Denoting the radius of the circumscribed circle as R, we can determine using
The area of the triangle is
Many of these quantities have simple relationships to the altitude ("h") of each vertex from the opposite side:
The area is
The height of the center from each side, or
The radius of the circle circumscribing the three vertices is
The radius of the inscribed circle is
In an equilateral triangle, the altitudes, the angle bisectors, the perpendicular bisectors, and the medians to each side coincide.
A triangle ABC that has the sides a, b, c,
exradiira, rb, rc (tangent to a, b, c respectively), and where R and r are the radii of the
incircle respectively, is equilateral
if and only if any one of the statements in the following nine categories is true. Thus these are properties that are unique to equilateral triangles, and knowing that any one of them is true directly implies that we have an equilateral triangle.
triangle center of an equilateral triangle coincides with its
centroid, which implies that the equilateral triangle is the only triangle with no
Euler line connecting some of the centers. For some pairs of triangle centers, the fact that they coincide is enough to ensure that the triangle is equilateral. In particular:
Napoleon's theorem states that, if equilateral triangles are constructed on the sides of any triangle, either all outward, or all inward, the centers of those equilateral triangles themselves form an equilateral triangle.
Pompeiu's theorem states that, if P is an arbitrary point in the plane of an equilateral triangle ABC but not on its
circumcircle, then there exists a triangle with sides of lengths PA, PB, and PC. That is, PA, PB, and PC satisfy the
triangle inequality that the sum of any two of them is greater than the third. If P is on the circumcircle then the sum of the two smaller ones equals the longest and the triangle has degenerated into a line, this case is known as
Van Schooten's theorem.
Euler's inequality, the equilateral triangle has the smallest ratio R/r of the circumradius to the inradius of any triangle: specifically, R/r = 2.: p.198
The triangle of largest area of all those inscribed in a given circle is equilateral; and the triangle of smallest area of all those circumscribed around a given circle is equilateral.
The ratio of the area of the incircle to the area of an equilateral triangle, , is larger than that of any non-equilateral triangle.: Theorem 4.1
The ratio of the area to the square of the perimeter of an equilateral triangle, is larger than that for any other triangle.
If a segment splits an equilateral triangle into two regions with equal perimeters and with areas A1 and A2, then: p.151, #J26
If a triangle is placed in the
complex plane with complex vertices z1, z2, and z3, then for either non-real cube root of 1 the triangle is equilateral if and only if: Lemma 2
Given a point P in the interior of an equilateral triangle, the ratio of the sum of its distances from the vertices to the sum of its distances from the sides is greater than or equal to 2, equality holding when P is the centroid. In no other triangle is there a point for which this ratio is as small as 2. This is the
Erdős–Mordell inequality; a stronger variant of it is
Barrow's inequality, which replaces the perpendicular distances to the sides with the distances from P to the points where the
angle bisectors of ∠APB, ∠BPC, and ∠CPA cross the sides (A, B, and C being the vertices).
For any point P in the plane, with distances p, q, and t from the vertices A, B, and C respectively,
For any point P in the plane, with distances p, q, and t from the vertices,
where R is the circumscribed radius and L is the distance between point P and the centroid of the equilateral triangle.
For any point P on the inscribed circle of an equilateral triangle, with distances p, q, and t from the vertices,
For any point P on the minor arc BC of the circumcircle, with distances p, q, and t from A, B, and C respectively,
moreover, if point D on side BC divides PA into segments PD and DA with DA having length z and PD having length y, then : 172
A regular tetrahedron is made of four equilateral triangles.
Equilateral triangles are found in many other geometric constructs. The intersection of circles whose centers are a radius width apart is a pair of equilateral arches, each of which can be inscribed with an equilateral triangle. In three dimensions, they form faces of regular and uniform
polyhedra. Three of the five
Platonic solids are composed of equilateral triangles: the
icosahedron. In particular, the tetrahedron, which has four equilateral triangles for faces, can be considered the three-dimensional analogue of the triangle. All Platonic solids can inscribe tetrahedra, as well as be inscribed inside tetrahedra.
Also in the third dimension, equilateral triangles form
uniform antiprisms as well as uniform
star antiprisms. For antiprisms, two (non-mirrored)
parallel copies of regular polygons are connected by alternating bands of 2n triangles. Specifically for star antiprisms, there are prograde and retrograde (crossed) solutions that join mirrored and non-mirrored parallel
The equilateral triangle belongs to the infinite family of n-
simplexes, with n=2.
Construction of equilateral triangle with compass and straightedge
An equilateral triangle is easily constructed using a
straightedge and compass, because 3 is a
Fermat prime. Draw a straight line, and place the point of the compass on one end of the line, and swing an arc from that point to the other point of the line segment. Repeat with the other side of the line. Finally, connect the point where the two arcs intersect with each end of the line segment
An alternative method is to draw a circle with radius r, place the point of the compass on the circle and draw another circle with the same radius. The two circles will intersect in two points. An equilateral triangle can be constructed by taking the two centers of the circles and either of the points of intersection.
The proof that the resulting figure is an equilateral triangle is the first proposition in Book I of
Derivation of area formula
The area formula in terms of side length a can be derived directly using the Pythagorean theorem or using trigonometry.
Using the Pythagorean theorem
The area of a triangle is half of one side a times the height h from that side:
An equilateral triangle with a side of 2 has a height of √3, as the
sine of 60° is √3/2.
The legs of either right triangle formed by an altitude of the equilateral triangle are half of the base a, and the hypotenuse is the side a of the equilateral triangle. The height of an equilateral triangle can be found using the
Substituting h into the area formula 1/2ah gives the area formula for the equilateral triangle:
trigonometry, the area of a triangle with any two sides a and b, and an angle C between them is
Each angle of an equilateral triangle is 60°, so
The sine of 60° is . Thus
since all sides of an equilateral triangle are equal.
In culture and society
Equilateral triangles have frequently appeared in man made constructions:
The shape occurs in modern architecture such as the cross-section of the
^Riley, Michael W.; Cochran, David J.; Ballard, John L. (December 1982). "An Investigation of Preferred Shapes for Warning Labels". Human Factors: The Journal of the Human Factors and Ergonomics Society. 24 (6): 737–742.