Using the limit definition, how do you find the derivative of #f(x)=3(x^(-2)) #?
1 Answer
Explanation:
According to the limit definition, the derivative of
#f'(x) = lim_(h -> 0) (f(x+h) - f(x)) / h#
In your case, this means
#f'(x) = lim_(h -> 0) (3(x+h)^(-2) - 3x^(-2)) /h#
# = lim_(h -> 0) (3/(x+h)^2 - 3/x^2) /h#
# = lim_(h -> 0) ((3x^2 - 3(x+h)^2)/((x+h)^2 *x^2)) /h#
# = lim_(h -> 0) (3x^2 - 3(x+h)^2)/(h(x+h)^2 *x^2) #
... use
# = lim_(h -> 0) (3x^2 - 3(x^2 + 2xh + h^2))/(h(x+h)^2 *x^2) #
# = lim_(h -> 0) (cancel(3x^2) - cancel(3x^2) - 6xh - 3h^2)/(h(x+h)^2 *x^2) #
# = lim_(h -> 0) (h( - 6x - 3h))/(h(x+h)^2 *x^2) #
... cancel
# = lim_(h -> 0) ( - 6x - 3h)/((x+h)^2 *x^2) #
... at this point you can apply the
# = ( - 6x - 0)/((x+0)^2 *x^2) #
# = ( - 6x )/(x^4) #
# = ( - 6 )/(x^3) #
# = -6x^(-3) #
Thus, your derivative is
#f'(x) = -6x^(-3)#