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(x,y) → (x, y-4) (x,y) → (x-2, y) (x,y) → (x, y-2) (x,y) → (x, y+2) Which rule maps the red graph onto the orange graph? (x,y) → (x, y-4) (x,y) → (x-2, y) (x,y) → (x, y-3) (x,y) → (x, y+4) Which rule maps the red graph onto the grey graph? (x,y) → (x, y-8) (x,y) → (x, y+8) (x,y) → (x-8, y) (x,y) → (x+8, y) Which rule maps the red graph onto the green graph? The graph of the parent function y = x3 is shifted to form the graph below. What is the new function? y = x3 - 1 y = x3 + 1 y = x3 + 2 y = x3 + 3 The graph of the parent function y = x2 is shifted to form the graph below. What is the new function? y = x2 - 1 y = x2 + 2 y = x2 - 2 y = x2 - 3 The graph of the parent function y =|x| is shifted to form the graph below. What is the new function? y = |x| -6 y = |x| -7 y = |x| +7 y = |x| - 5 The function f(x)= x2 under goes a transformationby the rule of (x,y)→(x, y -5). Describe the transformation and find the new function? shifts the graph down 5, f(x) = x2 - 5 shifts the graph down 3, f(x) = x2 - 3 shifts the graph up 5, f(x) = x2 + 5 shifts the graph up 5, f(x) = x2 - 5 The following table of values for the parent function f(x) and a shifted function g(x) are below. Use the values to determine the function for g(x). -1 -2 0 1 2 x f(x) 4 1 0 4 1 g(x) 7 4 3 4 7 g(x) = x2 +3 g(x) = x2 -3 g(x) = |x|+3 g(x) = x3 -3 The following table of values for the parent function f(x) and a shifted function g(x) are below. Use the values to determine the function for g(x). -1 -2 0 1 2 x f(x) -8 -1 0 8 1 g(x) -10 -3 -2 -1 6 g(x) = x2 -2 g(x) = x3- 3 g(x) = |x| - 2 g(x) = x3 -2 The function f(x)= 1/x under goes a transformationby the rule of (x,y)→(x, y +2). Describe the transformation and find the new function? shifts the graph up 2, f(x) =(1/x) + 2 shifts the graph down 2, f(x) = (1/x) +2 shifts the graph up 4, f(x) = (1/x) + 4 shifts the graph up 2, f(x) = (1/x) -2 |