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There are different formula for: Height, Area, Perimeter, Angle, Length of Median Radius of inscribed circle Perimeter of inscribed circle Area of inscribed circle etc.
An equilateral triangle inscribed in a circle has three sides that are equal in length and three angles that are each 60 degrees. The center of the circle is also the intersection point of the triangle's perpendicular bisectors.
Where the side of the equilateral triangle is s and the radius of the inscribed circle is r:s = 2r * tan 30° = 48.50 cm
Yes. Any triangle can be inscribed within a circle, although the center of the circle may not necessarily lie within the triangle.
If you mean properties of an equilateral triangle then some of them are:- It has 3 equal sides It has 3 equal interior angles that add up to 180 degrees It has 3 lines of symmetry It will tessellate leaving no gaps or overlaps Its perimeter is the sum of its 3 sides It can fit perfectly into a circle Its area is: 0.5*base*perpendicular height
Yes and perfectly
Yes. Any triangle can be inscribed in a circle.
There are different formula for: Height, Area, Perimeter, Angle, Length of Median Radius of inscribed circle Perimeter of inscribed circle Area of inscribed circle etc.
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A square or an equilateral triangle for example when a circle is inscribed within it.
An equilateral triangle inscribed in a circle has three sides that are equal in length and three angles that are each 60 degrees. The center of the circle is also the intersection point of the triangle's perpendicular bisectors.
Where the side of the equilateral triangle is s and the radius of the inscribed circle is r:s = 2r * tan 30° = 48.50 cm
Yes. Any triangle can be inscribed within a circle, although the center of the circle may not necessarily lie within the triangle.
Draw a circle using a compass. Then, without changing the compass setting, place its point on the circumference of the circle, at any point A, and draw two arcs to intersect the circumference at B and C. Move the compass to B and draw another arc to intersect the circumference at D; and then from C to E. ADE will be an inscribed equilateral triangle.
The circumcenter of the triangle.
It is the center of the circle that is inscribed in the triangle.
If you mean properties of an equilateral triangle then some of them are:- It has 3 equal sides It has 3 equal interior angles that add up to 180 degrees It has 3 lines of symmetry It will tessellate leaving no gaps or overlaps Its perimeter is the sum of its 3 sides It can fit perfectly into a circle Its area is: 0.5*base*perpendicular height