Follow these steps to convert given Turns value from Turns units to Seconds units.
Enter the input Turns value in the text field.
The given Turns is converted to Seconds in realtime ⌚ using the formula, and displayed under the Seconds label.
You may copy the resulting Seconds value using the Copy button.
Formula
To convert given angle from Turns to Seconds, use the following formula.
Seconds = Turns * 1296000
Calculation
Calculation will be done after you enter a valid input.
Turns to Seconds Conversion Table
The following table gives some of the most used conversions from Turns to Seconds.
Turns (turn)
Seconds (")
0 turn
0 "
1 turn
1296000 "
10 turn
12960000 "
45 turn
58320000 "
90 turn
116640000 "
180 turn
233280000 "
360 turn
466560000 "
1000 turn
1296000000 "
Turns
A turn, also known as a revolution or full circle, represents a complete rotation around a central point and is equal to 360 degrees or 2Ï€ radians. Turns are used in various disciplines, including engineering, navigation, and geometry, to describe full rotations. The concept of turns is deeply rooted in both mathematical theory and practical applications, such as in the design of gears and wheels.
Seconds
Seconds of arc, often simply called arcseconds, are a further subdivision of minutes of arc, with 60 seconds in one minute. This small unit is used for extremely precise angular measurements, such as those needed in astronomy, optics, and surveying, where even minute differences in angle can be significant.
{
"conversion": "turns-seconds",
"x_slug": "turns",
"y_slug": "seconds",
"x": "turn",
"y": "\"",
"x_desc": "Turns",
"y_desc": "Seconds",
"category": "Angle",
"symbol": "m",
"formula": "x * 1296000",
"precision": 11,
"examples": "<div class=\"example\">\n <div class=\"example_head\"><span class=\"example_n\">1</span>\n <h3 class=\"question\">Consider that a turntable rotates by 0.25 turns to play a vinyl record.<br>Convert this rotation from turns to Seconds.</h3></div>\n <h4 class=\"answer\">Answer:</h4>\n <p><strong>Given:</strong></p>\n <p>The angle in turns is:</p>\n <p class=\"step\"><span>Angle<sub>(Turns)</sub></span> = 0.25</p>\n <p><strong>Formula:</strong></p>\n <p>The formula to convert angle from turns to seconds is:</p>\n <p class=\"formula step\"><span>Angle<sub>(Seconds)</sub></span> = <span>Angle<sub>(Turns)</sub></span> × 1296000</p>\n <p><strong>Substitution:</strong></p>\n <p>Substitute given weight <strong>Angle<sub>(Turns)</sub> = 0.25</strong> in the above formula.</p>\n <p class=\"step\"><span>Angle<sub>(Seconds)</sub></span> = <span>0.25</span> × 1296000</p>\n <p class=\"step\"><span>Angle<sub>(Seconds)</sub></span> = 324000</p>\n <p><strong>Final Answer:</strong></p>\n <p>Therefore, <strong>0.25 turn</strong> is equal to <strong>324000 \"</strong>.</p>\n <p>The angle is <strong>324000 \"</strong>, in seconds.</p>\n </div>\n <div class=\"example\">\n <div class=\"example_head\"><span class=\"example_n\">2</span>\n <h3 class=\"question\">Consider that a wind turbine completes 2 turns in a light breeze.<br>Convert this rotation from turns to Seconds.</h3></div>\n <h4 class=\"answer\">Answer:</h4>\n <p><strong>Given:</strong></p>\n <p>The angle in turns is:</p>\n <p class=\"step\"><span>Angle<sub>(Turns)</sub></span> = 2</p>\n <p><strong>Formula:</strong></p>\n <p>The formula to convert angle from turns to seconds is:</p>\n <p class=\"formula step\"><span>Angle<sub>(Seconds)</sub></span> = <span>Angle<sub>(Turns)</sub></span> × 1296000</p>\n <p><strong>Substitution:</strong></p>\n <p>Substitute given weight <strong>Angle<sub>(Turns)</sub> = 2</strong> in the above formula.</p>\n <p class=\"step\"><span>Angle<sub>(Seconds)</sub></span> = <span>2</span> × 1296000</p>\n <p class=\"step\"><span>Angle<sub>(Seconds)</sub></span> = 2592000</p>\n <p><strong>Final Answer:</strong></p>\n <p>Therefore, <strong>2 turn</strong> is equal to <strong>2592000 \"</strong>.</p>\n <p>The angle is <strong>2592000 \"</strong>, in seconds.</p>\n </div>\n ",
"table1n": "<h2><span class=\"x\">Turns</span> to <span class=\"y\">Seconds</span> Conversion Table</h2><p>The following table gives some of the most used conversions from Turns to Seconds.</p><table><thead><tr><th scope=\"column\" role=\"columnheader\">Turns (<span class=\"unit\">turn</span>)</th><th scope=\"column\" role=\"columnheader\">Seconds (<span class=\"unit\">\"</span>)</th><tr></thead><tbody><tr><td>0 <span class=\"unit\">turn</span></td><td>0 <span class=\"unit\">\"</span></td></tr><tr><td>1 <span class=\"unit\">turn</span></td><td>1296000 <span class=\"unit\">\"</span></td></tr><tr><td>10 <span class=\"unit\">turn</span></td><td>12960000 <span class=\"unit\">\"</span></td></tr><tr><td>45 <span class=\"unit\">turn</span></td><td>58320000 <span class=\"unit\">\"</span></td></tr><tr><td>90 <span class=\"unit\">turn</span></td><td>116640000 <span class=\"unit\">\"</span></td></tr><tr><td>180 <span class=\"unit\">turn</span></td><td>233280000 <span class=\"unit\">\"</span></td></tr><tr><td>360 <span class=\"unit\">turn</span></td><td>466560000 <span class=\"unit\">\"</span></td></tr><tr><td>1000 <span class=\"unit\">turn</span></td><td>1296000000 <span class=\"unit\">\"</span></td></tr></table>",
"units": [
[
"degrees",
"Degrees",
"°"
],
[
"radians",
"Radians",
"rad"
],
[
"gradians",
"Gradians",
"gon"
],
[
"minutes",
"Minutes",
"'"
],
[
"seconds",
"Seconds",
"\""
],
[
"turns",
"Turns",
"turn"
],
[
"circles",
"Circles",
"circle"
],
[
"binary_degrees",
"Binary Degrees",
"°"
],
[
"compass_points",
"Compass Points",
"compass point"
],
[
"diameter_part",
"Diameter Parts",
"diameter part"
],
[
"hexacontades",
"Hexa-Contades",
"hexacontade"
],
[
"hour_angles",
"Hour Angles",
"hour angle"
],
[
"right_angles",
"Right Angles",
"right angle"
],
[
"milliradians",
"Milli-radians",
"mrad"
],
[
"quadrants",
"Quadrants",
"quadrant"
],
[
"sextants",
"Sextants",
"sextant"
],
[
"pi_radians",
"Ï€ Radians",
"Ï€ radians"
],
[
"zam",
"Zam",
"zam"
]
],
"y_long_desc": "Seconds of arc, often simply called arcseconds, are a further subdivision of minutes of arc, with 60 seconds in one minute. This small unit is used for extremely precise angular measurements, such as those needed in astronomy, optics, and surveying, where even minute differences in angle can be significant.",
"x_long_desc": "A turn, also known as a revolution or full circle, represents a complete rotation around a central point and is equal to 360 degrees or 2Ï€ radians. Turns are used in various disciplines, including engineering, navigation, and geometry, to describe full rotations. The concept of turns is deeply rooted in both mathematical theory and practical applications, such as in the design of gears and wheels."
}
ConvertOnline