From a point P on x^2/a^2 - y^2/b^2 = 1, two lines are drawn parallel to each of the asymptotes, cutting the asymptotes at M and N. Prove that the area of the parallelogram ONPM is constant (where O is the origin).
How the hell do I do this? I found the equ. of the lines and found M and N BUT when I try to use the area of a parallelogram to prove its constant...it gets all messy and crap.
Please show me how to do this?
NP: bx+ay-bx1 - ay1 = 0
MP: bx-ay-bx1+ay1=0
N[(bx1+ay1)/2b , (bx1+ay1)/2a]
M[(bx1-ay1)/2b,(ay1-bx1)/2a]
How the hell do I do this? I found the equ. of the lines and found M and N BUT when I try to use the area of a parallelogram to prove its constant...it gets all messy and crap.
Please show me how to do this?
NP: bx+ay-bx1 - ay1 = 0
MP: bx-ay-bx1+ay1=0
N[(bx1+ay1)/2b , (bx1+ay1)/2a]
M[(bx1-ay1)/2b,(ay1-bx1)/2a]
