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Find the altitude (length of a segment perpendicular to both bases) of the isosceles trapezoid shown.
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33 votes
Find the altitude (length of a segment perpendicular to both bases) of the isosceles trapezoid shown.

Find the altitude (length of a segment perpendicular to both bases) of the isosceles-example-1
User Rudresh Bhatt
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1 Answer

22 votes
22 votes

SOLUTION

The trapezoid can be re-drawn for a better understanding as follows, since it is an isosceles trapezoid

So, we can use either side to find the altitude, which I have labelled as x.

Now, we can see two right-angle triangles which are the same, so we can use anyone. From Pythagoras, we have that


\begin{gathered} \text{hyp}^2=opp^2+adj^2 \\ 9^2=3^2+x^2 \\ 81=9+x^2 \\ x^2=81-9 \\ x^2=72 \\ x=\sqrt[]{72} \\ x=8.485 \end{gathered}

hence the answer is 8.5 to the nearest tenth

Find the altitude (length of a segment perpendicular to both bases) of the isosceles-example-1
User Sylordis
by
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