Cycloid

Demonstration of the properties of the involute of a cycloid

There are several demonstrations of the assertion. The one presented here uses the physical definition of cycloid and the kinematic property that the instantaneous velocity of a point is tangent to its trajectory. Referring to the adjacent picture, ${\displaystyle P_{1}}$ and ${\displaystyle P_{2}}$ are two tangent points belonging to two rolling circles. The two circles start to roll with same speed and same direction without skidding. ${\displaystyle P_{1}}$ and ${\displaystyle P_{2}}$ start to draw two cycloid arcs as in the picture. Considering the line connecting ${\displaystyle P_{1}}$ and ${\displaystyle P_{2}}$ at an arbitrary instant (red line), it is possible to prove that the line is anytime tangent in ${\displaystyle P_{2}}$ to the lower arc and orthogonal to the tangent in ${\displaystyle P_{1}}$ of the upper arc. One sees that calling ${\displaystyle Q}$ the point in common between the upper circle and the lower circle:

• ${\displaystyle P_{1},Q,P_{2}}$ are aligned because ${\displaystyle {\widehat {P_{1}O_{1}Q}}={\widehat {P_{2}O_{2}Q}}}$ (equal rolling speed) and therefore ${\displaystyle {\widehat {O_{1}QP_{1}}}={\widehat {O_{2}QP_{2}}}}$ . The point ${\displaystyle Q}$ lies on the line ${\displaystyle O_{1}O_{2}}$ therefore ${\displaystyle {\widehat {P_{1}QO_{1}}}+{\widehat {P_{1}QO_{2}}}=\pi }$ ad analogously ${\displaystyle {\widehat {P_{2}QO_{2}}}+{\widehat {P_{2}QO_{1}}}=\pi }$. From the equality of ${\displaystyle {\widehat {O_{1}QP_{1}}}}$ and ${\displaystyle {\widehat {O_{2}QP_{2}}}}$ one has that also ${\displaystyle {\widehat {P_{1}QO_{2}}}={\widehat {P_{2}QO_{1}}}}$. It follows ${\displaystyle {\widehat {P_{1}QO_{1}}}+{\widehat {P_{2}QO_{1}}}=\pi }$ .
• If ${\displaystyle A}$ is the meeting point between the perpendicular from ${\displaystyle P_{1}}$ to the straight of ${\displaystyle O_{1}O_{2}}$ and the tangent to the circle in ${\displaystyle P2}$ , then the triangle ${\displaystyle P_{1}AP_{2}}$ is isosceles because ${\displaystyle {\widehat {QP_{2}A}}={\frac {1}{2}}{\widehat {P_{2}O_{2}Q}}}$ and ${\displaystyle {\widehat {QP_{1}A}}={\frac {1}{2}}{\widehat {QO_{1}R}}=}$(easy to prove seen the construction)${\displaystyle ={\frac {1}{2}}{\widehat {QO_{1}P_{1}}}}$ . For the previous noted equality between ${\displaystyle {\widehat {P_{1}O_{1}Q}}}$ and ${\displaystyle {\widehat {QO_{2}P_{2}}}}$ then ${\displaystyle {\widehat {QP_{1}A}}={\widehat {QP_{2}A}}}$ and ${\displaystyle P_{1}AP_{2}}$ is isosceles.
• Conducting from ${\displaystyle P_{2}}$ the orthogonal straight to ${\displaystyle O_{1}O_{2}}$ , from ${\displaystyle P_{1}}$ the straight line tangent to the upper circle and calling ${\displaystyle B}$ the meeting point is now easy to see that ${\displaystyle P_{1}AP_{2}B}$ is a rhombus, using the theorems concerning the angles between parallel lines
• Now consider the speed ${\displaystyle V_{2}}$ of ${\displaystyle P_{2}}$ . It can be seen as the sum of two components, the rolling speed ${\displaystyle V_{a}}$ and the drifting speed ${\displaystyle V_{d}}$ . Both speeds are equal in modulus because the circles roll without skidding. ${\displaystyle V_{d}}$ is parallel to ${\displaystyle P_{1}A}$ and ${\displaystyle V_{a}}$ is tangent to the lower circle in ${\displaystyle P_{2}}$ therefore is parallel to ${\displaystyle P_{2}A}$ . The rhombus constituted from the components ${\displaystyle V_{d}}$ and ${\displaystyle V_{a}}$ is therefore similar (same angles) to the rhombus ${\displaystyle BP_{1}AP_{2}}$ because they have parallel sides. The total speed of ${\displaystyle P_{2},V_{2}}$ is then parallel to ${\displaystyle P_{2}P_{1}}$ because both are diagonals of two rhombuses with parallel sides and has in common with ${\displaystyle P_{1}P_{2}}$ the contact point ${\displaystyle P_{2}}$ . It follows that the speed vector ${\displaystyle V_{2}}$ lies on the prolongation of ${\displaystyle P_{1}P_{2}}$ . Because ${\displaystyle V_{2}}$ is tangent to the arc of cycloid in ${\displaystyle P_{2}}$ (property of velocity of a trajectory), it follows that also ${\displaystyle P_{1}P_{2}}$ is coinciding with the tangent to the lower cycloid arc in ${\displaystyle P_{2}}$.
• Analogously, it can be easily demonstrated that ${\displaystyle P_{1}P_{2}}$ is orthogonal to ${\displaystyle V_{1}}$ (other diagonal of the rhombus).
• The tip of an inextensible wire initially stretched on half arc of lower cycloid and bounded to the upper circle in ${\displaystyle P_{1}}$ will then follow the point along its path without changing its length because the speed of the tip is at each moment orthogonal to the wire (no stretching or compression). The wire will be at the same time tangent in ${\displaystyle P_{2}}$ to the lower arc because the tension and the demonstrated items. If it would not be tangent then there would be a discontinuity in ${\displaystyle P_{2}}$ and consequently there would be unbalanced tension forces.