Question: Assuming the integrability of the function ( f ) , the order of integrations in [ I = int _ { - pi

Assuming the integrability of the function ( f ), the order of integrations in [ I =\int_{-\pi/2}^{\pi/2} dx \int_{-1}^{\sin x} dy \ f(x, y)] will be reversed. What is the resulting iterated integral?. Option A :( \int_{-1}^{1} dy \int_{\arcsin y}^{\pi/2} dx \ f(x, y)). Option B : (\int_{-1}^{1} dy \int_{-\pi/2}^{\arcsin y} dx \ f(x, y)).Option C :( \int_{0}^{1} dy \int_{\arcsin y}^{\pi/2} dx \ f(x, y)).Option D : (\int_{-1}^{1} dy \int_{-\arcsin y}^{\pi/2} dx \ f(x, y))

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