Suppose that the altitude drawn intersects the base of PQRS at point T
With triangle RTQ, we see that angle T is 90° and angle R is 30°. Since the angles in a triangle always sum to 180°, angle Q is 180° - 90° - 30° = 60°. Thus, triangle RTQ is a 30°-60°-90° right triangle.
The sides of a 30°-60°-90° triangle are in ratio 1:√3:2 (this is in the form (side opposite to 30° angle):(side opposite to 60° angle):(side opposite to 90° angle)). The hypotenuse, the side opposite opposite to the 90° angle, has a length of 24. The altitude of the triangle, the side opposite to the 30° angle, therefore has a length of 24/2 = 12; and the base of the triangle, the side opposite to the 60° angle, has a length of 12√3
Therefore, the area of PQRS is
[tex] =area of left trapezoid +area of triangle [/tex]
=[tex] =(1/2)(6+18)*(12)+(1/2)*(12\sqrt{3} *12) [/tex]
=[tex] 144+72\sqrt{3} [/tex] units
