Follow these steps to convert given angle from the units of Turns to the units of Quadrants.
Enter the input Turns value in the text field.
The calculator converts the given Turns into Quadrants in realtime ⌚ using the conversion formula, and displays under the Quadrants label. You do not need to click any button. If the input changes, Quadrants value is re-calculated, just like that.
You may copy the resulting Quadrants 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 Turns to Quadrants?
The formula to convert given angle from Turns to Quadrants is:
Angle(Quadrants) = Angle(Turns) × 4
Substitute the given value of angle in turns, i.e., Angle(Turns) in the above formula and simplify the right-hand side value. The resulting value is the angle in quadrants, i.e., Angle(Quadrants).
Calculation
Calculation will be done after you enter a valid input.
Examples
1
Consider that a turntable rotates by 0.25 turns to play a vinyl record. Convert this rotation from turns to Quadrants.
Answer:
Given:
The angle in turns is:
Angle(Turns) = 0.25
Formula:
The formula to convert angle from turns to quadrants is:
Angle(Quadrants) = Angle(Turns) × 4
Substitution:
Substitute given weight Angle(Turns) = 0.25 in the above formula.
Angle(Quadrants) = 0.25 × 4
Angle(Quadrants) = 1
Final Answer:
Therefore, 0.25 turn is equal to 1 quadrant.
The angle is 1 quadrant, in quadrants.
2
Consider that a wind turbine completes 2 turns in a light breeze. Convert this rotation from turns to Quadrants.
Answer:
Given:
The angle in turns is:
Angle(Turns) = 2
Formula:
The formula to convert angle from turns to quadrants is:
Angle(Quadrants) = Angle(Turns) × 4
Substitution:
Substitute given weight Angle(Turns) = 2 in the above formula.
Angle(Quadrants) = 2 × 4
Angle(Quadrants) = 8
Final Answer:
Therefore, 2 turn is equal to 8 quadrant.
The angle is 8 quadrant, in quadrants.
Turns to Quadrants Conversion Table
The following table gives some of the most used conversions from Turns to Quadrants.
Turns (turn)
Quadrants (quadrant)
0 turn
0 quadrant
1 turn
4 quadrant
10 turn
40 quadrant
45 turn
180 quadrant
90 turn
360 quadrant
180 turn
720 quadrant
360 turn
1440 quadrant
1000 turn
4000 quadrant
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.
Quadrants
Quadrants are a unit of angular measurement representing one-quarter of a full circle, equivalent to 90 degrees or π/2 radians. Quadrants are commonly used in geometry, astronomy, and navigation to describe and analyze positions, angles, and directional orientations within a defined space.
Frequently Asked Questions (FAQs)
1. What is the formula for converting Turns to Quadrants in Angle?
The formula to convert Turns to Quadrants in Angle is:
Turns * 4
2. Is this tool free or paid?
This Angle conversion tool, which converts Turns to Quadrants, is completely free to use.
3. How do I convert Angle from Turns to Quadrants?
To convert Angle from Turns to Quadrants, you can use the following formula:
Turns * 4
For example, if you have a value in Turns, you substitute that value in place of Turns in the above formula, and solve the mathematical expression to get the equivalent value in Quadrants.
{
"conversion": "turns-quadrants",
"x_slug": "turns",
"y_slug": "quadrants",
"x": "turn",
"y": "quadrant",
"x_desc": "Turns",
"y_desc": "Quadrants",
"category": "Angle",
"symbol": "m",
"formula": "x * 4",
"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 Quadrants.</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 quadrants is:</p>\n <p class=\"formula step\"><span>Angle<sub>(Quadrants)</sub></span> = <span>Angle<sub>(Turns)</sub></span> × 4</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>(Quadrants)</sub></span> = <span>0.25</span> × 4</p>\n <p class=\"step\"><span>Angle<sub>(Quadrants)</sub></span> = 1</p>\n <p><strong>Final Answer:</strong></p>\n <p>Therefore, <strong>0.25 turn</strong> is equal to <strong>1 quadrant</strong>.</p>\n <p>The angle is <strong>1 quadrant</strong>, in quadrants.</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 Quadrants.</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 quadrants is:</p>\n <p class=\"formula step\"><span>Angle<sub>(Quadrants)</sub></span> = <span>Angle<sub>(Turns)</sub></span> × 4</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>(Quadrants)</sub></span> = <span>2</span> × 4</p>\n <p class=\"step\"><span>Angle<sub>(Quadrants)</sub></span> = 8</p>\n <p><strong>Final Answer:</strong></p>\n <p>Therefore, <strong>2 turn</strong> is equal to <strong>8 quadrant</strong>.</p>\n <p>The angle is <strong>8 quadrant</strong>, in quadrants.</p>\n </div>\n ",
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"table1n": "<h2><span class=\"x\">Turns</span> to <span class=\"y\">Quadrants</span> Conversion Table</h2><p>The following table gives some of the most used conversions from Turns to Quadrants.</p><table><thead><tr><th scope=\"column\" role=\"columnheader\">Turns (<span class=\"unit\">turn</span>)</th><th scope=\"column\" role=\"columnheader\">Quadrants (<span class=\"unit\">quadrant</span>)</th><tr></thead><tbody><tr><td>0 <span class=\"unit\">turn</span></td><td>0 <span class=\"unit\">quadrant</span></td></tr><tr><td>1 <span class=\"unit\">turn</span></td><td>4 <span class=\"unit\">quadrant</span></td></tr><tr><td>10 <span class=\"unit\">turn</span></td><td>40 <span class=\"unit\">quadrant</span></td></tr><tr><td>45 <span class=\"unit\">turn</span></td><td>180 <span class=\"unit\">quadrant</span></td></tr><tr><td>90 <span class=\"unit\">turn</span></td><td>360 <span class=\"unit\">quadrant</span></td></tr><tr><td>180 <span class=\"unit\">turn</span></td><td>720 <span class=\"unit\">quadrant</span></td></tr><tr><td>360 <span class=\"unit\">turn</span></td><td>1440 <span class=\"unit\">quadrant</span></td></tr><tr><td>1000 <span class=\"unit\">turn</span></td><td>4000 <span class=\"unit\">quadrant</span></td></tr></table>",
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"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 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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