Using this square in a circle calculator, you can find the biggest square in a circle. It also helps you find the largest circle inside a square. Be it geometry 📐, construction 🏗️, or daily life 🚶, we often come across composite shapes such as a square circumscribing a circle 🔵 or a square inscribed in a circle. This calculator helps you find the dimensions 📏 of such shapes when one of the measurements is known! Have you ever wondered 'What is the largest circular pizza 🍕 I can fit into this square 🔲 box?' or 'What is the largest square piece of cake 🎂 I can fit into this circular plate 🍽️?' or 'What is the largest circular indoor pool 🏊 I can fit into this square room?' Well, wonder no more! Because our square in a circle calculator will help you find the answers to these questions and more!
Using the square in a circle calculator, you can find any of the following:
You can thus use this square in a circle calculator in several different ways, depending on your need!
To know how to find the largest square in a circle using the square inside a circle calculator, do the following:
In this manner, you can find the maximal square that you can draw within a given circle.
To know how to find the largest circle in a square using the square inside a circle calculator, do the following:
In this manner, when a square is circumscribing a circle, you can find the radius and area of the circle.
Squaring a circle refers to finding a square with the same area as that of the circle. For a circle with radius r, a square with the same area will have a side length of r√π. So, for example, if a given circle has a radius of 10 cm, then a square with the same area as the circle will have a side length of 10√π cm. Alternatively, we can also convert a given square to a round shape by doing the reverse operation. It's interesting to note that we can approximate a square to a circle by incrementally increasing the number of sides to get regular polygons such as pentagon, hexagon, heptagon, octagon, etc. until we end up with a circle ⭕.
Converting a square to a circle refers to finding a circle with the same area as the square. So if we want to convert a square to a round figure, the radius of the resulting circle will be s/√π, where s is the side of the square.
If we have a circle of radius 10 cm, then we can do the following to find the largest square inscribed in the circle:
If we have a square circumscribed about a circle with side 10 cm, then we can find the largest circle inscribed in the square as follows:
If we have a square of side 10 cm, its area will be 100 cm². A circle with the same area will therefore have a radius of 10/√π, or 5.64 cm.
When a circle is inscribed in a square , the diameter of the circle is equal to the side length of the square.
You can find the perimeter and area of the square, when at least one measure of the circle or the square is given. For a square with side length s , the following formulas are used. Perimeter = 4 s Area = s 2 Diagonal = s 2 Similarly, you can find the circumference and area of the circle , when at least one measure of the circle or the square is given. For a circle with radius r , the following formulas are used. Circumference = 2 π r Area = π r 2
Example 1: Find the perimeter of the square.
When a circle is inscribed in a square, the diameter of the circle is equal to the side length of the square. So, the side length of the square is 6 cm. The perimeter P of a square with side length s is given by P = 4 s . Substitute 6 for s in P = 4 s . P = 4 ( 6 ) = 24 The perimeter of the square is 24 cm.
Example 2: What is the area of a circle that is inscribed in a square of area 64 square units? When a circle is inscribed in a square, the length of each side of the square is equal to the diameter of the circle. That is, the diameter of the inscribed circle is 8 units and therefore the radius is 4 units. The area of a circle of radius r units is A = π r 2 . Substitute r = 4 in the formula. A = π ( 4 ) 2 = 16 π ≈ 50.24 Therefore, the area of the inscribe circle is about 50.24 square units. |