#sig fig in 6.0223010000 x 10-24 = ?
Can someone help me solve this equation showing the steps involved to get the answer?
There are 11 s.f. in the number you posted. Here is a site that helps explain s.f.
http://www.chemteam.info/SigFigs/SigFigs.html
To determine the number of significant figures in a given number, follow these steps:
Step 1: Identify the non-zero digits.
In the number 6.0223010000 x 10^(-24), there are non-zero digits from left to right: 6, 0, 2, 2, 3, 0, 1. These digits are all significant.
Step 2: Determine the leading zeros.
Leading zeros are zeros that appear before any non-zero digits. In this case, the leading zeros are 0s before the digit 6. Leading zeros are not significant.
Step 3: Check the trailing zeros in the decimal part.
Trailing zeros are zeros that appear after all non-zero digits in the decimal part. In this case, there are trailing zeros after the digit 1 at the end of the number. These trailing zeros are significant because they fall after the decimal point.
Step 4: Determine the significance of zeros between non-zero digits.
In this case, there are two zeros between the non-zero digits, specifically between the 2s. These zeros are significant because they are sandwiched between significant non-zero digits.
Step 5: Count all the significant figures.
Adding up all the significant figures determined in the previous steps, we have a total of 8 significant figures in the number 6.0223010000 x 10^(-24).
Therefore, the number 6.0223010000 x 10^(-24) has 8 significant figures.