The sum of all angles in triangle AMC is equal to 180°. Substitute angle ABC by 55 and solve for angle ACM The sum of all angles in triangle ABC is equal to 180°. The size of angle ABC is equal to 55 degrees. The sum of all three angles of the triangle is equal to 180°. Multiply both sides by 2 and divide thm by h to simplify toįind the measure of angle A in the figure below.Ī first interior angle of the triangle is supplementary to the angle whose measure is 129° and is equal toĪ second interior angle of the triangle is supplementary to the angle whose measure is 138° and is equal to We now substitute EB and FC in A2 = (1/2) h (EB + FC)Ī2 = (1/2) h (17 + 20 - DF) = (1/2) h (37 - DF)įor EF to divide the parallelogram into two regions of equal ares, we need to have area A1 and area A2 equal Now let A2 be the area of the trapezoid EBCF. HenceĪ1 = (1/2) h (AE + DF) = (1/2) h (3 + DF), h is the height of the parallelogram. Let A1 be the area of the trapezoid AEFD. Find the length of DF such that the segment EF divide the parallelogram in two regions with equal areas. E is a point between A and B such that the length of AE is 3 cm. HenceĪBCD is a parallelogram such that AB is parallel to DC and DA parallel to CB. Let A be the measure of angle A and B be the measure of angle B. With Solutions and Explanations for Grade 9ĭetailed solutions and full explanations to Geometry Problems for grade 9 are presented.Īngles A and B are complementary and the measure of angle A is twice the measure of angle B.
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