csc^-1(x) derivative
The derivative of the inverse cosecant function, denoted as csc^(-1)(x) or arcsin(1/x), can be found using calculus
The derivative of the inverse cosecant function, denoted as csc^(-1)(x) or arcsin(1/x), can be found using calculus.
Let’s start by using the definition of the inverse function:
y = csc^(-1)(x) or arcsin(1/x)
To find the derivative of y with respect to x, we can take the derivative of both sides of the equation. However, since csc^(-1)(x) is not an elementary function, we need to use some trigonometric identities to simplify the expression.
Recall that the cosecant function (csc(x)) is equal to 1/sin(x). Using this relationship, we can rewrite the equation as:
x = 1/sin(y)
Now, we can take the derivative of both sides with respect to x using the chain rule:
1 = (d/dx) [1/sin(y)]
To simplify further, let’s use the quotient rule:
1 = (sin(y)(d/dx)(1) – 1(d/dx)(sin(y)))/(sin^2(y))
Since (d/dx)(1) is 0 (since 1 is a constant), we can simplify the expression to:
1 = – (d/dx)(sin(y))/(sin^2(y))
Now, we just need to find the derivative of sin(y) with respect to x. Applying the chain rule once again gives:
1 = – (d/dx)(sin(y))/(sin^2(y)) = -(cos(y))/(sin^2(y)) * (dy/dx)
To isolate dy/dx, we can rearrange the equation:
dy/dx = -sin^2(y)/cos(y)
However, y is equal to csc^(-1)(x) or arcsin(1/x). Substituting y back into the equation gives the final answer:
dy/dx = -sin^2(csc^(-1)(x))/cos(csc^(-1)(x))
Note that this expression can also be written as:
dy/dx = -1/(|x| * sqrt(x^2 – 1))
So, the derivative of csc^(-1)(x) is -1/(|x| * sqrt(x^2 – 1)).
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