Solution Found!
Let f (x) = x – 3, h (x) = x3 , and j (x) = 2x. Express
Chapter 1, Problem 11E(choose chapter or problem)
Let \(f(x)=x-1 \cdot g(x)=\sqrt{x}, h(x)=x^{3}, \text { and } j(x)=2 x\) .\(f\) Express each of the functions in Exercises 11 and 12 as a composite in-volving one or more of \(f, \mathrm{~g}, \mathrm{~h} \text {, and } \mathrm{j} \text {. }\)
\(\text { a. } y=\sqrt{x}-3 b \cdot y=2 \sqrt{x} \text { c. } y=x^{1 / 4} \text { d. } y=4 \times \text { e.y }=\sqrt{(x-3)^{3}} \text { f. } y=(2 x-6)^{3}\)
Equation Transcription:
Text Transcription:
f(x) = x - 1. g(x) = x, h(x) = x3, and j(x) = 2x.
ƒ, g,h, and j. y = x-3 y = 2x y = x1/4 y = 4x y = (x-3)3 y = (2x - 6)3
Questions & Answers
QUESTION:
Let \(f(x)=x-1 \cdot g(x)=\sqrt{x}, h(x)=x^{3}, \text { and } j(x)=2 x\) .\(f\) Express each of the functions in Exercises 11 and 12 as a composite in-volving one or more of \(f, \mathrm{~g}, \mathrm{~h} \text {, and } \mathrm{j} \text {. }\)
\(\text { a. } y=\sqrt{x}-3 b \cdot y=2 \sqrt{x} \text { c. } y=x^{1 / 4} \text { d. } y=4 \times \text { e.y }=\sqrt{(x-3)^{3}} \text { f. } y=(2 x-6)^{3}\)
Equation Transcription:
Text Transcription:
f(x) = x - 1. g(x) = x, h(x) = x3, and j(x) = 2x.
ƒ, g,h, and j. y = x-3 y = 2x y = x1/4 y = 4x y = (x-3)3 y = (2x - 6)3
ANSWER:
Solution :
Step 1 :
In this problem, we have to express each of the function in composite involving one or more of
.