The equation of two altitudes of an equi...

The equation of two altitudes of an equilateral triangle are `sqrt3x - y + 8 - 4 sqrt3 = 0 ` and `sqrt3x + y - 12 - 4 sqrt3 = 0` . The equation of the third altitude is

Similar Questions

Explore conceptually related problems

The joint equation of two altitudes of an equilateral triangle is (sqrt(3)x-y+8-4sqrt(3)) (-sqrt(3)x-y+12 +4sqrt(3)) = 0 The third altitude has the equation

The joint equation of two altitudes of an equilateral triangle is (sqrt(3)x-y+8-4sqrt(3)) (-sqrt(3)x-y+12 +4sqrt(3)) = 0 . Find the third altitude equation.

The joint equation of two altitudes of an equilateral triangle is (sqrt(3)x-y+8-4sqrt(3)) (-sqrt(3)x-y+12 +4sqrt(3)) = 0 The third altitude has the equation

Find the length of the altitude of an equilateral triangle of side 3sqrt(3) cm

The joint equation of two altitudes of an equilateral triangle is (sqrt(3)x-y+8-4sqrt(3))(-sqrt(3)x-y+12+4sqrt(3))=0 The third altitude has the equation

The altitude of an equilateral triangle is sqrt3 cm . What is its perimeter?

The equation of an altitude of an equilateral triangle is sqrt3x + y = 2sqrt3 and one of its vertices is (3,sqrt3) then the possible number of triangles is

If the altitude of an equilateral triangle is 12sqrt(3) cm , then its area would be :

The equation of two altitudes of an equilateral triangle are `sqrt3x - y + 8 - 4 sqrt3 = 0 ` and `sqrt3x + y - 12 - 4 sqrt3 = 0` . The equation of the third altitude is

Similar Questions

Recommended Questions