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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?
In Monkey Go Happy 2, the code for level 7 is randomized for each player, making it unique to your specific game session. The code is typically a sequence of numbers or symbols that you need to input correctly to progress to the next level. To find the code for level 7, you may need to solve puzzles, interact with objects, or complete challenges within the game.
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 vault code of monkey go happy 2?
The answer code is 2469 :D
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).
