The straight line whose sum of the intercepts on theaxes is equal to half of the product of the intercepts,passes through the point whose coordinates are

Prove that all the lines having the sum of the interceps on the axes equal to half of the product of the intercepts pass through the point.Find the fixed point.

Prove that all the lines having the sum of the interceps on the axes equal to half of the product of the intercepts pass through the point. Find the fixed point.

Prove that all the lines having the sum of the interceps on the axes equal to half of the product of the intercepts pass through the point. Find the fixed point.

Prove that all the lines having the sum of the interceps on the axes equal to half of the product of the intercepts pass through the point. Find the fixed point.

Prove that all the lines having the sum of the interceps on the axes equal to half of the product of the intercepts pass through the point. Find the fixed point.

The envelope of the family of straight lines whose sum of intercepts on the axes is 4 is

A straight line cuts intercepts from the coordinate axes sum of whose reciprocals is (1)/(p). It passses through a fixed point

A straight line passes through the fixed point [1/k,1/k] . The sum of the reciprocals of its intercepts on the coordinate axes is