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Chapter 1: Problem 44

Show that the composition of two increasing functions is increasing.

Short Answer

Expert verified
We are given two increasing functions \(f: \mathbb{R} \rightarrow \mathbb{R}\) and \(g: \mathbb{R} \rightarrow \mathbb{R}\), meaning that if \(x < y\), then \(f(x) < f(y)\) and \(g(x) < g(y)\) hold for any \(x, y \in \mathbb{R}\). We want to show that the composition \((g \circ f): \mathbb{R} \rightarrow \mathbb{R}\), defined as \((g \circ f)(x) = g(f(x))\), is also an increasing function. Since \(f(x) < f(y)\), we can apply the increasing function \(g\) on both sides to get \(g(f(x)) < g(f(y))\). Rewriting the inequality in terms of the composition, we get \((g \circ f)(x) < (g \circ f)(y)\) for any \(x, y \in \mathbb{R}\) such that \(x < y\), concluding that the composition of two increasing functions is indeed an increasing function.

Step by step solution

01

Define an increasing function

An increasing function is a function f: R → R (from the real numbers to the real numbers) that satisfies the following condition: for any two numbers x and y in the domain of R, if x < y, then f(x) < f(y).
02

Define the composition of two functions

Let f: R → R and g: R → R be two functions. The composition of these two functions, denoted by (g ∘ f): R → R, is a new function defined as (g ∘ f)(x) = g(f(x)) for any x in R. The idea is to first apply the function f to the input x, then apply the function g to the result.
03

Assume both f and g are increasing functions

We want to show that if both functions f and g are increasing, their composition (g ∘ f) will also be increasing. So assume that both f and g satisfy the definition of an increasing function. That is, if x < y, then f(x) < f(y) and g(x) < g(y) for any x, y in the domain of R.
04

Show (g ∘ f) is increasing

To show that the composition (g ∘ f) is increasing, we need to demonstrate that the inequality (g ∘ f)(x) < (g ∘ f)(y) holds for any x, y in R such that x < y.
05

Use properties of increasing functions

Given that x < y, we know that f(x) < f(y), because f is an increasing function. Now we can apply the increasing function g to both sides of the inequality: g(f(x)) < g(f(y)), because g is also an increasing function.
06

Rewrite the inequality in terms of the composition

The inequality g(f(x)) < g(f(y)) can be rewritten in terms of the composition (g ∘ f) as follows: (g ∘ f)(x) = g(f(x)) < g(f(y)) = (g ∘ f)(y).
07

Conclude

Since we have shown that for any x, y in R, if x < y, then (g ∘ f)(x) < (g ∘ f)(y), we can conclude that the composition of two increasing functions is also an increasing function.

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Most popular questions from this chapter

For each of the functions \(f\) given. (a) Find the domain of \(f\). (b) Find the range of \(f\). (c) Find a formula for \(f^{-1}\). (d) Find the domain of \(f^{-1}\). (e) Find the range of \(f^{-1}\). You can check your solutions to part (c) by verifying that \(f^{-1} \circ f=I\) and \(f \circ f^{-1}=I\) (recall that \(I\) is the function defined by \(I(x)=x\) ). \(f(x)=3 x+5\)

Give an example of a one-to-one function whose domain equals the set of integers and whose range equals the set of positive integers.

Give an example of an increasing function whose domain is the interval [0,1] but whose range does not equal the interval \([f(0), f(1)]\).

For each of the functions \(f\) given. (a) Find the domain of \(f\). (b) Find the range of \(f\). (c) Find a formula for \(f^{-1}\). (d) Find the domain of \(f^{-1}\). (e) Find the range of \(f^{-1}\). You can check your solutions to part (c) by verifying that \(f^{-1} \circ f=I\) and \(f \circ f^{-1}=I\) (recall that \(I\) is the function defined by \(I(x)=x\) ). \(f(x)=2 x-7\)

Suppose \(f\) and \(g\) are functions, each with domain of four numbers, with \(f\) and \(g\) defined by the tables below: $$\begin{array}{c|c}x & f(x) \\\\\hline 1 & 4 \\\2 & 5 \\\3 & 2 \\\4 & 3\end{array}$$ $$\begin{array}{c|c}x & g(x) \\\\\hline 2 & 3 \\\3 & 2 \\\4 & 4 \\\5 & 1\end{array}$$ What is the range of \(g^{-1} ?\)
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