Math  /  Algebra

Question(1 point) The graph below is a vertical and/or horizontal shift of y=1/xy=1 / x (assume no reflections or compression/expansions have been applied). (a) The graph's equation can be written in the form f(x)=1x+A+Bf(x)=\frac{1}{x+A}+B for constants AA and BB. Based on the graph above, find the values for AA and BB. A=A= \square and B=B= \square (b) Write your answers from part (a) as a single fraction. f(x)=Mx+Cx+Df(x)=\frac{M x+C}{x+D} for constants M,CM, C, and DD. What are the values of M,CM, C, and DD ? M=M= \square C=C= \square , and D=D= \square

Studdy Solution
Thus, the function can be written as: f(x)=3x+7x+2 f(x) = \frac{3x + 7}{x + 2}
The values are: A=2,B=3 A = 2, \quad B = 3 M=3,C=7,D=2 M = 3, \quad C = 7, \quad D = 2

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