Traduzione per "in degree" a finlandese

In degree

• asteina
• asteessa

Esempi di traduzione.

asteina

Water hardness is measured in degrees of hardness...
Veden kovuus mitataan yksikköinä jäykkyyden asteet...

Displayed in degrees Celsius (° C) or Fahrenheit (° F).
Näytetään celsiusasteina (° C) tai Fahrenheit-asteina (° F).

A phase is a time delay expressed in degrees of rotation.
Vaihemittaus Vaihe on viive ilmaistuna pyörinnän asteina.

This is often measured in degrees Celsius per second, C/s.
Tämä mitataan usein astetta sekunnissa, C/s.

The boost in degrees will just last about 2 weeks and also go back to regular after.
Kasvu asteina vain kestä

Switchable units of measurement for inclination in degrees, inches/feet or as percentage
Kytkettävissä mittayksiköt kaltevuus asteina, tuumaa / jalkaa tai prosentteina

The melting points of the metals are specified in degrees Kelvin (K).
Metallien sulamispisteet on määritelty asteina Kelvin (K). Ultraääni kavitaatio nesteessä

This sensor allows the micro:bit to detect the current ambient temperature, in degrees Celsius.
Tällä sensorilla micro:bit voi tunnistaa ilman lämpötilan Celsius-asteina.

The rise in degrees will only last concerning 2 weeks and return to typical after.
Pikalämmitys asteina vain kestää koskevat 2 viikkoa ja palata normaaliksi.

12 Find the sum of the values of such that, where is measured in degrees and .
12 Etsi summa arvojen sellainen, että, Jossa mitataan asteina ja .

In addition it contains alcohol which is expressed in degrees or percentage.
Kattokaltevuus voidaan ilmoittaa myös asteina tai prosentteina.

The electrical length is then typically expressed as N wavelengths or as the phase φ expressed in degrees or radians.
Vaihesiirto ilmaistaan yleensä asteina tai radiaaneina.

The angle may be measured in degrees or in time, with 24h = 360° exactly.
Se ilmoitetaan tavallisesti aikayksikköinä siten, että 24 tuntia vastaa täyttä kulmaa eli 360 astetta.

An alternate formula for a logarithmic and golden spiral is: r = a c θ {\displaystyle r=ac^{\theta }\,} where the constant c is given by: c = e b {\displaystyle c=e^{b}\,} which for the golden spiral gives c values of: c = φ 1 90 ≐ 1.0053611 {\displaystyle c=\varphi ^{\frac {1}{90}}\doteq 1.0053611} if θ is measured in degrees, and c = φ 2 π ≐ 1.358456. {\displaystyle c=\varphi ^{\frac {2}{\pi }}\doteq 1.358456.} OEIS: A212224 if θ is measured in radians.
Vaihtoehtoinen yhtälö logaritmiselle ja kultaiselle spiraalille on: r = a c θ {\displaystyle r=ac^{\theta }\,} jossa vakio c on: c = e b {\displaystyle c=e^{b}\,} mikä kultaiselle spiraalille antaa c:n arvot: c = ϕ 1 90 ≐ 1.0053611 {\displaystyle c=\phi ^{\frac {1}{90}}\doteq 1.0053611} jos θ on mitattu asteina, ja c = ϕ 2 π ≐ 1.358456. {\displaystyle c=\phi ^{\frac {2}{\pi }}\doteq 1.358456.} jos θ on mitattu radiaaneina.

A golden spiral with initial radius 1 has the following polar equation: r = φ θ 2 π {\displaystyle r=\varphi ^{\theta {\frac {2}{\pi }}}\,} The polar equation for a golden spiral is the same as for other logarithmic spirals, but with a special value of the growth factor b: r = a e b θ {\displaystyle r=ae^{b\theta }\,} or θ = 1 b ln ⁡ ( r / a ) , {\displaystyle \theta ={\frac {1}{b}}\ln(r/a),} with e being the base of natural logarithms, a being the initial radius of the spiral, and b such that when θ is a right angle (a quarter turn in either direction): e b θ r i g h t = φ {\displaystyle e^{b\theta _{\mathrm {right} }}\,=\varphi } Therefore, b is given by b = ln ⁡ φ θ r i g h t . {\displaystyle b={\ln {\varphi } \over \theta _{\mathrm {right} }}.} The numerical value of b depends on whether the right angle is measured as 90 degrees or as π 2 {\displaystyle \textstyle {\frac {\pi }{2}}} radians; and since the angle can be in either direction, it is easiest to write the formula for the absolute value of b {\displaystyle b} (that is, b can also be the negative of this value): | b | = ln ⁡ φ 90 ≐ 0.0053468 {\displaystyle |b|={\ln {\varphi } \over 90}\doteq 0.0053468\,} for θ in degrees; | b | = ln ⁡ φ π / 2 ≐ 0.3063489 {\displaystyle |b|={\ln {\varphi } \over \pi /2}\doteq 0.3063489\,} for θ in radians OEIS: A212225.
Kultaisen spiraalin napakoordinaattiyhtälö on sama kuin muille logaritmisille spiraaleille, mutta erikoisarvolla kasvutekijälle b: r = a e b θ {\displaystyle r=ae^{b\theta }\,} tai θ = 1 b ln ⁡ ( r / a ) , {\displaystyle \theta ={\frac {1}{b}}\ln(r/a),} jossa e on luonnollisten logaritmien kantaluku, a on mielivaltainen positiivinen reaalivakio, ja b sellainen, että θ on suora kulma (neljänneskäännös jompaankumpaan suuntaan): e b θ r i g h t = ϕ {\displaystyle e^{b\theta _{\mathrm {right} }}\,=\phi } Joten b on b = ln ⁡ ϕ θ r i g h t . {\displaystyle b={\ln {\phi } \over \theta _{\mathrm {right} }}.} b:n numeerinen arvo johtuu siitä onko suora kulma mitattu 90 asteena vai π 2 {\displaystyle \textstyle {\frac {\pi }{2}}} radiaanina; ja kun kulma voi olla kumpaan tahansa suuntaan, on helpointa kirjoittaa yhtälö b:n itseisarvolle (siis b voi olla myös tämän arvon vastaluku): | b | = ln ⁡ ϕ 90 = 0.0053468 {\displaystyle |b|={\ln {\phi } \over 90}=0.0053468\,} θ:lle asteina; | b | = ln ⁡ ϕ π / 2 = 0.306349 {\displaystyle |b|={\ln {\phi } \over \pi /2}=0.306349\,} θ:lle radiaaneina.