The height of an equilateral triangle is 13√3 Find the side of this triangle.
In order to find the length of the side of an equilateral triangle, the median length of which is 13√3, let’s reason.
By the property of an equilateral triangle, the median divides the side to which it is drawn into two equal segments. And at the same time it is height.
As a result, we get two identical right-angled triangles.
We introduce the variable x, denoting the side of the triangle by it.
In a right-angled triangle, the hypotenuse will be x, one of the legs is x / 2 (half of the side to which the median is drawn), the second leg is the median equal to 13√3.
We apply the Pythagorean theorem and get.
x ^ 2 = (x / 2) ^ 2 + (13√3) ^ 2;
x ^ 2 = 507 + x2 / 4;
4x ^ 2 = 2028 + x ^ 2;
4x ^ 2 – x ^ 2 = 2028;
3x ^ 2 = 2028;
x ^ 2 = 2028: 3;
x ^ 2 = 676;
x = √676;
x = 26 is the length of the side of the triangle.