On the grid, the point A(−6; −4) is shown. The point is first enlarged by scale factor ½, centre the origin, then rotated 180° about the origin, and finally reflected in the x-axis. Write down the coordinates of A‴, the final image after all three transformations.
On the grid, the line segment AB has endpoints A(2; −2) and B(−2; −3), as shown. The segment is first enlarged by scale factor 2, centre the origin and then reflected in the y-axis. Write down the coordinates of A″ and B″, the final image after both transformations.
On the grid, the point A(3; −5) is shown. The point is first reflected in the x-axis, then rotated 90° clockwise about the origin, and finally reflected in the x-axis. Write down the coordinates of A‴, the final image after all three transformations.
On the grid, the line segment AB has endpoints A(0; −3) and B(−6; −4), as shown. The segment is first rotated 180° about the origin and then rotated 90° anticlockwise about the origin. Write down the coordinates of A″ and B″, the final image after both transformations.
On the grid, the point A(−3; −1) is shown. The point is first reflected in the y-axis and then translated 1 unit left and 3 units down. Write down the coordinates of A″, the final image after both transformations.
On the grid, △ABC has vertices A(−4; 2), B(−1; −6) and C(0; −2), as shown. The triangle is first reflected in the x-axis; a second transformation then maps the result onto the dashed image A″B″C″, with A landing on A″(−4; −6). Describe the translation fully.
On the grid, the point A(−2; −6) is shown. The point is first reflected in the x-axis, then translated 1 unit right and 3 units down, and finally translated 4 units right and 1 unit down. Write down the coordinates of A‴, the final image after all three transformations.
On the grid, the line segment AB has endpoints A(4; 2) and B(−4; −6), as shown. The segment is first enlarged by scale factor ½, centre the origin; a second transformation then maps the result onto the dashed image A″B″, with A landing on A″(−2; 1). Describe the second transformation fully. (It is a single reflection, rotation or enlargement.)
On the grid, the line segment AB has endpoints A(5; −2) and B(−1; 1), as shown. The segment is first rotated 180° about the origin; a second transformation then maps the result onto the dashed image A″B″, with A landing on A″(−3; 3). Describe the translation fully.
On the grid, the line segment AB has endpoints A(0; 6) and B(−6; −6), as shown. The segment is first enlarged by scale factor ½, centre the origin and then rotated 180° about the origin. Write down the coordinates of A″ and B″, the final image after both transformations.
On the grid, the point A(−2; −3) is shown. The point is first rotated 90° anticlockwise about the origin and then rotated 180° about the origin. Write down the coordinates of A″, the final image after both transformations.
On the grid, the point A(1; −1) is shown. The point is first reflected in the y-axis, then enlarged by scale factor 2, centre the origin, and finally reflected in the x-axis. Write down the coordinates of A‴, the final image after all three transformations.