Nishan Poojary
Shri Madhwa Vadiraja Institute of Technology and Management (SMVITM), Udupi
Nishan Poojary has created this Calculator and 300+ more calculators!
Mona Gladys
St Joseph's College (St Joseph's College), Bengaluru
Mona Gladys has verified this Calculator and 400+ more calculators!

11 Other formulas that you can solve using the same Inputs

Radius of Inscribed Circle
Radius Of Inscribed Circle=sqrt((Semiperimeter Of Triangle -Side A)*(Semiperimeter Of Triangle -Side B)*(Semiperimeter Of Triangle -Side C)/Semiperimeter Of Triangle ) GO
Area of Triangle when semiperimeter is given
Area Of Triangle=sqrt(Semiperimeter Of Triangle *(Semiperimeter Of Triangle -Side A)*(Semiperimeter Of Triangle -Side B)*(Semiperimeter Of Triangle -Side C)) GO
Area of a Triangle when sides are given
Area=sqrt((Side A+Side B+Side C)*(Side B+Side C-Side A)*(Side A-Side B+Side C)*(Side A+Side B-Side C))/4 GO
Radius of circumscribed circle
Radius Of Circumscribed Circle=(Side A*Side B*Side C)/(4*Area Of Triangle) GO
Area of a Rectangle when breadth and diagonal are given
Area=Breadth*(sqrt((Diagonal)^2-(Breadth)^2)) GO
Area of a Rectangle when length and diagonal are given
Area=Length*(sqrt((Diagonal)^2-(Length)^2)) GO
Perimeter of Triangle
Perimeter Of Triangle=Side A+Side B+Side C GO
Area of a Trapezoid
Area=((Base A+Base B)/2)*Height GO
Perimeter of a Parallelogram
Perimeter=2*Side A+2*Side B GO
Area of a Square when diagonal is given
Area=1/2*(Diagonal)^2 GO
Area of a Square when side is given
Area=(Side A)^2 GO

11 Other formulas that calculate the same Output

Radius of the circumcircle of a triangle
Radius=((Side A)*(Side B)*(Side C))/4*(sqrt(Semiperimeter *(Semiperimeter -Side A)*(Semiperimeter -Side B)*(Semiperimeter -Side C))) GO
Radius Of The Orbit
Radius=(Quantum Number*Plancks Constant)/(2*pi*Mass*Velocity) GO
Bohr's Radius
Radius=(Quantum Number/Atomic number)*0.529*10^-10 GO
Inner radius of a hallow cylinder
Radius=(Inner curved surface area)/(2*pi*Height) GO
Radius of circle when area of sector and angle are given
Radius=(2*Area of Sector/Central Angle)^0.5 GO
Outer radius of hollow cylinder
Radius=(Outer surface area)/(2*pi*Height) GO
Radius of a circle when circumference is given
Radius=(Circumference of Circle)/(pi*2) GO
Radius of a circle when area is given
Radius=sqrt(Area of Circle/pi) GO
Radius of Sphere
Radius=(1/2)*sqrt(Area/pi) GO
Radius of the circumscribed circle of an equilateral triangle if given side
Radius=Side/sqrt(3) GO
Radius of a circle when diameter is given
Radius=Diameter /2 GO

Radius of circumscribed circle of a isosceles trapezoid given semiperimeter and larger base length. Formula

Radius=(Side A*Base B*Diagonal)/4*(sqrt(((Semiperimeter )*(Semiperimeter -Side A)*(Semiperimeter -Base B)*(Semiperimeter -Diagonal))))
r=(a*bb*d)/4*(sqrt(((S)*(S-a)*(S-bb)*(S-d))))
More formulas
Radius of the circumcircle of a triangle GO
Radius of the circumscribed circle of an equilateral triangle if given side GO
Radius of the circumscribed circle of an equilateral triangle if given height GO
Radius of the circumscribed circle of an isosceles triangle GO
Radius of the circumscribed circle of a right triangle when two sides are given GO
Radius of the circumscribed circle of a right triangle when given hypotenuse GO
Radius of the circumscribed circle of a rectangle given two sides GO
Radius of the circumscribed circle of a rectangle given diagonal GO
Radius of the circumcircle of a regular hexagon GO
Radius of the circumcircle of a regular hexagon GO
Radius of the circumscribed circle of a square given side GO
Radius of the circumscribed circle of a square given GO
Radius of the circumscribed circle of an isosceles trapezoid if given sides and diagonal GO
Radius of the circumscribed circle of an isosceles trapezoid if given longer sides and diagonal GO
Radius of the circumscribed circle of a regular polygon GO
Radius of the circumcircle of a triangle GO
Radius of the circumscribed circle of an isosceles trapezoid if given semiperimeter and base length. GO

What is trapezoid..?

A trapezoid, also known as a trapezium, is a flat closed shape having 4 straight sides , with one pair of parallel sides. The parallel sides of a trapezium are known as the bases, and its non-parallel sides are called legs. A trapezium can also have parallel legs. The parallel sides can be horizontal , vertical or slanting. The perpendicular distance between the parallel sides is called the altitude. A trapezoid is a parallelogram if both pairs of its opposite sides are parallel. A trapezoid is a square if both pairs of its opposite sides are parallel; all its sides are of equal length and at right angles to each other.

How to Calculate Radius of circumscribed circle of a isosceles trapezoid given semiperimeter and larger base length.?

Radius of circumscribed circle of a isosceles trapezoid given semiperimeter and larger base length. calculator uses Radius=(Side A*Base B*Diagonal)/4*(sqrt(((Semiperimeter )*(Semiperimeter -Side A)*(Semiperimeter -Base B)*(Semiperimeter -Diagonal)))) to calculate the Radius, The Radius of circumscribed circle of a isosceles trapezoid given semiperimeter and larger base length. formula is defined as the radius of the circle circumscribing the isosceles trapezoid when the value of the larger base length and semiperimeter is given. Radius and is denoted by r symbol.

How to calculate Radius of circumscribed circle of a isosceles trapezoid given semiperimeter and larger base length. using this online calculator? To use this online calculator for Radius of circumscribed circle of a isosceles trapezoid given semiperimeter and larger base length., enter Side A (a), Base B (bb), Diagonal (d) and Semiperimeter (S) and hit the calculate button. Here is how the Radius of circumscribed circle of a isosceles trapezoid given semiperimeter and larger base length. calculation can be explained with given input values -> NaN = (8*12*8)/4*(sqrt(((10)*(10-8)*(10-12)*(10-8)))).

FAQ

What is Radius of circumscribed circle of a isosceles trapezoid given semiperimeter and larger base length.?
The Radius of circumscribed circle of a isosceles trapezoid given semiperimeter and larger base length. formula is defined as the radius of the circle circumscribing the isosceles trapezoid when the value of the larger base length and semiperimeter is given and is represented as r=(a*bb*d)/4*(sqrt(((S)*(S-a)*(S-bb)*(S-d)))) or Radius=(Side A*Base B*Diagonal)/4*(sqrt(((Semiperimeter )*(Semiperimeter -Side A)*(Semiperimeter -Base B)*(Semiperimeter -Diagonal)))). Side A is an upright or sloping surface of a structure or object that is not the top or bottom and generally not the front or back, Base B is the lowest part or edge of something, especially the part on which it rests or is supported, A diagonal is a straight line joining two opposite corners of a square, rectangle, or another straight-sided shape and Semiperimeter of an isosceles triangle is half of the sum of length of all sides.
How to calculate Radius of circumscribed circle of a isosceles trapezoid given semiperimeter and larger base length.?
The Radius of circumscribed circle of a isosceles trapezoid given semiperimeter and larger base length. formula is defined as the radius of the circle circumscribing the isosceles trapezoid when the value of the larger base length and semiperimeter is given is calculated using Radius=(Side A*Base B*Diagonal)/4*(sqrt(((Semiperimeter )*(Semiperimeter -Side A)*(Semiperimeter -Base B)*(Semiperimeter -Diagonal)))). To calculate Radius of circumscribed circle of a isosceles trapezoid given semiperimeter and larger base length., you need Side A (a), Base B (bb), Diagonal (d) and Semiperimeter (S). With our tool, you need to enter the respective value for Side A, Base B, Diagonal and Semiperimeter 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 Radius?
In this formula, Radius uses Side A, Base B, Diagonal and Semiperimeter . We can use 11 other way(s) to calculate the same, which is/are as follows -
  • Radius=(Circumference of Circle)/(pi*2)
  • Radius=sqrt(Area of Circle/pi)
  • Radius=Diameter /2
  • Radius=(Quantum Number/Atomic number)*0.529*10^-10
  • Radius=(Quantum Number*Plancks Constant)/(2*pi*Mass*Velocity)
  • Radius=(1/2)*sqrt(Area/pi)
  • Radius=(2*Area of Sector/Central Angle)^0.5
  • Radius=(Inner curved surface area)/(2*pi*Height)
  • Radius=(Outer surface area)/(2*pi*Height)
  • Radius=((Side A)*(Side B)*(Side C))/4*(sqrt(Semiperimeter *(Semiperimeter -Side A)*(Semiperimeter -Side B)*(Semiperimeter -Side C)))
  • Radius=Side/sqrt(3)
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