How Can You Prove a Bijection from [0,1] to [a,b]?

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Homework Help Overview

The discussion revolves around proving a bijection from the interval [0,1] to another interval [a,b], where a and b are real numbers. Participants are exploring examples and properties of functions that could serve as bijections.

Discussion Character

  • Exploratory, Conceptual clarification, Problem interpretation

Approaches and Questions Raised

  • Participants suggest specific functions as potential bijections and discuss the need to determine appropriate constants to satisfy the bijection conditions. There is also a consideration of whether all functions from [0,1] to [a,b] can be bijections, prompting questions about the validity of this claim.

Discussion Status

Some guidance has been offered regarding the form of functions that could be bijections, and there is an ongoing exploration of different cases related to the values of a and b. However, there is no explicit consensus on the validity of the claim that all functions are bijections, and participants are encouraged to question this assumption.

Contextual Notes

Participants are considering the implications of continuity and discontinuity in functions when discussing bijections, as well as the need for specific cases based on the values of a and b.

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Homework Statement



I really don't understand the question for this problem, could you please help me out? Thanks so much

1.a,b are some real numbers. Give an example of a bijection from [0,1] to [a,b]
2. Prove that all functions from [0,1] to [a,b] are bijections

Homework Equations


The Attempt at a Solution



I think the example function could be something like Sqrt(1-x) + Sqrt(x). That makes its domain be [0,1]. But I don't know how to make it end up with the value of [a,b]
 
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Try a function like this--f(x) = c(x - h)--with domain restricted to [0, 1]. You'll need to figure out what the constants c and h need to be so that f(0) = a and f(1) = b.
 
Hi, oh yes, your function works. All functions f(x) = mx + n are bijections. Thanks for your help.

About the second one, do you think I should break it into 3 cases. With a,b < 0; a,b > 0; and a <0 ^ b>0?
 
Before looking at your cases, you should first ask yourself whether it's true. "All functions" covers a lot of territory, including functions that are continuous as well as those that are discontinuous.
 

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