How do you find the derivative of ##y=arcsin(2x+1)##?
How do you find the derivative of ##y=arcsin(2x+1)##?
In these cases you need chain rule .
dy/(dx)## =##d/(dz## x##dz/dx##===>
It’s better to take ##d/(dz## & ## dz/dx## separately .
d/(dz##= ##d/(d(2x+1)##.##arcsin (2x+1)##.
d/(dz##=##1/sqrt(1-(2x+1)^2##= ##1/(2sqrt(-x^2-x)## ——(1)
dz/dx##= ##d/dx## .## (2x+1)## =##d/dx 2x## = ##2## ——(2)
Then multiply (1) &(2),
So finally you get ##dy/(dx)##= ##1/(2sqrt(-x^2-x)####2##
dy/(dx)##=##1/(sqrt(-x^2-x)## ; where ##y## = ##arcsin(2x+1)
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