How do you write the number .0899 in scientific notation?

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How do you write the number .0899 in scientific notation?

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Answer 1 · 2016-06-21T05:57:02

$0.0899 = 8.99 \times 10^{- 2}$ $0.0899=8.99xx10^(-2)$

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 $10$ $10$ .

Note that moving decimal $p$ $p$ digits to right is equivalent to multiplying by $10^{p}$ $10^p$ and moving decimal $q$ $q$ digits to left is equivalent to dividing by $10^{q}$ $10^q$ .

Hence, we should either divide the number by $10^{p}$ $10^p$ i.e. multiply by $10^{- p}$ $10^(-p)$ (if moving decimal to right) or multiply the number by $10^{q}$ $10^q$ (if moving decimal to left).

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

To write $0.0899$ $0.0899$ in scientific notation, we will have to move the decimal point two places to right, which literally means multiplying by $10^{2}$ $10^2$ .

Hence in scientific notation $0.0899 = 8.99 \times 10^{- 2}$ $0.0899=8.99xx10^(-2)$ (note that as we have moved decimal one point to right we are multiplying by $10^{- 2}$ $10^(-2)$ .

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How do you write the number .0899 in scientific notation?

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