Multiplying and Dividing Radicals - Algebra II

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Question

Multiply and express the answer in the simplest form:

$\small \sqrt3(\sqrt4-\sqrt3)$

Answer

$\small \sqrt3(\sqrt4-\sqrt3)$

$\small \sqrt{12}-\sqrt9$

$\small \sqrt{12}=\sqrt4 \times \sqrt3=2\sqrt3$

$\small \sqrt9=3$

$\small \sqrt{12}-\sqrt9=2\sqrt3-3$

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Question

$\frac{5+3\sqrt{2}}{-3-\sqrt{5}}=?$

Answer

To solve this expression, multiply the numerator and the denominator by the complex conjugate of the denominator. Since the denominator is $-3-\sqrt{5}$ , the complex conjugate of this is $-3+\sqrt{5}$ . Therefore:

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

$=\frac{(5+3\sqrt{2})(-3+\sqrt{5})}{(-3-\sqrt{5})(-3+\sqrt{5})}$

$=\frac{-15+5\sqrt{5}-9\sqrt{2}+3\sqrt{10}}{9-5}$

$=\frac{-15+5\sqrt{5}-9\sqrt{2}+3\sqrt{10}}{4}$

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Question

$\left ( \sqrt{x}+\sqrt{6} \right )\left ( \sqrt{x}-\sqrt{6} \right )$

Answer

FOIL with difference of squares. The multiplying cancels the square roots on both terms.

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Question

Simplify $2x^{2}\cdot x^{5}\cdot 3x^{3}$

Answer

To simplify, you must use the Law of Exponents.

First you must multiply the coefficients then add the exponents:

$2\cdot3\cdot x^{2+5+3}=6\cdot x^{10}=6x^{10}$ .

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Question

Simplify.

$\sqrt{36} \times 3\sqrt{36}$

Answer

We can solve this by simplifying the radicals first: $\sqrt{36} =6$

Plugging this into the equation gives us:

$6 \times3(6)=108$

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Question

Simplify.

$5\sqrt{2} \times4\sqrt{2}$

Answer

Note: the product of the radicals is the same as the radical of the product:

$\sqrt{2} \times \sqrt2} = \sqrt{2\times 2$ which is $\sqrt{4} =2$

Once we understand this, we can plug it into the equation:

$5\sqrt{2} \times4\sqrt{2} = 5\times4\times \sqrt{2\times 2}$

$5\times4\times2=40$

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Question

Simplify.

$\frac{\sqrt{32}}{3\sqrt{16}}$

Answer

We can simplify the radicals:

$\sqrt{32} =\sqrt{16\times 2} =4\sqrt{2}$ and $\sqrt{16} =4$

Plug in the simplifed radicals into the equation:

$\frac{4\sqrt{2}}{3\times 4} = \frac{4\sqrt{2}}{12}$

$\frac{4 \sqrt2}{12}=\frac{\sqrt2}{3}$

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Question

Simplify and rationalize the denominator if needed,

$\frac{\sqrt{16}}{4\sqrt{2}}$

Answer

We can only simplify the radical in the numerator: $\sqrt{16} =4$

Plugging in the simplifed radical into the equation we get:

$\frac{4}{4\sqrt{2}} = \frac{1}{\sqrt{2}}$

Note: We simplified further because both the numerator and denominator had a "4" which canceled out.

Now we want to rationalize the denominator,

$\frac{1}{\sqrt2}\bigg(\frac{\sqrt2}{\sqrt2}\bigg)=\frac{\sqrt2}{2}$

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Question

What is the product of $\sqrt{12}$ and $3\sqrt{6}$ ?

Answer

First, simplify $\sqrt{12}=\sqrt{4\cdot3}$ to $2\sqrt{3}$ .

Then set up the multiplication problem:

$2\sqrt{3}\cdot 3\sqrt{6}$ .

Multiply the terms outside of the radical, then the terms under the radical:

$2\cdot 3\sqrt{3\cdot6}$ then simplfy: $6\sqrt{18}.$

The radical is still not in its simplest form and must be reduced further:

$6\sqrt{18}=6\cdot3\sqrt{2}=18\sqrt{2}$ . This is the radical in its simplest form.

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Question

Simplify

${}\frac{\sqrt{117}}{\sqrt{13}}$

Answer

To divide the radicals, simply divide the numbers under the radical and leave them under the radical:

$\sqrt{\frac{117}{13}}=\sqrt9$

Then simplify this radical:

$\sqrt9=3$ .

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Question

Solve and simplify.

$\sqrt{2}\cdot \sqrt{3}$

Answer

When multiplying radicals, just take the values inside the radicand and perfom the operation.

$\sqrt{2}\cdot \sqrt{3}=\sqrt{2\cdot 3}=\sqrt{6}$

$\sqrt{6}$ can't be reduced so this is the final answer.

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Question

Solve and simplify.

$\sqrt{9}\cdot \sqrt{3}$

Answer

When multiplying radicals, just take the values inside the radicand and perfom the operation.

In this case, we have a perfect square so simplify that first.

Then, take that answer and multiply that with $\sqrt{3}$ to get the final answer.

${\sqrt{9}}\cdot \sqrt{3}=3\cdot \sqrt{3}=3\sqrt{3}$ .

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Question

Solve and simplify.

$\frac{\sqrt{5}}{\sqrt{3}}$

Answer

When dividing radicals, check the denominator to make sure it can be simplified or that there is a radical present that needs to be fixed. Since there is a radical present, we need to eliminate that radical. To do this, we multiply both top and bottom by $\sqrt{3}$ . The reason is because we want a whole number in the denominator and multiplying by itself will achieve that. By multiplying itself, it creates a square number which can be reduced to .

$\frac{\sqrt{5}}{\sqrt{3}}\cdot \frac{\sqrt{3}}{\sqrt{3}}=\frac{\sqrt{15}}{\sqrt{9}}=\frac{\sqrt{15}}{3}$

With the denominator being , the numerator is $\sqrt{5\cdot 3}=\sqrt{15}$ . Final answer is $\frac{\sqrt{15}}{3}$ .

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Question

Solve and simplify.

$\frac{\sqrt{9}}{\sqrt{4}}$

Answer

When dividing radicals, check the denominator to make sure it can be simplified or that there is a radical present that needs to be fixed.

Both and are perfect squares so they can be simplify.

Final answer is

$\frac{\sqrt9}{\sqrt4}=\frac{\sqrt{3\cdot 3}}{\sqrt{2\cdot 2}}=\frac{3}{2}$ .

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Question

Solve and simplify.

$3\sqrt{2}\cdot 4\sqrt{3}$

Answer

When multiplying radicals, just take the values inside the radicand and perfom the operation.

Since there is a number outside of the radicand, multiply the outside numbers and then the radicand.

$3{\sqrt{2}}\cdot 4\sqrt{3}=3\cdot 4\cdot \sqrt{2\cdot 3}=12\sqrt{6}$

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Question

Solve and simplify.

$3\sqrt{6}\cdot 6\sqrt{10}$

Answer

When multiplying radicals, just take the values inside the radicand and perfom the operation.

Since there is a number outside of the radicand, multiply the outside numbers and then the radicand.

$3\sqrt{6}\cdot 6\sqrt{10}=3\cdot 6\cdot\sqrt{6\cdot10}=18\sqrt{60}$

Before we say that's the final answer, check the radicand to see that there are no square numbers that can be factored. A can be factored and thats a perfect square. When I divide with , I get which doesn't have perfect square factors.

Therefore, our answer becomes

$18{\sqrt{60}}=18\sqrt{4\cdot 15}=18\cdot2\sqrt{15}=36\sqrt{15}$ .

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Question

Solve and simplify.

$2\sqrt{15}\cdot \sqrt{15}$

Answer

When multiplying radicals, just take the values inside the radicand and perfom the operation.

Since there is a number outside of the radicand, multiply the outside numbers and then the radicand.

$2\sqrt{15}\cdot \sqrt{15}=2\cdot\sqrt{15\cdot15}=2\cdot15=30$

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Question

Solve and simplify.

$(4\sqrt{7})^2$

Answer

Since we are dealing with exponents, lets break it down.

$(4{\sqrt{7}})^2=4^2\cdot ({\sqrt{7}})^2=16\cdot 7=112$

Remember to distribute.

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Question

Solve and simplify.

$\frac{\sqrt{24}}{\sqrt{2}}$

Answer

When dividing radicals, check the denominator to make sure it can be simplified or that there is a radical present that needs to be fixed. Since there is a radical present, we need to eliminate that radical. However, there is a faster way to possibly elminate the denominator. Let's simplify the numerator.

$\sqrt{24}=\sqrt{8\cdot3}=\sqrt{4\cdot2\cdot3}=2\sqrt{2}\cdot\sqrt{3}$ .

The reason I split it up is because I can cancel out the radicals and thus simplifying the question to give final answer of $2\sqrt{3}$ .

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Question

Solve and simplify.

$\frac{2\sqrt{75}}{3\sqrt{175}}$

Answer

When dividing radicals, check the denominator to make sure it can be simplified or that there is a radical present that needs to be fixed. Since there is a radical present, we need to eliminate that radical. However, there is a faster way to possibly elminate the denominator. Let's simplify the numerator.

$\frac{2\sqrt{75}}{3\sqrt{175}}=\frac{2\cdot\sqrt{25\cdot3}}{3\cdot\sqrt{25\cdot7}}=\frac{2\cdot\sqrt{25}\cdot\sqrt{3}}{3\cdot\sqrt{25}\cdot\sqrt{7}}=\frac{2\sqrt{3}}{3\sqrt{7}}$

We still need to eliminate the radical so multiply top and bottom by $\sqrt{7}$ .

$\frac{2\sqrt{3}\cdot\sqrt{7}}{3\sqrt{7}\cdot\sqrt{7}}=\frac{2\sqrt{21}}{3\cdot 7}=\frac{2\sqrt{21}}{21}$ .

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