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9 × 100 = 37 x 9 × 100 37 = x Divide both sides by 37 900 37 = x Multiply 24 x Divide

The answer, rounded, is the same.

Multiplying and dividing by tens

In many fields, especially in the sciences, it is common to multiply decimals by powers of 10. Let’s see what happens when we multiply 1.9436 by some powers of 10.

1.9436 ( 10 ) = 19.436 1.9436 ( 100 ) = 194.36 1.9436 ( 1000 ) = 1943.6

The number of places that the decimal point moves is the same as the number of zeros in the power of ten. [link] summarizes the results.

Multiply by Zeros Decimal point moves . . .
10 1 1 place to the right
100 2 2 places to the right
1,000 3 3 places to the right
10,000 4 4 places to the right

We can use this pattern as a shortcut to multiply by powers of ten instead of multiplying using the vertical format. We can count the zeros in the power of 10 and then move the decimal point that same number of places to the right.

So, for example, to multiply 45.86 by 100, move the decimal point 2 places to the right.

An equation reads 45.86 × 100 = 4586. An arrow shows the decimal point moving two places to the right.

Sometimes when we need to move the decimal point, there are not enough decimal places. In that case, we use zeros as placeholders. For example, let’s multiply 2.4 by 100. We need to move the decimal point 2 places to the right. Since there is only one digit to the right of the decimal point, we must write a 0 in the hundredths place.

An equation reads 2.4 × 100 = 240. An arrow shows the decimal point moving two places to the right.

When dividing by powers of 10, simply take the opposite approach and move the decimal to the left by the number of zeros in the power of ten.

Let’s see what happens when we divide 1.9436 by some powers of 10.

1.9436 ÷ 10 = 0.19436 1.9436 ÷ 100 = 0.019436 1.9436 ÷ 1000 = 0.0019436

If there are insufficient digits to move the decimal, add zeroes to create places.

Scientific notation

Scientific notation is used to express very large and very small numbers as a product of two numbers. The first number of the product, the digit term, is usually a number not less than 1 and not greater than 10. The second number of the product, the exponential term, is written as 10 with an exponent. Some examples of scientific notation are given in [link] .

Standard Notation Scientific Notation
1000 1 × 10 3
100 1 × 10 2
10 1 × 10 1
1 1 × 10 0
0.1 1 × 10 −1
0.01 1 × 10 −2

Scientific notation is particularly useful notation for very large and very small numbers, such as 1,230,000,000 = 1.23 × 10 9 , and 0.00000000036 = 3.6 × 10 −10 .

Expressing numbers in scientific notation

Converting any number to scientific notation is straightforward. Count the number of places needed to move the decimal next to the left-most non-zero digit: that is, to make the number between 1 and 10. Then multiply that number by 10 raised to the number of places you moved the decimal. The exponent is positive if you moved the decimal to the left and negative if you moved the decimal to the right. So

2386 = 2.386 × 1000 = 2.386 × 10 3

and

0.123 = 1.23 × 0.1 = 1.23 × 10 −1

The power (exponent) of 10 is equal to the number of places the decimal is shifted.

Logarithms

The common logarithm (log) of a number is the power to which 10 must be raised to equal that number. For example, the common logarithm of 100 is 2, because 10 must be raised to the second power to equal 100. Additional examples are in [link] .

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Source:  OpenStax, Microbiology. OpenStax CNX. Nov 01, 2016 Download for free at http://cnx.org/content/col12087/1.4
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