A circle is inscribed in a square with a side length of 10 cm. If the circle is enlarged until it circumscribes the square, what is the increase in the circles area? - NBX Soluciones

Understanding the Context

Why A circle is inscribed in a square with a side length of 10 cm. If the circle is enlarged until it circumscribes the square, what is the increase in the circle’s area?

This question isn’t just about numbers—it’s a gateway to understanding spatial relationships critical in architecture, UX design, and data visualization. The square, with sides of 10 cm, holds a circle perfectly fitting inside with diameter equal to the square’s side. Enlarging the circle until it circumscribes the square means doubling the circle’s diameter—transforming it from confined to encompassing. That small change doubles the circle’s radius, dramatically increasing its area. The math behind it unveils how basic shapes underpin digital and physical structures across the U.S.

How It Actually Works: The Math Behind the Expansion

Key Insights

To explore the area increase, begin with geometry fundamentals. For a square of 10 cm per side, the inscribed circle has a diameter equal to 10 cm—so radius 5 cm. Its area follows the standard formula πr²:
π × (5)² = 25π cm².

Now, when the circle expands to circumcircle a square of the same size, its diameter becomes the square’s diagonal. Using the Pythagorean theorem, the diagonal equals side × √2 = 10√2 cm. So the new radius is half that: 5√2 cm. The new area is:
π × (5√2)² = π × (25 × 2) = 50π cm².

The increase in area is then 50π – 25π = 25π cm²—approximately 78.54 cm². This shift, rooted in precise geometry, highlights how transformative shape growth can be.

Common Questions About the Circle Expansion

Final Thoughts

Q: Why does doubling the diameter change the area so much?
Because area grows with the square of the radius. Doubling the diameter quadru