answersLogoWhite

0


Best Answer

The domain is {-4, 2, 6, 7}.

User Avatar

Wiki User

βˆ™ 7y ago
This answer is:
User Avatar

Add your answer:

Earn +20 pts
Q: What is the domain of this relation (-4 2) (24)(69) (78)?
Write your answer...
Submit
Still have questions?
magnify glass
imp
Related questions

What is the domain of this relation?

(2,-3),(-4,2),(6,2),(-5,-3),(-3,0)


What is the domain of the relation (8 2) (4 2) (3 2) (5 3)?

The domain consists of the set {3, 4, 5, 8}


What is the domain of this relation(-3, 2), ( 2, -4), (2, 6), (-3, -5), (0, -3)?

{-3,2,0}


How many significant figures does each numbers have 2469?

Each of them ... the 2, the 4, the 6, and the 9 ... has one significant figure.


What is the domain of this relation(2, -3), (-4, 2), (6, 2), (-5, -3), (-3, 0)?

{2,-4,6,-5,-3}


What is the code on level 7 in monkey go happy 2?

what is the code lock for monkey go happy mini monkey 2


What is the vault code of monkey go happy 2?

The answer code is 2469 :D


How do you state the domain of this relation 5) (2 3) (1 -4) (-3 3) (-1 -2)?

If this is the whole of the function, then the domain is {2, 1, -3, -1}. That set can be put in increasing order if you wish but that is not necessary.


What is the domain of this relation (-3 0) (-2 -5) (-2 6) (3 7) (0 -17)?

The domain is the set {-3, -2, 0, 3}. Note that because -2 is mapped to -5 as well as 6, this relationship is not a function.


How do you to sketch a graph of a function whose domain is in the closed interval 0-4 and whose range is the set of two numbers 2 and 3?

Find the domain of the relation then draw the graph.


Which are examples of mere relation?

It is a collection of the second values in the ordered pair (Set of all output (y) values). Example: In the relation, {(-2, 3), {4, 5), (6, -5), (-2, 3)}, The domain is {-2, 4, 6} and range is {-5, 3, 5}.


Example of relation and function?

A function must be well defined. This means that every element in the domain maps to only one element in the range. In more math terms, let a and b be in the domain of f such that a = b. If f is a function, then if a = b, f(a) = f(b). A relation does not need to be well defined. An example of this would be y^2 = 4. y = 2 or -2. An ordered pair that would be part of a relation but not a function would be (x, y^2) vs an ordered pair possible in a function which would be (x^2, y).