The joint equation of two altitudes of an equilateral triangle is `(sqrt3 x - y +8–4sqrt3) (-sqrt3 x - y + 12 + 4sqrt3) = 0`.
The third altitude has the equation

Evaluate lim_(xrarra) (sqrt(a + 2x) - sqrt(3x))/(sqrt(3a + x) - 2sqrtx)

(sqrt3+sqrt2)^(4)- (sqrt3-sqrt2)^(4) =

What is the length of one side of a equilateral triangle with height 3 cm. Find the area [Find in cm sqrt3=1.73 ].

If the equations of base of an equilateral triangle is 2x -y =1 and the vertex is (-1,2) , then the length of the side of the triangles is : a) sqrt((20)/(3)) b) (2)/(sqrt(15)) c) sqrt((8)/(15)) d) sqrt((15)/(2))

The angle between the lines sqrt(3)x-y-2=0 and x-sqrt(3)y+1=0 is :

Find angles between the lines sqrt 3 x + y = 1 and x + sqrt 3 y = 1

underset(x to 3) (lim)( sqrt(x) - sqrt(3) )/( sqrt( x^(2) -9) ) is equal to a)1 b)3 c) sqrt3 d)0