Since the diagonals of a parallelogram bisect each other, and the diagonals are 10 and 22, then the halves of the diagonals are 5 and 11Look at the red triangle: The interior angle at the top of the red triangle is supplementary to the 65° angle. So it is 180°-65°=115° We have a case of SAS, so we use the law of cosines to calculate b, the base of the red triangle: bē = 11ē + 5ē - 2(11)(5)cos(115°) bē = 121 + 25 - 110(-.4226182617) bē = 285.4640264 b = 16.8956807 inches. We have the base of the parallelogram. Now we have to find the height of the parallelogram. We will use the law of sines to find the angle Ꮎ 5 b = sinᎾ sin(115°) b*sinᎾ = 5sin(115°) 5sin(115°) sinᎾ = b 5sin(115°) sinᎾ = 16.8956807 sinᎾ = .2682069468 Ꮎ = 15.55759756° Now we will extend the base and draw in the height of the parallelogram, labeling it h: The big right triangle that has angle Ꮎ on the left, and the opposide side h on the right, has a hypotenuse which is the longer diagonal, 22, so h sinᎾ = 22 h = 22(sinᎾ) h = 22(.2682069468) h = 5.90055283 Finally we can calculate the area of the parallelogram, A = bh A = (16.8956807in)(5.90055283in) A = 99.69385657 square inches Edwin