Fill in the blanks. Refer to my given. To determine the domain and range in rational functions , ________the denominator to________ and solve for the variable x . The objective is that it must have ________denominator . The value that would make it zero is the value that would not be in included in the domain . To find the range , solve the equation for x in terms of_________. Again , it must have non - zero denominator . The value that would make the__________ equal to zero is the value that would not be included in the range.
Fill in the blanks. Refer to my given.
To determine the domain and range in rational functions , ________the denominator to________ and solve for the variable x . The objective is that it must have ________denominator . The value that would make it zero is the value that would not be in included in the domain . To find the range , solve the equation for x in terms of_________. Again , it must have non - zero denominator . The value that would make the__________ equal to zero is the value that would not be included in the range.
Given this:
This is about the domain and range of a rational function It laid down the basic concepts of domain and range and showed how to determine them in a rational function . From this , you learned that a function is a simple rule of correspondence between two variables x and y. The x variable is considered the input which is also called the independent variable while the y variable is the output which is also called the dependent variable. It is a basic notion that for every value of x there corresponds a value in y. This set of values in x is the domain while the set of values in y is the range of a rational function.
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