How to add square roots - PSAT Math

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Question

If $$\sqrt{x}$=3^2$ what is x?

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Answer

Square both sides:

x = (32)2 = 92 = 81

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Question

Simplify.

$\sqrt{32}$+$\sqrt{64}$+$\sqrt{8}$

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Answer

$\sqrt{32}$+$\sqrt{64}$+$\sqrt{8}$

First step is to find perfect squares in all of our radicans.

$\sqrt{32}\rightarrow$\sqrt{16\cdot 2}$\rightarrow4$\sqrt{2}$

$$\sqrt{64}\rightarrow$\sqrt{8\cdot 8}$\rightarrow8$

$\sqrt{8}\rightarrow$\sqrt{4\cdot 2}$\rightarrow2$\sqrt{2}$

After doing so you are left with $4$\sqrt{2}$+2$\sqrt{2}$+8$

Just like fractions you can only add together coefficents with like terms under the radical.

$6$\sqrt{2}$+8$

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Question

Simplify:

$\sqrt{27}$-$\sqrt{48}$+$\sqrt{81}$

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Answer

To combine radicals, they must have the same radicand. Therefore, we must find the perfect squares in each of our square roots and pull them out.

$\sqrt{27}\rightarrow $\sqrt{93}$\rightarrow $$\sqrt{3^2$3}$\rightarrow 3$\sqrt{3}$

$\sqrt{48}\rightarrow $\sqrt{163}$\rightarrow $$\sqrt{4^2$3}$\rightarrow 4$\sqrt{3}$

Now, we plug these equivalent expressions back into our equation and simplify:

$\sqrt{27}$-$\sqrt{48}$+$\sqrt{81}$

$3\sqrt3-4\sqrt3+9$

$-\sqrt3+9$

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Question

Simplify:

$\sqrt{54}$ - $\sqrt{24}$ + $\sqrt{6}$

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Answer

Simplify each of the radicals by factoring out a perfect square:

$\sqrt{54}$ - $\sqrt{24}$ + $\sqrt{6}$

$= $\sqrt{9 \cdot 6}$ - $\sqrt{4\cdot 6}$ + $\sqrt{6}$$

$= $\sqrt{9}$ \cdot $\sqrt{6}$ - $\sqrt{4}$ \cdot $\sqrt{6}$ + $\sqrt{6}$$

$= 3$\sqrt{6}$ - 2 $\sqrt{6}$ + 1$\sqrt{6}$$

$=\left ( 3 - 2 + 1 \right ) $\sqrt{6}$$

$= 2 $\sqrt{6}$$

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Question

Simplify the expression:

$\sqrt{45}$ + $\sqrt{125}$ + $\sqrt{175}$

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Answer

For each of the expressions, factor out a perfect square:

$\sqrt{45}$ + $\sqrt{125}$ + $\sqrt{175}$

$= $\sqrt{9 \cdot 5}$ + $\sqrt{25 \cdot 5}$ + $\sqrt{25 \cdot 7}$$

$= $\sqrt{9 }$ \cdot $\sqrt{ 5}$ + $\sqrt{25 }$ \cdot $\sqrt{ 5}$+ $\sqrt{25}$ \cdot $\sqrt{ 7}$$

$=3 $\sqrt{ 5}$ +5 $\sqrt{ 5}$+5 $\sqrt{ 7}$$

$=\left (3 +5 \right ) $\sqrt{ 5}$+5 $\sqrt{ 7}$$

$=8 $\sqrt{ 5}$+5 $\sqrt{ 7}$$

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Question

Add the square roots into one term:

$\small {$\sqrt{12}$} + {$\sqrt{75}$}$

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Answer

In order to solve this problem we need to simplfy each of the radicals. By doing this we will get two terms that have the same number under the radical which will allow us to combine the terms.

$\small {$\sqrt{12}$} + {$\sqrt{75}$}$

$\small = \small {$\sqrt{4}$} \times {$\sqrt{3}$} + {$\sqrt{25}$} \times {$\sqrt{3}$}$

$\small \small = 2 {$\sqrt{3}$} + 5 {$\sqrt{3}$}$

$\small = 7 {$\sqrt{3}$}$

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Question

Simplify:

$\sqrt{2}$+$\sqrt{2}$+$\sqrt{3}$+3$\sqrt{5}$

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Answer

Remember that you treat square roots like you do variables in the sense that you just add the like factors. In this problem, the only set of like factors is the pair of $\sqrt{2}$ values. Hence:

$\sqrt{2}$+$\sqrt{2}$+$\sqrt{3}$+3$\sqrt{5}$ = 2$\sqrt{2}$+$\sqrt{3}$+3$\sqrt{5}$

Do not try to simplify any further!

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Question

Simplify:

$\sqrt{2}$+3$\sqrt{12}$+2$\sqrt{50}$+$\sqrt{3}$

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Answer

Begin by simplifying your more complex roots:

$\sqrt{12}$= $\sqrt{223}$=2$\sqrt{3}$

$\sqrt{50}$ = $\sqrt{552}$=5$\sqrt{2}$

This lets us rewrite our expression:

$\sqrt{2}$+3$\sqrt{12}$+2$\sqrt{50}$+$\sqrt{3}$ = $\sqrt{2}$+3(2$\sqrt{3}$)+2(5$\sqrt{2}$)+$\sqrt{3}$

Do the basic multiplications of coefficients:

$\sqrt{2}$+3(2$\sqrt{3}$)+2(5$\sqrt{2}$)+$\sqrt{3}$ = $\sqrt{2}$+6$\sqrt{3}$+10$\sqrt{2}$+$\sqrt{3}$

Reorder the terms:

$\sqrt{2}$+10$\sqrt{2}$+6$\sqrt{3}$+$\sqrt{3}$

Finally, combine like terms:

$11$\sqrt{2}$+7$\sqrt{3}$$

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Question

If $$\sqrt{x}$=3^2$ what is x?

Tap to reveal answer

Answer

Square both sides:

x = (32)2 = 92 = 81

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Question

Simplify.

$\sqrt{32}$+$\sqrt{64}$+$\sqrt{8}$

Tap to reveal answer

Answer

$\sqrt{32}$+$\sqrt{64}$+$\sqrt{8}$

First step is to find perfect squares in all of our radicans.

$\sqrt{32}\rightarrow$\sqrt{16\cdot 2}$\rightarrow4$\sqrt{2}$

$$\sqrt{64}\rightarrow$\sqrt{8\cdot 8}$\rightarrow8$

$\sqrt{8}\rightarrow$\sqrt{4\cdot 2}$\rightarrow2$\sqrt{2}$

After doing so you are left with $4$\sqrt{2}$+2$\sqrt{2}$+8$

Just like fractions you can only add together coefficents with like terms under the radical.

$6$\sqrt{2}$+8$

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Question

Simplify:

$\sqrt{27}$-$\sqrt{48}$+$\sqrt{81}$

Tap to reveal answer

Answer

To combine radicals, they must have the same radicand. Therefore, we must find the perfect squares in each of our square roots and pull them out.

$\sqrt{27}\rightarrow $\sqrt{93}$\rightarrow $$\sqrt{3^2$3}$\rightarrow 3$\sqrt{3}$

$\sqrt{48}\rightarrow $\sqrt{163}$\rightarrow $$\sqrt{4^2$3}$\rightarrow 4$\sqrt{3}$

Now, we plug these equivalent expressions back into our equation and simplify:

$\sqrt{27}$-$\sqrt{48}$+$\sqrt{81}$

$3\sqrt3-4\sqrt3+9$

$-\sqrt3+9$

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Question

Simplify:

$\sqrt{54}$ - $\sqrt{24}$ + $\sqrt{6}$

Tap to reveal answer

Answer

Simplify each of the radicals by factoring out a perfect square:

$\sqrt{54}$ - $\sqrt{24}$ + $\sqrt{6}$

$= $\sqrt{9 \cdot 6}$ - $\sqrt{4\cdot 6}$ + $\sqrt{6}$$

$= $\sqrt{9}$ \cdot $\sqrt{6}$ - $\sqrt{4}$ \cdot $\sqrt{6}$ + $\sqrt{6}$$

$= 3$\sqrt{6}$ - 2 $\sqrt{6}$ + 1$\sqrt{6}$$

$=\left ( 3 - 2 + 1 \right ) $\sqrt{6}$$

$= 2 $\sqrt{6}$$

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Question

Simplify the expression:

$\sqrt{45}$ + $\sqrt{125}$ + $\sqrt{175}$

Tap to reveal answer

Answer

For each of the expressions, factor out a perfect square:

$\sqrt{45}$ + $\sqrt{125}$ + $\sqrt{175}$

$= $\sqrt{9 \cdot 5}$ + $\sqrt{25 \cdot 5}$ + $\sqrt{25 \cdot 7}$$

$= $\sqrt{9 }$ \cdot $\sqrt{ 5}$ + $\sqrt{25 }$ \cdot $\sqrt{ 5}$+ $\sqrt{25}$ \cdot $\sqrt{ 7}$$

$=3 $\sqrt{ 5}$ +5 $\sqrt{ 5}$+5 $\sqrt{ 7}$$

$=\left (3 +5 \right ) $\sqrt{ 5}$+5 $\sqrt{ 7}$$

$=8 $\sqrt{ 5}$+5 $\sqrt{ 7}$$

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Question

Add the square roots into one term:

$\small {$\sqrt{12}$} + {$\sqrt{75}$}$

Tap to reveal answer

Answer

In order to solve this problem we need to simplfy each of the radicals. By doing this we will get two terms that have the same number under the radical which will allow us to combine the terms.

$\small {$\sqrt{12}$} + {$\sqrt{75}$}$

$\small = \small {$\sqrt{4}$} \times {$\sqrt{3}$} + {$\sqrt{25}$} \times {$\sqrt{3}$}$

$\small \small = 2 {$\sqrt{3}$} + 5 {$\sqrt{3}$}$

$\small = 7 {$\sqrt{3}$}$

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Question

Simplify:

$\sqrt{2}$+$\sqrt{2}$+$\sqrt{3}$+3$\sqrt{5}$

Tap to reveal answer

Answer

Remember that you treat square roots like you do variables in the sense that you just add the like factors. In this problem, the only set of like factors is the pair of $\sqrt{2}$ values. Hence:

$\sqrt{2}$+$\sqrt{2}$+$\sqrt{3}$+3$\sqrt{5}$ = 2$\sqrt{2}$+$\sqrt{3}$+3$\sqrt{5}$

Do not try to simplify any further!

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Question

Simplify:

$\sqrt{2}$+3$\sqrt{12}$+2$\sqrt{50}$+$\sqrt{3}$

Tap to reveal answer

Answer

Begin by simplifying your more complex roots:

$\sqrt{12}$= $\sqrt{223}$=2$\sqrt{3}$

$\sqrt{50}$ = $\sqrt{552}$=5$\sqrt{2}$

This lets us rewrite our expression:

$\sqrt{2}$+3$\sqrt{12}$+2$\sqrt{50}$+$\sqrt{3}$ = $\sqrt{2}$+3(2$\sqrt{3}$)+2(5$\sqrt{2}$)+$\sqrt{3}$

Do the basic multiplications of coefficients:

$\sqrt{2}$+3(2$\sqrt{3}$)+2(5$\sqrt{2}$)+$\sqrt{3}$ = $\sqrt{2}$+6$\sqrt{3}$+10$\sqrt{2}$+$\sqrt{3}$

Reorder the terms:

$\sqrt{2}$+10$\sqrt{2}$+6$\sqrt{3}$+$\sqrt{3}$

Finally, combine like terms:

$11$\sqrt{2}$+7$\sqrt{3}$$

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Question

If $$\sqrt{x}$=3^2$ what is x?

Tap to reveal answer

Answer

Square both sides:

x = (32)2 = 92 = 81

← Didn't Know|Knew It →

Question

Simplify.

$\sqrt{32}$+$\sqrt{64}$+$\sqrt{8}$

Tap to reveal answer

Answer

$\sqrt{32}$+$\sqrt{64}$+$\sqrt{8}$

First step is to find perfect squares in all of our radicans.

$\sqrt{32}\rightarrow$\sqrt{16\cdot 2}$\rightarrow4$\sqrt{2}$

$$\sqrt{64}\rightarrow$\sqrt{8\cdot 8}$\rightarrow8$

$\sqrt{8}\rightarrow$\sqrt{4\cdot 2}$\rightarrow2$\sqrt{2}$

After doing so you are left with $4$\sqrt{2}$+2$\sqrt{2}$+8$

Just like fractions you can only add together coefficents with like terms under the radical.

$6$\sqrt{2}$+8$

← Didn't Know|Knew It →

Question

Simplify:

$\sqrt{27}$-$\sqrt{48}$+$\sqrt{81}$

Tap to reveal answer

Answer

To combine radicals, they must have the same radicand. Therefore, we must find the perfect squares in each of our square roots and pull them out.

$\sqrt{27}\rightarrow $\sqrt{93}$\rightarrow $$\sqrt{3^2$3}$\rightarrow 3$\sqrt{3}$

$\sqrt{48}\rightarrow $\sqrt{163}$\rightarrow $$\sqrt{4^2$3}$\rightarrow 4$\sqrt{3}$

Now, we plug these equivalent expressions back into our equation and simplify:

$\sqrt{27}$-$\sqrt{48}$+$\sqrt{81}$

$3\sqrt3-4\sqrt3+9$

$-\sqrt3+9$

← Didn't Know|Knew It →

Question

Simplify:

$\sqrt{54}$ - $\sqrt{24}$ + $\sqrt{6}$

Tap to reveal answer

Answer

Simplify each of the radicals by factoring out a perfect square:

$\sqrt{54}$ - $\sqrt{24}$ + $\sqrt{6}$

$= $\sqrt{9 \cdot 6}$ - $\sqrt{4\cdot 6}$ + $\sqrt{6}$$

$= $\sqrt{9}$ \cdot $\sqrt{6}$ - $\sqrt{4}$ \cdot $\sqrt{6}$ + $\sqrt{6}$$

$= 3$\sqrt{6}$ - 2 $\sqrt{6}$ + 1$\sqrt{6}$$

$=\left ( 3 - 2 + 1 \right ) $\sqrt{6}$$

$= 2 $\sqrt{6}$$

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