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When trying to find the tangential velocity, many textbooks define the tangent direction as one of the following:

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or

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Intuitively, why is the tangent vector the derivative of the position with respect to its modulus? Or the velocity with respect to its modulus? Why necessarily in the tangential direction?

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  • $\begingroup$ What is dr and ds representing? $\endgroup$
    – The Space Guy
    Commented Sep 23, 2021 at 8:19
  • $\begingroup$ @TheSpaceGuy dr is the infinitesimal variation of the position vector and ds the infinitesimal variation of the position vector's modulus $\endgroup$
    – XXb8
    Commented Sep 23, 2021 at 8:20
  • $\begingroup$ Well, then dr/ds is representing unit vector along the tangent(direction of the motion). $\endgroup$
    – The Space Guy
    Commented Sep 23, 2021 at 8:24

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Symbol $s$ is not the modulus of $\mathbf r$, it's the distance travelled. You can see that as $\Delta s\to0$, then $|\Delta\mathbf r|\to \Delta s$ as well. Intuitelvely, it's because the arc of a sufficiently smooth curve can be better and better approximated with the line as you move ends together.

Since, $|\Delta\mathbf r|\to \Delta s$, then $|d\mathbf r/ds|=1$, in other words $\mathbf t = d\mathbf r/ds$ is a unit vector tangential to the curve

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  • $\begingroup$ This makes sense. However can't there be motion where |\Delta\mathbf r|\ remains conctant while distance travelled changes? Wouldn't this make |\Delta\mathbf r| \ =0 while the distance continues to change? $\endgroup$
    – XXb8
    Commented Sep 24, 2021 at 7:21
  • $\begingroup$ Also could you further explain how the line segment on the graph relate to your answer? $\endgroup$
    – XXb8
    Commented Sep 24, 2021 at 7:22

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