Chapter 13 - Partial Derivatives - 13.1 Functions Of Two Or More Variables - Exercises Set 13.1 - Page 914: 8

$$g(x(t), y(t))=\frac{\sqrt{t}}{\left(t^{2}+1\right)^{3}}$$

Given: \[ \begin{array}{c} y e^{-3 x}=g(x, y) \\ \ln \left(1+t^{2}\right), y(t)=\sqrt{t}=x(t) \end{array} \] We find: \[ \because y e^{-3 x}=g(x, y) \] \[ \begin{aligned} g(x(t), y(t)) &=y(t) e^{-3 x(t)} \\ g(x(t), y(t)&=\sqrt{t} * e^{-3 \ln \left(t^{2}+1\right)} \\ g(x(t), y(t))&=\frac{\sqrt{t}}{\left(t^{2}+1\right)^{3}} \end{aligned} \]