1
The answer depends on the centre of rotation. A rotation cannot be described without specifying the centre of rotation.
292
To find the image of the point (-5, 2) under the translation ( t(3, -4) ), you add the translation vector to the original point. This means you calculate: [ (-5 + 3, 2 - 4) = (-2, -2). ] Thus, the image of the point (-5, 2) under the translation ( t(3, -4) ) is (-2, -2).
The rule is (-2, -5)
1
The answer will depend on whether the rotation is clockwise or counterclockwise.
The answer depends on the centre of rotation. A rotation cannot be described without specifying the centre of rotation.
That depends upon the centre of rotation - it can be any point at all in the plane; eg: If the centre is (-1, -2), then after the rotation (-1, -2) → (-1, -2) If the centre is (-0, 0), then after the rotation: (-1, -2) → (2, -1) If the centre is (1, 2), then after the rotation: (-1, -2) → (5, 0) etc.
292
A transformation, in the form of a rotation requires the centre of rotation to be defined. There is no centre of rotation given.
To find the image of the point (-5, 2) under the translation ( t(3, -4) ), you add the translation vector to the original point. This means you calculate: [ (-5 + 3, 2 - 4) = (-2, -2). ] Thus, the image of the point (-5, 2) under the translation ( t(3, -4) ) is (-2, -2).
Yes, 270 divide by 2 is 135.
270 of them.
The rule is (-2, -5)
A reflection or a 'mirror image' in the y axis
plss help me