Hi Bobbym

Hi I am sorry. I choose the wrong value. I take this opportunity to reedit this exercise and make it more interersting.

An equilateral triangle  P Q R is inscribed in a square A B C D .  P is on AD, Q on AB and R on CD.
What is the side length of the triangle if the side length of the square = 10 cm and the distance AP=3 cm.
You can start working on numerical values and use numerical method to find the answer. It is more rewarding
to start with AD=a, Ap=d, calculate the litteral value of the side lenth of the triangle. I hope I am right this time

Hi;

Hi hammana;

Hi hammana;

There are many ways to a correct answer.

I do not suppose that you read "Commonsense, Brute Force and the Computer..."

Probably nobody did because the guy who wrote it never got it published. Although it deals with programming it is often applicable.

If someone writes a tremendously deep program that runs in under a second he would be happy. Someone else writes a program to do the same task but it takes 10 seconds. Is his program bad?
Not necessarily, when we find that the first program took 5 days to develope and the second person's 2 days.

The real running time of the two programs is 5 days and 1 second versus 2 days and 10 seconds. From this vantage point the second guy has the superior program. What I am getting at is solutions like programs have different ratings of simplicity and elegance based on how you view them.

I generally work towards a solution that can be solved using computational methods. I do not veer off much from that strategy. This way is natural and quick for me. If some other way is more natural to you then by all means use it.

Hi hammana;

Thanks for providing your solution.

I use this place for all my latexing. No downloads, pull down menus, clean latex every time.

http://latex.codecogs.com/editor.php