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Find the domain of the function defined by the set of points below. Express your answer as a set of numbers.

(10,-4),(-3,1),(9,10),(2,0),(6,0)
Answer:

Find the domain of the function defined by the set of points below. Express your answer as a set of numbers. $\newline$ $(10,-4),(-3,1),(9,10),(2,0),(6,0)$ $\newline$ Answer:

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Domain and range of functions

Full solution

Q. Find the domain of the function defined by the set of points below. Express your answer as a set of numbers.

\newline

(10,-4),(-3,1),(9,10),(2,0),(6,0)

\newline

Answer:

Define Function Domain: The domain of a function is the set of all possible input values (usually $x$ -values) for which the function is defined. To find the domain of the function represented by the set of points, we need to list all the unique $x$ -values from the given points.
Identify Given Points: The given points are $(10,-4)$ , $(-3,1)$ , $(9,10)$ , $(2,0)$ , and $(6,0)$ . The $x$ -values from these points are $10$ , $-3$ , $9$ , $2$ , and $(-3,1)$ $0$ .
List Unique $X$ -Values: We need to make sure that these $x$ -values are unique and list them in a set to represent the domain. The $x$ -values are already unique, so we can directly form the set.
Form Domain Set: The domain of the function is the set of $x$ -values $\{10, -3, 9, 2, 6\}$ .

More problems from Domain and range of functions

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\text{Audrey can type \( 45 \) words in \( 68 \) seconds.}

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Question

What is the domain of this relation?

\newline

(4,-3) (-3,-10) (-5,5) (9,-2) (9,-1)

\newline

\newline

\{-5,-3,4,9\}

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\newline

\newline

[A] s \text{ is the independent variable and } l \text{ is the dependent variable }

\newline

[B] l \text{ is the independent variable and } s \text{ is the dependent variable }

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\newline

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\newline

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\newline

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\newline

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\newline

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