Complete the proof of Heron's formula. 1 a. Begin with the formula Area =bc sin A and square both sides. b. In the equation from part (a), replace sin²A by 1 - cos² A. c. In the equation from part (b), factor 1 - cos² A as a difference of squares. d. Take the square root of both sides and write the area as Area = cos A e. Use the law of cosines to show that a+b+c -a+b+c bc (1+cos A): 2 2 Note: Using similar logic, we can also show that a-b+c a a+b-c bc (1-cos A)= 2 2 f. Use the substitutions = (a+b+c) to rewrite equation (2) as bc (1 bc (1+cos A)s(sa) Note: Using similar logic, we can also show that bc (1-cos A)=(s-b)(s-c) g. Substitute equations (4) and (5) into equation (1). € 2 (3) (4)
Complete the proof of Heron's formula. 1 a. Begin with the formula Area =bc sin A and square both sides. b. In the equation from part (a), replace sin²A by 1 - cos² A. c. In the equation from part (b), factor 1 - cos² A as a difference of squares. d. Take the square root of both sides and write the area as Area = cos A e. Use the law of cosines to show that a+b+c -a+b+c bc (1+cos A): 2 2 Note: Using similar logic, we can also show that a-b+c a a+b-c bc (1-cos A)= 2 2 f. Use the substitutions = (a+b+c) to rewrite equation (2) as bc (1 bc (1+cos A)s(sa) Note: Using similar logic, we can also show that bc (1-cos A)=(s-b)(s-c) g. Substitute equations (4) and (5) into equation (1). € 2 (3) (4)
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter6: The Trigonometric Functions
Section: Chapter Questions
Problem 10RE
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