I'm just learning about significant figures (sig figs) in my chemistry class, and I'm confused about the rules. An example to my problem: if I had the following expression: $$\left ( \frac{2.378 - 1.2}{1.03} \right )$$ I've thought of 2 ways to approach this. Which one is correct (or is neither correct)?
Approach 1:
Round each intermediate operation as you go. This is what my textbook does for its examples, but it itself suggests "Approach 2" below. I'm just listing this approach here as an option since addition/subtraction and multiplication/division have their own rules for rounding (hence, maybe do intermediate-operation rounding).
1) Round the subtraction part.
$$\left ( \frac{1.2}{1.03} \right )$$
2) Do the division and round.
$$1.2\,\,\, (2\ \mathrm{sig\ figs})$$
Approach 2:
In actual practice, the book says:
In a series of calculations, carry the extra digits through to the final result, THEN round.
I think it means this:
1) Do the subtraction, but keep the *exact* number while noting that the rounded number was supposed to have 2 sig figs.
$$\left ( \frac{1.178}{1.03} \right )$$
2) Do the division with the exact number and the denominator, and since this step produces the final result, NOW you round, rounding to 2 sig figs per the note in Step 1.
$$1.1\,\,\,(\text{2 sig figs})$$
The problem here is that these two approaches produce 2 different results. So, to repeat, which one is correct (or is it neither)? The textbook doesn't provide an example like this. I found two different websites, but they too conflict with each other.
http://www.occc.edu/kmbailey/chem1115tutorials/Sig_Fig_and_Math_Answers.htm (From the solution to problem #3, I should use "Approach 1".)
http://fabice.com/misc/significant_figures.html (It quotes, "In a composed operation, intermediate results are not rounded." So that means I should use "Approach 2?".)
Compared to the other questions on this forum, this question seems silly, but I find the concept of sig figs important if I want to understand chemistry at all.