How do you solve and write the following in interval notation: $|-4x| + |-5| <=9$ ?

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How do you solve and write the following in interval notation: $|-4x| + |-5| <=9$ ?

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Answer 1 · 2017-05-09T15:46:31

Solve for $|x|$ and find the bounds for which $x$ must lie in.

Explanation:

Since constants can be taken out of absolute values are their positive values when alone or when multiplied with a variable (but not when adding/subtracting), we can rewrite the inequality as:
$4|x|+5<=9$

Now we solve for $|x|$ :
$|x|<=1$

We can remove the absolute value by recognizing that $x$ must be equal to or between $-1$ and $1$ :
$-1<=x<=1$

In interval notation, parentheses are used for greater than (>), less than (<), and infinity (both $-oo$ and $oo$ ). Brackets are used for greater than or equal to ( $>=$ ) and less than or equal to ( $<=$ ).
Therefore, $-1<=x<=1$ can be written as $[-1,1]$ in interval notation.

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How do you solve and write the following in interval notation: $|-4x| + |-5| <=9$ ?

1 Answer

Explanation:

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How do you solve and write the following in interval notation: |-4x| + |-5| <=9|-4x| + |-5| <=9?

1 Answer

Explanation:

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How do you solve and write the following in interval notation: $|-4x| + |-5| <=9$ ?