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what are the lenghths of the legs in the triangle?give your answer in simplest radical form or rounded to the nearest hundredth.

what are the lenghths of the legs in the triangle?give your answer in simplest radical-example-1
User DarrylG
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1 Answer

7 votes
7 votes

Here, we are given a 45°-45°-90° triangle.

Let's find the length of the legs.

A 45°-45°-90° triangle is an isosceles triangle, and the two legs of an isosceles triangle are of equal lengths.

To find the length of each leg apply the formula:


c=a\sqrt[]{2}

Where;

c = 12

Thus, we have:


12=a\sqrt[]{2}

Solve for a:

Divide both sides by √2


\begin{gathered} \frac{12}{\sqrt[]{2}}=\frac{a\sqrt[]{2}}{\sqrt[]{2}} \\ \\ \frac{12}{\sqrt[]{2}}=a \\ \\ a=\frac{12}{\sqrt[]{2}} \\ \\ \text{Simplify the denominator:} \\ a=\frac{12}{\sqrt[]{2}}\ast\frac{\sqrt[]{2}}{\sqrt[]{2}} \\ \\ a=\frac{12\sqrt[]{2}}{2} \\ \\ a=6\sqrt[]{2} \end{gathered}

Therefore, the length of each leg in radical form is 6√2

ANSWER:


6\text{ }\sqrt[]{2}

User Simon Leier
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