When referring to functions, the DOMAIN is made up of ____
When referring to functions, the RANGE is made up of ____
Linear functions have a ________ rate of change. Non-linear functions have a rate of change that changes.
If a function is _______, then it is going down from left to right.
outputs/y-values increasing decreasing constant lines inputs/x-values
increasing decreasing constant lines.
Linear functions have a constant rate of change.
Nonlinear functions have a rate of change that changes.
If a function is decreasing, then it is going down from left to right.
When referring to functions, the DOMAIN is made up of the inputs or x-values. This means that the domain consists of all the possible values that can be used as input to the function.
When referring to functions, the RANGE is made up of the outputs or y-values. This means that the range consists of all the possible values that can be produced as output from the function.
Linear functions have a constant rate of change. This means that for any given interval, the change in the output (y-value) for a given change in the input (x-value) will always be the same.
Non-linear functions have a rate of change that changes. This means that the change in the output (y-value) for a given change in the input (x-value) varies depending on where you are on the graph of the function.
If a function is decreasing, then it is going down from left to right. This means that as the input (x-value) increases, the output (y-value) decreases.
When referring to functions, the DOMAIN is made up of the inputs or x-values of the function. It represents the set of all possible values that can be plugged into the function.
On the other hand, the RANGE is made up of the outputs or y-values of the function. It represents the set of all possible values that can be obtained as a result of evaluating the function for each input in the domain.
Linear functions have a constant or consistent rate of change. This means that for every unit increase in the input (x-value), the output (y-value) increases or decreases by the same amount. This rate of change is often represented by the slope of the linear function's graph.
Non-linear functions, however, have a rate of change that changes. This means that the amount by which the output (y-value) changes for each unit increase in the input (x-value) is not constant throughout the entire domain. The rate of change of a non-linear function can vary depending on the specific values of the inputs.
If a function is decreasing, then it is going down from left to right. This indicates that as the input values increase, the output values decrease. It is important to note that this behavior is observed when considering the graph or a table of values representing the function.