Ron has a very good knowledge of graphs and relationships. So he is given a question to solve it using a programming language. The coordinates of centres of these squares are (x1, a/2), (x2, a/2) and (x3, a/2) respectively. All of them are placed with one of their sides resting on the x-axis. You are allowed to move the centres of each of these squares along the x-axis (either to the left or to the right) by a distance of at most K. Find the maximum possible area of intersections of all these three squares that you can achieve. That is, the maximum area of the region which is part of all the three squares in the final configuration.

Computer Networking: A Top-Down Approach (7th Edition)
7th Edition
ISBN:9780133594140
Author:James Kurose, Keith Ross
Publisher:James Kurose, Keith Ross
Chapter1: Computer Networks And The Internet
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Note: Please Answer in java only
Ron has a very good knowledge of graphs and relationships. So he is given a question to solve it using a
programming language. The coordinates of centres of these squares are (x1, a/2), (x2, a/2) and (x3, a/2)
respectively. All of them are placed with one of their sides resting on the x-axis. You are allowed to move
the centres of each of these squares along the x-axis (either to the left or to the right) by a distance of at
most K. Find the maximum possible area of intersections of all these three squares that you can achieve.
That is, the maximum area of the region which is part of all the three squares in the final configuration.
Input
1
10
123
Output
0.00000
Transcribed Image Text:Note: Please Answer in java only Ron has a very good knowledge of graphs and relationships. So he is given a question to solve it using a programming language. The coordinates of centres of these squares are (x1, a/2), (x2, a/2) and (x3, a/2) respectively. All of them are placed with one of their sides resting on the x-axis. You are allowed to move the centres of each of these squares along the x-axis (either to the left or to the right) by a distance of at most K. Find the maximum possible area of intersections of all these three squares that you can achieve. That is, the maximum area of the region which is part of all the three squares in the final configuration. Input 1 10 123 Output 0.00000
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