Perform the calculation and record the answer with the correct number of significant figures.

Digits from 1 to 9 are always significant and have infinite number of significant figures.
All non-zero numbers are always significant. For example: 664, 6.64 and 66.4 all have three significant figures.
All zeros between the integers are always significant. For example: 5018, 5.018 and 50.18 all have four significant figures.
All zeros preceding the first integers are never significant. For example: 0.00058 has two significant figures.
All zeros after the decimal point are always significant. For example: 2.500, 25.00 and 250.0 all have four significant figures.
All zeroes used solely for spacing the decimal point are not significant. For example: 10000 has one significant figure.

Rule applied for addition and subtraction:

The least precise number present after the decimal point determines the number of significant figures in the answer.

Rule applied for multiplication and division:

In case of multiplication and division, the number of significant digits is taken from the value which has least precise significant digits

This a a problem of subtraction and division.

First, the subtraction is carried out.

[tex]\Rightarow \frac{6.5-6.10}{3.19}=\frac{0.4}{3.19}[/tex]

Here, the least precise number after decimal was 1.

[tex]\Rightarrow \frac{0.4}{3.19}=0.125[/tex]

Here, the least precise number of significant digit is 1. So, the answer becomes 0.1

This a a problem of subtraction, addition and division.

First, the subtraction and addition is carried out.

[tex]\Rightarow \frac{34.123+9.60}{98.7654-9.249}=\frac{43.723}{89.5164}=\frac{43.72}{89.516}[/tex]

Here, the least precise number after decimal in addition are 2 and in subtraction are 3

[tex]\Rightarrow \frac{43.72}{89.516}=0.48840[/tex]

Here, the least precise number of significant digit are 4. So, the answer becomes 0.4884