Find the equations of the straight lines , bisectors of the angles formed by the following pairs of lines
`y-b=(2m)/(1-m^(2))(x-a)` and `y-b=(2m')/(1-m' ^(2))(x-a)`

Find the equations of the bisectors of the angles formed by the following pairs of lines x+2y+3=0 and 2x+y-2=0

Find the point of intersection of the following pairs of lines: y=m_(1)x+(a)/(m_(1)) and y=m_(2)x+(a)/(m_(2))

Find the area of the triangle formed by the line x+y=3 and the angle bisectors of the pair of lines x^(2)-y^(2)+4y-4=0

Show that the equation of the pair of lines bisecting the angles between the pair of bisectors of the angles between the pair of lines ax^(2)+2hxy+by^(2)=0 is (a-b)(x^(2)-y^(2))+4hxy=0

Show that the area of the triangle formed by the lines y=m_(1)x+c_(1),y=m_(2)x+c_(2) and and is 2|m_(1)-m_(2)|

Show that the equation of the straight line through the origin angle varphi with the line y=m x+b\ i s y/x=(m+-t a nvarphi)/(1+-m\ t a nvarphi)

The envelope of the family of straight lines y=m^(2)x+(1)/(m^(2))

If m_(1) and m_(2) are the roots of the equation x^(2)-ax-a-1=0 then the area of the triangle formed by the three straight lines y=m_(1)xy=m_(2)x and y=a is

Find the point of intersection of the following pair of lines : (i) 9x-10y=12 and 2x-5=0 (ii) y=m_(1)x+c_(1) and y=m_(2)x+c_(2) (iii) x+y=8 and x-y=2