A function is described by the following ordered pairs: (7, 4.5) (–4, 7.2) (–7.2, –4) (5.2, 3) which set of ordered pairs represents the inverse of the function? (7, –4), (–7.2, –4), (3, 5.2), (4.5, –4) (7, –4), (–7.2, 5.2), (4.5, 7.2), (–4, 3) (4.5, 7), (7.2, –4), (–4, –7.2), (3, 5.2) (7, 4.5), (–4, 7.2), (–7.2, –4), (5.2, 3)
A Function Is Described By The Following Ordered Pairs: (7, 4.5) (–4, 7.2) (–7.2, –4) (5.2, 3) Which Set Of Ordered Pairs Represents The Inverse Of The Function? (7, –4), (–7.2, –4), (3, 5.2), (4.5, –4) (7, –4), (–7.2, 5.2), (4.5, 7.2), (–4, 3) (4.5, 7), (7.2, –4), (–4, –7.2), (3, 5.2) (7, 4.5), (–4, 7.2), (–7.2, –4), (5.2, 3)
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A Function Is Described By The Following Ordered Pairs: (7, 4.5) (–4, 7.2) (–7.2, –4) (5.2, 3) Which Set Of Ordered Pairs Represents The Inverse Of The Function? (7, –4), (–7.2, –4), (3, 5.2), (4.5, –4) (7, –4), (–7.2, 5.2), (4.5, 7.2), (–4, 3) (4.5, 7), (7.2, –4), (–4, –7.2), (3, 5.2) (7, 4.5), (–4, 7.2), (–7.2, –4), (5.2, 3). The set of the first components of each ordered pair is called the domain and the set of the second. To find the inverse of a function described by a set of ordered pairs, we need to swap the x and y values in each pair.
Functions Ordered Pairs Sheet 1 from learninglibrarysteiner.z21.web.core.windows.net
Study with quizlet and memorize flashcards containing terms like a function is represented by the set of ordered pairs. A function is described by the following ordered pairs (7,4.5) the function? (1) when given a set of ordered pairs & (2) when given a function.
A Function Is Described By The Following Ordered Pairs (7,4.5) The Function?
A function is described by the following ordered pairs: A relation is a set of ordered pairs. Study with quizlet and memorize flashcards containing terms like a function is represented by the set of ordered pairs.
The Following Video Examines How To Find The Inverse Of Function In Two Ways:
Study with quizlet and memorize flashcards containing terms like a _____ is any relation in which no two ordered pairs have the same first element, f = {(6, 3), (5, 4), (4, 5), (3, 6), (2, 7)} f is a. Which set of ordered pairs represents the inverse of (7,4.5) the function? To find the inverse of a function described by a set of ordered pairs, we need to swap the x and y values in each pair.
The Set Of The First Components Of Each Ordered Pair Is Called The Domain And The Set Of The Second.
(1) when given a set of ordered pairs & (2) when given a function. Determining whether a relation represents a function.
