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Study the graphs of f(x) and g(x). On a coordinate plane, y = f (x) approaches the y-axis in quadrant 4 and then curves up through (1, 0) and goes through (10, 2). Y = g (x) approaches x = 1 in quadrant 4 and then curves up through (2, negative 2) and goes through (10, 0) Which statement describes g(x) as a transformation of f(x) and identifies an equation for g(x)? Vertical stretch followed by a translation 1 unit left, so g(x)(StartFraction 1 Over 9 EndFraction (x + 1))" Vertical stretch followed by a translation 1 unit right, so g(x) = f(StartFraction 1 Over 9 EndFraction (x minus 1)). Horizontal stretch followed by a translation 1 unit left, so g(x) = f Horizontal stretch followed by a translation 1 unit right, so g(x) = f(StartFraction 1 Over 9 EndFraction (x minus 1)).

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Answer:

C. Horizontal stretch followed by a translation 1 unit left, so [tex]g(x) = f(\frac{1}{9} (x + 1)[/tex].

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Answer:

D

HORIZONTAL STRETCH followed by a translation 1 UNIT RIGHT, so g(x) = f( 1/9 (x-1)).

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