Graphing Piecewise Functions

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Graph the following piecewise functions.

\(\textbf{1)}\) \(f(x) = \begin{cases}
x+2 & \text{if } x\lt 0 \\
-x+2 & \text{if }x\geq 0
\end{cases}\)
Show Graph

\(\textbf{2)}\) \(f(x) = \begin{cases}
x & \text{if } x\leq 3 \\
-x+5 & \text{if }x\gt 4
\end{cases}\)
Show Graph

\(\textbf{3)}\) \(f(x) = \begin{cases}
x^2-9 & \text{if } x\lt 4 \\
x-5 & \text{if }x\geq 4
\end{cases}\)
Show Graph

\(\textbf{4)}\) \(f(x) = \begin{cases}
x & \text{if } x\lt 0 \\
-x+5 & \text{if }x\geq 0
\end{cases}\)
Show Graph

\(\textbf{5)}\) \(f(x) = \begin{cases}
-2x-4 & \text{if } x\lt 0 \\
x+1 & \text{if }x\geq 0
\end{cases}\)
Show Graph

\(\textbf{6)}\) \(f(x) = \begin{cases}
x+3 & \text{if } x\lt 2 \\
-x+2 & \text{if }x\geq 2
\end{cases}\)
Show Graph
See Also
Page 2.7: Piecewise Defined Functions Piecewise Functions | Brilliant Math & Science Wiki Graph piecewise-defined functions | College Algebra Modeling a piecewise-defined function from its graph — Krista King Math | Online math help

\(\textbf{7)}\) \(f(x) = \begin{cases}
3x+3 & \text{if } x\leq 2 \\
-2x+8 & \text{if }x\geq 5
\end{cases}\)
Show Graph

\(\textbf{8)}\) \(f(x) = \begin{cases}
x^2-6 & \text{if } x\lt 4 \\
5 & \text{if }x\geq 4
\end{cases}\)
Show Graph

\(\textbf{9)}\) \(f(x) = \begin{cases}
x & \text{if } x\lt -3 \\
5 & \text{if } -3\leq x\leq 4 \\
-2 & \text{if }x\gt 4
\end{cases}\)
Show Graph

\(\textbf{10)}\) \(f(x) = \begin{cases}
x^2 & \text{if } x\lt 3 \\
-x+1 & \text{if }x\geq 3
\end{cases}\)
Show Graph

\(\textbf{11)}\) \(f(x) = \begin{cases}
5 & \text{if } x\lt 0 \\
3 & \text{if }x\geq 4
\end{cases}\)
Show Graph

\(\textbf{12)}\) \(f(x) = \begin{cases}
x+9 & \text{if } x\lt -3 \\
x^2-6 & \text{if } -3\leq x\leq 4 \\
-x & \text{if }x\gt 4
\end{cases}\)
Show Graph
See Also
4.1: Piecewise-Defined Functions

\(\textbf{13)}\) \(f(x) = \begin{cases}
x^2-8 & \text{if } x\lt 0 \\
5 & \text{if }x\geq 0
\end{cases}\)
Show Graph

\(\textbf{14)}\) \(f(x) = \begin{cases}
6 & \text{if } x\lt -4 \\
x+1 & \text{if } -4\leq x\lt 4 \\
-x+2 & \text{if }x\geq 4
\end{cases}\)
Show Graph

\(\textbf{15)}\) Graph the following piecewise function.
\(f(x) = \begin{cases}
x+2 & \text{if } x\geq 4 \\
x^2 & \text{if }x\lt 4
\end{cases}\)
Please see video for the graph

\(\textbf{16)}\) Identify the Domain and Range of the following piecewise function.
\(f(x) = \begin{cases}
-x+5 & \text{if } x\gt 4 \\
x & \text{if }x\leq 3
\end{cases}\)
Show Answer

\(\textbf{17)}\) Graph the following piecewise function.
\(f(x) = \begin{cases}
-x+5 & \text{if } x\gt 4 \\
x & \text{if }x\leq 3
\end{cases}\)
Please see video for the graph

\(\textbf{18)}\) Is the following continuous at \(x=4? \)
\(f(x) = \begin{cases}
-x+5 & \text{if } x\leq 4 \\
x-3 & \text{if } 4\lt x \lt 6 \\
x & \text{if }x\geq 6
\end{cases}\)
Show Answer

\(\textbf{19)}\) Is the following continuous at \( x=6? \)
\(f(x) = \begin{cases}
-x+5 & \text{if } x\leq 4 \\
x-3 & \text{if } 4\lt x \lt 6 \\
x & \text{if }x\geq 6
\end{cases}\)
Show Answer

\(\textbf{20)}\) Find the value of a that makes the function continuous.
\(f(x) = \begin{cases}
\frac{x^2+6x+5}{x+1} & \text{if } x \neq -1 \\
a & \text{if }x = -1
\end{cases}\)

Show Answer

\(\textbf{21)}\) Find the values of a and b that make the function continuous at all points.
\(f(x) = \begin{cases}
2x^2 & \text{if } x\leq 2 \\
ax+b & \text{if } 2\lt x \lt 4 \\
x^2+4 & \text{if }x\geq 4
\end{cases}\)
Show Answer

See Related Pages\(\)

\(\bullet\text{ Evaluating Piecewise Functions}\)\(\,\,\,\,\,\,\,\,\)

\(\bullet\text{ Absolute Value Functions as Piecewise Functions}\)\(\,\,\,\,\,\,\,\,\)

In Summary

Graphing piecewise functions involves plotting a function that is defined by multiple pieces, each with its own function rule. These pieces are typically defined by x values within a certain range. Graphing piecewise functions is a useful tool for visualizing functions that have different behavior over different values of x. It allows us to see how the function changes as we move from one piece to another, which can be helpful in understanding the overall shape and behavior of the function.

Graphing piecewise functions is typically covered in a precalculus or calculus course. Some related topics to graphing piecewise functions include analyzing and interpreting functions, finding key features such as intercepts and asymptotes, and using functions to model real-world situations. Other related topics might include the study of continuous and discontinuous functions, or the use of piecewise functions in fields such as engineering and economics.

Real world examples of Graphing Piecewise Functions

A company might use a piecewise function to model the cost of producing a certain product as the number of units produced increases. The function might have different pieces for different ranges of production, with each piece representing a different cost structure. For example, the cost per unit might be lower for larger quantities due to economies of scale.

A piecewise function could be used to model the rate at which a substance dissolves in a solution. The function might have different pieces for different concentrations of the substance, with each piece representing a different rate of dissolution.

A piecewise function could be used to model the resistance of a material as a function of temperature. The function might have different pieces for different temperature ranges, with each piece representing a different resistance coefficient.

A piecewise function could be used to model the price of a commodity, such as oil, as a function of time. The function might have different pieces for different time periods, with each piece representing a different price trend.

A piecewise function could be used to model the speed of a vehicle as a function of time. The function might have different pieces for different time periods, with each piece representing a different speed.

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Graphing Piecewise Functions | (2024)

Graph the following piecewise functions.

\(\textbf{1)}\) \(f(x) = \begin{cases} x+2 & \text{if } x\lt 0 \\ -x+2 & \text{if }x\geq 0 \end{cases}\)Show Graph

\(\textbf{2)}\) \(f(x) = \begin{cases} x & \text{if } x\leq 3 \\ -x+5 & \text{if }x\gt 4 \end{cases}\)Show Graph

\(\textbf{3)}\) \(f(x) = \begin{cases} x^2-9 & \text{if } x\lt 4 \\ x-5 & \text{if }x\geq 4 \end{cases}\)Show Graph

\(\textbf{4)}\) \(f(x) = \begin{cases} x & \text{if } x\lt 0 \\ -x+5 & \text{if }x\geq 0 \end{cases}\)Show Graph

\(\textbf{5)}\) \(f(x) = \begin{cases} -2x-4 & \text{if } x\lt 0 \\ x+1 & \text{if }x\geq 0 \end{cases}\)Show Graph

\(\textbf{7)}\) \(f(x) = \begin{cases} 3x+3 & \text{if } x\leq 2 \\ -2x+8 & \text{if }x\geq 5 \end{cases}\)Show Graph

\(\textbf{8)}\) \(f(x) = \begin{cases} x^2-6 & \text{if } x\lt 4 \\ 5 & \text{if }x\geq 4 \end{cases}\)Show Graph

\(\textbf{9)}\) \(f(x) = \begin{cases} x & \text{if } x\lt -3 \\ 5 & \text{if } -3\leq x\leq 4 \\ -2 & \text{if }x\gt 4 \end{cases}\)Show Graph

\(\textbf{10)}\) \(f(x) = \begin{cases} x^2 & \text{if } x\lt 3 \\ -x+1 & \text{if }x\geq 3 \end{cases}\)Show Graph

\(\textbf{11)}\) \(f(x) = \begin{cases} 5 & \text{if } x\lt 0 \\ 3 & \text{if }x\geq 4 \end{cases}\)Show Graph

\(\textbf{12)}\) \(f(x) = \begin{cases} x+9 & \text{if } x\lt -3 \\ x^2-6 & \text{if } -3\leq x\leq 4 \\ -x & \text{if }x\gt 4 \end{cases}\)Show GraphSee Also4.1: Piecewise-Defined Functions

\(\textbf{13)}\) \(f(x) = \begin{cases} x^2-8 & \text{if } x\lt 0 \\ 5 & \text{if }x\geq 0 \end{cases}\)Show Graph

\(\textbf{14)}\) \(f(x) = \begin{cases} 6 & \text{if } x\lt -4 \\ x+1 & \text{if } -4\leq x\lt 4 \\ -x+2 & \text{if }x\geq 4 \end{cases}\)Show Graph

\(\textbf{15)}\) Graph the following piecewise function.\(f(x) = \begin{cases} x+2 & \text{if } x\geq 4 \\ x^2 & \text{if }x\lt 4 \end{cases}\)Please see video for the graph

\(\textbf{16)}\) Identify the Domain and Range of the following piecewise function.\(f(x) = \begin{cases} -x+5 & \text{if } x\gt 4 \\ x & \text{if }x\leq 3 \end{cases}\)Show Answer

\(\textbf{17)}\) Graph the following piecewise function.\(f(x) = \begin{cases} -x+5 & \text{if } x\gt 4 \\ x & \text{if }x\leq 3 \end{cases}\)Please see video for the graph

\(\textbf{18)}\) Is the following continuous at \(x=4? \)\(f(x) = \begin{cases} -x+5 & \text{if } x\leq 4 \\ x-3 & \text{if } 4\lt x \lt 6 \\ x & \text{if }x\geq 6 \end{cases}\)Show Answer

\(\textbf{19)}\) Is the following continuous at \( x=6? \)\(f(x) = \begin{cases} -x+5 & \text{if } x\leq 4 \\ x-3 & \text{if } 4\lt x \lt 6 \\ x & \text{if }x\geq 6 \end{cases}\)Show Answer

\(\textbf{20)}\) Find the value of a that makes the function continuous.\(f(x) = \begin{cases} \frac{x^2+6x+5}{x+1} & \text{if } x \neq -1 \\ a & \text{if }x = -1 \end{cases}\)Show Answer

\(\textbf{21)}\) Find the values of a and b that make the function continuous at all points.\(f(x) = \begin{cases} 2x^2 & \text{if } x\leq 2 \\ ax+b & \text{if } 2\lt x \lt 4 \\ x^2+4 & \text{if }x\geq 4 \end{cases}\)Show Answer