3. By sketching this triangle it can be determined that this is not a right triangle, but rather an oblique-angled triangle. For the lengths of the three sides, let a = 7, b = 8, and c = 11, and let angle A be opposite side a, and angle B be opposite side b, and angle C be opposite side c.
Using the Law of Cosines:
cos(A) = (b² + c² - a²)/2bc = [(8)² + (11)² - (7)²)/2(8)(11) = 0.773
A = acos(0.773) = 39.4°
Using the Law of Sines:
sin(A)/a = sin(B)/b ==> sin(B) = (b/a)sin(A) = (8/7)sin(39.4°) = 0.725
B = asin(0.725) = 46.5°
Knowing angles A and B, angle C is:
C = 180° - A - B = 180° - 39.4° - 46.5° = 94.1°
Finally, the area is:
Area = (ab/2)sin(C) = [(7)(8)/2]sin(94.1°) = 27.928 yd²
The total cost is (27.928)($17.50 + $3.25) = $579.51 [answer (a)]