A variable line passes through the point of intersection of the lines `x+2y-1=0` and `2x-y-1=0` and meets the coordinate axes in A and B. The locus of the mid poind of AB is

If a variable line passes through the point of intersectionof the lines x+2y-1=0 and 2x-y-1=0 and meets the coordinate axes in A and B ,then the locus of the midpoint of AB is : (A)x+3y=0 (B) x+3y=10(C)x+3y=10xy(D) None of these

A variable straight line passes through the points of intersection of the lines x+2y=1 and 2x-y=1 and meets the co-ordinates axes in A and B. Prove that the locus of the midpoint Of AB is 10xy=x+3y.

A variable line through the point of intersection of the lines (x)/(a)+(y)/(b)=1 and (x)/(b)+(y)/(a)=1 meets the coordinate axes in A and B.Show that the locus of the midpoint of AB is the curve 2xy(a+b)=ab(x+y)

A variable line through the point of intersection of the lines (x)/(a)+(y)/(b)=1 and (x)/(b)+(y)/(a)=1 meets the coordinate axes in A and B.Show that the locus of the midpoint of AB is the curve 2xy(a+b)=ab(x+y)

A variable line through the point of intersection of the lines (x)/(a)+(y)/(b)=1 and (x)/(b)+(y)/(a)=1 meets the coordinate axes in A and B.Show that the locus of the midpoint of AB is the curve 2xy(a+b)=ab(x+y)

A variable line through the point of intersection of the lines (x)/(a)+(y)/(b)=1 and (x)/(b)+(y)/(a)=1 meets the coordinate axes in A and B.Show that the locus of the midpoint of AB is the curve 2xy(a+b)=ab(x+y)

A variable line through the point of intersection of the lines (x)/(a)+(y)/(b)=1 and (x)/(b)+(y)/(a)=1 meets the coordinate axes in A and B.Show that the locus of the midpoint of AB is the curve 2xy(a+b)=ab(x+y)

Consider a variable line L which passes through the point of intersection P of the lines 3x+4y=12 and x+2y-5=0 meeting the coordinate axes at points A and B. Then