Mona Gladys
St Joseph's College (St Joseph's College), Bengaluru
Mona Gladys has created this Calculator and 500+ more calculators!
Shweta Patil
Walchand College of Engineering (WCE), Sangli
Shweta Patil has verified this Calculator and 100+ more calculators!

11 Other formulas that you can solve using the same Inputs

Second angle of kite
Angle B=arccos((((symmetry diagonal-Distance from center to a point)^2)+(Side B^2)-(Diagonal/2)^2)/(2*(symmetry diagonal-Distance from center to a point)*(Side B))) GO
Obtuse angle of right kite
Angle A=2*arccos((Side A^2+symmetry diagonal^2-Side B^2)/(2*Side A*symmetry diagonal)) GO
Second side of kite given both diagonals
Side B=sqrt(((Diagonal/2)^2)+(symmetry diagonal-Distance from center to a point)^2) GO
Chord (s) of antiparallelogram
Length of long chord=sqrt((2*section 1^2)-(cos(180-Angle A)*(2*section 1^2))) GO
Angle α of antiparallelogram
Angle A=arccos((section 1^2+section 2^2-Side A^2)/(2*section 1*section 2)) GO
Angle β of antiparallelogram
Angle B=arccos((Side A^2+section 2^2-section 1^2)/(2*Side A*section 2)) GO
Angle γ of antiparallelogram
Angle C=arccos((Side A^2+section 1^2-section 2^2)/(2*Side A*section 1)) GO
Circumcircle radius of right kite
Radius of circumcircle=symmetry diagonal/2 GO
Other diagonal of kite given area
Diagonal=(2*Area)/symmetry diagonal GO
Area of kite
Area=(symmetry diagonal*Diagonal)/2 GO
Long side of Antiparallelogram
Side B=section 1+section 2 GO

Section 2 of half square kite Formula

section 2=symmetry diagonal-section 1
e2=f-e1
More formulas
Symmetry diagonal of half square kite GO
Other diagonal of half square kite GO
Square side of half square kite given diagonal GO
Section 1 of half square kite GO
Perimeter of half square kite GO
Square side of half square kite given perimeter GO
Other side of half square kite given perimeter GO
Symmetry angle of half square kite GO

What is a half square kite?

A half square kite is a deltoid with a right angle on one of the non-symmetrical vertices. It is based on a diagonally halved square, on whose hypotenuse a matching isosceles triangle is symmetrically attached

How to Calculate Section 2 of half square kite?

Section 2 of half square kite calculator uses section 2=symmetry diagonal-section 1 to calculate the section 2, The Section 2 of half square kite formula is defined as e2=e-e1 where e is symmetry diagonal and e1 is section 1 of half square kite. section 2 and is denoted by e2 symbol.

How to calculate Section 2 of half square kite using this online calculator? To use this online calculator for Section 2 of half square kite, enter symmetry diagonal (f) and section 1 (e1) and hit the calculate button. Here is how the Section 2 of half square kite calculation can be explained with given input values -> 5 = 10-5.

FAQ

What is Section 2 of half square kite?
The Section 2 of half square kite formula is defined as e2=e-e1 where e is symmetry diagonal and e1 is section 1 of half square kite and is represented as e2=f-e1 or section 2=symmetry diagonal-section 1. symmetry diagonal is the diagonal of kite which is perpendicular to the other diagonal and section 1 is the section of the symmetrical diagonal towards the symmetrical angle.
How to calculate Section 2 of half square kite?
The Section 2 of half square kite formula is defined as e2=e-e1 where e is symmetry diagonal and e1 is section 1 of half square kite is calculated using section 2=symmetry diagonal-section 1. To calculate Section 2 of half square kite, you need symmetry diagonal (f) and section 1 (e1). With our tool, you need to enter the respective value for symmetry diagonal and section 1 and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
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