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202104181519 Homework 1 (Q4)

i. Find the infinitesimal small vector \mathbf{dr} in the cylindrical coordinate induced by an infinitesimal small changes of \mathrm{d}\rho, \mathrm{d}\theta, and \mathrm{d}z in terms of \rho, \theta, z, \mathrm{d}\rho, \mathrm{d}\theta, \mathrm{d}z and the corresponding unit vector.

ii. f(u_1, u_2, u_3) is defined in \mathbf{r}=(u_1, u_2, u_3) coordinate. Its gradient is defined

\displaystyle{\lim_{\Delta l_i\to 0}\sum_{i=1}^{3}\frac{\Delta f_i}{\Delta l_i}\hat{\mathbf{u}}_l}

where \Delta l_i and \Delta f_i are respectively the changes in length and functional value induced purely by the infinitesimal change in u_i. \hat{\mathbf{u}}_l is the unit vector of \mathbf{u}_i. Thus find the gradient of f in cylindrical coordinate.

Solution.

(The solution below is based on the manuscript of 2015-2016 PHYS2155 Methods of Physics II Homework Solutions.)

i.

\mathbf{dr}=\mathrm{d}\rho\,\hat{\boldsymbol{\rho}}+\rho\,\mathrm{d}\theta\,\hat{\boldsymbol{\theta}}+\mathrm{d}z\,\hat{\mathbf{z}}

Compare to the figure below.

ii.

\begin{aligned} \nabla f & = \lim_{\Delta l_i\to 0}\sum_{i=1}^{3}\frac{\Delta f_i}{\Delta l_i}\hat{\mathbf{u}_i} \\ & = \lim_{\Delta\rho\to 0} \frac{\Delta f_\rho}{\Delta \rho}\,\hat{\boldsymbol{\rho}} + \lim_{\Delta\theta\to 0} \frac{\Delta f_\theta}{\rho\Delta\theta}\,\hat{\boldsymbol{\theta}} + \lim_{\Delta z\to 0}\frac{\Delta f_z}{\Delta z}\,\hat{\mathbf{z}} \\ & = \frac{\partial f}{\partial \rho}\,\hat{\boldsymbol{\rho}} + \frac{1}{\rho}\frac{\partial f}{\partial \theta}\,\hat{\boldsymbol{\theta}} + \frac{\partial f}{\partial z}\,\hat{\mathbf{z}} \end{aligned}

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