant figures, and they show disagreement only in the guessed digit.

Is there a way we could have known from the beginning that our answer needed to be rounded to only two significant figures?

If we look at the original measurements that went into the calculation, we see a length of 36.3 cm, which has three significant figures, and a height of 6.7 cm, which has two significant figures.

Imagine there is a chain that is made of only two links, and one link is able to hold 3 kg before it breaks and the other is able to hold 2 kg, how much weight can the entire chain hold? Strong enough to hold 3 kg Strong enough to hold 2 kg

If you are thinking that the chain could hold 5 kg (3 kg + 2 kg), then think again! Strong enough to hold 3 kg Strong enough to hold 2 kg

If you are thinking that the chain could hold 5 kg (3 kg + 2 kg), then think again! The chain would break at its weakest point. And so, as a whole, the chain would only be able to hold 2 kg before it broke. Together only strong enough to hold 2 kg

There is an old expression that says: “A chain is only as strong as its weakest link.”

There is an old expression that says: “A chain is only as strong as its weakest link.” If a chain were made of ten links, and nine of those links could hold 100 kg, but one could only hold 1 kg…

How much weight would the entire chain be able to hold?

How much weight would the entire chain be able to hold? Just 1 kg!

How much weight would the entire chain be able to hold? Just 1 kg! Essentially, the one weak link ruins it for the rest of the links.

The same holds true for calculations involving measurements. Consider the calculation below. 23.40 cm x 0.47 cm x 6.05 cm = precise to 4 significant figures precise to 2 significant figures precise to 3 significant figures

The calculator answer has 6 significant figures. 23.40 cm x 0.47 cm x 6.05 cm = cm3 precise to 4 significant figures precise to 2 significant figures precise to 3 significant figures

The calculator answer has 6 significant figures. But the weakest measurement has only 2 significant figures. 23.40 cm x 0.47 cm x 6.05 cm = cm3 precise to 4 significant figures precise to 2 significant figures precise to 3 significant figures

The calculator answer has 6 significant figures. But the weakest measurement has only 2 significant figures. This means the answer must be rounded to only two significant figures: 67 cm3 23.40 cm x 0.47 cm x 6.05 cm = cm3 precise to 4 significant figures precise to 2 significant figures precise to 3 significant figures

When you report an answer to be something like “ cm3”(just because that is what showed up on your calculator), you are claiming a level of precision much higher than the measurements deserve. 67 cm3 23.40 cm x 0.47 cm x 6.05 cm = cm3 precise to 4 significant figures precise to 2 significant figures precise to 3 significant figures

An answer of cm3 means that the “ ” are definite, and only the “9” is a guess. 67 cm3 23.40 cm x 0.47 cm x 6.05 cm = cm3 precise to 4 significant figures precise to 2 significant figures precise to 3 significant figures

An answer of cm3 means that the “ ” are definite, and only the “9” is a guess. But if the 0.47 cm could have just as easily been read as 0.46 cm, consider how different the answer would be. 67 cm3 23.40 cm x 0.47 cm x 6.05 cm = cm3 precise to 4 significant figures precise to 2 significant figures precise to 3 significant figures

So here is the rule: When multiplying or dividing two or more measurements, always round your answer off to the number of significant figures in the weakest measurement. (The weakest measurement is the one with the fewest significant figures)

So here is the rule: When multiplying or dividing two or more measurements, always round your answer off to the number of significant figures in the weakest measurement. (The weakest measurement is the one with the fewest significant figures) This ensures that your answer will not be any more or less precise than it should be.

If crude measurements were made, then only crude values can be calculated from them. If more precise measurements were made, then more precise values can be calculated.

So let’s say a student is calculating the average speed of a car as it traveled down the road.

So let’s say a student is calculating the average speed of a car as it traveled down the road. Speed is distance divided by time.

So let’s say a student is calculating the average speed of a car as it traveled down the road. Speed is distance divided by time. The student measures the time with a very precise stop watch and records a time of s.

So let’s say a student is calculating the average speed of a car as it traveled down the road. Speed is distance divided by time. The student measures the time with a very precise stop watch and records a time of s. Distance is measured rather crudely: 680 m. 100 200 300 400 500 600 700 800 m

Speed = = = distance time 680 m s 100 200 300 400 500 600 700 800 m

Speed = = = m/s distance time 680 m s 100 200 300 400 500 600 700 800 m

Speed = = = m/s This answer is what appears on the calculator, but it is obviously way too precise. distance time 680 m s 100 200 300 400 500 600 700 800 m

Speed = = = m/s This answer is what appears on the calculator, but it is obviously way too precise. What should it be rounded to? distance time 680 m s 100 200 300 400 500 600 700 800 m

Speed = = = m/s The distance (680 m) has two significant figures distance time 680 m s 100 200 300 400 500 600 700 800 m

Speed = = = m/s The distance (680 m) has two significant figures… and the time ( s) has five significant figures. distance time 680 m s 100 200 300 400 500 600 700 800 m

Speed = = = m/s The distance (680 m) has two significant figures… and the time ( s) has five significant figures. The weaker measurement is the one with just two significant figures... distance time 680 m s 100 200 300 400 500 600 700 800 m

Speed = = = m/s The distance (680 m) has two significant figures… and the time ( s) has five significant figures. The weaker measurement is the one with just two significant figures… so the answer should be rounded to just two sig. figs. distance time 680 m s 100 200 300 400 500 600 700 800 m

Speed = = = m/s The distance (680 m) has two significant figures… and the time ( s) has five significant figures. The weaker measurement is the one with just two significant figures… so the answer should be rounded to just two sig. figs. 4.6 m/s distance time 680 m s 100 200 300 400 500 600 700 800 m

Now try each of the following 20 problems.

Now try each of the following 20 problems. Use a calculator, and then write your answer on paper.

Now try each of the following 20 problems. Use a calculator, and then write your answer on paper. Make sure to round the answer to the correct number of significant figures…

Now try each of the following 20 problems. Use a calculator, and then write your answer on paper. Make sure to round the answer to the correct number of significant figures… …and also make sure to include correct units with each answer.

1) m x 14.8 m =

1) m x 14.8 m = 512 m2

1) m x 14.8 m = 512 m2 The 34.6 m and the 14.8 m both have three significant figures, so the answer is rounded to three significant figures.

2) 67 cm x 38 cm =

2) 67 cm x 38 cm = 2500 cm2

2) 67 cm x 38 cm = 2500 cm2 The 67 cm and the 38 cm both have two significant figures, so the answer must be rounded to two significant figures.

3) m x m =

3) m x m = m2

3) m x m = m2 The m and the m both have two significant figures, so the answer must be rounded to two significant figures.

4) mm x 72.7 mm =

4) mm x 72.7 mm = 2470 mm2

4) mm x 72.7 mm = 2470 mm2 The 34.0 mm and the 72.7 mm both have three significant figures, so the answer is rounded to three significant figures.

5) m x m =

5) m x m = 432.7 m2

5) m x m = 432.7 m2 The m and the m both have four significant figures, so the answer is rounded to four significant figures.

6) 207 m x 64 m =

6) 207 m x 64 m = 13,000 m2

6) 207 m x 64 m = 13,000 m2 The 207 m has three significant figures, but the 64 m has only two. Thus, the answer should be rounded to two significant figures.

7) cm x 0.8 cm =

7) cm x 0.8 cm = 200 cm2

7) cm x 0.8 cm = 200 cm2 The cm has four significant figures, but the 0.8 cm only has one. Thus, the answer must be rounded to just one significant figure.

8) 3.4 m x 16.3 m x 25.7 m =

8) 3.4 m x 16.3 m x 25.7 m = 1400 m3

8) 3.4 m x 16.3 m x 25.7 m = 1400 m3 The 3.4 m has two significant figures, and the 16.3 m and 25.7 m each have three significant figures. Thus, the answer is rounded to just two significant figure.

9) mL x g/mL =

9) mL x g/mL = 4.5 g

9) mL x g/mL = 4.5 g The 0.48 mL has two significant figures, and the cm has four. Thus, the answer is rounded to just two significant figures.

10) m x m =

10) m x m = 306.0 m2

10) m x m = 306.0 m2 The m and the m both have four significant figures, so the answer should have four significant figures. The calculator gives only “306” as the answer. In this situation, the answer must be enhanced up to four significant figures: “306.0”

11) km hr =

11) km hr = 5.47 km/hr

11) km hr = 5.47 km/hr The 17.5 km and the 3.20 hr both have three significant figures, so the answer should have just three significant figures.

12) g - 85 mL =

12) g - 85 mL = 2.8 g/mL

12) g - 85 mL = 2.8 g/mL The g has five significant figures, but the 85 mL has only two. Thus, the answer should have only two significant figures.

13) m m =

13) m m = 3.2 m

13) m m = 3.2 m The 2300 m2 has two significant figures and the 725 m has three. The answer should therefore be rounded to just two significant figures.

14) km hr =

14) km hr = 5.00 km/hr

14) km hr = 5.00 km/hr The 17.5 km and the 3.50 hr both have three significant figures, so the answer should have three significant figures. The calculator gives an answer of simply “5.” So this “5” must be enhanced up to three significant figures: “5.00.”

15) m3 – 7.0 m =

15) m3 – 7.0 m = 4.6 m2

15) m3 – 7.0 m = 4.6 m2 The 32.0 m3 has three significant figures, but the 7.0 m has only two, so the answer should be rounded to just two significant figures.

16) g – mL =

16) g – mL = 1.000 g/mL

16) g – mL = 1.000 g/mL The g and the mL both have four significant figures, so the answer should be rounded to four significant figures.

17) (65 m x 17 m) – 4.83 s =

17) (65 m x 17 m) – 4.83 s = 230 m2/s

17) (65 m x 17 m) – 4.83 s = 230 m2/s The 65 m and 17 m both have two significant figures, and the 4.83 s has three significant figures. Thus the answer should have two significant figures.

18) g – (3.42 cm x 7.61 cm x 0.35 cm) =

18) g – (3.42 cm x 7.61 cm x 0.35 cm) = 6.3 g/cm3

18) g – (3.42 cm x 7.61 cm x 0.35 cm) = 6.3 g/cm3 The g has four significant figures, the 3.42 cm and the 7.61 cm each have three significant figures, but the 0.35 cm has only two significant figures. The answer therefore should be rounded to just two significant figures.

19) 215 cm x 372 cm =

19) 215 cm x 372 cm = 80,000 cm2

19) 215 cm x 372 cm = 80,000 cm2 The 215 cm and the 372 cm both have three significant figures, so the answer should be rounded to three significant figures. 79,980 rounds up to 80,000, which appears to have only one significant figure. A line over the second 0 fixes this problem.

20) m – s =

20) m – s = 20.0 m/s

20) m – s = 20.0 m/s The m has four significant figures and the s has three, so the answer should have three significant figures. The calculator gives an answer of “20”, which has only one significant figure. It must be enhanced to three significant figures: 20.0.

So… How many did you get correct?

So… How many did you get correct? Hopefully this tutorial program has helped you understand how to round off answers for these sort of calculations

It is important to remember that this rule of rounding answers off to the fewest number of significant figures applies only to multiplication and division.

It is important to remember that this rule of rounding answers off to the fewest number of significant figures applies only to multiplication and division. There is a different rule that is used for adding and subtracting...

It is important to remember that this rule of rounding answers off to the fewest number of significant figures applies only to multiplication and division. There is a different rule that is used for adding and subtracting… and that will be the topic of our next tutorial.

So now you know what to do when you multiply and divide measured quantities:

So now you know what to do when you multiply and divide measured quantities: simply round your answer off to the same number of significant figures as there are in the weakest measurement

So now you know what to do when you multiply and divide measured quantities: simply round your answer off to the same number of significant figures as there are in the weakest measurement (weakest meaning fewest number of significant figures).

So now you know what to do when you multiply and divide measured quantities: simply round your answer off to the same number of significant figures as there are in the weakest measurement (weakest meaning fewest number of significant figures). But do addition and subtraction follow the same rule?

So now you know what to do when you multiply and divide measured quantities: simply round your answer off to the same number of significant figures as there are in the weakest measurement (weakest meaning fewest number of significant figures). But do addition and subtraction follow the same rule? Not quite.

In adding and subtracting, you still look for the weakest measurement, but weak is defined differently.

In adding and subtracting, you still look for the weakest measurement, but weak is defined differently. You don’t count significant figures at all.

In adding and subtracting, you still look for the weakest measurement, but weak is defined differently. You don’t count significant figures at all. Instead, you look at what place the guess (the last significant figure) is in.

For example, in g, the guess is the “4” and it is in the tenths place. 1 , . ten-thousands place thousands place hundreds place tens place ones place tenths place hundredths place thousandths place ten-thousandths place

For example, in g, the guess is the “4” and it is in the tenths place. In g, the guess is the “1” and it is in the thousandths place. 1 , . ten-thousands place thousands place hundreds place tens place ones place tenths place hundredths place thousandths place ten-thousandths place

For example, in g, the guess is the “4” and it is in the tenths place. In g, the guess is the “1” and it is in the thousandths place. Between these two measurements, g is the weaker measurement, because its guess is in the higher place. 1 , . ten-thousands place thousands place hundreds place tens place ones place tenths place hundredths place thousandths place ten-thousandths place

And if these two measurements were added together: 138.4 g g

And if these two measurements were added together: 138.4 g g g This is what the calculator would give as the answer.

And if these two measurements were added together: 138.4 g g g This is what the calculator would give as the answer. But it should be rounded at the highest guessed place (the tenths place) .

And if these two measurements were added together: 138.4 g g g This is what the calculator would give as the answer. But it should be rounded at the highest guessed place (the tenths place) . Which would change it to…

And if these two measurements were added together: 138.4 g g 138.7 g This is what the calculator would give as the answer. But it should be rounded at the highest guessed place (the tenths place) . Which would change it to…

And if these two measurements were added together: 138.4 g g g The reason is this: starting at the left-hand side of the calculator answer:

And if these two measurements were added together: 138.4 g g g The reason is this: starting at the left-hand side of the calculator answer: The “1” in the hundreds place is definite because it comes from the definite “1” above it.

And if these two measurements were added together: 138.4 g g g The same holds true for the “3” in the tens place.

And if these two measurements were added together: 138.4 g g g The same holds true for the “3” in the tens place. And for the “8” in the ones place.

And if these two measurements were added together: 138.4 g g g The same holds true for the “3” in the tens place. And for the “8” in the ones place. But think about the “6” in the tenths place…

And if these two measurements were added together: 138.4 g g g The same holds true for the “3” in the tens place. And for the “8” in the ones place. But think about the “6” in the tenths place… It came from adding a definite “2” from to a guessed “4” from

And if these two measurements were added together: 138.4 g g g The same holds true for the “3” in the tens place. And for the “8” in the ones place. But think about the “6” in the tenths place… It came from adding a definite “2” from to a guessed “4” from If the “4” could have been read as a “3” instead, that would have changed the “6” to a “5.”

And if these two measurements were added together: 138.3 g g g The same holds true for the “3” in the tens place. And for the “8” in the ones place. But think about the “6” in the tenths place… It came from adding a definite “2” from to a guessed “4” from If the “4” could have been read as a “3” instead, that would have changed the “6” to a “5.”

And if these two measurements were added together: 138.4 g g g The same holds true for the “3” in the tens place. And for the “8” in the ones place. But think about the “6” in the tenths place… It came from adding a definite “2” from to a guessed “4” from If the “4” could have been read as a “3” instead, that would have changed the “6” to a “5.” This “6” therefore cannot be considered definite.

And if these two measurements were added together: 138.4 g g g The same holds true for the “3” in the tens place. And for the “8” in the ones place. But think about the “6” in the tenths place… It came from adding a definite “2” from to a guessed “4” from If the “4” could have been read as a “3” instead, that would have changed the “6” to a “5.” This “6” therefore cannot be considered definite. And if the “6” is indefinite (guessed), then the answer has to end there.

And if these two measurements were added together: 138.4 g g g Since the “6” is followed by an “8,” it rounds up, giving us…

And if these two measurements were added together: 138.4 g g 138.7 g Since the “6” is followed by an “8,” it rounds up, giving us…

Let’s try another problem: 315,600 cm + 219 cm

Let’s try another problem: 315,600 cm + 219 cm 315,819 cm

Let’s try another problem: 315,600 cm + 219 cm 315,819 cm This is the calculator answer,

Let’s try another problem: 315,600 cm + 219 cm 315,819 cm This is the calculator answer, but let’s consider where the guesses are.

Let’s try another problem: 315,600 cm + 219 cm 315,819 cm This is the calculator answer, but let’s consider where the guesses are. The “6” in “315,600 cm” is in the hundreds place and the “9” in “219 cm” is in the ones place.

Let’s try another problem: 315,600 cm + 219 cm 315,819 cm This is the calculator answer, but let’s consider where the guesses are. The “6” in “315,600 cm” is in the hundreds place and the “9” in “219 cm” is in the ones place. Since we have to round the answer off at the highest guessed place (the hundreds place),

Let’s try another problem: 315,600 cm + 219 cm 315,819 cm This is the calculator answer, but let’s consider where the guesses are. The “6” in “315,600 cm” is in the hundreds place and the “9” in “219 cm” is in the ones place. Since we have to round the answer off at the highest guessed place (the hundreds place), the answer becomes…

Let’s try another problem: 315,600 cm + 219 cm 315,800 cm This is the calculator answer, but let’s consider where the guesses are. The “6” in “315,600 cm” is in the hundreds place and the “9” in “219 cm” is in the ones place. Since we have to round the answer off at the highest guessed place (the hundreds place), the answer becomes…

Let’s try another problem: 34.75 s s s

Let’s try another problem: 34.75 s s s The fact that there are three numbers being added together does not change anything.

Let’s try another problem: 34.75 s s s s

Let’s try another problem: 34.75 s s s s Again, this is the calculator answer,

Let’s try another problem: 34.75 s s s s Again, this is the calculator answer, but let’s consider the guesses:

Let’s try another problem: 34.75 s s s s Again, this is the calculator answer, but let’s consider the guesses: The “5” (in the hundredths place), the “8” (in the thousandths place) and the “6” (in the tenths place) are the three guesses.

Let’s try another problem: 34.75 s s s s Again, this is the calculator answer, but let’s consider the guesses: The “5” (in the hundredths place), the “8” (in the thousandths place) and the “6” (in the tenths place) are the three guesses. The highest guessed place is the tenths place so this is where the answer needs to be rounded.

Let’s try another problem: 34.75 s s s s Again, this is the calculator answer, but let’s consider the guesses: The “5” (in the hundredths place), the “8” (in the thousandths place) and the “6” (in the tenths place) are the three guesses. The highest guessed place is the tenths place so this is where the answer needs to be rounded. This gives and answer of…

Let’s try another problem: 34.75 s s s 147.4 s Again, this is the calculator answer, but let’s consider the guesses: The “5” (in the hundredths place), the “8” (in the thousandths place) and the “6” (in the tenths place) are the three guesses. The highest guessed place is the tenths place so this is where the answer needs to be rounded. This gives and answer of…

Let’s try word problem:

Let’s try word problem: A construction crane weighs 197,000 kg.

Let’s try word problem: A construction crane weighs 197,000 kg. The crane operator sticks his chewed gum under the seat.

Let’s try word problem: A construction crane weighs 197,000 kg. The crane operator sticks his chewed gum under the seat. The gum weighs kg.

Let’s try word problem: A construction crane weighs 197,000 kg. The crane operator sticks his chewed gum under the seat. The gum weighs kg. How much does the crane weigh now?

Let’s try word problem: A construction crane weighs 197,000 kg. The crane operator sticks his chewed gum under the seat. The gum weighs kg. How much does the crane weigh now? 197,000 kg kg The set-up for this problem would look like this:

Let’s try word problem: A construction crane weighs 197,000 kg. The crane operator sticks his chewed gum under the seat. The gum weighs kg. How much does the crane weigh now? 197,000 kg kg The set-up for this problem would look like this: And the calculator answer would be:

Let’s try word problem: A construction crane weighs 197,000 kg. The crane operator sticks his chewed gum under the seat. The gum weighs kg. How much does the crane weigh now? 197,000 kg kg 197, kg The set-up for this problem would look like this: And the calculator answer would be:

Let’s try word problem: A construction crane weighs 197,000 kg. The crane operator sticks his chewed gum under the seat. The gum weighs kg. How much does the crane weigh now? 197,000 kg kg 197, kg But let’s consider where the guesses are:

Let’s try word problem: A construction crane weighs 197,000 kg. The crane operator sticks his chewed gum under the seat. The gum weighs kg. How much does the crane weigh now? 197,000 kg kg 197, kg But let’s consider where the guesses are: The “7” (in the thousands place), and the “8” (in the thousandths place) are the two guesses.

Let’s try word problem: A construction crane weighs 197,000 kg. The crane operator sticks his chewed gum under the seat. The gum weighs kg. How much does the crane weigh now? 197,000 kg kg 197, kg But let’s consider where the guesses are: The “7” (in the thousands place), and the “8” (in the thousandths place) are the two guesses. The highest guessed place is clearly the thousands place…

Let’s try word problem: A construction crane weighs 197,000 kg. The crane operator sticks his chewed gum under the seat. The gum weighs kg. How much does the crane weigh now? 197,000 kg kg 197, kg But let’s consider where the guesses are: The “7” (in the thousands place), and the “8” (in the thousandths place) are the two guesses. The highest guessed place is clearly the thousands place… So the answer rounds to…

Let’s try word problem: A construction crane weighs 197,000 kg. The crane operator sticks his chewed gum under the seat. The gum weighs kg. How much does the crane weigh now? 197,000 kg kg But let’s consider where the guesses are: The “7” (in the thousands place), and the “8” (in the thousandths place) are the two guesses. The highest guessed place is clearly the thousands place… So the answer rounds to…

Let’s try word problem: A construction crane weighs 197,000 kg. The crane operator sticks his chewed gum under the seat. The gum weighs kg. How much does the crane weigh now? 197,000 kg kg This might seem strange at first:

Let’s try word problem: A construction crane weighs 197,000 kg. The crane operator sticks his chewed gum under the seat. The gum weighs kg. How much does the crane weigh now? 197,000 kg kg This might seem strange at first: we started with 197,000 kg, added something to it and ended up with the same mass: 197,000 kg.

Let’s try word problem: A construction crane weighs 197,000 kg. The crane operator sticks his chewed gum under the seat. The gum weighs kg. How much does the crane weigh now? 197,000 kg kg This might seem strange at first: we started with 197,000 kg, added something to it and ended up with the same mass: 197,000 kg. But this should make sense since what we are adding is so tiny.

Let’s try word problem: A construction crane weighs 197,000 kg. The crane operator sticks his chewed gum under the seat. The gum weighs kg. How much does the crane weigh now? 197,000 kg kg This might seem strange at first: we started with 197,000 kg, added something to it and ended up with the same mass: 197,000 kg. But this should make sense since what we are adding is so tiny. When a bucket-full of water has one more drop added to it… it’s still just a bucket-full of water!

How about subtraction:

How about subtraction: Joey’s best time in the 200 m was s.

How about subtraction: Joey’s best time in the 200 m was s. He buys new shoes guaranteed to shave 0.2 s off his time.

How about subtraction: Joey’s best time in the 200 m was s. He buys new shoes guaranteed to shave 0.2 s off his time. With the new shoes, what should his best time be?

How about subtraction: Joey’s best time in the 200 m was s. He buys new shoes guaranteed to shave 0.2 s off his time. With the new shoes, what should his best time be? 21.43 s - 0.2 s The set-up for this problem would look like this:

How about subtraction: Joey’s best time in the 200 m was s. He buys new shoes guaranteed to shave 0.2 s off his time. With the new shoes, what should his best time be? 21.43 s - 0.2 s The set-up for this problem would look like this: And the calculator answer would be…

How about subtraction: Joey’s best time in the 200 m was s. He buys new shoes guaranteed to shave 0.2 s off his time. With the new shoes, what should his best time be? 21.43 s - 0.2 s 21.23 s The set-up for this problem would look like this: And the calculator answer would be…

How about subtraction: Joey’s best time in the 200 m was s. He buys new shoes guaranteed to shave 0.2 s off his time. With the new shoes, what should his best time be? 21.43 s - 0.2 s 21.23 s But let’s consider where the guesses are:

How about subtraction: Joey’s best time in the 200 m was s. He buys new shoes guaranteed to shave 0.2 s off his time. With the new shoes, what should his best time be? 21.43 s - 0.2 s 21.23 s But let’s consider where the guesses are: The “3” (in the hundredths place) and the “2” (in the tenths place) are our two guesses.

How about subtraction: Joey’s best time in the 200 m was s. He buys new shoes guaranteed to shave 0.2 s off his time. With the new shoes, what should his best time be? 21.43 s - 0.2 s 21.23 s But let’s consider where the guesses are: The “3” (in the hundredths place) and the “2” (in the tenths place) are our two guesses. The highest guessed place is the tenths place

How about subtraction: Joey’s best time in the 200 m was s. He buys new shoes guaranteed to shave 0.2 s off his time. With the new shoes, what should his best time be? 21.43 s - 0.2 s 21.23 s But let’s consider where the guesses are: The “3” (in the hundredths place) and the “2” (in the tenths place) are our two guesses. The highest guessed place is the tenths place so that is where our answer should be rounded. Giving us…

How about subtraction: Joey’s best time in the 200 m was s. He buys new shoes guaranteed to shave 0.2 s off his time. With the new shoes, what should his best time be? 21.43 s - 0.2 s 21.2 s But let’s consider where the guesses are: The “3” (in the hundredths place) and the “2” (in the tenths place) are our two guesses. The highest guessed place is the tenths place so that is where our answer should be rounded. Giving us…

Now try each of the following 10 problems.

Now try each of the following 10 problems. Use a calculator, and then write your answer on paper. Make sure to round the answer at the correct place…

Now try each of the following 10 problems. Use a calculator, and then write your answer on paper. Make sure to round the answer at the correct place… …and also make sure to include correct units with each answer.

1) cm cm =

1) cm cm = 21.15 cm

1) cm cm = 21.15 cm The guesses are the “3” (in the thousandths place) and the “1” (in the hundredths place), so the answer must be rounded at the hundredths place.

1) cm cm = 21.15 cm Note that the units simply match the units in the two measurements being added. That is always the case for addition and subtraction.

2) 285 g – 17 g =

2) 285 g – 17 g = 268 g

2) 285 g – 17 g = 268 g The guesses are the “5” (in the ones place) and the “7” (also in the ones place), so the answer must be rounded at the ones place.

2) 285 g – 17 g = 268 g Actually, the calculator answer already ended in the ones place, so no rounding was really necessary.

2) 285 g – 17 g = 268 g Actually, the calculator answer already ended in the ones place, so no rounding was really necessary. That happens quite often in addition and subtraction: the calculator answer just happens to be the correct answer!

7.5 m m m =

7.5 m m m = 25.2 m

7.5 m m m = 25.2 m The guesses are the “5” (in the tenths place), the “2” (in the hundredths place) and the “3” (in the tenths place), so the answer must be rounded at the tenths place.

4) mg – mg =

4) mg – mg = 1.7 mg

4) mg – mg = 1.7 mg The guesses are the “8” (in the hundredths place), the “9” (in the tenths place), so the answer must be rounded at the tenths place.

5) 6.45 g g =

5) 6.45 g g = 15.77 g

5) 6.45 g g = 15.77 g The guesses are the “5” (in the hundredths place) and the “2” (also in the hundredths place).

5) 6.45 g g = 15.77 g The guesses are the “5” (in the hundredths place) and the “2” (also in the hundredths place). The calculator answer already ends in the hundredths place so it is correct as it is.

6) L – L =

6) L – L = 27.0 L

6) L – L = 27.0 L The guesses are the “4” (in the tenths place) and the other “4” (also in the tenths place). So the answer should end in the tenths place.

6) L – L = 27.0 L The guesses are the “4” (in the tenths place) and the other “4” (also in the tenths place). So the answer should end in the tenths place. The calculator just gives “27” as an answer, so here you have to enhance it up to “27.0”

7) 130 g g g

7) 130 g g g 800 g

7) 130 g g g 800 g The guesses are the “3” (in the tens place), the “2” (in the hundreds place) and the “9” (in the ones place). So the answer should end in the hundreds place.

8) 130 g g g

8) 130 g g g 820 g

8) 130 g g g 820 g The guesses are the “3” (in the tens place), the “0” (in the tens place) and the “9” (in the ones place). So the answer should end in the tens place this time.

9) 61.7 cm x 9.2 cm =

9) 61.7 cm x 9.2 cm = 570 cm2

9) 61.7 cm x 9.2 cm = 570 cm2 This is a multiplication problem, and follows a different rule. Don’t look for where the guesses are. Just count how many significant figures there are in each measurement. (Remember???)

9) 61.7 cm x 9.2 cm = 570 cm2 The 61.7 cm has three significant figures, and the 9.2 cm has just two. Thus, the answer is rounded to just two significant figure.

10) 553 cm cm =

10) 553 cm cm = 570 cm

10) 553 cm cm = 570 cm The guesses are the “3” (in the ones place) and the “7” (in the hundredths place). So the answer should end in the ones place.

10) 553 cm cm = 570 cm The calculator gives an answer of “ ” The “9” would round up to give an answer of “570,” but this appears to end in the tens place. To show the “0” is significant, we put a line over it.

Well, hopefully these tutorials have proved helpful in teaching you how to round answers when you are doing calculations with measurements:

Well, hopefully these tutorials have proved helpful in teaching you how to round answers when you are doing calculations with measurements: -- When multiplying and dividing, always round your answer off to the fewest number of significant figures.

Well, hopefully these tutorials have proved helpful in teaching you how to round answers when you are doing calculations with measurements: -- When multiplying and dividing, always round your answer off to the fewest number of significant figures. -- When adding and subtracting, always round your answer off at the highest guessed place.

Calculations with significant figures

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Calculations with significant figures

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