Question

Question #1506a

Answer 1

`dy/dx = 1/sqrt(1+x^2)`

Explanation:

You can simply use the chain rule:

`d/dx ln(x+sqrt(1+x^2)) = (1/(x+sqrt(1+x^2)) )d/dx(x+sqrt(1+x^2))`

`d/dx ln(x+sqrt(1+x^2)) = (1/(x+sqrt(1+x^2)) ) (1+x/sqrt(1+x^2))`

`d/dx ln(x+sqrt(1+x^2)) = (1/(x+sqrt(1+x^2)) ) (x+sqrt(1+x^2))/sqrt(1+x^2)`

`d/dx ln(x+sqrt(1+x^2)) = 1/sqrt(1+x^2)`

or you can note that:

`f(x) = ln(x+sqrt(1+x^2))`

is the logarithmic form of the inverse hyperbolic sine function so that:

`y= ln(x+sqrt(1+x^2)) <=> sinhy = x`

differentiating the second expression implicitly:

`d/dx (sinhy) = 1`

`coshy dy/dx = 1`

`dy/dx = 1/coshy`

and from the identity:

`cosh^2y-sinh^2y = 1`

we then get:

`coshy = sqrt(1+sinh^2y) = sqrt(1+x^2)`

and:

`dy/dx = 1/sqrt(1+x^2)`

Answer 2

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