Tangential angle

In geometry, the tangential angle of a curve in the Cartesian plane, at a specific point, is the angle between the tangent line to the curve at the given point and the Template:Mvar-axis.^[1] (Some authors define the angle as the deviation from the direction of the curve at some fixed starting point. This is equivalent to the definition given here by the addition of a constant to the angle or by rotating the curve.^[2])

If a curve is given parametrically by Template:Math, then the tangential angle Template:Mvar at Template:Mvar is defined (up to a multiple of Template:Math) by^[3]

${\displaystyle \frac{(x^{\prime }(t),y^{\prime }(t))}{|x^{\prime }(t),y^{\prime }(t)|}=(\cos \phi ,\sin \phi ).}$

Here, the prime symbol denotes the derivative with respect to Template:Mvar. Thus, the tangential angle specifies the direction of the velocity vector Template:Math, while the speed specifies its magnitude. The vector

${\displaystyle \frac{(x^{\prime }(t),y^{\prime }(t))}{|x^{\prime }(t),y^{\prime }(t)|}}$

is called the unit tangent vector, so an equivalent definition is that the tangential angle at Template:Mvar is the angle Template:Mvar such that Template:Math is the unit tangent vector at Template:Mvar.

If the curve is parametrized by arc length Template:Mvar, so Template:Math, then the definition simplifies to

${\displaystyle (x^{\prime }(s),y^{\prime }(s))=(\cos \phi ,\sin \phi ).}$

In this case, the curvature Template:Mvar is given by Template:Math, where Template:Mvar is taken to be positive if the curve bends to the left and negative if the curve bends to the right.^[1] Conversely, the tangent angle at a given point equals the definite integral of curvature up to that point:^[4][1]

${\displaystyle \phi (s)={\displaystyle \underset{0}{\overset{s}{\int }}}\kappa (s)ds+{\phi }_0}$

${\displaystyle \phi (t)={\displaystyle \underset{0}{\overset{t}{\int }}}\kappa (t)s^{\prime }(t)dt+{\phi }_0}$

If the curve is given by the graph of a function Template:Math, then we may take Template:Math as the parametrization, and we may assume Template:Mvar is between Template:Math and Template:Math. This produces the explicit expression

${\displaystyle \phi =\arctan f^{\prime }(x).}$

In polar coordinates, the polar tangential angle is defined as the angle between the tangent line to the curve at the given point and ray from the origin to the point.^[6] If Template:Mvar denotes the polar tangential angle, then Template:Math, where Template:Mvar is as above and Template:Mvar is, as usual, the polar angle.

If the curve is defined in polar coordinates by Template:Math, then the polar tangential angle Template:Mvar at Template:Mvar is defined (up to a multiple of Template:Math) by

${\displaystyle \frac{(f^{\prime }(\theta ),f(\theta ))}{|f^{\prime }(\theta ),f(\theta )|}=(\cos \psi ,\sin \psi )}$.

If the curve is parametrized by arc length Template:Mvar as Template:Math, Template:Math, so Template:Math, then the definition becomes

${\displaystyle (r^{\prime }(s),r{\theta }^{\prime }(s))=(\cos \psi ,\sin \psi )}$.

The logarithmic spiral can be defined a curve whose polar tangential angle is constant.^[5][6]

• Differential geometry of curves
• Whewell equation
• Subtangent

Template:Reflist

• Template:Cite web
• Template:Cite book