1. Let us first find the missing interior angle.
m<C+53+61=180
m<C=66 degrees
law of sines:
a,b, and c represents the lengths of the triangles and A,B, and C represents the measures of the interior angles opposite to the sides.
For the purposes of this problem let us use a shorthand version for the law of sines.
b=134.95 meters approx.
AC is equal to length b in this case so AC=134.95 meters approx.
2. law of cosines: a²=b²+c²-2bccos(A)
Let us rearrange this formula so that we can solve for cos(C) in terms of a, b, and c (the sides lengths of the triangle).
a²=b²+c²-2bccos(A)
a²-b²-c²=-2bccos(A)
=cos(A)
cos(A)=
Now, because we want to find measure of angle A...
cos(A)=
cos(A)=0.83 approx.
A=33.52 degrees approx.
3. Solving with law of cosines.
law of cosines: a²=b²+c²-2bccos(A)
a²=16²+18²-2(16)(18)cos(52 degrees)
a²=256+324-576cos(52 degrees)
a²=580-576cos(52 degrees)
a²=225.38 approx.
a=15.01 units approx.
Solving with law of sines.
law of sines:
For the purposes of this problem let us use a shorthand version for the law of sines.
x=15.00 un approx.