Differentiate #sqrtx+1/sqrtx# without using first principles?

Question

703 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2018-06-27T11:27:13

#(dy)/(dx)=(x-1)/(2xsqrtx)=(x-1)/(2x^(3/2)#

Here,

#(1)y=sqrtx+1/sqrtx=x^(1/2)+x^(-1/2)#

#=>(dy)/(dx)=1/2x^(1/2-1)-1/2x^(-1/2- 1)=1/2x^(-1/2)-1/2x^(-3/2)#

#=>(dy)/(dx)=1/(2x^(1/2))-1/(2x^(3/2))=(x-1)/(2x^(3/2)#

OR

#(2)y=sqrtx+1/sqrtx#

#=>y=(x+1)/sqrtx#

#(dy)/(dx)=(sqrtx*d/(dx)(x+1)-(x+1)d/(dx)(sqrtx))/(sqrtx)^2#

#=>(dy)/(dx)=(sqrtx*1-(x+1)*1/(2sqrtx))/x#

#=>(dy)/(dx)=(2x-(x+1))/(2sqrtx*x)=(x-1)/(2xsqrtx#

#=>(dy)/(dx)=(x-1)/(2x^(3/2))#