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Chapter 6: Problem 2

Decide whether each function is one-to-one. $$f(x)=-5 x+2$$

Short Answer

Expert verified
The function \( f(x) = -5x + 2 \) is one-to-one.

Step by step solution

01

Understand One-to-One Functions

A function is one-to-one if every distinct input gives a distinct output. In mathematical terms, if \( f(x_1) = f(x_2) \) implies that \( x_1 = x_2 \), then the function is one-to-one.
02

Analyze the Given Function

The given function is \( f(x) = -5x + 2 \), which is a linear function with a non-zero slope. Linear functions with non-zero slopes are one-to-one because the slope ensures that different inputs will lead to different outputs.
03

Algebraic Verification

To verify algebraically, assume \( f(x_1) = f(x_2) \). This gives us the equation \(-5x_1 + 2 = -5x_2 + 2\). Simplifying, we get \(-5x_1 = -5x_2\), which reduces to \(x_1 = x_2\). Hence, the function satisfies the condition for being one-to-one.
04

Conclusion

Since \( f(x) = -5x + 2 \) satisfies the condition that \( f(x_1) = f(x_2) \) implies \( x_1 = x_2 \), it is a one-to-one function.

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Key Concepts

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

Linear Function
A linear function is a type of function that creates a straight line when plotted on a graph, hence the name "linear." The general form of a linear function is \( f(x) = ax + b \), where:
  • \( a \) is the slope, which determines the steepness or incline of the line.
  • \( b \) is the y-intercept, which is the point where the line crosses the y-axis.
In the given exercise, the function \( f(x) = -5x + 2 \) is linear. Here, \( a = -5 \), indicating a slope of -5. This negative slope tells us that as \( x \) increases, \( f(x) \) decreases, producing a downward sloping line.
The y-intercept \( b = 2 \) means the line crosses the y-axis at the point (0, 2).
All linear functions with a non-zero slope are automatically one-to-one functions because they guarantee unique outputs for unique inputs.
Algebraic Verification
Algebraic verification is a method to determine the properties of a function by using algebraic manipulation. To verify if a function is one-to-one, we assume that the function's outputs are equal for two different inputs. Specifically, if \( f(x_1) = f(x_2) \), we should demonstrate that this implies \( x_1 = x_2 \).

Looking at the function \( f(x) = -5x + 2 \), assume \( f(x_1) = f(x_2) \). This leads to the equation:\[-5x_1 + 2 = -5x_2 + 2\]
By simplifying, subtract 2 from both sides to get:\[-5x_1 = -5x_2\]
Divide both sides by -5 to find:\[x_1 = x_2\]
Since we've shown that equal outputs imply equal inputs, the function is algebraically verified as one-to-one.
Function Properties
Functions can have various properties that define their behavior. Understanding these properties is key to analyzing and predicting how the function behaves under different conditions.- **One-to-One Function**: As detailed earlier, a function is labeled as one-to-one if each input results in a unique output. This can be a crucial property when trying to invert functions.- **Slope**: In linear functions like \( f(x) = -5x + 2 \), the slope is essential. A non-zero slope confirms a one-to-one relationship between inputs and outputs.- **Intercepts**: These are points where the function crosses the axes. For linear functions:
  • **y-intercept**: The point where the function crosses the y-axis; for the given function, it is 2.
  • **x-intercept**: The point where the function crosses the x-axis, calculated by setting \( f(x) = 0 \).
Understanding these properties helps students grasp the overall behavior and characteristics of functions, allowing them to apply this knowledge to diverse mathematical problems.

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Most popular questions from this chapter

Use the definition of inverse functions to show analytically that \(f\) and \(g\) are inverses. $$f(x)=x^{3}+4, \quad g(x)=\sqrt[3]{x-4}$$

Use the properties of logarithms to rewrite each expression as a single logarithm with coefficient 1 . Assume that all variables represent positive real numbers. $$\ln (a+b)+\ln a-\frac{1}{2} \ln 4$$

For each function that is one-to-one, write an equation for the inverse function of \(y=f(x)\) in the form \(y=f^{-1}(x),\) and then graph \(f\) and \(f^{-1}\) on the same axes. Give the domain and range of \(f\) and \(f^{-1} .\) If the function is not one-to-one, say so. $$y=3 x-4$$

Use the definition of inverse functions to show analytically that \(f\) and \(g\) are inverses. $$f(x)=4 x+3, \quad g(x)=\frac{x-3}{4}$$

For each exponential function \(f\), find \(f^{-1}\) analytically and graph \(f\) and \(f^{-1}\) as \(Y_{1}\) and \(Y_{2}\) in the same viewing window. $$f(x)=-10^{x}+4$$
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