How do you use the limit definition to find the derivative of #f(x)=x/(x+2)#?

1 Answer
Alan P.
Jan 13, 2018

#f'(x)=2/((x+2)^2)#

Explanation:

Given #f(x)=x/(x+2)#

By the limit definition of the derivative
#f'(x)=lim_(hrarr0) (f(x+h)-f(x))/h#

#color(white)("XXX")=lim_(hrarr0) ((x+h)/(x+h+2)-x/(x+2))/h#

#color(white)("XXX")=lim_(hrarr0) (((x+h) * (x+2) -x * (x+h+2))/((x+h+2) * (x+2)))/h#

#color(white)("XXX")=lim_(hrarr0)(((x^2+2h+xh+2x)-(x^2+xh+2x))/(x^2+xh+2x+2h+4))/h#

#color(white)("XXX")=lim_(hrarr0) ((2h)/(x^2+2h+xh+4x+4))/h#

#color(white)("XXX")=lim_(hrarr0)2/(x^2+2h+xh+4x+4)#

#color(white)("XXX")=2/(x^2+4x+4)color(white)("xx")orcolor(white)("xx")2/((x+2)^2)#

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