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On a coordinate plane, two parabolas open up. The solid-line parabola, labeled f of x, goes through (negative 2, 4), has a vertex at (0, 0), and goes through (2, 4). The dashed-line parabola, labeled g of x, goes through (negative 5, 8), has a vertex at (negative 3, 4), and goes through (negative 1, 8).
Which best describes the transformation that occurs from the graph of f(x) = x2 to g(x) = (x + 3)2 + 4?

left 3, up 4
right 3, down 4
left 3, down 4
right 3, up 4

On a coordinate plane two parabolas open up The solidline parabola labeled f of x goes through negative 2 4 has a vertex at 0 0 and goes through 2 4 The dashedl class=

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musiclover10045

Look at the lowest point of the line ( the bottom of the u)

On f(x) the u is at the point (0,0)

On g(x) the u is at point ( -3,4)

This means it shifted to the left 3 units and up 4 units.

The answer is left 3, up 4

michaelshadowanderso

Answer:

A. left 3, up 4

Step-by-step explanation:

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