4 of them.
To determine the number of significant figures in the product of 0.1400, 6.02, and (10^{23}), we need to identify the significant figures in each number. The number 0.1400 has four significant figures, 6.02 has three significant figures, and (10^{23}) has one significant figure (as it is a power of ten). The product will have the same number of significant figures as the term with the least significant figures, which is 6.02 with three significant figures. Therefore, the final product will have three significant figures.
Significant figures in a number are all the non-zero digits and zeros between them that are significant for the precision of the measurement. To determine the significant figures in a number, count all the non-zero digits and any zeros between them. Trailing zeros after a decimal point are also significant figures.
There are 3 significant figures in this number.
There are 6 significant figures in this number.
4 significant figures.Zeros are significant if they are between two non-zero numbers, or if they are "trailing" zeros in a number with a decimal point.Eg.0.000047 = 2 significant figures4.7000 = 5 significant figures
The least number of significant figures in any number of the problem determines the number of significant figures in the answer.
The least number of significant figures in any number of the problem determines the number of significant figures in the answer.
3 of them.
To determine the number of significant figures in the number 1.833, we see that it has four significant figures. The number 95.6 has three significant figures. When performing calculations with these numbers, the result should be reported with the least number of significant figures, which in this case is three (from 95.6).
To determine the number of significant figures in the product of 0.1400, 6.02, and (10^{23}), we need to identify the significant figures in each number. The number 0.1400 has four significant figures, 6.02 has three significant figures, and (10^{23}) has one significant figure (as it is a power of ten). The product will have the same number of significant figures as the term with the least significant figures, which is 6.02 with three significant figures. Therefore, the final product will have three significant figures.
In order to determine the number of significant figures in a number, you need to look at the non-zero digits and any zeros between them.
To determine the number of significant figures in the answer to the calculation 65.25 m x 37.4 m, we look at the significant figures of each number. The number 65.25 m has four significant figures, while 37.4 m has three significant figures. The result should be reported with the least number of significant figures, which is three in this case. Therefore, the answer will have three significant figures.
4 of them.
When adding or subtracting measurements, the number of significant figures in the result should match the measurement with the least number of decimal places.
The least number of significant figures in any number of the problem determines the number of significant figures in the answer.
Three - all nonzero numbers are significant.
The proper number of significant figures for 7800 L depends on how the number is presented. If it is written as 7800 with no decimal point, it typically has three significant figures. However, if it were written as 7800. or in scientific notation (e.g., 7.8 × 10³), it would have four significant figures. To determine the exact number of significant figures, additional context or notation is required.