deriv of lnx
To find the derivative of ln(x), we can use the logarithmic differentiation technique
To find the derivative of ln(x), we can use the logarithmic differentiation technique.
Let y = ln(x), where y is a function of x. To find dy/dx (the derivative of y with respect to x), we’ll take the natural logarithm of both sides of the equation:
ln(y) = ln(ln(x))
Now, we can differentiate implicitly with respect to x on both sides:
1/y * dy/dx = 1/x * 1/ln(x)
To solve for dy/dx, we can multiply both sides by y:
dy/dx = y * (1/x * 1/ln(x))
Since y = ln(x), we substitute it back into the equation:
dy/dx = ln(x) * (1/x * 1/ln(x))
Next, we can simplify the expression:
dy/dx = 1/x
Hence, the derivative of ln(x) is equal to 1/x.
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