The perimeter of a regular hexagon is 48 inches. What is the number of square inches in the positive difference between the areas of the circumscribed and the inscribed circles of the hexagon? Express your answer in terms of pi.

##16pi ” in”^2##
Refer to the image below to give us visual on how to solve this.
Given that ##P = 48 ” in”##, means we have the measurement of each side equal to ##P/6 =(48″ in”)/6 = 8 ” in”##. Since the figure is a regular six-sided polygon.
To find the positive difference in area of the circumscribed and inscribed circles, we need to find of course each area of the circle, but find these area, we need their respective radius.
The figure shows us that the ##color(red)”radius”## of the circumscribed circle is the also the radius of the hexagon, and the ##color(blue)”radius”## of the inscribed circle is the apothem of the hexagon.
Apothem is the distance from the center perpendicular to one of the side of a regular polygon.
Note that, apothem is also the perpendicular bisector of the side of a regular polygon. These means that the side is divided into two, and equals ##4 ” in”##.
Another important thing, a regular hexagon is also made up of 6 equilateral triangles, and these triangles have interior angles of ##60^o##.
Using the radii and one side of the hexagon, we can form a right “special” triangle which is a 30-60-90 triangle.
We know the measure of a side and an angle, therefore we can use trigonometric functions to determine the other legs.
Solving for ##color(red)R##:
##cos theta=(adj)/(hyp)##
##cos 60^o=(4 “in”)/color(red)R##
##color(red)R=(4″in”)/(cos60^o) = color(red)(8 ” in”)##
Solving for ##color(blue)r##:
##tan theta=(opp)/(adj)##
##tan 60^o=color(blue)(r)/(4 “in”)##
##color(blue)r=4″in”*tan60^o = color(blue)(4sqrt3 ” in”)##
NOW WE HAVE THE RADII, WE COMPUTE FOR THE AREAS:
Let:
##A_c =>## area of the circumscribed circle
##A_i =>##area of the inscribed circle
##A_s =>##area of the shaded ##->##one we are after
##A_s=A_c-A_i##
##A_s=picolor(red)R^2-picolor(blue)r^2##
##A_s=pi(color(red)R^2-color(blue)r^2)##
##A_s=pi[color(red)((8))^2-color(blue)((4sqrt3))^2]##
##A_s=pi(64-48)##
##A_s=16pi ” in”^2##

Save Time On Research and Writing
Hire a Pro to Write You a 100% Plagiarism-Free Paper.
Get My Paper
Calculate your order
Pages (275 words)
Standard price: $0.00
Client Reviews
4.9
Sitejabber
4.6
Trustpilot
4.8
Our Guarantees
100% Confidentiality
Information about customers is confidential and never disclosed to third parties.
Original Writing
We complete all papers from scratch. You can get a plagiarism report.
Timely Delivery
No missed deadlines – 97% of assignments are completed in time.
Money Back
If you're confident that a writer didn't follow your order details, ask for a refund.

Calculate the price of your order

You will get a personal manager and a discount.
We'll send you the first draft for approval by at
Total price:
$0.00
Power up Your Academic Success with the
Team of Professionals. We’ve Got Your Back.
Power up Your Study Success with Experts We’ve Got Your Back.
Live Chat+1 763 309 4299EmailWhatsApp