Turn (angle): Difference between revisions

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The turn (symbol tr or pla) is a unit of plane angle measurement that is the measure of a complete angle—the angle subtended by a complete circle at its center. One turn is equal to Template:Math radians, 360 degrees or 400 gradians. As an angular unit, one turn also corresponds to one cycle (symbol cyc or c)^[1] or to one revolution (symbol rev or r).^[2] Common related units of frequency are cycles per second (cps) and revolutions per minute (rpm).Template:Efn The angular unit of the turn is useful in connection with, among other things, electromagnetic coils (e.g., transformers), rotating objects, and the winding number of curves. Divisions of a turn include the half-turn and quarter-turn, spanning a straight angle and a right angle, respectively; metric prefixes can also be used as in, e.g., centiturns (ctr), milliturns (mtr), etc.

In the ISQ, an arbitrary "number of turns" (also known as "number of revolutions" or "number of cycles") is formalized as a dimensionless quantity called rotation, defined as the ratio of a given angle and a full turn. It is represented by the symbol N. Template:Xref

Because one turn is ${\displaystyle 2\pi }$ radians, some have proposed representing ${\displaystyle 2\pi }$ with the single letter 𝜏 (tau).

Unit symbols

There are several unit symbols for the turn.

EU and Switzerland

The German standard DIN 1315 (March 1974) proposed the unit symbol "pla" (from Latin: Script error: No such module "Lang". 'full angle') for turns.^[3][4] Covered in Template:Ill (October 2010), the so-called Script error: No such module "Lang". ('full angle') is not an SI unit. However, it is a legal unit of measurement in the EU^[5][6] and Switzerland.^[7]

Calculators

The scientific calculators HP 39gII and HP Prime support the unit symbol "tr" for turns since 2011 and 2013, respectively. Support for "tr" was also added to newRPL for the HP 50g in 2016, and for the hp 39g+, HP 49g+, HP 39gs, and HP 40gs in 2017.^[8][9] An angular mode TURN was suggested for the WP 43S as well,^[10] but the calculator instead implements "MULTemplate:Pi" ([[multiples of π|multiples of Template:Pi]]) as mode and unit since 2019.^[11][12]

Divisions

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Many angle units are defined as a division of the turn. For example, the degree is defined such that one turn is 360 degrees.

Using metric prefixes, the turn can be divided in 100 centiturns or Template:Val milliturns, with each milliturn corresponding to an angle of 0.36°, which can also be written as 21′ 36″.^[13][14] A protractor divided in centiturns is normally called a "percentage protractor". While percentage protractors have existed since 1922,^[15] the terms centiturns, milliturns and microturns were introduced much later by the British astronomer Fred Hoyle in 1962.^[13][14] Some measurement devices for artillery and satellite watching carry milliturn scales.^[16][17]

Binary fractions of a turn are also used. Sailors have traditionally divided a turn into 32 compass points, which implicitly have an angular separation of Template:Sfrac turn. The binary degree, also known as the binary radian (or brad), is Template:Sfrac turn.^[18] The binary degree is used in computing so that an angle can be represented to the maximum possible precision in a single byte. Other measures of angle used in computing may be based on dividing one whole turn into Template:Math equal parts for other values of Template:Mvar.^[19]

Unit conversion

One turn is equal to ${\displaystyle 2\pi }$ = ${\displaystyle \tau }$ ≈ Template:Val^[20] radians, 360 degrees, or 400 gradians.

In the ISQ/SI

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In the International System of Quantities (ISQ), rotation (symbol N) is a physical quantity defined as number of revolutions:^[21]

N is the number (not necessarily an integer) of revolutions, for example, of a rotating body about a given axis. Its value is given by:

${\displaystyle N=\frac{\phi }{2\pi \text{ rad}}}$

where Template:Varphi denotes the measure of rotational displacement.

The above definition is part of the ISQ, formalized in the international standard ISO 80000-3 (Space and time),^[21] and adopted in the International System of Units (SI).^[22][23]

Rotation count or number of revolutions is a quantity of dimension one, resulting from a ratio of angular displacement. It can be negative and also greater than 1 in modulus. The relationship between quantity rotation, N, and unit turns, tr, can be expressed as:

${\displaystyle N=\frac{\phi }{\text{tr}}=\{\phi {\}}_{\text{tr}}}$

where {Template:Varphi}_tr is the numerical value of the angle Template:Varphi in units of turns (see Template:Slink).

In the ISQ/SI, rotation is used to derive rotational frequency (the rate of change of rotation with respect to time), denoted by Template:Mvar:

${\displaystyle n=\frac{\mathrm{d}N}{\mathrm{d}t}}$

The SI unit of rotational frequency is the reciprocal second (s⁻¹). Common related units of frequency are hertz (Hz), cycles per second (cps), and revolutions per minute (rpm).

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Script error: No such module "anchor". The superseded version ISO 80000-3:2006 defined "revolution" as a special name for the dimensionless unit "one",Template:Efn which also received other special names, such as the radian.Template:Efn Despite their dimensional homogeneity, these two specially named dimensionless units are applicable for non-comparable kinds of quantity: rotation and angle, respectively.^[24] "Cycle" is also mentioned in ISO 80000-3, in the definition of period.Template:Efn

See also

• Ampere-turn
• Hertz (modern) or Cycle per second (older)
• Angle of rotation
• Revolutions per minute
• Repeating circle
• Spat (angular unit) – the solid angle counterpart of the turn, equivalent to Template:Math steradians.
• Unit interval
• Divine Proportions: Rational Trigonometry to Universal Geometry
• Modulo operation
• Twist (mathematics)
• Tau (mathematics)

Notes

Template:Notelist

References

Template:Reflist

External links

• The Tau Manifesto