Question: Suppose you have a function y = f(x) such that the domain of A(x) is 1 s * $ 6 and the range of f(x)
Suppose you have a function y = f(x) such that the domain of A(x) is 1 s * $ 6 and the range of f(x) is -2 sy s 5. (a) What is the domain of A2(x - 2))? OOEx$ 5 O1sxs6 0 - Exs 5 SXS 7 N C SXS 5 b) What is the range of A2(x - 2))? 0 3 sys 10 0 -4sys5 0 -2sys5 0 -7sys0 O -2sys7 (c) What is the domain of 2f(x) - 2? O -15x$6 01sxs6 0-4sxs1 0 6 5 x $ 11 O1sxs 8 (d) What is the range of 2f(x) - 2? O -8sys8 O-i1 sys 3 0 -6sys8 O -6 sy = 10 O-1sy = 13 (e) Can you find positive constants B and C so that the domain of A(B(x - C)) is 8 s x s 9? O Yes O No Find the positive constants B and C, if they exist. (If an answer does not exist, enter DNE.) B = C= (f) Can you find positive constants A and D so that the range of Af(x) + D is 0 sys 1? O Yes O No Find the positive constants A and D, if they exist. (If an answer does not exist, enter DNE.) A= D =
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