S cos xdx

To integrate the function ∫S cos(x) dx, you need to provide more information about what "S" represents. The integral depends on the limits of integration and whether "S" is a constant or a variable.

If "S" is a constant and you have specified the limits of integration, the integral can be calculated as follows:

∫S cos(x) dx = S∫cos(x) dx

The integral of cos(x) with respect to x is equal to sin(x) + C, where C is the constant of integration:

∫cos(x) dx = sin(x) + C

So, if you have specific limits of integration, say from a to b, the definite integral would be:

∫[a to b] S cos(x) dx = S[sin(b) - sin(a)]

If "S" is a variable, and you want to find the antiderivative of S cos(x) with respect to x, you can treat "S" as a constant and integrate as shown above, which would give you an expression in terms of both "S" and x:

∫S cos(x) dx = S∫cos(x) dx = S(sin(x) + C)

If you meant something different by "S," please provide additional information so I can give you a more specific answer.

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