In an equilateral triangle with side a, prove that the altitude is of length `(asqrt3)/2`

In an equilateral triangle with side a, prove that the altitude is of length (a sqrt3)/2

In an equilateral triangle with side a, prove that, the altitude is of length (sqrt(3))/(2)a .

In an equilateral triangle with side a, prove that, the area of the triangle (sqrt(3))/(4)a^(2) .

In an equilateral triangle with side 'a' prove that its altitudes = sqrt3/2a and its area = sqrt3/4a^2 .

In an equilateral triangle with side a , prove that Altitude =(asqrt(3))/2 (ii) Area =(sqrt(3))/4a^2

In an equilateral triangle with side a ,prove that Altitude =(a sqrt(3))/(2) (ii) Area =(sqrt(3))/(4)a^(2)

In an equilateral triangle with side a, prove that area =(sqrt(3))/(4)a^(2)

In an equilateral triangle of side 3sqrt(3) cm then length of the altitude is

An equilateral triangle is inscribed in the parabola y^2 =4ax whose one vertex is at the vertex of the parabola if 1 cms is the side of the equilateral triangle prove that the length of each altitude of the triangle is (1sqrt3)/2 cms