Answer to Question #273513 in Linear Algebra for Zaia grgs

Question #273513

For each of the following functions determine the inverse image of T = {x ∈ R : 0 ≤ x 2 − 25}.

1. f : R → R defined by f(x) = 3x³.

2. g : R + → R defined by g(x) = ln(x).

3. h : R → R defined by h(x) = x − 9.

Expert's answer

a. Write "y=f(x)"

"y = 3x^3."

b. Interchange "x" and "y"

"x=3y^3"

c. Solve for "y"

"y=(x\/3)^{1\/3}"

d. Write "f^{-1}(x)=y"

"f^{-1}(x)=(x\/3)^{1\/3}"

"0\\leq x^2\\leq25=>-5\\leq x\\leq5"

"f^{-1}(T)=[-(5\/3)^{1\/3}, (5\/3)^{1\/3}]"

a. Write "y=g(x)"

"y = \\ln x"

b. Interchange "x" and "y"

"x=\\ln y"

c. Solve for "y"

"y=e^x"

d. Write "g^{-1}(x)=y"

"g^{-1}(x)=e^x,x>0, x\\in \\R"

"0\\leq x^2\\leq25, x>0=>0<x\\leq5"

"g^{-1}(T)=[1, e^5]"

a. Write "y=h(x)"

"y = x-9."

b. Interchange "x" and "y"

"x=y-9"

c. Solve for "y"

"y=x+9"

d. Write "h^{-1}(x)=y"

"h^{-1}(x)=x+9"

"0\\leq x^2\\leq25=>-5\\leq x\\leq5"

"h^{-1}(T)=[4, 14]"

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