A light beam, emanating from the point (3, 10) reflects from the straight line `2x+y-6=0` and then passes through the point `B(7, 2)`. Find the equations of the incident and reflected beams.

A light beam, emanating from the point A (3, 10) reflects from the straight line 2x+y-6=0 and then passes through the point B(4, 3) . Find the equations of the reflected beams.

A light beam emanating from the point A(3,10) reflects from the straight line 2x+y-6=0 and then passes through the point B(4,3) .The equation of the reflected beam is x+3y-lambda=0, then the valueof lambda is

A beam of light from the point A(3,10) reflects from the line 2x+y-6=0 and then passes through the point B(5, 6).The equation of reflected beam is :

A beam of light from the point A(3,10) reflects from the line 2x+y-6=0 and then passes through the point B(5, 6).The equation of reflected beam is :

A light beam 2x+y+1=0 emanating from the point (-1,1) gets reflected from the straight line x+y+1=0 then reflected ray passes through

A ray of light coming from the point (1,2) is reflected at a point A on the axes of x and then passes through the point (5,3). Find the co ordinates of the point A.

A ray of light passing through the point (1, 2) reflects on the x–axis at point A and the reflected ray passes through the point (5, 3). Find the coordinates of A.

Aray of light passing through the point (1, 2) reflects on the x-axis at point and the reflected ray passes through the point (5,3). Find the coordinates of A.