No translation will invert a quadratic graph.
goes through the origin, up and to the right
A graph is best described as a table that communicates information visually.
it describes the data shown simply in a short phrase
A transformation has been made on the graph. A translation has been made.
This describes a double-bar graph.
3
y=x+1 there for answer is 2
First, reflect the graph of y = x² in the x-axis (line y = 0) to obtain the graph of y = -x²; then second, shift it 3 units up to obtain the graph of y = -x² + 3.
You move the graph upwards by 2 units.
I suggest "boring".
To translate the graph y = x to the graph of y = x - 6, shift the graph of y = x down 6 units.
The lines are parallel.
y equals x-4 plus 2 is the same as y = x-2. You just translate the graph of y=x, 2 units to the right, OR 2 down.
The equation you have given, y + 2 = 7, does not describe a line, it describes the number 5. You would not graph a single number, there is nothing to graph.
A reflection about the x-axis (in other words, turned upside down) and then moved down three units. So basically, it'll end up as an upside down parabola (not squashed, stretched, or anything) with its vertex (which is a maximum) at (0,-3).
A horizontal line, 1 unit below the x-axis.
goes through the origin, up and to the right