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@ -26,4 +26,76 @@ $`\def\PSclosed{\mathscr{S}_{\displaystyle\tiny\bigcirc}}`$ |
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<!--MétaDonnée : INS-1°année_--> |
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<!--MétaDonnée : INS-1°année_--> |
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Main Part to be done |
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! *Suggested method:* |
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! |
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! Each in his own language adapts with his own words, his own sentences, the content of the little ones |
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! numbered elements |
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! of jointly developed courses. So it's not a word-for-word translation, but |
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! the course elements being small, there is a very high corespondance on the content. |
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! We can really display the courses in parallel in 2 or in all 3 languages, |
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! it really makes sense to the student. |
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! If we use different mathematical notations in the 3 languages, each language |
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! keep its rating. The course display in "exchange" mode allows the student to compare |
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! vocabulary, and mathematical notations. |
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### Cylindrical coordinates |
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#### Definition of coordinates and definition domains |
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! For example, this course element denoted * CS300 *: |
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* * CS300 *: |
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Reference frame: Cartesian coordinate system $ `(O, x, y, z)` $ |
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\ - **1 point $`O`$ origin** of the space. <br> |
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\ - **3 axes** named **$`Ox,Oy,Oz`$**, intersecting at $`O`$, **orthogonal 2 to 2**. <br> |
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\ - **1 unit of length**. <br> |
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! can give : |
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The cylindrical coordinates are defined from a Cartesian coordinate system, i.e. |
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\- 1 point $`O` origin of space. <br> |
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\- 3 axes named $`Ox, Oy, Oz`$, intersecting at $`O`$, orthogonal 2 to 2. <br> |
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\- 1 unit of length. <br> |
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! The following element * CS310 *: |
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* * CS310 *: |
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Cylindrical coordinates $`(\rho,\varphi,z)`$: |
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\- Any point $`M`$ of space is orthogonally projected onto the plane $`xOy`$ leading |
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to the point $`m_{xy}`$, and on the $`Oz`$ axis leading to the point $`m_z`$. |
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\- The **coordinate $`\ rho_M`$** of the point $`M`$ is the *nonalgebraic distance $`Om_{xy}`$* |
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between the point $`O`$ and the point $`m_ {xy}`$.<br> |
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\- The **coordinate $`\varphi_M`$** of the point $`M`$ is the *nonalgebraic angle |
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$`\widehat{xOm_ {xy}}`$* between the axis $`Ox`$ and the half-line $`Om_{xy}`$, |
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the direction of rotation being such that the trihedron *$`(Ox,Om_ {xy},Oz)`$* is |
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a *direct trihedron*.<br> |
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\- The **coordinate $`z_M`$** of the point $`M`$ is the *algebraic distance $`\overline {Om_z}`$* |
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between the point $`O`$ and the point $`m_z`$. |
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**$`\rho_M=\overline{Om_ {xy}}`$, $`\varphi_M = \widehat{xOm_y}`, $`z_M =Om_z`$** |
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! can give : |
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The cylindrical coordinates are ordered and noted $`(\rho,\varphi,z)`$. |
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For any point $`M`$ in space: |
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\- The $`\ rho_M`$ coordinate of the point $`M`$ is the nonalgebraic distance $`Om_{xy}`$ |
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between point $`O`$ and point $ m_{xy}`$. <br> |
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\- The coordinate $`\varphi_M`$ of the point $`M`$ is the nonalgebraic angle |
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$`\widehat{xOm_{xy}}`$ between the axis $`Ox`$ and the half-line $`Om_ {xy}`$, |
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the direction of rotation being such that the trihedron $`(Ox,Om_{xy},Oz)`$ is a direct trihedron. <br> |
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\- The $`z_M`$ coordinate of the point $`M` $ is the algebraic distance $`\overline{Om_z}`$ |
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between the point $`O`$ and the point $`m_z`$. |
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A same point $`M`$ located in $`z_M`$ on the axis $`Oz`$ can be represented by any triplet |
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$`(z_M, 0, \varphi)`$ where $`\varphi`$ can take all possible values. By convention, |
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the value $`\varphi`$ is set to 0, and the cylindrical coordinates of any point $`M`$ located |
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in $`z_M`$ on the $`Oz`$ axis will be $`(z_M, 0, 0)`$. |
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! and we continue on the sequence of course elements decided jointly: |
