A straight line cuts the x-axis at point...

A straight line cuts the x-axis at point `A(1,0),` and y-axis at point B, such that `angle OAB=alpha (alpha>pi/4).` C is middle point of `AB and B'` is a mirror image of point B with respect to line `OC and C` is a mirror image of point `C` with respect to line `BB,'` then the ratio of the areas of triangles `ABB' and BB'C`' is equal to

Similar Questions

Explore conceptually related problems

Find the image of the point with respect to line mirror.

The line y= mx+c cut the Y-axis at the point

Find the image of the point (-8,12) with respect to line mirror 4x+7y+13=0

Find the image of the point (-8,12) with respect to line mirror 4x+7y+13=0.

The image of point P(alpha,beta) with respect to the line y=-x is the point Q and the image of Q with respect to the line y=x is R. Then the mid point of R is

The image of the point P(3,5) with respect to the line y=x is the point Q and the image of Q with respect to the line y=0 is the point R(a,b), then (a,b) is equal to:

Find the image of the point (1, -2) with respect to the line mirror 2x-y+1=0

Find the image of the point (2,1) with respect to the line mirror x+y-5=0

Similar Questions

Recommended Questions