How to use this Diameter Parts to Turns Converter 🤔
Follow these steps to convert given angle from the units of Diameter Parts to the units of Turns.
Enter the input Diameter Parts value in the text field.
The calculator converts the given Diameter Parts into Turns in realtime ⌚ using the conversion formula, and displays under the Turns label. You do not need to click any button. If the input changes, Turns value is re-calculated, just like that.
You may copy the resulting Turns value using the Copy button.
To view a detailed step by step calculation of the conversion, click on the View Calculation button.
You can also reset the input by clicking on Reset button present below the input field.
What is the Formula to convert Diameter Parts to Turns?
The formula to convert given angle from Diameter Parts to Turns is:
Angle(Turns) = Angle(Diameter Parts) / 376.991
Substitute the given value of angle in diameter parts, i.e., Angle(Diameter Parts) in the above formula and simplify the right-hand side value. The resulting value is the angle in turns, i.e., Angle(Turns).
Calculation
Calculation will be done after you enter a valid input.
Examples
1
Consider that a mechanical watch's gear rotates by 12 diameter parts. Convert this rotation from diameter parts to Turns.
Answer:
Given:
The angle in diameter parts is:
Angle(Diameter Parts) = 12
Formula:
The formula to convert angle from diameter parts to turns is:
Angle(Turns) = Angle(Diameter Parts) / 376.991
Substitution:
Substitute given weight Angle(Diameter Parts) = 12 in the above formula.
Angle(Turns) = 12 / 376.991
Angle(Turns) = 0.03183099862
Final Answer:
Therefore, 12 diameter part is equal to 0.03183099862 turn.
The angle is 0.03183099862 turn, in turns.
2
Consider that a precision tool rotates by 16 diameter parts for accurate measurements. Convert this rotation from diameter parts to Turns.
Answer:
Given:
The angle in diameter parts is:
Angle(Diameter Parts) = 16
Formula:
The formula to convert angle from diameter parts to turns is:
Angle(Turns) = Angle(Diameter Parts) / 376.991
Substitution:
Substitute given weight Angle(Diameter Parts) = 16 in the above formula.
Angle(Turns) = 16 / 376.991
Angle(Turns) = 0.04244133149
Final Answer:
Therefore, 16 diameter part is equal to 0.04244133149 turn.
The angle is 0.04244133149 turn, in turns.
Diameter Parts to Turns Conversion Table
The following table gives some of the most used conversions from Diameter Parts to Turns.
Diameter Parts (diameter part)
Turns (turn)
0 diameter part
0 turn
1 diameter part
0.00265258322turn
10 diameter part
0.02652583218turn
45 diameter part
0.1194turn
90 diameter part
0.2387turn
180 diameter part
0.4775turn
360 diameter part
0.9549turn
1000 diameter part
2.6526turn
Diameter Parts
Diameter parts are a less common unit of angular measurement, historically used to describe angles in terms of the fractional parts of a circle's diameter. This unit was more prevalent in classical geometry and certain types of mechanical design, where direct relationships between linear measurements and angles were essential.
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 2π 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.
Frequently Asked Questions (FAQs)
1. What is the formula for converting Diameter Parts to Turns in Angle?
The formula to convert Diameter Parts to Turns in Angle is:
Diameter Parts / 376.991
2. Is this tool free or paid?
This Angle conversion tool, which converts Diameter Parts to Turns, is completely free to use.
3. How do I convert Angle from Diameter Parts to Turns?
To convert Angle from Diameter Parts to Turns, you can use the following formula:
Diameter Parts / 376.991
For example, if you have a value in Diameter Parts, you substitute that value in place of Diameter Parts in the above formula, and solve the mathematical expression to get the equivalent value in Turns.
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"y": "turn",
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"y_desc": "Turns",
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"formula": "x / 376.991",
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"examples": "<div class=\"example\">\n <div class=\"example_head\"><span class=\"example_n\">1</span>\n <h3 class=\"question\">Consider that a mechanical watch's gear rotates by 12 diameter parts.<br>Convert this rotation from diameter parts to Turns.</h3></div>\n <h4 class=\"answer\">Answer:</h4>\n <p><strong>Given:</strong></p>\n <p>The angle in diameter parts is:</p>\n <p class=\"step\"><span>Angle<sub>(Diameter Parts)</sub></span> = 12</p>\n <p><strong>Formula:</strong></p>\n <p>The formula to convert angle from diameter parts to turns is:</p>\n <p class=\"formula step\"><span>Angle<sub>(Turns)</sub></span> = <span>Angle<sub>(Diameter Parts)</sub></span> / 376.991</p>\n <p><strong>Substitution:</strong></p>\n <p>Substitute given weight <strong>Angle<sub>(Diameter Parts)</sub> = 12</strong> in the above formula.</p>\n <p class=\"step\"><span>Angle<sub>(Turns)</sub></span> = <span>12</span> / 376.991</p>\n <p class=\"step\"><span>Angle<sub>(Turns)</sub></span> = 0.03183099862</p>\n <p><strong>Final Answer:</strong></p>\n <p>Therefore, <strong>12 diameter part</strong> is equal to <strong>0.03183099862 turn</strong>.</p>\n <p>The angle is <strong>0.03183099862 turn</strong>, in turns.</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 precision tool rotates by 16 diameter parts for accurate measurements.<br>Convert this rotation from diameter parts to Turns.</h3></div>\n <h4 class=\"answer\">Answer:</h4>\n <p><strong>Given:</strong></p>\n <p>The angle in diameter parts is:</p>\n <p class=\"step\"><span>Angle<sub>(Diameter Parts)</sub></span> = 16</p>\n <p><strong>Formula:</strong></p>\n <p>The formula to convert angle from diameter parts to turns is:</p>\n <p class=\"formula step\"><span>Angle<sub>(Turns)</sub></span> = <span>Angle<sub>(Diameter Parts)</sub></span> / 376.991</p>\n <p><strong>Substitution:</strong></p>\n <p>Substitute given weight <strong>Angle<sub>(Diameter Parts)</sub> = 16</strong> in the above formula.</p>\n <p class=\"step\"><span>Angle<sub>(Turns)</sub></span> = <span>16</span> / 376.991</p>\n <p class=\"step\"><span>Angle<sub>(Turns)</sub></span> = 0.04244133149</p>\n <p><strong>Final Answer:</strong></p>\n <p>Therefore, <strong>16 diameter part</strong> is equal to <strong>0.04244133149 turn</strong>.</p>\n <p>The angle is <strong>0.04244133149 turn</strong>, in turns.</p>\n </div>\n ",
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"table1n": "<h2><span class=\"x\">Diameter Parts</span> to <span class=\"y\">Turns</span> Conversion Table</h2><p>The following table gives some of the most used conversions from Diameter Parts to Turns.</p><table><thead><tr><th scope=\"column\" role=\"columnheader\">Diameter Parts (<span class=\"unit\">diameter part</span>)</th><th scope=\"column\" role=\"columnheader\">Turns (<span class=\"unit\">turn</span>)</th><tr></thead><tbody><tr><td>0 <span class=\"unit\">diameter part</span></td><td>0 <span class=\"unit\">turn</span></td></tr><tr><td>1 <span class=\"unit\">diameter part</span></td><td>0<span>.00265258322</span> <span class=\"unit\">turn</span></td></tr><tr><td>10 <span class=\"unit\">diameter part</span></td><td>0<span>.02652583218</span> <span class=\"unit\">turn</span></td></tr><tr><td>45 <span class=\"unit\">diameter part</span></td><td>0<span>.1194</span> <span class=\"unit\">turn</span></td></tr><tr><td>90 <span class=\"unit\">diameter part</span></td><td>0<span>.2387</span> <span class=\"unit\">turn</span></td></tr><tr><td>180 <span class=\"unit\">diameter part</span></td><td>0<span>.4775</span> <span class=\"unit\">turn</span></td></tr><tr><td>360 <span class=\"unit\">diameter part</span></td><td>0<span>.9549</span> <span class=\"unit\">turn</span></td></tr><tr><td>1000 <span class=\"unit\">diameter part</span></td><td>2<span>.6526</span> <span class=\"unit\">turn</span></td></tr></table>",
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"y_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 2π 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.",
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