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45.0300mm has six significant figures. A significant figure is any non-zero digit or any embedded or trailing zero. Leading zeros are not significant.

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There are six significant figures in the measurement of 45.0300 mm. All non-zero digits and zeros between them are significant, as well as any zero to the right of a decimal point.

5 significant figures.

5 of them.

5 of them.

5 of them.

5 of them.

Five

Five

Five

Q: The number of significant figures in the measurement of 45.0300 mm is what?

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The measurement 77.09m has four significant figures.

There are two significant figures in the measurement 210 cm.

The accuracy of the measurement device determines the number of significant figures that should be retained in recording measurements.

the measured quantity with the least number of significant figures. For example, if you multiply a quantity with 3 significant figures by a quantity with 2 significant figures, your result should have 2 significant figures.

The least count of a measuring instrument is the smallest value that can be measured with the instrument. It determines the precision of the measurement. Significant figures, on the other hand, are the digits in a number that carry meaning about the precision of the measurement. The number of significant figures in a measurement is related to the least count of the instrument used to make that measurement.

Related questions

The measurement 77.09m has four significant figures.

There are 4 significant figures in this number.

There are 4 significant figures in this number.

There are two significant figures in the measurement 210 cm.

The number of significant figures should be equal to the significant figures in the least precise measurement.

3 of them.

4 of them.

0.0136

The accuracy of the measurement device determines the number of significant figures that should be retained in recording measurements.

The least number of significant figures in any number of the problem determines the number of significant figures in the answer.

the measured quantity with the least number of significant figures. For example, if you multiply a quantity with 3 significant figures by a quantity with 2 significant figures, your result should have 2 significant figures.

The least number of significant figures in any number of the problem determines the number of significant figures in the answer.