If the distance of any point `(x,y)` from origin is defined as `d(x,y)=max{|x|,|y|}`, then the locus of the point `(x,y)` where `d(x,y)=1` is

If the distance of any point (x, y) from origin is defined as d(x,y)="m ax"{|x|,|y|} , then the locus of the point (x,y) , where (x,y)=1 is:

If the distance of any point (x,y) from origin is defined as d(x,y)=max{|x|,|y|} , then the locus d(x,y)=1 is a

The distance of any point (x,y) from the origin is defined as d=max {absx,absy} , then the distance of the common point for the family of line x(1+lambda)+lambday+2+lambda=0 (being parameter) from origin is

The distance of the point (x,y) from the origin is defined as d = max . {|x|,|y|} . Then the distance of the common point for the family of lines x (1 + lambda ) + lambda y + 2 + lambda = 0 (lambda being parameter ) from the origin is

The distance of the point (x,y) from the origin is defined as d = max . {|x|,|y|} . Then the distance of the common point for the family of lines x (1 + lambda ) + lambda y + 2 + lambda = 0 (lambda being parameter ) from the origin is

The distance of the point (x,y) from the origin is defined as d = max . {|x|,|y|} . Then the distance of the common point for the family of lines x (1 + lambda ) + lambda y + 2 + lambda = 0 (lambda being parameter ) from the origin is

If the distance of the point P(x, y) from A(a, 0) is a+x , then y^(2)=?

Distance of any point P(x,y) from origin is defined by d=max{|x|,|y|} and if alpha^(2)+beta^(2)-2 alpha+4 beta+5=0, then distance of A(alpha,beta) from origin is .....

The distance between the points (x,-y) and (-x,y) is