Difference between revisions of "Calculus:Derivative of Polynomial Functions"

Derivative of Polynomial Functions

=Newton Derivative of Polynomial Functions=

1. The sum rule ${\displaystyle (f+g)'=f'+g'}$
2. The Difference Rule ${\displaystyle (f-g)'=f'-g'}$
3. The Product Rule ${\displaystyle (f*g)'=f*g'+g*f'}$
4. The Quotient Rule ${\displaystyle ({f \over g})'={(gf'-fg') \over g^{2}}}$

=Leibniz Derivative of Polynomial Functions=

1. The sum rule ${\displaystyle {d(f+g) \over dx}={df \over dx}+{dg \over dx}}$
2. The Difference Rule ${\displaystyle {d(f-g) \over dx}={df \over dx}-{dg \over dx}}$
3. The Product Rule ${\displaystyle {d(fg) \over dx}'=f{dg \over dx}+g{df \over dx}}$
4. The Quotient Rule ${\displaystyle {d({f \over g}) \over dx}={g{df \over dx}-f{dg \over dx} \over g^{2}}}$

Examples

Example 1

Ex1:${\displaystyle f'(x^{4}+2x^{2}+4x+2)}$

Using the sum rule we can divided in to different part ${\displaystyle f((x^{4})+2(x^{2})+4(x)+(2))}$

so we will started to work on different part by using power rule.

${\displaystyle f'((x^{4})+2(x^{2})+4(x)+(2))}$

${\displaystyle (4x^{3})+2(2x)+4}$

${\displaystyle 4x^{3}+4x+4}$

Example 2

Ex2:${\displaystyle f'x^{4}*x^{3}}$

Using the Product Rule we can divided in to different part ${\displaystyle f'x^{4}*(x^{3})'+(x^{4})'*x^{3}}$

Example 4