If a circle is inscribed in a triangle, which of the following must be true? Check
all that apply.
I A. The circle is tangent to each side of the triangle.
B. The triangle is circumscribed about the circle.
n
C. The circle is congruent to the triangle.
D. Each vertex of the triangle lies inside the circle.
D E. Each vertex of the triangle lies outside the circle.
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6gny6hpjyp 6gny6hpjyp · Answer 1 · 2021-06-22T16:59:37+02:00

Answer:

A. The circle is tangent to each side of the triangle.

B. The triangle is circumscribed about the circle.

E. Each vertex of the triangle lies outside the circle.

Step-by-step explanation:

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ayoushivt ayoushivt · Answer 2 · 2022-07-18T08:44:56+02:00

Option A , B and D are the statements that apply to the Inscribed Circle in a Triangle

An inscribed circle is when all the sides of the polygon is tangential to the circle .

It is given that

a circle is inscribed in a triangle

Then the statements that apply are

The circle is tangent to each side of the triangle.

The triangle is circumscribed about the circle and

Each vertex of the triangle lies outside the circle.

Option A , B and D are the statements that apply to the Inscribed Circle in a Triangle

To know more about Inscribed Circle

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