How do you write $12 \times 10^{- 6}$ $12times 10^-6$ in standard form?

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How do you write $12 \times 10^{- 6}$ $12times 10^-6$ in standard form?

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Answer 1 · 2016-06-25T04:45:29

$12 \times 10^{- 6} = 0.000012$ $12xx10^(-6)=0.000012$

Explanation:

In scientific notation, we write a number so that it has single digit to the left of decimal sign and is multiplied by an integer power of $10$ $10$ .

In other words, in scientific notation, a number is written as $a \times 10^{n}$ $axx10^n$ , where $1 \leq a < 10$ $1<=a<10$ and $n$ $n$ is an integer and $1 \leq a < 10$ $1<=a<10$ .

To write the number in normal or standard notation one just needs to multiply by the power $10^{n}$ $10^n$ (or divide if $n$ $n$ is negative). This means moving decimal $n$ $n$ digits to right if multiplying by $10^{n}$ $10^n$ and moving decimal $n$ $n$ digits to left if dividing by $10^{n}$ $10^n$ (i.e. multiplying by $10^{- n}$ $10^(-n)$ ).

In the given case, as we have the number as $12 \times 10^{- 6}$ $12xx10^(-6)$ , we need to move decimal digit to the left by six points. For this, let us write $12$ $12$ as $00000012$ $00000012$ and moving decimal point six points to left means $0.000012$ $0.000012$

Hence in standard notation $12 \times 10^{- 6} = 0.000012$ $12xx10^(-6)=0.000012$

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How do you write $12 \times 10^{- 6}$ $12times 10^-6$ in standard form?

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Explanation:

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