Cofunction

In mathematics, a function f is cofunction of a function g if f(A) = g(B) whenever A and B are complementary angles (pairs that sum to one right angle).^[1] This definition typically applies to trigonometric functions.^[2]^[3] The prefix "co-" can be found already in Edmund Gunter's Canon triangulorum (1620).^[4]^[5]

For example, sine (Latin: sinus) and cosine (Latin: cosinus,^[4]^[5] sinus complementi^[4]^[5]) are cofunctions of each other (hence the "co" in "cosine"):

$\sin (\frac{π}{2} - A) = \cos (A)$ ^[1]^[3]	$\cos (\frac{π}{2} - A) = \sin (A)$ ^[1]^[3]

The same is true of secant (Latin: secans) and cosecant (Latin: cosecans, secans complementi) as well as of tangent (Latin: tangens) and cotangent (Latin: cotangens,^[4]^[5] tangens complementi^[4]^[5]):

$\sec (\frac{π}{2} - A) = \csc (A)$ ^[1]^[3]	$\csc (\frac{π}{2} - A) = \sec (A)$ ^[1]^[3]
$\tan (\frac{π}{2} - A) = \cot (A)$ ^[1]^[3]	$\cot (\frac{π}{2} - A) = \tan (A)$ ^[1]^[3]

These equations are also known as the cofunction identities.^[2]^[3]

This also holds true for the versine (versed sine, ver) and coversine (coversed sine, cvs), the vercosine (versed cosine, vcs) and covercosine (coversed cosine, cvc), the haversine (half-versed sine, hav) and hacoversine (half-coversed sine, hcv), the havercosine (half-versed cosine, hvc) and hacovercosine (half-coversed cosine, hcc), as well as the exsecant (external secant, exs) and excosecant (external cosecant, exc):

$ver (\frac{π}{2} - A) = cvs (A)$ ^[6]	$cvs (\frac{π}{2} - A) = ver (A)$
$vcs (\frac{π}{2} - A) = cvc (A)$ ^[7]	$cvc (\frac{π}{2} - A) = vcs (A)$
$hav (\frac{π}{2} - A) = hcv (A)$	$hcv (\frac{π}{2} - A) = hav (A)$
$hvc (\frac{π}{2} - A) = hcc (A)$	$hcc (\frac{π}{2} - A) = hvc (A)$
$exs (\frac{π}{2} - A) = exc (A)$	$exc (\frac{π}{2} - A) = exs (A)$

References

↑ ^1.0 ^1.1 ^1.2 ^1.3 ^1.4 ^1.5 ^1.6 Hall, Arthur Graham; Frink, Fred Goodrich (January 1909). "Chapter II. The Acute Angle [10 Functions of complementary angles"]. Trigonometry. Part I: Plane Trigonometry. New York: Henry Holt and Company. pp. 11–12. https://archive.org/stream/planetrigonometr00hallrich#page/n26/mode/1up.
↑ ^2.0 ^2.1 Algebra and Trigonometry (8 ed.). Cengage Learning. 2014. p. 528. ISBN 978-128596583-3. https://books.google.com/books?id=JEDAAgAAQBAJ&pg=PA528. Retrieved 2017-07-28.
↑ ^3.0 ^3.1 ^3.2 ^3.3 ^3.4 ^3.5 ^3.6 ^3.7 "5.1 The Elementary Identities". Precalculus. 2012. http://jwbales.home.mindspring.com/precal/part5/part5.1.html.
↑ ^4.0 ^4.1 ^4.2 ^4.3 ^4.4 Canon triangulorum. 1620.
↑ ^5.0 ^5.1 ^5.2 ^5.3 ^5.4 Roegel, Denis, ed (2010-12-06). "A reconstruction of Gunter's Canon triangulorum (1620)". HAL. https://hal.inria.fr/inria-00543938/document.
↑ "Coversine". MathWorld. Wolfram Research, Inc.. http://mathworld.wolfram.com/Coversine.html.
↑ "Covercosine". MathWorld. Wolfram Research, Inc.. http://mathworld.wolfram.com/Covercosine.html.

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[Hall_1909-1] 1.0 ^1.1 ^1.2 ^1.3 ^1.4 ^1.5 ^1.6 Hall, Arthur Graham; Frink, Fred Goodrich (January 1909). "Chapter II. The Acute Angle [10 Functions of complementary angles"]. Trigonometry. Part I: Plane Trigonometry. New York: Henry Holt and Company. pp. 11–12. https://archive.org/stream/planetrigonometr00hallrich#page/n26/mode/1up.

[Aufmann_Nation_2014-2] 2.0 ^2.1 Algebra and Trigonometry (8 ed.). Cengage Learning. 2014. p. 528. ISBN 978-128596583-3. https://books.google.com/books?id=JEDAAgAAQBAJ&pg=PA528. Retrieved 2017-07-28.

[Bales_2012-3] 3.0 ^3.1 ^3.2 ^3.3 ^3.4 ^3.5 ^3.6 ^3.7 "5.1 The Elementary Identities". Precalculus. 2012. http://jwbales.home.mindspring.com/precal/part5/part5.1.html.

[Gunter_1620-4] 4.0 ^4.1 ^4.2 ^4.3 ^4.4 Canon triangulorum. 1620.

[Roegel_2010-5] 5.0 ^5.1 ^5.2 ^5.3 ^5.4 Roegel, Denis, ed (2010-12-06). "A reconstruction of Gunter's Canon triangulorum (1620)". HAL. https://hal.inria.fr/inria-00543938/document.

[Weisstein_covers-6] "Coversine". MathWorld. Wolfram Research, Inc.. http://mathworld.wolfram.com/Coversine.html.

[Weisstein_covercos-7] "Covercosine". MathWorld. Wolfram Research, Inc.. http://mathworld.wolfram.com/Covercosine.html.

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