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A square of side x is cut out of a larger square of side y. What is the area of the remaining figure?​

A square of side x is cut out of a larger square of side y. What is the area of the remaining figure?​
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2 votes
A square of side x is cut out of a larger square of side y. What is the area of the remaining

figure?​

User Retromuz
by
7.6k points

1 Answer

2 votes

Answer:

The area of the remaining figure is
y^2-x^2

Explanation:

Area of the Square Shape

Given a square of side length x, the area is calculated by the formula:


A_x=x^2

It's given a square of side x is cut out of a larger square of side y. Please refer to the image below.

The area of the square of side length y is:


A_y=y^2

The shaded area of the remaining figure is the difference between both areas:


A=A_y-A_x


A=y^2-x^2

The area of the remaining figure is
\mathbf{y^2-x^2}

A square of side x is cut out of a larger square of side y. What is the area of the-example-1
User Christian Hagelid
by
8.0k points
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