A reflecting surface is represented by the equation `y=(2L)/pisin((pix)/L),0lexleL`. A ray traveling horizontal becomes vertical after reflecting. The co-ordinates of the point(s) on which this ray is incident.

A reflecting surface is represented by the equation y = (2L)/(pi) sin ((pi x)/(L)) , where 0 le x le L . A ray of light travelling horizontally becomes vertical after reflection with the surface. The co-ordinates of the point where this ray is incident is.

A refracting surface is represented by the equation x^(2)+y^(2) = a^(2) . A ray travelling in negative x-directed towards positive y-direction after reflection from the surface at point P. Then co-ordinates of point P are

If a ray travelling the line x = 1 gets reflected the line x+y=1 then the equation of the line along which the reflected ray travels is

An isosceles prism has one of the refracting surfaces silvered. A ray of light is incident normally on the refracting face AB. After two reflections, the ray emerges from the base of the prism perpendicular to it. Find the angle of the prism.

If the equation of mirror is given by y= 2//pi "sin"pix (y gt 0 , 0 le x le 1 ) then find the point on which horizontal ray should be incident so that the reflected ray become perpendicular to the incident ray

A ray of light travelling along the line OA (O being origin ) is reflected by the line mirror x-y +1=0 is the point of incidence being A (1,2) the reflected ray , travelling along AB is again reflected by the line mirror x-y=2 , the point of incidence being B. If this reflected ray moves along BC, find the equation of the lne BC.

Comprehension # 'A ray M is sent along the line (x-0)/2=(y-2)/2=(z-1)/0 and is reflected by the plane x=0 at point Adot The reflected ray is again reflected by the plane x+2y=0 at point Bdot The initial ray and final reflected ray meets at point Jdot The coordinate of the point B is

If a ray travelling along the line x = 1 gets reflected from the line x + y = 1, then the eqaution the line along which the reflected ray travels is

A ray of light moving parallel to x-axis gets reflected from a parabolic mirror whose equation is 4( x+ y) - y^(2) = 0 . After reflection the ray pass through the pt(a, b) . Then the value of a + b is

A parabolic mirror is silvered at inner surface. The equation of the curve formed by its intersection with X-Y plane is given by y=(x^(2))/(4) . A ray travelling in X-Y plane along line y=x+3 hits the mirror in second quandrant and gets reflected. The unit vector in the direction of reflected ray will be