∫ cosu du
To solve the integral ∫cos(u) du, we can use the integration rules and the trigonometric identity
To solve the integral ∫cos(u) du, we can use the integration rules and the trigonometric identity.
The integral of the cosine function is known to be the sine function, so we have ∫cos(u) du = sin(u) + C, where C is the constant of integration.
Therefore, the antiderivative of cos(u) with respect to u is sin(u), and the final result of the integral is sin(u) + C.
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