Question: Find the nth Maclaurin polynomial for the function.f(x)= ex,n =4Step 1If f has n derivatives at 0, thenPn(x)= f(0)+ f(0)x +f(0)x22!+f(0)x33!+...fn(0)xnn!is called the nth Maclaurin

Find the nth Maclaurin polynomial for the function.f(x)= ex,n =4Step 1If f has n derivatives at 0, thenPn(x)= f(0)+ f(0)x +f(0)x22!+f(0)x33!+...fn(0)xnn!is called the nth Maclaurin polynomial for f.Find the following derivatives, which we need to find the polynomial.f(x)=exf(x)=f(x)=f(x)=f(4)(x)=

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