Answer:
See below
Explanation:
First, you need to know what a significant figure means.
The significant figures in a measurement consist of all the certain digits in one measurement, including one uncertain or estimated digit.
With that being said, the second thing we need to do is to correct the exercise. According to an external source, the exercise is the following:
a) x = 17.2 + 65.18 - 2.4
In this case, we can say that 17.2 and 2.4 has the uncertain digit at the end, but in 65.18 it's the 8. Therefore, when we make the sum of all of this we have:
x = 17.2 + 65.18 - 2.4 = 79.98
The last digit is the uncertain digit, therefore, we won't include this digit. So the final result would have 3 significant figure. However 8 surpass 5, and hence, we should approximate our result. Then our final result is:
x = 80.0
b) x = 13.0217 / 17.10
The last digit of the 13, is the uncertain. So, doing this:
x = 13.0217 / 17.10 = 0.761502924
With the correct significant figure, this would be only 4 so:
x = 0.7615
c) x = (0.0061020)*(2.0092)*(1200.00)
Applying the same principle as before:
x = (0.0061020)*(2.0092)*(1200.00) = 14.712
Hope it helps
