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O que (quem) é trigonometrical function - definição

FIRST TRIGONOMETRIC SURVEY OF BRITAIN

Principal Triangulation of Britain; Trigonometrical Survey; Trigonometrical survey

Trigonometric functions

$<math>\cos(\theta)</math> and <math>\sin(\theta)</math> are the real and imaginary part of <math>e^{i\theta}</math> respectively.$
$<math>\cos(x)</math> together with the first Taylor polynomials <math>p_n(x)=\sum_{k=0}^n (-1)^k \frac{x^{2k}}{(2k)!}</math>$
$Cotangent (dotted)}} – [{{filepath:trigonometric_functions_derivation_animation.svg}} animation]$

FUNCTION OF AN ANGLE

TrigonometricFunctions; Trigonmetic function; Cosecant; Cotangent; Cosec; Logarithmic sine; Logarithmic tangent; Circular trigonometric function; Circular function; Trigonometric Function; Trigonometric Functions; Tangens; Trigonometry table; Tangent (trigonometry); Circular functions; Trig function; Trig functions; Sin-cos-tan; Sine-cosine-tangent; Sine cosine tangent; Sin cos tan; Cotangent (trigonometric function); Tangent (trigonometric function); Tan(); Wrapping functions; Wrapping function; Tangent function; Prosthaphaeresis formulas; Sin^2(x); Secant function; Tan(x); Trig ratios; Trigonometric function; Kosinus; Kotangens; Kosekans; Sekans; Secans; Cot(x); Sec(x); Cosec(x); Trigonometic functions; Angle function; Cotg; Secant (trigonometric function); Cos X; Csc(x); Tan (function); Tangent (function); Trigonometric ratio; Secant (trigonometry); Cosecant (trigonometry); Cosinus rectus; Vertical cosine; Secant and cosecant; Sinus secundus; Cotangens; Cosecans; Sinus rectus secundus; Sinus secundus arcus; Sine complement; Sinus complementi; Prosinus; Local cosine tree; Tan (trigonometry); Cot (trigonometry); Sec (trigonometry); Cosec (trigonometry); Csc (trigonometry); Cotan (trigonometry); Ctg (trigonometry); Tg (trigonometry); Tg (trigonometric function); Ctg (trigonometric function); Tangens complementi; Secans complementi; Tangent complement; Secant complement; Secans interior; Goniometric functions; Goniometric function; Angle functions; Natural cosine; Natural tangent; Natural cotangent; Natural secant; Natural cosecant; Logarithmic cosine; Logarithmic cotangent; Logarithmic secant; Logarithmic cosecant; Tan function; Sin. com.; Cos.; Sco (trigonometry); Sc (trigonometry); Cos. (trigonometry); Tan. (trigonometry); T (trigonometry); Tang. (trigonometry); Tc (trigonometry); Cotangent function; Cosecant function; Sincostan

In mathematics, the trigonometric functions (also called circular functions, angle functions or goniometric functions) are real functions which relate an angle of a right-angled triangle to ratios of two side lengths. They are widely used in all sciences that are related to geometry, such as navigation, solid mechanics, celestial mechanics, geodesy, and many others.

https://en.wikipedia.org/wiki/Trigonometric_functions

Inverse trigonometric functions

INVERSE FUNCTION OF THE TRIGONOMETRIC FUNCTION

Arcsine; Arctan; Arctangent; Inverse tangent; Arccosine; Cyclometric function; Arc Sine; Arc sine; Arc Cosecant; Arc Cosine; Arc Cotangent; Arc Secant; Arc Tangent; Arcsin; Arccotangent; Arccosec; Arccosecant; Arccot; Arcctg; Inverse cosine; Inverse cotangent; Inverse cosecant; Arccsc; Inverse secant; Inverse sine; Arcsecant; Arctg; Arc cosecant; Arc function; Inverse trigonometric cofunctions; Cyclometric functions; ArcSin; Arc tangent; Arc cosine; Arc cotangent; Arc functions; Arcsin(x); Arccos(x); Arctan(x); Inverse trigonometric function; Inverse trig functions; Inverse trig function; Inverse trig; Inverse trigonometry; Arc trigonometric functions; Cyclometric; Arc- (function prefix); Arcus sinus; Arcus cosinus; Arcus tangens; Arcus secans; Arcus cotangens; Arcus cosecans; Arccos (trigonometry); Arcsin (trigonometry); Arccot (trigonometry); Arccsc (trigonometry); Arcsec (trigonometry); Arctan (trigonometry); Arctg (trigonometric function); Arcctg (trigonometric function); Arcus function; Trigonometric arcus function; Trigonometric arcus functions; Arc-trigonometric functions; Arc-trigonometric function; Arc trigonometric function; Anti-trigonometric function; Anti-trigonometric functions; Antitrigonometric function; Antitrigonometric functions; Arc-sine; Arc-cosine; Arc-tangent; Arc-cotangent; Arc-secant; Arc-cosecant; Anti-sine; Anti-cosine; Anti-tangent; Anti-cotangent; Anti-secant; Anti-cosecant; Antisine; Anticosine; Antitangent; Anticotangent; Antisecant; Anticosecant; Inv sin; Inv cos; Inv tan; Inv cot; Inv sec; Inv csc; Inverse trigonometric sine; Inverse trigonometric cosine; Inverse trigonometric tangent; Inverse trigonometric cotangent; Inverse trigonometric secant; Inverse trigonometric cosecant; Arcsec (trigonometric function); Arcsec (function); Asec (function); Inverse circular function; Inverse circular functions; Arc secant; Inverse trigonometric; Arc (function prefix); Arctangent function; Asin (function); Acos (function); Atan (function)

In mathematics, the inverse trigonometric functions (occasionally also called arcus functions, antitrigonometric functions or cyclometric functions) are the inverse functions of the trigonometric functions (with suitably restricted domains). Specifically, they are the inverses of the sine, cosine, tangent, cotangent, secant, and cosecant functions, and are used to obtain an angle from any of the angle's trigonometric ratios.

https://en.wikipedia.org/wiki/Inverse_trigonometric_functions

Function (mathematics)

$A binary operation is a typical example of a bivariate function which assigns to each pair <math>(x, y)</math> the result <math>x\circ y</math>.$

ASSOCIATION OF A SINGLE OUTPUT TO EACH INPUT

Mathematical Function; Mathematical function; Function specification (mathematics); Mathematical functions; Empty function; Function (math); Ambiguous function; Function (set theory); Function (Mathematics); Functions (mathematics); Domain and range; Functional relationship; G(x); H(x); Function notation; Output (mathematics); Ƒ(x); Overriding (mathematics); Overriding union; F of x; Function of x; Bivariate function; Functional notation; Function of several variables; Y=f(x); ⁡; Draft:The Repeating Fractional Function; Image (set theory); Mutivariate function; Draft:Specifying a function; Function (maths); Functions (math); Functions (maths); F(x); Empty map; Function evaluation

In mathematics, a function from a set to a set assigns to each element of exactly one element of .; the words map, mapping, transformation, correspondence, and operator are often used synonymously.

https://en.wikipedia.org/wiki/Function_(mathematics)

Wikipédia

Principal Triangulation of Great Britain

The Principal Triangulation of Britain was the first high-precision triangulation survey of the whole of Great Britain (including Ireland), carried out between 1791 and 1853 under the auspices of the Board of Ordnance. The aim of the survey was to establish precise geographical coordinates of almost 300 significant landmarks which could be used as the fixed points of local topographic surveys from which maps could be drawn. In addition there was a purely scientific aim in providing precise data for geodetic calculations such as the determination of the length of meridian arcs and the figure of the Earth. Such a survey had been proposed by William Roy (1726–1790) on his completion of the Anglo-French Survey but it was only after his death that the Board of Ordnance initiated the trigonometric survey, motivated by military considerations in a time of a threatened French invasion. Most of the work was carried out under the direction of Isaac Dalby, William Mudge and Thomas Frederick Colby, but the final synthesis and report (1858) was the work of Alexander Ross Clarke. The survey stood the test of time for a century, until the Retriangulation of Great Britain between 1935 and 1962.

https://en.wikipedia.org/wiki/Principal Triangulation of Great Britain