nikita33
Sep7-08, 04:11 PM
1. The problem statement, all variables and given/known data
a norman window has the shape of a rectangle surmounted by a semicircle. A norman window with the perimeter 30 ft. is to be constructed.
a.) find a function that models the area of the window.
b.) find the dimensions of the window that admit the greatest amount of light
2. Relevant equations
part a.) area= LW (this problem, it will be xy, with x as the width)
semicircle circumference= 1/2\Pix s
part b.) i dont know and I cannot use derivatives or calculus, which is why im having
trouble here.
3. The attempt at a solution
a.)
P= x + 2y + 1/2\Pix = 30
2y = 30 - 1/2\Pix - x
y = 15 - 1/2x - 1/4\Pix
A= (x)(15 - 1/2x - 1/4\Pix) + 1/2\Pi(1/2x)2
(x)(15 - 1/2x - 1/4\Pix) + 1/8\Pix2
hence A= 15x - 1/2x2 - 1/8\Pi2
b.)
i know the area equation is correct. I have no idea as to how to begin to figure out the max dimensions for the light. i would appreciate any clues. and sorry if the pi isnt looking right.
a norman window has the shape of a rectangle surmounted by a semicircle. A norman window with the perimeter 30 ft. is to be constructed.
a.) find a function that models the area of the window.
b.) find the dimensions of the window that admit the greatest amount of light
2. Relevant equations
part a.) area= LW (this problem, it will be xy, with x as the width)
semicircle circumference= 1/2\Pix s
part b.) i dont know and I cannot use derivatives or calculus, which is why im having
trouble here.
3. The attempt at a solution
a.)
P= x + 2y + 1/2\Pix = 30
2y = 30 - 1/2\Pix - x
y = 15 - 1/2x - 1/4\Pix
A= (x)(15 - 1/2x - 1/4\Pix) + 1/2\Pi(1/2x)2
(x)(15 - 1/2x - 1/4\Pix) + 1/8\Pix2
hence A= 15x - 1/2x2 - 1/8\Pi2
b.)
i know the area equation is correct. I have no idea as to how to begin to figure out the max dimensions for the light. i would appreciate any clues. and sorry if the pi isnt looking right.