Mona Gladys
St Joseph's College (St Joseph's College), Bengaluru
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Anamika Mittal
Vellore Institute of Technology (VIT), Bhopal
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11 Other formulas that you can solve using the same Inputs

Side a of a triangle
Side A=sqrt((Side B)^2+(Side C)^2-2*Side B*Side C*cos(Angle A)) GO
Diagonal of a Rectangle when breadth and area are given
Diagonal=sqrt(((Area)^2/(Breadth)^2)+(Breadth)^2) GO
Diagonal of a Rectangle when length and area are given
Diagonal=sqrt(((Area)^2/(Length)^2)+(Length)^2) GO
Work
Work =Force*Displacement*cos(Angle A) GO
Chord Length when radius and angle are given
Chord Length=sin(Angle A/2)*2*Radius GO
Arc Length
Arc Length=2*pi*Radius*(Angle A/360) GO
Buoyant Force
Buoyant Force=Pressure*Area GO
Perimeter of a square when area is given
Perimeter=4*sqrt(Area) GO
Diagonal of a Square when area is given
Diagonal=sqrt(2*Area) GO
Pressure when force and area are given
Pressure=Force/Area GO
Stress
Stress=Force/Area GO

11 Other formulas that calculate the same Output

Diagonal of a Rectangle when breadth and perimeter are given
Diagonal=sqrt((2*(Breadth)^2)-(Perimeter*Breadth)+((Perimeter)^2/4)) GO
Diagonal of a Rectangle when length and perimeter are given
Diagonal=sqrt((2*(Length)^2)-(Perimeter*Length)+((Perimeter)^2/4)) GO
Diagonal of a Rectangle when breadth and area are given
Diagonal=sqrt(((Area)^2/(Breadth)^2)+(Breadth)^2) GO
Diagonal of a Rectangle when length and area are given
Diagonal=sqrt(((Area)^2/(Length)^2)+(Length)^2) GO
Diagonal of the rectangle when the radius of the circumscribed circle is given
Diagonal=2*Radius Of Circumscribed Circle GO
Diagonal of a Rectangle when length and breadth are given
Diagonal=sqrt(Length^2+Breadth^2) GO
Diagonal of a Square when perimeter is given
Diagonal=(Perimeter/4)*sqrt(2) GO
The maximum face diagonal length for cubes with a side length S
Diagonal=Side*(sqrt(2)) GO
Diagonal of a Square when side is given
Diagonal=Side*sqrt(2) GO
Diagonal of a Square when area is given
Diagonal=sqrt(2*Area) GO
Diagonal of a Cube
Diagonal=sqrt(3)*Side GO

Diagonal of an isosceles trapezoid given area and angle between the diagonals Formula

Diagonal=sqrt(2*Area/sin(Angle A))
d=sqrt(2*A/sin(∠A))
More formulas
Diagonal of an isosceles trapezoid if given all sides GO
Diagonal of an isosceles trapezoid given base a, lateral side c and angle A between them GO
Diagonal of an isosceles trapezoid given base a, lateral side c and angle B between them GO
Diagonal of an isosceles trapezoid given base b, lateral side c and angle B between them GO
Diagonal of an isosceles trapezoid given base b, lateral side c and angle A between them GO
Diagonal of an isosceles trapezoid given height and midsegment GO
Diagonal of an isosceles trapezoid given height and bases GO
Diagonal of an isosceles trapezoid given height, bases and angle between the diagonals GO
Diagonal of an isosceles trapezoid given height, midsegment and angle between the diagonals GO
Diagonal of a trapezoid given height, base a and angle at the base GO
Diagonal of an isosceles trapezoid given height, base b and angle at the base GO
Diagonal of an isosceles trapezoid given height, sides and bases GO

what is an isosceles trapezoid?

In Euclidean geometry, an isosceles trapezoid ( isosceles trapezium in British English) is a convex quadrilateral with a line of symmetry bisecting one pair of opposite sides. It is a special case of a trapezoid. Alternatively, it can be defined as a trapezoid in which both legs and both base angles are of the same measure.

How to Calculate Diagonal of an isosceles trapezoid given area and angle between the diagonals?

Diagonal of an isosceles trapezoid given area and angle between the diagonals calculator uses Diagonal=sqrt(2*Area/sin(Angle A)) to calculate the Diagonal, The Diagonal of an isosceles trapezoid given area and angle between the diagonals formula is defined as d=sqrt(2A/sin(B)) where A is area and B is the angle between the diagonals of the trapezoid. Diagonal and is denoted by d symbol.

How to calculate Diagonal of an isosceles trapezoid given area and angle between the diagonals using this online calculator? To use this online calculator for Diagonal of an isosceles trapezoid given area and angle between the diagonals, enter Area (A) and Angle A (∠A) and hit the calculate button. Here is how the Diagonal of an isosceles trapezoid given area and angle between the diagonals calculation can be explained with given input values -> 14.14214 = sqrt(2*50/sin(30)).

FAQ

What is Diagonal of an isosceles trapezoid given area and angle between the diagonals?
The Diagonal of an isosceles trapezoid given area and angle between the diagonals formula is defined as d=sqrt(2A/sin(B)) where A is area and B is the angle between the diagonals of the trapezoid and is represented as d=sqrt(2*A/sin(∠A)) or Diagonal=sqrt(2*Area/sin(Angle A)). The area is the amount of two-dimensional space taken up by an object and The angle A is one of the angles of a triangle.
How to calculate Diagonal of an isosceles trapezoid given area and angle between the diagonals?
The Diagonal of an isosceles trapezoid given area and angle between the diagonals formula is defined as d=sqrt(2A/sin(B)) where A is area and B is the angle between the diagonals of the trapezoid is calculated using Diagonal=sqrt(2*Area/sin(Angle A)). To calculate Diagonal of an isosceles trapezoid given area and angle between the diagonals, you need Area (A) and Angle A (∠A). With our tool, you need to enter the respective value for Area and Angle A and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
How many ways are there to calculate Diagonal?
In this formula, Diagonal uses Area and Angle A. We can use 11 other way(s) to calculate the same, which is/are as follows -
  • Diagonal=Side*sqrt(2)
  • Diagonal=sqrt(Length^2+Breadth^2)
  • Diagonal=sqrt(3)*Side
  • Diagonal=sqrt(((Area)^2/(Breadth)^2)+(Breadth)^2)
  • Diagonal=sqrt(((Area)^2/(Length)^2)+(Length)^2)
  • Diagonal=sqrt((2*(Length)^2)-(Perimeter*Length)+((Perimeter)^2/4))
  • Diagonal=sqrt((2*(Breadth)^2)-(Perimeter*Breadth)+((Perimeter)^2/4))
  • Diagonal=sqrt(2*Area)
  • Diagonal=(Perimeter/4)*sqrt(2)
  • Diagonal=Side*(sqrt(2))
  • Diagonal=2*Radius Of Circumscribed Circle
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