I cannot find an example and am confused about what to do with this problem. Can someone tell me what they want? Do they want me to graph the function and determine x&f? I am just not sure what why my answer is suppose to be.

Compare the graph of the given quadratic function f and the graph of y=x2. f(x)=(x-2)2+3

A answered this question in separate place where you posted it later.

To compare the graph of the given quadratic function f(x) = (x-2)^2 + 3 and the graph of y = x^2, you can follow these steps:

1. Graph the function y = x^2:
- Plot points on a coordinate plane by choosing various x-values and computing the corresponding y-values by squaring them.
- Connect the plotted points with a smooth curve. Remember that y = x^2 represents a U-shaped parabolic graph.

2. Graph the function f(x) = (x-2)^2 + 3:
- Transform the graph of y = x^2 to the right by 2 units. This means that you need to shift every point on the x-axis 2 units to the right.
- Next, shift the graph 3 units upward by adding 3 to the y-coordinate of each point.
- Plot these transformed points and connect them to form a new parabolic graph.

3. Compare the two graphs by observing their characteristics:
- Look for differences in shape, position, and y-intercept.
- Determine if the graphs intersect or are parallel, and whether one is taller or shorter than the other.
- Observe if they have the same axis of symmetry.

By comparing the two graphs visually, you can analyze how the equation f(x) = (x-2)^2 + 3 differs from the standard quadratic equation y = x^2. This will help you understand the differences in terms of shape, position, and other graphical characteristics.