Determinantshard
0:00.0

Consider the system of linear equations in uu and vv: {ucosx+vsinx=1usinx+vcosx=x\begin{cases} u \cos x + v \sin x = 1 \\ -u \sin x + v \cos x = x \end{cases} Using Cramer's rule, we can solve for uu as a function of xx. Find the value of the derivative u(x)u'(x) evaluated at x=πx = \pi.