Többváltozós függvények - elsőrendű parciális derivált

\[f\left( {x;y} \right) = {x^3} + x \cdot y + {y^3}\]

\[f\left( {x,y} \right) = {x^y}\]

\[f\left( {x;y} \right) = {2^{ - \frac{y}{x}}}\]

\[f\left( {x;y} \right) = x \cdot y \cdot \ln \left( {x + y} \right)\]

\[f\left( {x;y;z} \right) = \ln \left( {x \cdot y \cdot z} \right)\]

\[f\left( {x;y;z} \right) = \ln \left( {\frac{x}{y}} \right)\]

\[f\left( {x;y} \right) = x\sqrt y + \frac{y}{{\sqrt[3]{x}}}\]

\[f\left( {x;y} \right) = xy{e^{\sin \left( {xy} \right)}} + 5\]

\[f\left( {x;y} \right) = \sqrt {\sin x} \cdot \sin \sqrt y + \left( {\sin \ln x} \right) \cdot \ln \sin \frac{y}{x}\]

\[f\left( {x;y} \right) = {\left( {\sqrt {{x^2} + {y^2}} } \right)^x}\]

\[f\left( {x;y;z} \right) = {e^{x\left( {{x^2} + {y^2} + {z^2}} \right)}} + \pi \]

\[f\left( {x;y} \right) = \ln \frac{{{e^{{x^2}}}}}{{\sqrt {{{\sin }^3}y} }}\quad \quad {P_0}\left( {1;\frac{\pi }{2}} \right)\]

\[f\left( {x;y} \right) = tg\left( {{x^2} - 2y} \right)\quad \quad {P_0}\left( {2;2} \right)\]