A point S is taken on the side QR of triangle PQR such that RS = 2SQ. It is known that Angle PQR = 45^o and Angle SPQ = 15^o

Determine Angle PRQ.

     |QS|        |QS|         |PS|         |PS|
  --------- = ---------- = ---------- = ---------
   sin(15)     sin(QPS)     sin(PQS)     sin(45)

      2|QS|         |RS|         |PS|        |PS|
  ------------ = ---------- = ---------- = --------
   sin(120-x)     sin(RPS)     sin(PRS)     sin(x)

  2*sqrt(2)*sin(15)sin(x) = sin(120-x)          (1)

                = sin(120)*cos(x) - cos(120)*sin(x)

                = [sqrt(3)*cos(x) + sin(x)]/2

                    sqrt(3)
  tan(x) = -----------------------
            4*sqrt(2)*sin(15) - 1

         ~= 75 degrees

  Plugging x = 75 into equation (1), we see that

  angle PRQ is exactly 75 degrees.
 

Posted by Bractals on 2007-10-29 12:04:57