Let [math]X[/math] and [math]Y[/math] be continuous random variables with joint density function

Let [math]g[/math] be the marginal density function of [math]Y[/math]. Determine which of the following represents [math]g[/math].

• [[math]]g(y) = \begin{cases} 15y, \, 0 \lt y \lt 1 \\ 0, \, \textrm{Otherwise.} \end{cases}[[/math]]
• [[math]]g(y) = \begin{cases} \frac{15y^2}{2}, \, x^2 \lt y \lt x \\ 0, \, \textrm{Otherwise.} \end{cases}[[/math]]
• [[math]]g(y) = \begin{cases} \frac{15y^2}{2}, \, 0 \lt y \lt 1 \\ 0, \, \textrm{Otherwise.} \end{cases}[[/math]]
• [[math]]g(y) = \begin{cases} 15y^{3/2}(1-y^{1/2}), \, x^2 \lt y \lt x \\ 0, \, \textrm{Otherwise.} \end{cases}[[/math]]
• [[math]]g(y) = \begin{cases} 15y^{3/2}(1-y^{1/2}), \, 0 \lt y \lt 1\\ 0, \, \textrm{Otherwise.} \end{cases}[[/math]]