Transformations and joint pdf's

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Homework Statement



Let X1 and X2 be random variables having a joint pdf, fX1X2(x1,x2). Suppose that Y1=X1X2, and Y2=X1X2 Use the transformation result to derive an expression for the joint pdf of Y1 and Y2
in terms of that for X1 and X2

Homework Equations



The single random variable case

fy(y)=f[g-1(y)] |dg-1(y)/dy|
where g is our transformation


The Attempt at a Solution


So many subscripts,

Anyway I know the single variable case, so how do I generalise this to multiple random variables? Do much the same thing? Let g(Y1,Y2)= (X1 X2,X1/X2) , then what take ∇ .g-1? I'm not really sure how you generalise the derivative part,

Thanks,
 
on Phys.org
I think I see what you mean
so fy(y)= f( g-1(y1,y2)) . Jacobian[ g-1(y1,y2)]