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What term describes the set of all possibles values for a function?
The term that describes the set of all possible values for a function is called the "range." The range includes all output values that the function can produce based on its domain (the set of all possible input values). In mathematical terms, if ( f: X \rightarrow Y ) is a function from set ( X ) to set ( Y ), then the range is a subset of ( Y ).
What is the set of y values for a function?
The set of y values for a function is known as the range. It consists of all possible outputs (y values) that the function can produce based on its domain (the set of input values). The range can be determined by analyzing the function's behavior, such as its equations, graphs, or by evaluating specific input values.
What are the y values of a function?
The y values of a function represent the output values corresponding to each input (x value) in the function's domain. In a Cartesian coordinate system, these y values are plotted on the vertical axis and indicate how the function behaves as the input changes. For a given x value, the y value is determined by applying the function's rule or equation. Essentially, the set of all y values forms the range of the function.
What does domain and estimate the range mean in math?
"Domain" means for what numbers the function is defined (the "input" to the function). For example, "x + 3" is defined for any value of "x", whereas "square root of x" is defined for non-negative "x". "Range" refers to the corresponding values calculated by the function - the "output" of the function. If you write a function as y = (some function of x), for example y = square root of x, then the domain is all possible values that "x" can have, whereas the range is all the possible values that "y" can have.
What are the domain and range of the function graphed below?
I cannot see the graph you are referring to. However, to determine the domain of a function, you need to identify all possible input values (x-values), while the range consists of all possible output values (y-values). If you provide more details about the function or its characteristics, I can help you determine the domain and range.
What are the possible values of x called in a function?
The allowable values of x are called the "domain", and the resultant set of possible y values are called the "range".
How do you tell if its relation between range and domain?
Domain is what you can plug into the function (possible x values for y=f(x) type functions) and range is the possible values you can get out (possible y values).
Is x equals y a function?
y = x This is a line and a function. Function values are y values.
What are possible values for y called?
They comprise the codomain or range.
What is the domain of the function y equals 2x plus 3?
The domain of a function is the set of it's possible x values that will make the function work and output y values. In this case, it would be all the real numbers.
What are the y values of a function?
The y values of a function represent the output values corresponding to each input (x value) in the function's domain. In a Cartesian coordinate system, these y values are plotted on the vertical axis and indicate how the function behaves as the input changes. For a given x value, the y value is determined by applying the function's rule or equation. Essentially, the set of all y values forms the range of the function.
What does domain and estimate the range mean in math?
"Domain" means for what numbers the function is defined (the "input" to the function). For example, "x + 3" is defined for any value of "x", whereas "square root of x" is defined for non-negative "x". "Range" refers to the corresponding values calculated by the function - the "output" of the function. If you write a function as y = (some function of x), for example y = square root of x, then the domain is all possible values that "x" can have, whereas the range is all the possible values that "y" can have.
What are the possible values for y called?
The question is somewhat ambiguous, but I would guess that the answer is the RANGE.
Domain of function?
The domain of a function encompasses all of the possible inputs of that function. On a Cartesian graph, this would be the x axis. For example, the function y = 2x has a domain of all values of x. The function y = x/2x has a domain of all values except zero, because 2 times zero is zero, which makes the function unsolvable.
What is the slope of the linear function shown in the graph?
The difference in y-values divided by the difference in x-values. It's called rise over run.
Does the graph x-y2 equals 1 represent x as a function of y?
X - Y^2 = 1 - Y^2 = - X + 1 Y^2 = X - 1 Y = (+/-) sqrt(X - 1) now, X is represented as a function of Y. Function values are generally Y values.
Can the range repeat in a function?
The range in a function is the y values, and yes it can repeat
