Joint distribution of functions of variables

Joint variables but only for continuous’s Distribution of a function of a random variable
Let $X_{1}$ and $X_{2}$ be jointly continuous random variables with Joint Distribution $f_{X_{1}, X_{2}}$ .
Suppose: $Y_{1} = g_{1} (X_{1}, X_{2}), Y_{2} = g_{2} (X_{1}, X_{2})$ for some functions $g_{1}$ and $g_{2}$ satisfying:
1. The equations $y_{1} = g_{1} (x_{1}, x_{2})$ and $y_{2} = g_{2} (x_{1}, x_{2})$ can be uniquely solved for $x_{1}$ and $x_{2}$ in terms of $y_{1}$ and $y_{2}$
2. $g_{1}$ and $g_{2}$ have continuous partial derivatives at all $(x_{1}, x_{2})$ and are such that the Jacobian determinant $J (x_{1}, x_{2}) \neq = 0$
  - Take the absolute of jacobian
Then $Y_{1}$ and $Y_{2}$ are jointly continous with JPDF, $f_{Y_{1} Y_{2}} (y_{1}, y_{2}) = f_{X_{1}, X_{2}} (x_{1}, x_{2}) ∣ J (x_{1}, x_{2}) ∣^{- 1}$
- Replace $x_{1}, x_{2}$ with $y_{1}, y_{2}$
For $n > 2$ :
- $Y_{1} = g_{1} (X_{1}, ..., X_{n}), ..., Y_{n} = g_{n} (X_{1}, ..., X_{n})$
- Conditions:
  - $g_{i}$ all have continuous partial derivative and have unique solutions for $x_{i}$
  - Jacobian determinant, $J (x_{1}, .., x_{n}) \neq = 0$
  - Then $f_{Y_{1}, ..., Y_{n}} = f_{X_{1}, ..., X_{2}} (x_{1}, ..., x_{n}) ∣ J (x_{1}, ..., x_{n}) ∣^{- 1}$

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