[" The locus of point of "],[" intersection of the lines "],[y+mx=sqrt(a^(2)m^(2)+b^(2))" and "],[my-x=sqrt(a^(2)+b^(2)m^(2))" is "]

The locus of point of intersection of the lines y+mx=sqrt(a^2m^2+b^2) and my-x=sqrt(a^2+b^2m^2) is

The locus of point of intersection of the lines y+mx=sqrt(a^2m^2+b^2) and my-x=sqrt(a^2+b^2m^2) is

The locus of point of intersection of the lines y+mx=sqrt(a^2m^2+b^2) and my-x=sqrt(a^2+b^2m^2) is

The locus of point of intersection of the lines y+mx=sqrt(4+m^(2)) and my-x=sqrt(1+4m^(2)) is x^(2)+y^(2)=k then "k" is

Locus of points of intersection of lines x=at^(2),y=2at

The equation to the locus of point of intersection of lines y-mx=sqrt(4m^(2)+3) and my+x=sqrt(4+3m^(2)) is

Find the locus of the point of intersection of the lines x=a/(m^(2)) and y=(2a)/(m) , where m is a parameter.

If m is a variable,then prove that the locus of the point of intersection of the lines (x)/(3)-(y)/(2)=m and (x)/(3)+(y)/(2)=(1)/(m) is a hyperbola.

The locus of the point of intersection of the lines, sqrt(2)x-y+4sqrt(2)k=0" and "sqrt(2)kx+ky-4sqrt(2)=0 (k is any non-zero real parameter), is: