Solve the triangle using the Law of Sines. Assume a = 20, b = 35, and.A = 28degr
ID: 3424863 • Letter: S
Question
Solve the triangle using the Law of Sines. Assume a = 20, b = 35, and.A = 28degree. (Round the length to one decimal place and the angles to the nearest whole number. If either set of answers is not necessary, cross out those boxes.) A pilot flies in a straight path for 1.5 hours. She then makes a course correction, heading 10degree to the right of her original course, and flies 2 hours in the new direction. If she maintains a constant speed of 500 mi/h, how far is she from her starting position?Explanation / Answer
Solution : Given a = 20, b = 35 and A = 35.
We have b sin A = 35 sin 28o = 16.43, and 35 sin 28o < 20 < 35.
Since b sin A < a < b, therefore two triangles are possible.
We know sine rule
a/sin A= b/ sinB
or 20/sin28 = 35/ sin B
or sin B = 35 sin 28o/ 20
=35*0.27/ 20
= 0.82157523
Therefore angle B1 = 55o and B2 = 180o - 55o= 125.
Ans.
We also know that angle C = 180-(28+55.28), and C = 180-(28+125),
Angle C1 = 97o and C2 = 27o Ans.
Again use sine rule,
a/sin A = c1/sin C1
c1 = a sin C1/ sinA
= 20*sin 97/ sin 28
c1= 46.3. Ans
Similarly, by the sine rule,
a/sin A = c2/sin C2
c2 = a sin C2/ sinA
= 20*sin 27o/ sin 28o
c2 = 19.3 Ans