Find ∂f∂x\frac{\partial f}{\partial x}∂x∂f where f(x,y)=x2y+exyf(x, y) = x^2 y + e^{xy}f(x,y)=x2y+exy.
2xy+yexy2xy + ye^{xy}2xy+yexy
2xy+exy2xy + e^{xy}2xy+exy
x2+exyx^2 + e^{xy}x2+exy
2xy−yexy2xy - ye^{xy}2xy−yexy