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Diagonal across Three Sides of Hendecagon is a straight line joining two non-adjacent sides across three sides of the Hendecagon. Check FAQs
d3=2tan(π22)hsin(3π11)sin(π11)
d3 - Diagonal across Three Sides of Hendecagon?h - Height of Hendecagon?π - Archimedes' constant?

Diagonal of Hendecagon across Three Sides given Height Example

With values
With units
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Here is how the Diagonal of Hendecagon across Three Sides given Height equation looks like with Values.

Here is how the Diagonal of Hendecagon across Three Sides given Height equation looks like with Units.

Here is how the Diagonal of Hendecagon across Three Sides given Height equation looks like.

13.1133Edit=2tan(3.141622)17Editsin(33.141611)sin(3.141611)
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Diagonal of Hendecagon across Three Sides given Height Solution

Follow our step by step solution on how to calculate Diagonal of Hendecagon across Three Sides given Height?

FIRST Step Consider the formula
d3=2tan(π22)hsin(3π11)sin(π11)
Next Step Substitute values of Variables
d3=2tan(π22)17msin(3π11)sin(π11)
Next Step Substitute values of Constants
d3=2tan(3.141622)17msin(33.141611)sin(3.141611)
Next Step Prepare to Evaluate
d3=2tan(3.141622)17sin(33.141611)sin(3.141611)
Next Step Evaluate
d3=13.1133338440335m
LAST Step Rounding Answer
d3=13.1133m

Diagonal of Hendecagon across Three Sides given Height Formula Elements

Variables
Constants
Functions
Diagonal across Three Sides of Hendecagon
Diagonal across Three Sides of Hendecagon is a straight line joining two non-adjacent sides across three sides of the Hendecagon.
Symbol: d3
Measurement: LengthUnit: m
Note: Value should be greater than 0.
Height of Hendecagon
Height of Hendecagon is the length of a perpendicular line drawn from one vertex to the opposite side.
Symbol: h
Measurement: LengthUnit: m
Note: Value should be greater than 0.
Archimedes' constant
Archimedes' constant is a mathematical constant that represents the ratio of the circumference of a circle to its diameter.
Symbol: π
Value: 3.14159265358979323846264338327950288
sin
Sine is a trigonometric function that describes the ratio of the length of the opposite side of a right triangle to the length of the hypotenuse.
Syntax: sin(Angle)
tan
The tangent of an angle is a trigonometric ratio of the length of the side opposite an angle to the length of the side adjacent to an angle in a right triangle.
Syntax: tan(Angle)

Other Formulas to find Diagonal across Three Sides of Hendecagon

​Go Diagonal of Hendecagon across Three Sides
d3=Ssin(3π11)sin(π11)
​Go Diagonal of Hendecagon across Three Sides given Area
d3=4Atan(π11)11sin(3π11)sin(π11)
​Go Diagonal of Hendecagon across Three Sides given Perimeter
d3=P11sin(3π11)sin(π11)
​Go Diagonal of Hendecagon across Three Sides given Inradius
d3=2tan(π11)risin(3π11)sin(π11)

How to Evaluate Diagonal of Hendecagon across Three Sides given Height?

Diagonal of Hendecagon across Three Sides given Height evaluator uses Diagonal across Three Sides of Hendecagon = 2*tan(pi/22)*Height of Hendecagon*sin((3*pi)/11)/sin(pi/11) to evaluate the Diagonal across Three Sides of Hendecagon, The Diagonal of Hendecagon across Three Sides given Height formula is defined as the straight line connecting two non-adjacent vertices across three sides of Hendecagon, calculated using height. Diagonal across Three Sides of Hendecagon is denoted by d3 symbol.

How to evaluate Diagonal of Hendecagon across Three Sides given Height using this online evaluator? To use this online evaluator for Diagonal of Hendecagon across Three Sides given Height, enter Height of Hendecagon (h) and hit the calculate button.

FAQs on Diagonal of Hendecagon across Three Sides given Height

What is the formula to find Diagonal of Hendecagon across Three Sides given Height?
The formula of Diagonal of Hendecagon across Three Sides given Height is expressed as Diagonal across Three Sides of Hendecagon = 2*tan(pi/22)*Height of Hendecagon*sin((3*pi)/11)/sin(pi/11). Here is an example- 13.11333 = 2*tan(pi/22)*17*sin((3*pi)/11)/sin(pi/11).
How to calculate Diagonal of Hendecagon across Three Sides given Height?
With Height of Hendecagon (h) we can find Diagonal of Hendecagon across Three Sides given Height using the formula - Diagonal across Three Sides of Hendecagon = 2*tan(pi/22)*Height of Hendecagon*sin((3*pi)/11)/sin(pi/11). This formula also uses Archimedes' constant and , Sine (sin), Tangent (tan) function(s).
What are the other ways to Calculate Diagonal across Three Sides of Hendecagon?
Here are the different ways to Calculate Diagonal across Three Sides of Hendecagon-
  • Diagonal across Three Sides of Hendecagon=(Side of Hendecagon*sin((3*pi)/11))/sin(pi/11)OpenImg
  • Diagonal across Three Sides of Hendecagon=sqrt((4*Area of Hendecagon*tan(pi/11))/11)*sin((3*pi)/11)/sin(pi/11)OpenImg
  • Diagonal across Three Sides of Hendecagon=Perimeter of Hendecagon/11*sin((3*pi)/11)/sin(pi/11)OpenImg
Can the Diagonal of Hendecagon across Three Sides given Height be negative?
No, the Diagonal of Hendecagon across Three Sides given Height, measured in Length cannot be negative.
Which unit is used to measure Diagonal of Hendecagon across Three Sides given Height?
Diagonal of Hendecagon across Three Sides given Height is usually measured using the Meter[m] for Length. Millimeter[m], Kilometer[m], Decimeter[m] are the few other units in which Diagonal of Hendecagon across Three Sides given Height can be measured.
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