Domain
The set of all possible results: range.
The set of values for which the function is defined.
The range of a function is the set of all of the possible values that it can take on as an output value. You find the range by inspecting the function and seeing first what the domain is, and then what the range would be for that domain. The domain, then, is the set of all of the possible values that it can take on as an input value.
it is called the Domain......
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.
The correct answer for this question is RANGE (APEX) hope this helps someone! :))
Domain describes all possible input values.
The set of values for which the function is defined.
The range of a function is the set of all possible input values.
domain
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.
Actually, the set of all values that a function can take is referred to as the "range" of the function, not the domain. The domain of a function is the set of all possible input values (or independent variables) for which the function is defined. In contrast, the range consists of all output values that result from applying the function to its domain.
They are called the arguments of the function.
The collection of all input values is called the "domain." In mathematics, the domain refers to the set of all possible inputs for a given function, which can include numbers, variables, or other elements, depending on the context. Each input in the domain corresponds to an output in the function's range.
The range of a function is the set of all of the possible values that it can take on as an output value. You find the range by inspecting the function and seeing first what the domain is, and then what the range would be for that domain. The domain, then, is the set of all of the possible values that it can take on as an input value.
The set of all values that a function can take as inputs is called the domain of the function. The domain includes all possible input values for which the function is defined. It may be restricted by factors like the function's mathematical properties or any constraints placed on the variable.
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 ).
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.