Common-Core/ Grade 10
Maths MCQ Based On Congruence transformations composition graph the image
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Common-Core Grade 10 - 10 Congruence transformations composition graph the image
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The coordinates of the point (x,y), when translated a units horizontally and b units vertically, becomes (x+a,y+b).
The coordinates of the point (x,y) reflected across the x-axis becomes (x,-y).
Reflectios Over Y=-X: (X,Y) -----------> (-Y,-X)
The coordinates of the point (x,y), when rotated \\(90^{\\circ}\\) counterclockwise around the origin, becomes (-y,x).
The coordinates of the point (x,y), when translated a units horizontally and b units vertically, becomes (x+a,y+b).
After Translation : (X,Y) -----------> (X+H,Y+K) Where H Represents Horizontal Slide And K Represents Vertical Slide
The coordinates of the point (x,y), when rotated 90^{\\circ} counterclockwise around the origin, becomes (-y,x).
The coordinates of the point (x,y), when translated a units horizontally and b units vertically, becomes (x+a,y+b).
After 180 Degree Counterclockwise Rotation Around The Origin: (X,Y) -----------> (-X,-Y).After Doing 180 Degree Counterclockwise Rotation,Do The Reflection Over Y Axis For Each Of The Coordinates Of The Triangle
Reflectios Over Y Axis: (X,Y) -----------> (-X,Y)
The coordinates of the point (x,y), when translated a units horizontally and b units vertically, becomes (x+a,y+b).
The coordinates of the point (x,y) reflected across the x-axis becomes (x,-y).
The points with the coordinates (x,y) will become (-y,x) when rotated \\(90^{\\circ}\\) in the counterclockwise direction.
The image of a point (x,y) when translated a units horizontally and b units vertically is (x+a, y+b).
The point with the coordinates (x,y) will become (-y,x) when rotated \\(90^{\\circ}\\)in the counterclockwise direction.
The image of a point (x,y) when translated a units horizontally and b units vertically is (x+a, y+b).
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