Name two invariant points under reflection in the x-axis.

Points (3, 0) and (-1,0) are invariant points under reflection in the line L_1 points (0, -3) and (0, 1) are invariant points on reflection in line L_2 Write down the images of P (3,4) and Q (-5,-2) on reflection in L_2 Name the images as P" and Q" respectively.

Points (3, 0) and (-1,0) are invariant points under reflection in the line L_1 points (0, -3) and (0, 1) are invariant points on reflection in line L_2 Name or write equations for the lines L_1 and L_2

Points (3, 0) and (-1,0) are invariant points under reflection in the line L_1 points (0, -3) and (0, 1) are invariant points on reflection in line L_2 State or describe a single transformation that maps P' onto P".

Points (3, 0) and (-1,0) are invariant points under reflection in the line L_1 points (0, -3) and (0, 1) are invariant points on reflection in line L_2 Write down the images of points P (3, 4) and Q (-5, -2) on reflection in L_1 Name the images as P' and Q' respectively.

Point (-5,0) and (4,0) are invariant point under reflection in the line L_1 , point (0,-6) and (0,5) are invariant on reflection in the line L_2 . Write down the image of P(2,6) and Q (-8,-3) on reflection in L_1 . Name the images as P' and Q' respectively.

Point (-5,0) and (4,0) are invariant point under reflection in the line L_1 , point (0,-6) and (0,5) are invariant on reflection in the line L_2 . Write down the image of P and Q on reflection in L_2 . Name the images as P'' and Q'' respectively.

Point (-5,0) and (4,0) are invariant point under reflection in the line L_1 , point (0,-6) and (0,5) are invariant on reflection in the line L_2 . Name or write equation for the line L_1 and L_2 .

Point (-5,0) and (4,0) are invariant point under reflection in the line L_1 , point (0,-6) and (0,5) are invariant on reflection in the line L_2 . State or describe a single transformation that maps Q' onto Q'' .

Points (4,0) and (-3,0) are invarient points under reflection in line L_1 , point (0,5) and (0,-2) are invarient under reflection in line L_2. Name and write the equation of lines L_1 and L_2 .

Points (4,0) and (-3,0) are invarient points under reflection in line L_1 , point (0,5) and (0,-2) are invarient under reflection in line L_2. Write P' . The reflection of P(6,-8) " in " L_1 and P'' the image of P " in " L_2 .