If (alpha, beta) is the foot of perpendi...

If `(alpha, beta)` is the foot of perpendicular from `(x_1, y_1)` to line `lx+my+n=0`, then (A) `(x_1 - alpha)/l = (y_1 - beta)/m` (B) `(x-1 - alpha)/l) = (lx_1 + my_1 + n)/(l^2+m^2)` (C) `(y_1 - beta)/m = (lx_1 + my_1 +n)/(l^2 +m^2)` (D) `(x-alpha)/l = (lalpha+mbeta+n)/(l^2+m^2)`

Similar Questions

Explore conceptually related problems

If (h, r) is the foot of the perpendicular from (x_1, y_1) to lx+my+n=0 , prove that : (x_1-h)/l, = (y_1 - r)/m, = (lx_1 + my_1 +n)/(l^2 + m^2)

If alpha, beta are the roots of the equation x^(2) - lm + m = 0 , then find the value of 1/(alpha^(2)) + 1/(beta^(2)) in terms of l and m.

If alpha,beta are roots of the equation x^(2)+lx+m=0, write an equation whose roots are (1)/(alpha) and -(1)/(beta)A

Find the equation of the plane through the line (x-x_1)/l_1=(y-y_1)/m_1=(z-z_1)/n_1 and parallel to the line (x-alpha)/l_2=(y-beta)/m_2=(z-gamma)/n_2

If alpha,beta be the roots of x^(2)-x-1=0 and A_(n)=alpha^(n)+beta^(n), then A . M of A_(n-1) and A_(n), is

If alpha, beta " are the roots of the equation " lx^(2) - mx + m =0, l!=m,l!=0, then which one of the following statement is correct ?

The area (in square units ) of the quadrilateral formed by two pairs of lines l^(2) x^(2) - m^(2) y^(2) - n (lx + my) = 0 and l^(2) x^(2)- m^(2) y^(2) + n (lx - my ) = 0 , is

The equation (x-alpha)^(2)+(y-beta)^(2)=k(lx+my+n)^(2) represents

The line lx+my+n=0 touches y^(2)=4x and x^(2)=4y simultaneously then l+2m+3n=

If `(alpha, beta)` is the foot of perpendicular from `(x_1, y_1)` to line `lx+my+n=0`, then (A) `(x_1 - alpha)/l = (y_1 - beta)/m` (B) `(x-1 - alpha)/l) = (lx_1 + my_1 + n)/(l^2+m^2)` (C) `(y_1 - beta)/m = (lx_1 + my_1 +n)/(l^2 +m^2)` (D) `(x-alpha)/l = (lalpha+mbeta+n)/(l^2+m^2)`

Similar Questions

Recommended Questions