GRE Prep Club Daily Prep
Thank you for using the timer - this advanced tool can estimate your performance and suggest more practice questions. We have subscribed you to Daily Prep Questions via email.
Customized
for You
Track
Your Progress
Practice
Pays
Not interested in getting valuable practice questions and articles delivered to your email? No problem, unsubscribe here.
In the figure above, the circumference of the circle is 20π
[#permalink]
26 Aug 2017, 02:08
26 Aug 2017, 02:08
Expert Reply
1
Bookmarks
00:00
Question Stats:
81% (01:30) correct
18% (01:37) wrong based on 53 sessions
Hide Show timer Statistics
Attachment:
Inside.jpg [ 12.13 KiB | Viewed 4138 times ]
In the figure above, the circumference of the circle is 20π. Which of the following is the maximum possible area of the rectangle?
(A) 80
(B) 200
(C) 300
(D) \(100 \sqrt{2}\)
(E) \(200 \sqrt{2}\)
Re: In the figure above, the circumference of the circle is 20π
[#permalink]
07 Dec 2017, 04:38
07 Dec 2017, 04:38
1
So the rectangle is going have the greatest Area if it is a square.
We know that the circle has a diameter of 20.
The square will have this diameter as its diagonal. In every sqaure the diagonal is a side * sqRoot of 2. So here it is 20/(sqRoot2).
If we multiply 20/(sqRoot2) we obtain 200.
We know that the circle has a diameter of 20.
The square will have this diameter as its diagonal. In every sqaure the diagonal is a side * sqRoot of 2. So here it is 20/(sqRoot2).
If we multiply 20/(sqRoot2) we obtain 200.
Re: In the figure above, the circumference of the circle is 20π
[#permalink]
13 Dec 2019, 21:59
13 Dec 2019, 21:59
simon1994 wrote:
So the rectangle is going have the greatest Area if it is a square.
We know that the circle has a diameter of 20.
The square will have this diameter as its diagonal. In every sqaure the diagonal is a side * sqRoot of 2. So here it is 20/(sqRoot2).
If we multiply 20/(sqRoot2) we obtain 200.
We know that the circle has a diameter of 20.
The square will have this diameter as its diagonal. In every sqaure the diagonal is a side * sqRoot of 2. So here it is 20/(sqRoot2).
If we multiply 20/(sqRoot2) we obtain 200.
Can you please elaborate why it has to be a square to have maximum area ?
