If a<x and b<y, then the rectangle with corners at (x,y), (x,0), (0,y), and (0,0) has an area greater than ab.

Shannon Andrews

Shannon Andrews

Answered question

2022-07-15

If a < x and b < y, then the rectangle with corners at (x,y), (x,0), (0,y), and (0,0) has an area greater than ab.

Answer & Explanation

repotasonwf

repotasonwf

Beginner2022-07-16Added 12 answers

Step 1
What are the length of the sides of the rectangle? If you plot them, it will be easy to see that the lengths are x and y.
The area of a rectangle is base x height so the area of this rectangle is xy. We know a < x and b < y. Let x = a + α and y = b + β for some α and β positive real numbers. Then we substitute the area xy into ( a + α ) ( b + β ). Multiply this out and get that this is greater than ab.

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