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In ∆HIJ, i=99 inches and < H=9°. Find the length of h, to the nearest inch.

User Amit Hasan
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1 Answer

15 votes
15 votes

ANSWER

h = 16 in

Step-by-step explanation

We can solve this using the law of sines:

In this case, the relation is:


(i)/(\sin I)=(j)/(\sin J)=(h)/(\sin H)

WIth the first two ratios we have:


(99)/(\sin I)=(99)/(\sin J)

We can find that angles I and J are equal:


\begin{gathered} (\sin J)/(\sin I)=(99)/(99) \\ (\sin J)/(\sin I)=1 \\ \sin J=\sin I \\ J=I \end{gathered}

Therefore, they measures - because the interior angles of a triangle add up 180º- are:


\begin{gathered} m\angle H+m\angle J+m\angle I=180º \\ 9º+2m\angle J=180º \\ m\angle J=(180º-9º)/(2) \\ m\angle J=m\angle I=85.5º \end{gathered}

Now, using the law of sines, we can find h:


\begin{gathered} (i)/(\sin I)=(h)/(\sin H) \\ (99)/(\sin85.5º)=(h)/(\sin 9º) \\ h=99\cdot(\sin 9º)/(\sin 85.5º) \\ h=15.535in \end{gathered}

Rounded to the nearest inch, h = 16 in

In ∆HIJ, i=99 inches and < H=9°. Find the length of h, to the nearest inch.-example-1
User Micah Winkelspecht
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3.0k points