[Answer] The graph shows f(x) = (1/2)x and its translation g(x).Which describes the translation of f(x) to g(x)?

Answer: A. translation of four units up

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The graph shows f(x) = (1/2)x and its translation g(x).Which describes the translation of f(x) to g(x)? Sun Jul 23 2017 · The parent function is f(x) and its representation is given as: Now the graph g*x) is obtained by translation of the graph f(x) by some units. Now as the graph of g(x) is a shift of the graph f(x) or the graph g(x) is translated by 4 units upwards . The graphs of f ( x ) = 5x and its translation g ( x ) are shown on the graph . What is the equation of g ( x )? The asymptote of g ( x ) is the asymptote of f ( x ) shifted six units up. The graph shows that f ( x ) = 3x is translated horizontally and vertically to create the function g ( x ) = 3x - h + k … The graph shows f ( x )-?? and its translation g ( x ) Which describes the translation of f O translation of four units up ?? translation of five units up O translation of four units to the ri O translation of five units to the rig 9- gtr) 3 2 y < 2/3 x - 1 . The axis of symmetry for a quadratic equation can be found using the formula x = -b/2a where a and b are coefficients in the quadratic equation and x represents the values along a vertical line on the coordinate plane. How are the two functions f(x) = 0....

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