how does translation a figure vertically affect the coordinates of its vertices
A rotation turns a shape through an angle at a fixed point thus changing its coordinates
Nothing. Translation does not affect the measure of sides (or angles).
The answer depends on what you mean by "the verticals of a triangle".
When you shift a function, you are essentially translating its graph either horizontally or vertically. A horizontal shift alters the input values, moving the graph left or right, while a vertical shift changes the output values, moving the graph up or down. This transformation maintains the shape of the graph but changes its position in the coordinate plane. Shifting does not affect the function's overall behavior or characteristics, such as its domain and range.
Yes, the result is an enlargement or shrinking, with the origin as centre of enlargement.
Order is important because when you switch your numbers when dividing or subtracting, you might get a different answer which would affect your answer. ♫
A monotonic transformation does not change the overall shape of a function's graph, but it can stretch or compress the graph horizontally or vertically.
The direction of acceleration would be vertically upward, since the net force is acting in that direction. The horizontal motion of the balloon being blown westward does not affect the acceleration in the vertical direction.
Yes - the tail adds stability. Without it - the kite would just spin. The tail makes the bottom of the kite slightly heavier so it flies vertically.
As you slide the X file back into the folder, you can see that the first letters of each line spell out "Don't trust Director D" vertically. This information, however, does not affect how you have to play the island.
No, horizontal speed does not affect gravity. Gravity acts vertically and is the same for all objects regardless of their horizontal speed. However, horizontal speed can affect the trajectory of an object's motion in relation to gravity.
The vertical components of the air resistance acts vertically down on it. This adds to the effect of the gravitational force. Therefore net force is increased - it slows down more rapidly and so does not rise as far.