Find the second-order partial derivative fxyyf_{xyy}fxyy for f(x,y)=x2ln(y)+y2sin(x)f(x, y) = x^2 \ln(y) + y^2 \sin(x)f(x,y)=x2ln(y)+y2sin(x).
−2xy2-\frac{2x}{y^2}−y22x
2xy\frac{2x}{y}y2x
−2xy-\frac{2x}{y}−y2x
2xy2\frac{2x}{y^2}y22x