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Chapter 5: Problem 28

For \(f\) to be one-to-one, if \(a \neq b,\) then ____.

Short Answer

Expert verified
If \(a \neq b\), then \(f(a) \neq f(b)\).

Step by step solution

01

Understanding One-to-One Function

A function \(f\) is one-to-one (injective) if it assigns a unique output for every unique input. This means no two different inputs \(a\) and \(b\) can produce the same output \(f(a)\) and \(f(b)\).
02

Applying the One-to-One Condition

For a function \(f\) to be one-to-one, the condition \(a eq b\) must imply that \(f(a) eq f(b)\). This tells us that different inputs must result in different outputs.

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Injective Function
An injective function, also known as a one-to-one function, is a type of function that links each element in the domain to a distinct and unique element in the codomain. This concept is pivotal in understanding many mathematical ideas. Essentially, injectivity means that different inputs to a function always lead to different outputs. This property is crucial for ensuring that every element mapped from the input set has a unique counterpart in the output set, thus avoiding any overlap where two inputs share the same output.
  • If a function is injective, one can be sure that no two points in the input set are mapped to the same point in the output.
  • An easy way to test if a function is injective is to check if, whenever \( f(a) = f(b) \), it necessarily follows that \( a = b \).
Understanding injective functions is essential for ensuring that your function properly models scenarios where each input should have its own uniquely corresponding output.
Unique Input
For a function to be considered injective, each input value needs to be unique in terms of its relationship to the output values. In other words, if two different results are obtained, those results must have originated from two different inputs.
This characteristic is crucial in establishing a function as one-to-one because:
  • It ensures distinct inputs are treated independently without causing any overlap in output values.
  • If you encounter an output for an injective function that could be produced by multiple inputs, this would break its one-to-one nature.
By maintaining unique input-to-unique output pairs, an injective function assures that each output can be traced back to a single, specific input.
Unique Output
An important facet of injective functions is the uniqueness of their outputs. For every distinct input, there should be a distinctly unique output in an injective function. This means, mathematically, that the function never maps two different inputs to the same output.
To verify that a function produces a unique output for every input, consider:
  • Checking that if \( a eq b \), then it must follow that \( f(a) eq f(b) \).
  • Ensuring the function doesn’t accidentally produce repeating outputs from different inputs.
Understanding the uniqueness of outputs within injective functions helps in emphasizing the clear and distinct relationship between every pair of inputs and outputs, thereby supporting the function's integrity as one-to-one.

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Most popular questions from this chapter

Use any method (analytic or graphical) to solve each equation. $$\ln \left(\ln e^{-x}\right)=\ln 3$$

Assume that \(f(x)=a^{x},\) where \(a>1\) Is \(f\) a one-to-one function? If so, based on Section 5.1 what kind of related function exists for \(f ?\)

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