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(0)=# #-4#
After all, to calculate #f(0)#, we substitute #x=0# in the function.
We then get: \[f(0)=\left(-4\right)\cdot 0^3+5\cdot 0^2+9\cdot 0-4=-4\]
Hence, #f(0)=-4#.
After all, to calculate #f(0)#, we substitute #x=0# in the function.
We then get: \[f(0)=\left(-4\right)\cdot 0^3+5\cdot 0^2+9\cdot 0-4=-4\]
Hence, #f(0)=-4#.
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