The derivative of sin(x) can be found using the chain rule of differentiation as follows:
Let y = sin(x)
Using the chain rule, we can write:
dy/dx = cos(x) * d/dx(x)
The derivative of x with respect to x is equal to 1, therefore:
dy/dx = cos(x) * 1
Therefore, the derivative of sin(x) is:
cos(x)
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