A) Figure C B) Figure B C) Figure A D) Figure D
A) (x, y+5) B) (x, y-5) C) (x-5, y) D) (x+5, y)
A) Figure A B) Figure D C) Figure B D) Figure C
A) 4 B) 2 C) 3 D) 6
A) Reflecting figure ABCD over the x-axis and then translating it 5 units right B) Rotating figure ABCD 90 ° counter-clockwise. C) Rotating figure ABCD 180 ° counter-clockwise and then reflecting it over the x-axis D) Reflecting figure ABCD over the x-axis and then reflecting it over the y-axis
A) Relfecting triangle ABC over the x-axis and then translating down 5 units B) Rotating triangle ABC 180° C) Relecting triangle ABC over the y-axis and then translating down 2 units D) Rotating triangle ABC 90° and then reflecting it over the y-axis
A) A’(1/3,1/3) B’(1/3,4/3) C’(4/3,1/3) D’(4/3,4/3) B) A’(3,3) B’(1,4) C’(4,1) D’(4,4) C) A’(1,1) B’(1,4) C’(4,1) D’(4,4) D) A’(3,3) B’(3,12) C’(12,3) D’(12,12)
A) (4, -5) B) (-4, -5) C) (-5, -4) D) (-4, 5)
A) (2, -1) B) (-4, -7) C) (-4, 5) D) (-10, -1)
A) (−1,1),(4,4),(−5,1) B) (−1,1),(−4,4),(−5,1) C) (−1,1),(−4,4),(5,1) D) (1,1),(4,4),(5,1)
A) 30 B) 25 C) 60 D) 36
A) The figures are congruent because they have the same shape and same angles. B) The figures are similar because they maintain the same shape and have a scale factor of 3 C) The figures are similar because they look like one another. D) The figures are similar because they maintain the same shape and has been dilated by the scale factor of 2.
A) Rotate 90° counter-clockwise and then dilate by a scale factor of 2. B) Reflect JKLM over the y-axis and then dilate by a scale factor of 2. C) Translate right 9 units and then dilate by a scale factor of 2. D) Rotate 90° clockwise and then reflect over the y-axis and then dilate by a scale factor of 2. |