Let's see that the graph of "y=a(x-b)^2+c" is a translation of the graph of "y=ax^2" by +b in the x-axis direction and +c in the y-axis direction.
First enter integers in a , b , and c to determine the quadratic function "y=a(x-b)^2+c".
Observe how the graph of "y=ax^2" moves in parallel by +b in the x-axis direction and +c in the y-axis direction and overlaps with the graph of "y=a(x-b)^2+c".
At this time , note that these two graphs have the same shape and spread , but differ only position.
First enter integers in a , b , and c to determine the quadratic function "y=a(x-b)^2+c".
Observe how the graph of "y=ax^2" moves in parallel by +b in the x-axis direction and +c in the y-axis direction and overlaps with the graph of "y=a(x-b)^2+c".
At this time , note that these two graphs have the same shape and spread , but differ only position.
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