Page:Elementary Text-book of Physics (Anthony, 1897).djvu/35

Fig. 10 a clock, or counter-clockwise. Motion from left to right in the diameter is also considered positive. Displacement to the right of the centre is positive, and to the left negative.

If a point start from ${\displaystyle X}$ (Fig. 10), the position of greatest positive elongation, with a simple harmonic motion, its distance ${\displaystyle s}$ from ${\displaystyle O}$ or its displacement at the end of the time ${\displaystyle t}$, during which the point in the circle has moved through the arc ${\displaystyle BX}$, is ${\displaystyle OC=OB\cos {\phi }}$. Now, ${\displaystyle OB}$ is equal to ${\displaystyle OX}$, the amplitude, represented by ${\displaystyle a}$. If ${\displaystyle \omega }$ represent the angular velocity of the moving point, we have ${\displaystyle \phi =\omega t}$. Hence we have

${\displaystyle s=a\cos {\omega t}.}$

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To find the velocity at the point ${\displaystyle C}$, we must resolve the velocity of the point moving in the circle into its components parallel to the axes. The component at the point ${\displaystyle C}$ along ${\displaystyle OX}$ is ${\displaystyle V\sin {\phi }}$; or, since ${\displaystyle V=\omega a}$,

${\displaystyle v=-\omega a\sin {\omega t},}$

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remembering that motion from right to left is considered negative.

The acceleration at the point ${\displaystyle C}$ is the component along ${\displaystyle OX}$ of the acceleration of the point moving in the circle. The acceleration of ${\displaystyle B}$ is ${\displaystyle -{\frac {v^{2}}{a}}}$, the minus sign being given because this acceleration is directed opposite to the positive direction of the radius. The component at ${\displaystyle C}$ along ${\displaystyle OX}$ is

${\displaystyle f=-{\frac {v^{2}}{a}}\cos {\omega t}{\text{ or }}f=-\omega ^{2}a\cos {\omega t}=\omega ^{2}s.}$

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This formula shows that the acceleration in a simple harmonic