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ACT Math Test : Solving Problems with Roots & Exponents

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Example Question #11 : Solving Problems With Roots & Exponents

Find the value of

$\sqrt{18x+63}=x$

Possible Answers:

Only 21

-3 and 21

Only -3

3 and 21

Correct answer:

-3 and 21

Explanation:

To solve this problem we must first subtract a square from both sides

$18x+63=x^{2}$

We move 18x+63 to the right side to set the equation equal to . This way we are able to factor the equation as if it was a quadratic.

$x^{2}-18x-63=0$

And now we can factor into

(x-21)(x+3)

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Example Question #12 : Solving Problems With Roots & Exponents

Which of the following is equivalent to $\frac{\sqrt{21}}{6}$ ?

Possible Answers:

$\frac{7}{\sqrt{2}}$

$\frac{7}{\sqrt{6}}$

$\frac{\sqrt{7}}2{}$

$\sqrt{\frac{7}{2}}$

$\sqrt{\frac{7}{12}}$

Correct answer:

$\sqrt{\frac{7}{12}}$

Explanation:

If you try to simplify the expression given in the question, you will have a hard time…it is already simplified! However, if you look at the four answer choices you will realize that most of these contain roots in the denominator. Whenever you see a root in the denominator, you should look to rationalize that denominator. This means that you will multiply the expression by one to get rid of the root.

Consider each answer choice as you attempt to simplify each.

For choice $\frac{\sqrt{7}}2{}$ , the expression is already simplified and is not the same. At this point, your time is better spent simplifying those that need it to see if those simplified forms match.

For choice $\sqrt{\frac{7}{2}}$ , employ the "multiply by one" strategy of multiplying by the same numerator as the denominator to rationalize the root. If you do so, you will multiply $\sqrt{\frac{7}{2}}$ by $\frac{\sqrt{2}}{\sqrt{2}}$

$(\sqrt{\frac{7}{2}})(\frac{\sqrt{2}}{\sqrt{2}})=\frac{\sqrt{14}}{2}$ , which is no the same as $\frac{\sqrt{21}}{6}$ .

For answer choice $\sqrt{\frac{7}{12}}$ , multiply $\sqrt{\frac{7}{12}}$ by $\frac{\sqrt{12}}{\sqrt{12}}$ .

$(\sqrt{\frac{7}{12}})(\frac{\sqrt{12}}{\sqrt{12}})=\frac{\sqrt{84}}{12}$

And since $\sqrt{84}=(\sqrt{4})(\sqrt{21})$ , you can simplify the fraction:

$\frac{2\sqrt{21}}12{}=\frac{\sqrt{21}}{6}$ , which matches perfectly. Therefore, answer choice $\sqrt{\frac{7}{12}}$ is correct.

NOTE: If you want to shortcut the algebra, this problem offers you that opportunity by leveraging the answer choices along with an estimate. You can estimate that the given expression, $\frac{\sqrt{21}}6{}$ , is between $\frac{4}{6}$ and $\frac{5}{6}$ , because the $\sqrt{21}$ is between $\sqrt{16}$ (which is ) and $\sqrt{25}$ (which is ). Therefore you know you are looking for a proper fraction, a fraction in which the numerator is smaller than the denominator. Well, look at your answer choices and you will see that only answer choice $\sqrt{\frac{7}{12}}$ fits that description. So without even doing the math, you can rely on a quick estimate and know that you are correct.

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Example Question #13 : Solving Problems With Roots & Exponents

If $\sqrt{10x}=10\sqrt{10}$ and $\frac{10^{-5}}{10^{-y}}=x$ , what is ?

Possible Answers:

Correct answer:

Explanation:

The key to this problem is to avoid mistakes in finding with the root equation. There are a few different ways you could solve for :

1. Leverage the fact that $\sqrt{ab}=(\sqrt{a})(\sqrt{b})$ and apply that to $\sqrt{10}=\sqrt{10}\sqrt{x}$ . That means that $\sqrt{10}\sqrt{x}=10\sqrt{10}$ . Divide both sides by $\sqrt{10}$ and see that $\sqrt{x}=10$ , so x=100 .

2. Realize that $10\sqrt{10}=\sqrt{1000}$ (reverse engineering the root) and see that $\sqrt{1000}=\sqrt{10x}$ , so must equal 100 .

However you find , you must then apply that value to the exponent expression in the second equation. Now you have $\frac{10^{-5}}{10^{-y}}=100$ . And since you're dealing with exponents, you will want to express 100 as $10^{2}$ , meaning that you now have: $\frac{10^{-5}}{10^{-y}}=10^{2}$

Here you should deal with the negative exponents, the rule for which is that $a^{-b}=\frac{1}{a^{b}}$ . So the fraction you're given, $\frac{10^{-5}}{10^{-y}}$ , can then be transformed to $\frac{10^{y}}{10^{5}}$ .

Now you have:

$\frac{10^{y}}{10^{5}}=10^{2}$

Employing another rule of exponents, that of dividing exponents of the same base, you can transform the left-hand side to:

$\frac{10^{y}}{10^{5}}=10^{y-5}$

Since you now have everything with a base of , you can express $10^{y-5}$ as just y-5=2 . This then means that y=7 is the correct answer choice.

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ACT Math Test : Solving Problems with Roots & Exponents

Study concepts, example questions & explanations for ACT Math Test

All ACT Math Test Resources

Example Questions

Example Question #11 : Solving Problems With Roots & Exponents

Example Question #12 : Solving Problems With Roots & Exponents

Example Question #13 : Solving Problems With Roots & Exponents

All ACT Math Test Resources

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