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Haversine formula

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(Redirected from Haversine distance) Formula for the great-circle distance between two points on a sphere

The haversine formula determines the great-circle distance between two points on a sphere given their longitudes and latitudes. Important in navigation, it is a special case of a more general formula in spherical trigonometry, the law of haversines, that relates the sides and angles of spherical triangles.

The first table of haversines in English was published by James Andrew in 1805, but Florian Cajori credits an earlier use by José de Mendoza y Ríos in 1801. The term haversine was coined in 1835 by James Inman.

These names follow from the fact that they are customarily written in terms of the haversine function, given by hav θ = sin(⁠θ/2⁠). The formulas could equally be written in terms of any multiple of the haversine, such as the older versine function (twice the haversine). Prior to the advent of computers, the elimination of division and multiplication by factors of two proved convenient enough that tables of haversine values and logarithms were included in 19th- and early 20th-century navigation and trigonometric texts. These days, the haversine form is also convenient in that it has no coefficient in front of the sin function.

A diagram illustrating great-circle distance (drawn in red) between two points on a sphere, P and Q. Two antipodal points, u and v are also shown.

Formulation

Let the central angle θ between any two points on a sphere be:

θ = d r {\displaystyle \theta ={\frac {d}{r}}}

where

The haversine formula allows the haversine of θ to be computed directly from the latitude (represented by φ) and longitude (represented by λ) of the two points:

hav θ = hav ( Δ φ ) + cos ( φ 1 ) cos ( φ 2 ) hav ( Δ λ ) {\displaystyle \operatorname {hav} \theta =\operatorname {hav} \left(\Delta \varphi \right)+\cos \left(\varphi _{1}\right)\cos \left(\varphi _{2}\right)\operatorname {hav} \left(\Delta \lambda \right)}

where

  • φ1, φ2 are the latitude of point 1 and latitude of point 2,
  • λ1, λ2 are the longitude of point 1 and longitude of point 2,
  • Δ φ = φ 2 φ 1 {\displaystyle \Delta \varphi =\varphi _{2}-\varphi _{1}} , Δ λ = λ 2 λ 1 {\displaystyle \Delta \lambda =\lambda _{2}-\lambda _{1}} .

Finally, the haversine function hav(θ), applied above to both the central angle θ and the differences in latitude and longitude, is

hav θ = sin 2 ( θ 2 ) = 1 cos ( θ ) 2 {\displaystyle \operatorname {hav} \theta =\sin ^{2}\left({\frac {\theta }{2}}\right)={\frac {1-\cos(\theta )}{2}}}

The haversine function computes half a versine of the angle θ, or the squares of half chord of the angle on a unit circle (sphere).

To solve for the distance d, apply the archaversine (inverse haversine) to hav(θ) or use the arcsine (inverse sine) function:

d = r archav ( hav θ ) = 2 r arcsin ( hav θ ) {\displaystyle d=r\operatorname {archav} (\operatorname {hav} \theta )=2r\arcsin \left({\sqrt {\operatorname {hav} \theta }}\right)}

or more explicitly:

d = 2 r arcsin ( hav ( Δ φ ) + ( 1 hav ( Δ φ ) hav ( 2 φ m ) ) hav ( Δ λ ) ) = 2 r arcsin ( sin 2 ( Δ φ 2 ) + ( 1 sin 2 ( Δ φ 2 ) sin 2 ( φ m ) ) sin 2 ( Δ λ 2 ) ) = 2 r arcsin ( sin 2 ( Δ φ 2 ) + cos φ 1 cos φ 2 sin 2 ( Δ λ 2 ) ) = 2 r arcsin ( sin 2 ( Δ φ 2 ) cos 2 ( Δ λ 2 ) + cos 2 ( φ m ) sin 2 ( Δ λ 2 ) ) = 2 r arcsin ( 1 cos ( Δ φ ) + cos φ 1 cos φ 2 ( 1 cos ( Δ λ ) ) 2 ) {\displaystyle {\begin{aligned}d&=2r\arcsin \left({\sqrt {\operatorname {hav} (\Delta \varphi )+(1-\operatorname {hav} (\Delta \varphi )-\operatorname {hav} (2\varphi _{\text{m}}))\cdot \operatorname {hav} (\Delta \lambda )}}\right)\\&=2r\arcsin \left({\sqrt {\sin ^{2}\left({\frac {\Delta \varphi }{2}}\right)+\left(1-\sin ^{2}\left({\frac {\Delta \varphi }{2}}\right)-\sin ^{2}\left(\varphi _{\text{m}}\right)\right)\cdot \sin ^{2}\left({\frac {\Delta \lambda }{2}}\right)}}\right)\\&=2r\arcsin \left({\sqrt {\sin ^{2}\left({\frac {\Delta \varphi }{2}}\right)+\cos \varphi _{1}\cdot \cos \varphi _{2}\cdot \sin ^{2}\left({\frac {\Delta \lambda }{2}}\right)}}\right)\\&=2r\arcsin \left({\sqrt {\sin ^{2}\left({\frac {\Delta \varphi }{2}}\right)\cdot \cos ^{2}\left({\frac {\Delta \lambda }{2}}\right)+\cos ^{2}\left(\varphi _{\text{m}}\right)\cdot \sin ^{2}\left({\frac {\Delta \lambda }{2}}\right)}}\right)\\&=2r\arcsin \left({\sqrt {\frac {1-\cos \left(\Delta \varphi \right)+\cos \varphi _{1}\cdot \cos \varphi _{2}\cdot \left(1-\cos \left(\Delta \lambda \right)\right)}{2}}}\right)\end{aligned}}}

where φ m = φ 2 + φ 1 2 {\displaystyle \varphi _{\text{m}}={\frac {\varphi _{2}+\varphi _{1}}{2}}} .

When using these formulae, one must ensure that h = hav(θ) does not exceed 1 due to a floating point error (d is real only for 0 ≤ h ≤ 1). h only approaches 1 for antipodal points (on opposite sides of the sphere)—in this region, relatively large numerical errors tend to arise in the formula when finite precision is used. Because d is then large (approaching πR, half the circumference) a small error is often not a major concern in this unusual case (although there are other great-circle distance formulas that avoid this problem). (The formula above is sometimes written in terms of the arctangent function, but this suffers from similar numerical problems near h = 1.)

As described below, a similar formula can be written using cosines (sometimes called the spherical law of cosines, not to be confused with the law of cosines for plane geometry) instead of haversines, but if the two points are close together (e.g. a kilometer apart, on the Earth) one might end up with cos(⁠d/R⁠) = 0.99999999, leading to an inaccurate answer. Since the haversine formula uses sines, it avoids that problem.

Either formula is only an approximation when applied to the Earth, which is not a perfect sphere: the "Earth radius" R varies from 6356.752 km at the poles to 6378.137 km at the equator. More importantly, the radius of curvature of a north-south line on the earth's surface is 1% greater at the poles (≈6399.594 km) than at the equator (≈6335.439 km)—so the haversine formula and law of cosines cannot be guaranteed correct to better than 0.5%. More accurate methods that consider the Earth's ellipticity are given by Vincenty's formulae and the other formulas in the geographical distance article.

The law of haversines

Spherical triangle solved by the law of haversines

Given a unit sphere, a "triangle" on the surface of the sphere is defined by the great circles connecting three points u, v, and w on the sphere. If the lengths of these three sides are a (from u to v), b (from u to w), and c (from v to w), and the angle of the corner opposite c is C, then the law of haversines states:

hav ( c ) = hav ( a b ) + sin ( a ) sin ( b ) hav ( C ) . {\displaystyle \operatorname {hav} (c)=\operatorname {hav} (a-b)+\sin(a)\sin(b)\operatorname {hav} (C).}

Since this is a unit sphere, the lengths a, b, and c are simply equal to the angles (in radians) subtended by those sides from the center of the sphere (for a non-unit sphere, each of these arc lengths is equal to its central angle multiplied by the radius R of the sphere).

In order to obtain the haversine formula of the previous section from this law, one simply considers the special case where u is the north pole, while v and w are the two points whose separation d is to be determined. In that case, a and b are ⁠π/2⁠ − φ1,2 (that is, the, co-latitudes), C is the longitude separation λ2λ1, and c is the desired ⁠d/R⁠. Noting that sin(⁠π/2⁠ − φ) = cos(φ), the haversine formula immediately follows.

To derive the law of haversines, one starts with the spherical law of cosines:

cos ( c ) = cos ( a ) cos ( b ) + sin ( a ) sin ( b ) cos ( C ) . {\displaystyle \cos(c)=\cos(a)\cos(b)+\sin(a)\sin(b)\cos(C).\,}

As mentioned above, this formula is an ill-conditioned way of solving for c when c is small. Instead, we substitute the identity that cos(θ) = 1 − 2 hav(θ), and also employ the addition identity cos(ab) = cos(a) cos(b) + sin(a) sin(b), to obtain the law of haversines, above.

Proof

One can prove the formula:

hav ( θ ) = hav ( Δ φ ) + cos ( φ 1 ) cos ( φ 2 ) hav ( Δ λ ) {\displaystyle \operatorname {hav} \left(\theta \right)=\operatorname {hav} \left(\Delta \varphi \right)+\cos \left(\varphi _{1}\right)\cos \left(\varphi _{2}\right)\operatorname {hav} \left(\Delta \lambda \right)}

by transforming the points given by their latitude and longitude into cartesian coordinates, then taking their dot product.

Consider two points p 1 , p 2 {\displaystyle {\bf {p_{1},p_{2}}}} on the unit sphere, given by their latitude φ {\displaystyle \varphi } and longitude λ {\displaystyle \lambda } :

p 2 = ( λ 2 , φ 2 ) p 1 = ( λ 1 , φ 1 ) {\displaystyle {\begin{aligned}{\bf {p_{2}}}&=(\lambda _{2},\varphi _{2})\\{\bf {p_{1}}}&=(\lambda _{1},\varphi _{1})\end{aligned}}}

These representations are very similar to spherical coordinates, however latitude is measured as angle from the equator and not the north pole. These points have the following representations in cartesian coordinates:

p 2 = ( cos ( λ 2 ) cos ( φ 2 ) , sin ( λ 2 ) cos ( φ 2 ) , sin ( φ 2 ) ) p 1 = ( cos ( λ 1 ) cos ( φ 1 ) , sin ( λ 1 ) cos ( φ 1 ) , sin ( φ 1 ) ) {\displaystyle {\begin{aligned}{\bf {p_{2}}}&=(\cos(\lambda _{2})\cos(\varphi _{2}),\;\sin(\lambda _{2})\cos(\varphi _{2}),\;\sin(\varphi _{2}))\\{\bf {p_{1}}}&=(\cos(\lambda _{1})\cos(\varphi _{1}),\;\sin(\lambda _{1})\cos(\varphi _{1}),\;\sin(\varphi _{1}))\end{aligned}}}

From here we could directly attempt to calculate the dot product and proceed, however the formulas become significantly simpler when we consider the following fact: the distance between the two points will not change if we rotate the sphere along the z-axis. This will in effect add a constant to λ 1 , λ 2 {\displaystyle \lambda _{1},\lambda _{2}} . Note that similar considerations do not apply to transforming the latitudes - adding a constant to the latitudes may change the distance between the points. By choosing our constant to be λ 1 {\displaystyle -\lambda _{1}} , and setting λ = Δ λ {\displaystyle \lambda '=\Delta \lambda } , our new points become:

p 2 = ( cos ( λ ) cos ( φ 2 ) , sin ( λ ) cos ( φ 2 ) , sin ( φ 2 ) ) p 1 = ( cos ( 0 ) cos ( φ 1 ) , sin ( 0 ) cos ( φ 1 ) , sin ( φ 1 ) ) = ( cos ( φ 1 ) , 0 , sin ( φ 1 ) ) {\displaystyle {\begin{aligned}{\bf {p_{2}'}}&=(\cos(\lambda ')\cos(\varphi _{2}),\;\sin(\lambda ')\cos(\varphi _{2}),\;\sin(\varphi _{2}))\\{\bf {p_{1}'}}&=(\cos(0)\cos(\varphi _{1}),\;\sin(0)\cos(\varphi _{1}),\;\sin(\varphi _{1}))\\&=(\cos(\varphi _{1}),\;0,\;\sin(\varphi _{1}))\end{aligned}}}

With θ {\displaystyle \theta } denoting the angle between p 1 {\displaystyle {\bf {p_{1}}}} and p 2 {\displaystyle {\bf {p_{2}}}} , we now have that:

cos ( θ ) = p 1 , p 2 = p 1 , p 2 = cos ( λ ) cos ( φ 1 ) cos ( φ 2 ) + sin ( φ 1 ) sin ( φ 2 ) = sin ( φ 2 ) sin ( φ 1 ) + cos ( φ 2 ) cos ( φ 1 ) cos ( φ 2 ) cos ( φ 1 ) + cos ( λ ) cos ( φ 2 ) cos ( φ 1 ) = cos ( Δ φ ) + cos ( φ 2 ) cos ( φ 1 ) ( 1 + cos ( λ ) ) hav ( θ ) = hav ( Δ φ ) + cos ( φ 2 ) cos ( φ 1 ) hav ( λ ) {\displaystyle {\begin{aligned}\cos(\theta )&=\langle {\bf {p_{1}}},{\bf {p_{2}}}\rangle =\langle {\bf {p_{1}'}},{\bf {p_{2}'}}\rangle =\cos(\lambda ')\cos(\varphi _{1})\cos(\varphi _{2})+\sin(\varphi _{1})\sin(\varphi _{2})\\&=\sin(\varphi _{2})\sin(\varphi _{1})+\cos(\varphi _{2})\cos(\varphi _{1})-\cos(\varphi _{2})\cos(\varphi _{1})+\cos(\lambda ')\cos(\varphi _{2})\cos(\varphi _{1})\\&=\cos(\Delta \varphi )+\cos(\varphi _{2})\cos(\varphi _{1})(-1+\cos(\lambda '))\Rightarrow \\\operatorname {hav} \left(\theta \right)&=\operatorname {hav} \left(\Delta \varphi \right)+\cos(\varphi _{2})\cos(\varphi _{1})\operatorname {hav} \left(\lambda '\right)\end{aligned}}}

See also

References

  1. van Brummelen, Glen Robert (2013). Heavenly Mathematics: The Forgotten Art of Spherical Trigonometry. Princeton University Press. ISBN 9780691148922. 0691148929. Retrieved 2015-11-10.
  2. de Mendoza y Ríos, Joseph (1795). Memoria sobre algunos métodos nuevos de calcular la longitud por las distancias lunares: y aplicacion de su teórica á la solucion de otros problemas de navegacion (in Spanish). Madrid, Spain: Imprenta Real.
  3. Cajori, Florian (1952) . A History of Mathematical Notations. Vol. 2 (2 (3rd corrected printing of 1929 issue) ed.). Chicago: Open court publishing company. p. 172. ISBN 978-1-60206-714-1. 1602067147. Retrieved 2015-11-11. The haversine first appears in the tables of logarithmic versines of José de Mendoza y Rios (Madrid, 1801, also 1805, 1809), and later in a treatise on navigation of James Inman (1821). (NB. ISBN and link for reprint of second edition by Cosimo, Inc., New York, 2013.)
  4. Inman, James (1835) . Navigation and Nautical Astronomy: For the Use of British Seamen (3 ed.). London, UK: W. Woodward, C. & J. Rivington. Retrieved 2015-11-09. (Fourth edition: .)
  5. "haversine". Oxford English Dictionary (2nd ed.). Oxford University Press. 1989.
  6. H. B. Goodwin, The haversine in nautical astronomy, Naval Institute Proceedings, vol. 36, no. 3 (1910), pp. 735–746: Evidently if a Table of Haversines is employed we shall be saved in the first instance the trouble of dividing the sum of the logarithms by two, and in the second place of multiplying the angle taken from the tables by the same number. This is the special advantage of the form of table first introduced by Professor Inman, of the Portsmouth Royal Navy College, nearly a century ago.
  7. W. W. Sheppard and C. C. Soule, Practical navigation (World Technical Institute: Jersey City, 1922).
  8. E. R. Hedrick, Logarithmic and Trigonometric Tables (Macmillan, New York, 1913).
  9. Gade, Kenneth (2010). "A Non-singular Horizontal Position Representation". Journal of Navigation. 63 (3): 395–417. Bibcode:2010JNav...63..395G. doi:10.1017/S0373463309990415. ISSN 0373-4633.
  10. Korn, Grandino Arthur; Korn, Theresa M. (2000) . "Appendix B: B9. Plane and Spherical Trigonometry: Formulas Expressed in Terms of the Haversine Function". Mathematical handbook for scientists and engineers: Definitions, theorems, and formulas for reference and review (3rd ed.). Mineola, New York: Dover Publications. pp. 892–893. ISBN 978-0-486-41147-7.

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