Possible Transformations for Triangle A
Explore the various transformations for Triangle A when one of its vertices moves to (1,1). Discover different translation vectors, lines of reflection, centers of rotation, and centers of enlargement with varying scale factors. Visualize the transformations through images provided.
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Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find?
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 1. Translation with vector 2 0 2.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 1. Translation with vector 2 0 2. 3.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 1. Translation with vector 2 0 2. Translation with vector 5 0 3.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 2. Translation with vector 5 0 3. 4.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 2. Translation with vector 5 0 2 3. Translation with vector 2 4.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 2 3. Translation with vector 2 4. 5.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 2 3. Translation with vector 2 4. Reflection in the line ? = 0 5.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 4. Reflection in the line ? = 0 5. 6.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 4. Reflection in the line ? = 0 5. Reflection in the line ? = ? 6.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 5. Reflection in the line ? = ? 6. 7.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 5. Reflection in the line ? = ? 6. Reflection in the line ? = 1.5 7.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 6. Reflection in the line ? = 1.5 7. 8.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 6. Reflection in the line ? = 1.5 7. Rotation 180 about (0, 1) 8.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 7. Rotation 180 about (0, 1) 8. 9.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 7. Rotation 180 about (0, 1) 8. Rotation 180 about (0,0) 9.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 8. Rotation 180 about (0,0) 9. 10.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 8. Rotation 180 about (0,0) 9. Rotation 180 about ( 1.5, 1) 10.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 9. Rotation 180 about ( 1.5, 1) 10. 11.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 A 9. Rotation 180 about ( 1.5, 1) 10. Rotation 90 clockwise about (0, 2) 11.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 10. Rotation 90 clockwise about (0, 2) 11. 12.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 A 10. Rotation 90 clockwise about (0, 2) 11. Rotation 90 clockwise about ( 1, 1) 12.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 11. Rotation 90 clockwise about ( 1, 1) 12. 13.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 11. Rotation 90 clockwise about ( 1, 1) A 12. Rotation 90 clockwise about ( 1.5, 3.5) 13.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 12. Rotation 90 clockwise about ( 1.5, 3.5) 13. 14.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 12. Rotation 90 clockwise about ( 1.5, 3.5) 13. Rotation 90 anti-clockwise about (0,0) 14.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 13. Rotation 90 anti-clockwise about (0,0) 14. 15.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 13. Rotation 90 anti-clockwise about (0,0) 14. Rotation 90 anti-clockwise about (1,1) 15.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 14. Rotation 90 anti-clockwise about (1,1) 15. 16.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 14. Rotation 90 anti-clockwise about (1,1) 15. Rotation 90 anti-clockwise about ( 1.5,1.5) 16.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 15. Rotation 90 anti-clockwise about ( 1.5,1.5) 16. 17.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 15. Rotation 90 anti-clockwise about ( 1.5,1.5) 16. Enlargement by scale factor 2, centre ( 3, 1) 17.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 16. Enlargement by scale factor 2, centre ( 3, 1) 17. 18.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 16. Enlargement by scale factor 2, centre ( 3, 1) 17. Enlargement by scale factor 2, centre ( 9, 1) 18.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 17. Enlargement by scale factor 2, centre ( 9, 1) 18. 19.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 17. Enlargement by scale factor 2, centre ( 9, 1) 18. Enlargement by scale factor 2, centre ( 3,3) 19.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 18. Enlargement by scale factor 2, centre ( 3,3) 19. 20.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 18. Enlargement by scale factor 2, centre ( 3,3) 19. Enlargement by scale factor 1, centre (0, 1) 20.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 19. Enlargement by scale factor 1, centre (0, 1) 20. 21.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 19. Enlargement by scale factor 1, centre (0, 1) 20. Enlargement by scale factor 1, centre (0,0) 21.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 20. Enlargement by scale factor 1, centre (0,0) 21. 22.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor 1 2 20. Enlargement by scale factor 1, centre (0,0) 21. Enlargement by scale factor 1, centre ( 1.5, 1) 22.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor ? ? 21. Enlargement by scale factor 1, centre ( 1.5, 1) 22. 23.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor ? ? 21. Enlargement by scale factor 1, centre ( 1.5, 1) 22. Enlargement by scale factor 1 2 , centre (3, 1) 23.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor ? ? 22. Enlargement by scale factor 1 2 , centre (3, 1) 23. 24.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor ? ? 22. Enlargement by scale factor 1 2 , centre (3, 1) 23. Enlargement by scale factor 1 2 , centre (3, 3) 24.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor ? ? 23. Enlargement by scale factor 1 2 , centre (3, 3) 24.
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? Try finding: 3 possible translation vectors 3 possible lines of reflection 3 possible centres of a 180 rotation 3 possible centres of a 90 clockwise rotation 3 possible centres of a 90 anti-clockwise rotation 3 possible centres of an enlargement with scale factor 2 3 possible centres of an enlargement with scale factor 1 3 possible centres of an enlargement with scale factor ? ? 23. Enlargement by scale factor 1 2 , centre (3, 3) 24. Enlargement by scale factor 1 2 , centre (6, 1)
Triangle A is transformed so that one of its vertices moves to (1,1). How many different possible transformations can you find? 1. Translation with vector 2 2. Translation with vector 5 5 3. Translation with vector 0 0 2 4. Reflection in the line ? = 0 5. Reflection in the line ? = ? 6. Reflection in the line ? = 1.5 7. Rotation 180 about (0, 1) 8. Rotation 180 about (0,0) 9. Rotation 180 about ( 1.5, 1) 10. Rotation 90 clockwise about (0, 2) 11. Rotation 90 clockwise about ( 1, 1) 12. Rotation 90 clockwise about ( 1.5, 3.5) 13. Rotation 90 anti-clockwise about (0,0) 14. Rotation 90 anti-clockwise about (1,1) 15. Rotation 90 anti-clockwise about ( 1.5,1.5) 16. Enlargement by scale factor 2, centre ( 3, 1) 16. Enlargement by scale factor 2, centre ( 9, 1) 16. Enlargement by scale factor 2, centre ( 3,3) 19. Enlargement by scale factor 1, centre (0, 1) 20. Enlargement by scale factor 1, centre (0,0) 21. Enlargement by scale factor 1, centre ( 1.5, 1) 22. Enlargement by scale factor 1 centre (3, 1) 23. Enlargement by scale factor 1 centre (3, 3) 24. Enlargement by scale factor 1 centre (6, 1) 2 , 2 , 2 ,
