Involute

Involute of a parametrically defined curve

Equations of an involute curve for a parametrically defined function (x(t), y(t)) are

X ( t ) = x ( t ) − x ′ ( t ) x ′ ( t ) 2 + y ′ ( t ) 2 ∫ a t x ′ ( w ) 2 + y ′ ( w ) 2 d w Y ( t ) = y ( t ) − y ′ ( t ) x ′ ( t ) 2 + y ′ ( t ) 2 ∫ a t x ′ ( w ) 2 + y ′ ( w ) 2 d w

Involute of a circle

The involute of a circle resembles, but is not, an Archimedean spiral.

Its successive turns are parallel curves with constant separation distance, a property which is often (inaccurately) ascribed to the Archimedean spiral.

In Cartesian coordinates the involute of a circle has the parametric equation

where r is the radius of the circle, and θ is the angle in radians (θ ∈ ℝ). The counterclockwise spiral is made with positive values of θ, and the clockwise spiral is made with the negative values of θ.

In polar coordinates r, φ the involute of a circle has the parametric equation

where a is the radius of the circle and α is an angle parameter in radians (α ∈ ℝ) equal to t − φ (so tan α = t). With this parameter t (with t = tan α; t ∈ ℝ) it can be written in the form r = a 1 +   t 2 φ = t − arctan ⁡ ( t ) . From the Cartesian coordinates and the first polar coordinates, can be seen that so

Curve length

The arc length of the above curve for 0 ≤ t ≤ t₁ is

L = a 2 t 1 2

Application

Leonhard Euler proposed to use the involute of the circle for the shape of the teeth of toothwheel gear, a design which is the prevailing one in current use, called involute gear.

Involute of a catenary

The involute of a catenary through its vertex is a tractrix. In Cartesian coordinates the curve follows

x = t − tanh ⁡ ( t ) y = sech ⁡ ( t ) = 1 cosh ⁡ ( t )

where t is a parameter and sech is the hyperbolic secant (1/cosh(t)).

Derivative

With

r ( s ) = ( sinh − 1 ⁡ ( s ) , cosh ⁡ ( sinh − 1 ⁡ ( s ) ) )

we have

r ′ ( s ) = ( 1 , s ) 1 + s 2

and

r ( t ) − t r ′ ( t ) = ( sinh − 1 ⁡ ( t ) − t 1 + t 2 , 1 1 + t 2 ) .

Substitute

t = 1 − y 2 y

to get

( sech − 1 ⁡ ( y ) − 1 − y 2 , y ) .

Involute of a cycloid

One involute of a cycloid is a congruent cycloid. In cartesian coordinates the curve follows

x = r ( t − sin ⁡ ( t ) ) y = r ( 1 − cos ⁡ ( t ) )

where t is the angle and r is the radius.

Application

The involute has some properties that makes it extremely important to the gear industry: If two intermeshed gears have teeth with the profile-shape of involutes (rather than, for example, a traditional triangular shape), they form an involute gear system. Their relative rates of rotation are constant while the teeth are engaged, and also, the gears always make contact along a single steady line of force. With teeth of other shapes, the relative speeds and forces rise and fall as successive teeth engage, resulting in vibration, noise, and excessive wear. For this reason, nearly all modern gear teeth bear the involute shape.

The involute of a circle is also an important shape in gas compressing, as a scroll compressor can be built based on this shape. Scroll compressors make less sound than conventional compressors, and have proven to be quite efficient.