What is a relation in mathematics?

A relation is any set of ordered pairs, where the set of all x components is called the domain and the set of all y components is called the range.

What is the domain of a relation?

The domain is the set of all x components (or input values) in the ordered pairs of a relation.

What is the range of a relation?

The range is the set of all y components (or output values) in the ordered pairs of a relation.

How can you determine if a relation is a function?

A relation is a function if each x-value (domain element) is paired with exactly one y-value (range element). You can also use the vertical line test on a graph.

What is the vertical line test?

The vertical line test is a method to determine if a graph represents a function, by checking if any vertical line crosses the graph at more than one point.

What is the purpose of mapping diagrams in functions?

Mapping diagrams show how elements of the domain are paired with elements of the range, using arrows to represent the connections.

Can a relation have the same x-value with different y-values to be a function?

No, a function must have each x-value uniquely paired with one y-value, otherwise it is not a function.

What are examples of ordered pairs given in the video?

Examples include (1,3), (2,4), (5,7), (6,8) for domains and ranges discussions.

What graphical element is used to represent functions in the video?

Functions are represented using graphs in the Cartesian plane and mapping diagrams.

What are some examples of functions identified in the video?

Examples include linear functions, shown through straight-line graphs where the vertical line test confirms them as functions.

Relations and Functions | General Mathematics | Grade 11

00:14:28

https://www.youtube.com/watch?v=YU43Jvr3fs8

الملخص

TLDRIn this educational video, the instructor discusses the concepts of relations and functions in mathematics. A relation is defined as a set of ordered pairs, where the domain consists of all the x components and the range consists of all the y components. The video explains how each member of the domain can be paired with only one member of the range to qualify as a function. The instructor also introduces the vertical line test, a graphical method to identify functions. The test suggests that if any vertical line crosses a graph at more than one point, it is not considered a function. Mapping diagrams are shown as a means of depicting functions by connecting domain elements to range elements through arrows. The instructor provides several examples, illustrating how to identify whether certain relations are functions or not, both algebraically and graphically. The video concludes with a brief summary and invites viewers to ask further questions in the comments.

الوجبات الجاهزة

📘 A relation is a set of ordered pairs, having a domain and range.
🔤 The domain is the set of all x components, or inputs, from the ordered pairs.
🟢 The range is the set of all y components, or outputs, from the ordered pairs.
✔️ A function is a relation where each domain element maps to exactly one range element.
📏 The vertical line test helps determine if a graph is a function if only touches at one point.
🔗 Mapping diagrams visually show how domains and ranges connect via functions.
⚠️ A graph or relation where x-values have multiple y-values is not a function.
🖋️ Examples in the video show how to determine functions from relations.
📈 Functions can be graphically represented in the Cartesian plane.
🧠 Understanding domain and range is crucial in differentiating mathematical functions.

الجدول الزمني

00:00:00 - 00:05:00
The video begins with an introduction to the concept of relations and functions in mathematics. A relation is defined as a set of ordered pairs, with the domain being all the x-components and the range being all the y-components of these pairs. An example is provided with sets of ordered pairs, and the domain and range are identified. Furthermore, a relation is explained as a rule that assigns values from the domain to values in the range. The video differentiates between relations and functions, explaining that a function pairs each member of the domain with exactly one member of the range, which means no two ordered pairs have the same x-value but different y-values. Two examples are given to illustrate this concept, demonstrating how to identify both a function and a non-function relation.
00:05:00 - 00:14:28
The video continues by discussing ways to represent functions, such as using mapping diagrams where domain elements are mapped to range elements using arrows. It shows examples of mapping diagrams and evaluates their functions. Furthermore, it introduces the vertical line test, a method to graphically determine if a relation is a function: if a vertical line intersects a graph at exactly one point, the graph represents a function. Examples of graphs are given to illustrate the use of this test. The video concludes with reminders to subscribe and invitations for viewers to ask questions in the comments section. This summary captures the logical structure and key points discussed regarding relations, functions, and how to visually determine their properties.

الخريطة الذهنية

الأسئلة الشائعة

What is a relation in mathematics?
A relation is any set of ordered pairs, where the set of all x components is called the domain and the set of all y components is called the range.
What is the domain of a relation?
The domain is the set of all x components (or input values) in the ordered pairs of a relation.
What is the range of a relation?
The range is the set of all y components (or output values) in the ordered pairs of a relation.
How can you determine if a relation is a function?
A relation is a function if each x-value (domain element) is paired with exactly one y-value (range element). You can also use the vertical line test on a graph.
What is the vertical line test?
The vertical line test is a method to determine if a graph represents a function, by checking if any vertical line crosses the graph at more than one point.
What is the purpose of mapping diagrams in functions?
Mapping diagrams show how elements of the domain are paired with elements of the range, using arrows to represent the connections.
Can a relation have the same x-value with different y-values to be a function?
No, a function must have each x-value uniquely paired with one y-value, otherwise it is not a function.
What are examples of ordered pairs given in the video?
Examples include (1,3), (2,4), (5,7), (6,8) for domains and ranges discussions.
What graphical element is used to represent functions in the video?
Functions are represented using graphs in the Cartesian plane and mapping diagrams.
What are some examples of functions identified in the video?
Examples include linear functions, shown through straight-line graphs where the vertical line test confirms them as functions.

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التمرير التلقائي:

00:00:01
[Music]
00:00:14
hi class welcome back to our channel for
00:00:17
this video discussion
00:00:19
and about ebooks
00:00:20
some functions and
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relations
00:00:24
okay so define when nothing young
00:00:27
relation
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a relation is any set of ordered pairs
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the set of all the x components
00:00:35
of the ordered pairs is called the
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domain
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of the relation
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and the set of all the y components is
00:00:43
called the range
00:00:45
okay so if it's a bn a relation is a
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rule
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that relates values from a set of values
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called the domain
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okay to a second set of values called
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the range
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so whether nothing imagine domain
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is your adding input
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machine
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while syringe is
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so
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let's give the domain and range of the
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following relation for number one
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we have one three
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two four
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five seven and six comma eight
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x components of the ordered pairs
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okay
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so on only on we have one
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two
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five
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and six
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nahua
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while young range number
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is the set of all y components so you
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know
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we have seven
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then the sixth meron eight
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guys
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three four seven and eight
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so next number two
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so
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begin adding in domain and range
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again your adding domain is the set of
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all x components so you know
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numbers we have negative two negative
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one
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then multiply negative two so since mean
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negative two naught
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that is our y components so we have four
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one
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zero
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then five
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and last is your negative two
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okay so puerto ri nothing arranged guys
00:03:08
human numbers are adding set from lowest
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to highest or highest lowest depending
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guys
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um
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a relation in which each member of the
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domain is paired to exactly one member
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of the range is called a function
00:03:32
so on the banks of being none
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[Music]
00:03:35
relation
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function
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if no two ordered pairs have the same x
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value but different
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y values
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function
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number one
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we have one two two three three four and
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four comma five
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so as you can see guys um
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input
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nothing is a function
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okay
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next number two
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we have one comma one
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then two comma two three comma three and
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four comma four
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so as you can see guys now you mean
00:04:45
nothing is
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a unique output
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or is output so ebx bn young number to
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nothing is also a function
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okay
00:05:00
next number three
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one zero
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zero one
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negative one zero and zero
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negative one
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okay
00:05:12
so guys
00:05:20
which is zero
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and zero
00:05:47
domain is paired to exactly
00:05:49
one member of the range so this time
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domain
00:05:56
is
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okay which is one and negative one so
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therefore
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uh number three is not a function
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okay
00:06:12
so next number four we have negative two
00:06:15
four
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negative one one
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zero zero one one then two
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four
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okay
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so
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uh
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domain nothing which is negative two
00:06:30
negative one zero one two is
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is a function
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guys
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okay next
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uh functions can also be represented
00:06:55
through mapping
00:06:57
okay so where the elements of the domain
00:07:00
are map
00:07:01
to the elements of the range using
00:07:03
arrows okay so in this case
00:07:06
uh the relation or function is
00:07:08
represented by the set of all the
00:07:10
connections
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by the arrows all right so try
00:07:15
which of the following mapping
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diagrams represent function
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x component
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corresponds to a unique
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range tama young one corresponds to
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three two corresponds to five three
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corresponds to nine then four to seven
00:07:52
then five to thirty three so latina
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input nathan is my unique output so
00:07:57
therefore your number one nothing is a
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function
00:08:03
okay so function n
00:08:06
so next number two
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uh we have
00:08:10
x
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u7 output near one you eat an output in
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a zero then your nine and output is zero
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all right so one problem guys
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okay
00:09:04
so next number three naman
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meru
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11 13 17 19 and 23.
00:09:18
so guys
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11 and
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13.
00:09:29
okay then at the same time your input
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not in the two is made in the output
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output
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okay so this time
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uh your input not in the seven meet the
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level output so eb sub n
00:10:02
uh this function or this relation is not
00:10:04
a function
00:10:09
all right nine indian but guys you're
00:10:12
adding uh
00:10:13
mapping diagrams
00:10:16
okay so i unmoved dials of functions as
00:10:20
a graph
00:10:21
in the cartesian plane
00:10:23
all right so given the graph of a
00:10:25
relation we can easily identify if it is
00:10:28
a function or not by using the vertical
00:10:30
line test
00:10:32
okay so underneath vertical line test
00:10:35
a graph of a mathematical relation is
00:10:37
said to be a function
00:10:39
if any vertical line
00:10:42
drawn passing through the graph
00:10:44
touches the graph at exactly
00:10:46
one point
00:10:48
all right so if it's a bn
00:10:50
uh magicking function is a graph if
00:10:54
i connect in a vertical line
00:10:56
that is
00:11:12
example so which of the graphs
00:11:15
represent a function
00:11:18
so letter a
00:11:20
so little guys are to test the graph
00:11:23
again the gamma line of vertical line
00:11:26
okay so um
00:11:28
in a vertical line so any point in graph
00:11:34
in your guys
00:11:55
represents a function
00:12:00
okay
00:12:02
so next number two
00:12:04
or letter b
00:12:05
so determination is straight line
00:12:08
so
00:12:19
this line represents a function
00:12:45
this ellipse is not a function or this
00:12:48
graph is not a function
00:13:12
so that means
00:13:13
uh this graph represents a function
00:13:32
um
00:13:43
so that means this type of hyperbola is
00:13:46
not a function
00:13:53
and so gangnam language simply guys give
00:13:55
me the new outing vertical line this
00:14:01
so this is the end of our video i hope
00:14:04
uh 19 day and you guys go on about ebay
00:14:06
subscribe
00:14:09
and if you have questions or
00:14:11
clarifications kindly put them in the
00:14:13
comment section below
00:14:15
thank you guys for watching this is prof
00:14:18
d i'll catch you on the flip side bye

الوسوم

Mathematics
Relations
Functions
Domain
Range
Vertical Line Test
Ordered Pairs
Mapping Diagrams
Function Graphs
Educational