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Given the graph of y=f(x), shown as a red dashed curve, drag the movable blue point to obtain the graph of y=f(x−4)+3.

Given the graph of yfx shown as a red dashed curve drag the movable blue point to obtain the graph of yfx43 class=

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kudzordzifrancis

Answer:

See graph in attachment.

Step-by-step explanation:

The graph of [tex]y=f(x)[/tex] is a parabola that has its vertex at the origin.

The equation of the transformed graph is

[tex]y=f(x-4)+3[/tex]

The vertex of this transformed function is

[tex](4,3)[/tex]

Drag the blue graph up so that the vertex will now be at (4,3).

See graph in attachment.

Ver imagen kudzordzifrancis

The graph of the function f(x),which is in the shape of parabola has vertex at (0,0).

 →y=x²

f(x)=x²

Now, the graph of f(x) is translated by 2 units in horizontally right Direction.

→ y=(x-2)²

f(x-2)=(x-2)²

Now, we have to obtain the graph of the function

→y=f(x-4)+3

y=(x-4)²+3

The function , f(x-2) is shifted , 2 unit right in Horizontal right direction and, 3 unit up in vertically Upward direction.

Ver imagen Аноним

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