Functions: Domain and range
Function rule
We have just seen that a function can have a corresponding formula. From now on we will also give functions a name. This can be convenient if we are dealing with multiple functions. It helps us in easily identifying which function we mean.
#f(-3)=# #106#
After all, to calculate #f(-3)#, we substitute #x=-3# in the function.
We then get: \[f(-3)=\left(-2\right)\cdot \left(-3\right)^3+3\cdot \left(-3\right)^2+ \left(-7\right)\cdot \left(-3\right)+4=106\]
Hence, #f(-3)=106#.
After all, to calculate #f(-3)#, we substitute #x=-3# in the function.
We then get: \[f(-3)=\left(-2\right)\cdot \left(-3\right)^3+3\cdot \left(-3\right)^2+ \left(-7\right)\cdot \left(-3\right)+4=106\]
Hence, #f(-3)=106#.
Unlock full access
Teacher access
Request a demo account. We will help you get started with our digital learning environment.
Student access
Is your university not a partner?
Get access to our courses via Pass Your Math independent of your university. See pricing and more.
Or visit omptest.org if jou are taking an OMPT exam.
Or visit omptest.org if jou are taking an OMPT exam.