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zli034
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If there are X and Y two random variables. The pdf of Y is f(y), and conditional pdf of X is f(x|y). I want to find the marginal CDF of X, the F(x). Is this correct?
[itex]F(x)=\int^{F(x|y)}_{-\infty}f(y)dy[/itex]
[itex] \dfrac{d}{dx}\int^{F(x|y)}_{-\infty}f(y)dy=\int^{\infty}_{-\infty}f(x|y)f(y)dy=f(x)[/itex]?
[itex]F(x)=\int^{F(x|y)}_{-\infty}f(y)dy[/itex]
[itex] \dfrac{d}{dx}\int^{F(x|y)}_{-\infty}f(y)dy=\int^{\infty}_{-\infty}f(x|y)f(y)dy=f(x)[/itex]?
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