Answer:
Side of the square paper = 21 inches
Step-by-step explanation:
Let the square paper is having measure of each side = a inches
Esther cut this square piece into two pieces.
Let the other side of one rectangle piece = x inches
Perimeter of this piece = 2(a + x) inches
Similarly dimensions of the other rectangular piece will be = a inches × (a - x) inches
Perimeter of this piece = 2[a + (a - x)]
Since both the rectangular pieces have the same perimeter = 63
So, 2(a + x) = 2[a + (a - x)] = 63
2(a + x) = 2(2x - x)
a + x = 2a - x
2a - a = 2x
a = 2x
x = [tex]\frac{a}{2}[/tex]
Therefore, Perimeter = 2(a + x) = 2(a + [tex]\frac{a}{2}[/tex]) = 63
[tex]2\times \frac{3a}{2}[/tex] = 63
3a = 63
a = 21
Therefore, measure of the sides of the square is 21 inches.
