Transform the eqation ` x^(2) + xy + y^(2) = 8` from axes inclined at `60^(@)` to axes bisecting the angles between the original axes

Transform the equation x^(2)+y^(2)=ax into polar form.

Joint equation of lines bisecting angles between co-oridnates axes is

If one of the lines given by kx^(2)+xy-y^(2)=0 bisects the angle between the co-ordinate axes, then k=

The lines y = mx bisects the angle between the lines ax^(2) +2hxy +by^(2) = 0 if

Find the combined equation of te lines : (1) Through the origin having inclinations 60^(@) and 120^(@) with the X-axis. (2) bisecting the angle between the coordinate axes.

The joint equation of lines passing through the origin and bisecting the angles between co-ordinate axes is

If one of the lines given by the equation ax^(2)+6xy+by^(2)=0 bisects the angle between the co-ordinate axes, then value of (a+b) can be :

The axes being inclined at an angle of 60^(@) then angle between the two straight line y=2x+5 and 2y+x+7=0 is

The transformed equation of x^(2)+6xy+8y^(2)=10 when the axes are rotated through an angled pi//4 is

If two lines of x^(2)+3(l-5)xy-5y^(2)=0 are equally inclined with the axes then l=