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G.CO.A.5 STUDENT NOTES WS #7 – 1 We learn a lot about transformations when we analyze their motions in the coordinate plane. Patterns reveal shortcuts/rules that allow us to quickly determine the coordinates of an image. REFLECTION ON THE COORDINATE GRID 4 Reflection over the y axis. B (-1,3) B' (1,3) A (-3,2) B (-x,y) B' (x,y) 2 A' (3,2) 2 When we reflect over the y axis, the y values are unchanged and the x values are negated (opposite). C (-2,-1) C' (2,-1) RULE FOR REFLECTION OVER THE Y AXIS ry axis ( x, y) ( x, y) 4 Reflection over the x axis. B (-2,3) B (x,y) 2 When we reflect over the x axis, the x values are unchanged and the y values are negated (opposite). 2 A (-5,2) C (-1,1) 5 5 C' (-1,-1)' A' (-5,-2) 2 2 B' (x,-y) B' (-2,-3) RULE FOR REFLECTION OVER THE X AXIS Reflection over the y = x line. rx axis ( x, y ) ( x, y ) E (2,6) 6 F (x,y) When we reflect over the y = x line, the x and y values are reversed. F (3,5) 4 D (0,4) F' (5,3) F' (y,x) 2 E' (6,2) D' (4,0) 5 RULE FOR REFLECTION OVER THE Y = X LINE ry x ( x, y ) ( y, x) G.CO.A.5 STUDENT NOTES WS #7 – 2 ROTATION ON THE COORDINATE GRID 4 Rotation of 90 about the Origin When we rotate 90 about the origin, we see that the x and y coordinates are reversed and the new x coordinate is negated. B (2,4) C' (-y,x) 4 C' (-2,3) C (x,y) 2 2 B' (-4,2) C (3,2) A' (-1,1) A (1,1) 5 RULE FOR ROTATION BY 90 ABOUT THE ORIGIN RO ,90 ( x, y) ( y, x) 4 Rotation of 180 about the Origin B (2,4) C (3,2) 2 When we rotate by 180 about the origin, we see the x and y coordinates are negated. 2 C (x,y) A (1,1) A' -(1,-1) C' (-3,-2) 2 2 C' (-x,-y) 'B (-2-,4) 4 RULE FOR ROTATION BY 180 ABOUT THE ORIGIN RO ,180 ( x, y ) ( x, y ) Rotation of 270 about the Origin This is also a rotation of - 90. When we rotate by 270 about the origin, we see that the x and y coordinates are reversed and the new y coordinate is negated. 4 B (2,4) 2 C (x,y) 2 C (3,2) A (1,1) 5 A' (1,-1) B' (4,-2) 2 2 C' (y,-x) C' (2,-3) RULE FOR ROTATION BY 270 ABOUT THE ORIGIN RO ,270 ( x, y ) ( y, x)
