Question

How do you use the limit definition of the derivative to find the derivative of `f(x)=-3x^2+x+5`?

Answer 1

`f'(x)=-6x+1`

Explanation:

By definition of the derivative `f'(x)=lim_(h rarr 0) ( f(x+h)-f(x) ) / h`
So with `f(x) = -3x^2+x+5` we have;

`f'(x)=lim_(h rarr 0) ( {-3(x+h)^2+(x+h)+5 } - {-3x^2+x+5 } ) / h`
`:. f'(x)=lim_(h rarr 0) ( {-3(x^2+2hx+h^2)+x+h+5 } - {-3x^2+x+5 } ) / h`
`:. f'(x)=lim_(h rarr 0) ( -3x^2-6hx-3h^2+x+h+5 +3x^2-x-5 ) / h`
`:. f'(x)=lim_(h rarr 0) ( -6hx-2h^2+h ) / h`
`:. f'(x)=lim_(h rarr 0) ( -6x-2h+1 )`
`:. f'(x)=-6x+1`