The lines represented by `(x^2 + xy-x) (x-y) = 0`, forming a triangle. Then orthocentre of the triangle is

Consider the lines represented by equation (x^(2) + xy -x) xx (x-y) =0 forming a triangle. Then match the following lists:

If the equations of three sides of a triangle are x+y=1, 3x + 5y = 2 and x - y = 0 then the orthocentre of the triangle lies on the line/lines

If the equations of three sides of a triangle are x+y=1, 3x + 5y = 2 and x - y = 0 then the orthocentre of the triangle lies on the line/lines

If the equations of three sides of a triangle are x+y=1, 3x + 5y = 2 and x - y = 0 then the orthocentre of the triangle lies on the line/lines

If two sides of a triangle are represented by : 2x-3y+4=0 and 3x+2y-3=0 , then its orthocentre lies on the line :

ABC is a triangle formed by the lines xy = 0 and x + y = 1 . Statement - 1 : Orthocentre of the triangle ABC is at the origin . Statement - 2 : Circumcentre of Delta ABC is at the point (1/2 , 1/2) .

ABC is a triangle formed by the lines xy = 0 and x + y = 1 . Statement - 1 : Orthocentre of the triangle ABC is at the origin . Statement - 2 : Circumcentre of Delta ABC is at the point (1/2 , 1/2) .