stretch
Invariants are points that remain the same under certain transformations. You could plug the points into your transformation and note that what does in is the same as what comes out. The details depend on the transformation.
This is plotted with a straight line. The "rise" is how far the line rises vertically. the "run" is how far it traverses horizontally. The division "rise" / "run" is the "slope" of the line.
The wording is confusing, as a quadratic function is normally a function of one variable. If you mean the graph of y = f(x) where f is a quadratic function, then changes to the variable y will do some of those things. The transformation y --> -y will reflect the graph about the x-axis. The transformation y --> Ay (where A is real number) will cause the graph to stretch or shrink vertically. The transformation y --> y+A will translate it up or down.
To graph points, use rise over run and go up and over on the graph
It is a graph of isolated points - nothing more, nothing less!
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.
it is a graph that used a line vertically or sometimes horizontally
Yes, it can.
It could be either way just as long as you do the bar graph correctly
false
Chart paper is lines going vertically and horizontally so you can graph stuff.
Not necessarily. Unless otherwise noted. It can go vertically or horizontally.
translation of graphs , try that :)
A translation I found your question when searching for the same answer and when i found it i decided to tell you too.
The x-axis runs horizontally across the graph and the y-axis runs vertically on it.
On a standard Cartesian graph, there are two axes. The Y axis runs vertically, bottom to top and the X axis runs horizontally from left to right.
A reflection is when you "flip" an image over a line on your graph. A translation is when you move your image vertically and/or horizontally.