SOLUTION: A non-square rectangle is inscribed in a square so that each vertex of the rectangle is at the trisectional different sides of the square. Find the ratio of the area of the rectang

Algebra ->  Parallelograms -> SOLUTION: A non-square rectangle is inscribed in a square so that each vertex of the rectangle is at the trisectional different sides of the square. Find the ratio of the area of the rectang      Log On


   

Question 1082133: A non-square rectangle is inscribed in a square so that each vertex of the rectangle is at the trisectional different sides of the square. Find the ratio of the area of the rectangle to the area of the square.
Answer by ikleyn(52946) About Me  (Show Source):
You can put this solution on YOUR website!
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It is for the first time in my life I see this term "trisectional sides of the square".

Where it comes from ?

What is the source of this problem ?

Did it really come from a textbook ?