Consider a window that is in the shape of a rectangle topped by a semicircle. Given that the perimeter of the window is 14 meters, express the window's area, A, as a function of w, the width of the window. Note that this type of window is called a Norman window and the width of the rectangle, w, is the diameter of the described semicircle. A = ____ m2

cortejosni

cortejosni

Answered question

2022-08-03

Consider a window that is in the shape of a rectangle topped by a semicircle. Given that the perimeter of the window is 14 meters, express the window's area, A, as a function of w, the width of the window. Note that this type of window is called a Norman window and the width of the rectangle, w, is the diameter of the described semicircle.
A = ____ m2

Answer & Explanation

Brennan Parks

Brennan Parks

Beginner2022-08-04Added 14 answers

(1)
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(2)
The width and height of the rectangle are w and h,respectively.
The area and perimeter of the window are A and P,respectively.
The perimeter of the rectangular part of the window Is
P r = w + 2 h
The perimeter of the semicircular part of the window is
P s = 1 2 ( 2 π ( w 2 ) ) = π 2 w
Therefore P = P r + P s = ( 1 + π 2 ) w + 2 h
Rewriteh in terms of w:
( 1 + π 2 ) w + 2 h = P 2 h = P ( 1 + π 2 ) w h = P 2 1 2 ( 1 + π 2 ) w h = P 2 ( 1 2 + π 4 ) w
(3)
The area of the rectangular part of the Window is
A r = wh.
The area ot the semicircular part ot the windoW Is
A s = 1 2 ( π ( w 2 2 ) = π 8 w 2
Therefore A = A r + A s = π 8 w 2 + w h
Substitute P 2 ( 1 2 + π 4 ) w  for  h :
A = π 8 w 2 + w [ P 2 ( 1 2 + π 4 w ] = ( π 8 1 2 π 4 ) w 2 + P 2 w
A = ( π 8 + 1 2 ) w 2 + P 2 w P = 14 A = ( π 8 + 1 2 ) w 2 + 7 w
(4)
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