# How do you find the largest circle in a triangle?

## How do you find the largest circle in a triangle?

Age 16 to 18 The largest circle which fits inside a triangle just touching the three sides of the triangle is called the inscribed circle or incircle.

**What is the area of the largest circle that will fit completely inside the square?**

∴ The area of the largest circle that can be drawn inside the square is 198/7 cm2.

**How do you find the area of a circle with an inscribed triangle?**

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### What is the circle in a triangle?

In geometry, the incircle or inscribed circle of a triangle is the largest circle contained in the triangle; it touches (is tangent to) the three sides. The center of the incircle is a triangle center called the triangle’s incenter.

**How can we find area of triangle?**

The area of a triangle is defined as the total region that is enclosed by the three sides of any particular triangle. Basically, it is equal to half of the base times height, i.e. A = 1/2 × b × h.

**What is the diagonal of the largest square cut from a circle?**

Now, the diagonal of the largest square is the diameter of the circle. Originally Answered: Kindly send me the solution, What is the area of largest square cut from a circle of radius 4 cm? a² is the area of the largest square. Book a free one-on-one private trial math class today.

#### What is the area of a circle of 7 cm diameter?

The circle’s radius is 7 cm so its area is 49pi cm^2. So 196–49pi. 49pi approximates to 154cm. The circle is 154cm^2 and the rest of the sheet is 196–154=42cm^2. These two figures are close approximations due to pi not being a real number. What would be the area of largest square which can be drawn inside the circle of 10 cm diameter?

**How do you find the radius of a circle circumscribing a triangle?**

Given A, B, and C as the sides of the triangle and A as the area, the formula for the radius of a circle circumscribing a triangle is r = ABC / 4A and for a circle inscribed in a triangle is r = A / S where S = (A + B + C) / 2.

**What is the area of the equilateral triangle inscribed in a circle?**

Area of triangle = S^ 2 (√ 3 / 4) Area of triangle = ( 15.47 )^ 2 (√ 3 / 4) Area of triangle = 103.59 square meters. Final Answer: The area of the equilateral triangle inscribed in a circle is 103.59 square meters.

https://www.youtube.com/watch?v=uE0LwFlTXTw