exercise:85b57b4ef5: Difference between revisions
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(Created page with "<div class="d-none"><math> \newcommand{\ex}[1]{\item } \newcommand{\sx}{\item} \newcommand{\x}{\sx} \newcommand{\sxlab}[1]{} \newcommand{\xlab}{\sxlab} \newcommand{\prov}[1] {\quad #1} \newcommand{\provx}[1] {\quad \mbox{#1}} \newcommand{\intext}[1]{\quad \mbox{#1} \quad} \newcommand{\R}{\mathrm{\bf R}} \newcommand{\Q}{\mathrm{\bf Q}} \newcommand{\Z}{\mathrm{\bf Z}} \newcommand{\C}{\mathrm{\bf C}} \newcommand{\dt}{\textbf} \newcommand{\goesto}{\rightarrow}...") |
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Consider the Archimedean spiral defined by | Consider the Archimedean spiral defined by | ||
the equation <math>r=a\theta</math> | the equation <math>r=a\theta</math>. | ||
Describe the space of tangent vectors to this | Describe the space of tangent vectors to this | ||
curve at <math>\theta = 0</math>, and also at <math>\theta = \frac\pi2</math>. | curve at <math>\theta = 0</math>, and also at <math>\theta = \frac\pi2</math>. | ||
Latest revision as of 00:08, 26 November 2024
[math]
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[/math]
Consider the Archimedean spiral defined by the equation [math]r=a\theta[/math]. Describe the space of tangent vectors to this curve at [math]\theta = 0[/math], and also at [math]\theta = \frac\pi2[/math].