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I have the following triangle:

The side going up has a length of 96, the side going down has a length of 112. The angle closest to the center is 91 degrees broken up into 62 and 29 degrees from the x-axis. I am trying to find the length of the third side. I was trying to use the formula $C^2=A^2+B^2-2AB *cos(c)$, but I seem to get a different answer than I should. I used the longest side as $C$, the side with the length of 96 as $B$, and the side with the length of 112 as $A$. When I use the above formula, the third side equals 148.8, however, If I were to do it by using 2 triangles and a distance formula (done bellow), I end up with 183.03

The second way I did it was as follows:

For the top triangle:

  • $\cos(62)\cdot96=45.1$
  • $\sin(62)\cdot96=84.8$
  • Therefor the top points coordinates are (+45.1, +84.8)

For the Bottom triangle:

  • $\cos(29)\cdot112=98.0$
  • $\sin(29)\cdot112=54.3$
  • Therefor the bottom point's coordinates are (+54.3, -98.0)

Then I just plugged it into $A^2+B^2=C^2$


Which is totally different than:


What am I doing wrong? Is the formula incorrect?

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It looks like the bottom point has coordinates $(98, -54.3)$. The Law of Cosines computation looks correct. – Patrick Mar 27 '12 at 23:13
(+1) for showing work. – The Chaz 2.0 Mar 27 '12 at 23:28
You may wish to keep in mind that if $\alpha$, $\beta$, and $\gamma$ are angles in a triangle, then $\alpha+\beta+\gamma=180^{\circ}$. This should make your trigonometric career much, much easier. – 000 Mar 28 '12 at 1:20
up vote 2 down vote accepted

The second point has coordinates $(98, -54.3)$.

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