Mona Gladys
St Joseph's College (St Joseph's College), Bengaluru
Mona Gladys has created this Calculator and 300+ more calculators!
Anamika Mittal
Vellore Institute of Technology (VIT), Bhopal
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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
Diagonal 1 of a trapezoid
Diagonal 1=sqrt(Side A^2*Side B-Side A*Side B^2-Side B*Side C^2+Side A*Side D^2)/sqrt(Side A-Side B) GO
Radius of circumscribed circle
Radius Of Circumscribed Circle=(Side A*Side B*Side C)/(4*Area Of Triangle) GO
Side a of a triangle
Side A=sqrt((Side B)^2+(Side C)^2-2*Side B*Side C*cos(Angle A)) GO
side b of a triangle
Side B=sqrt(Side A^2+Side C^2-2*Side A*Side C*cos(Angle B)) GO
Perimeter of Triangle
Perimeter Of Triangle=Side A+Side B+Side C GO
Perimeter of a trapezoid
Perimeter=Side A+Side B+Side C+Side D GO
Perimeter Of Parallelepiped
Perimeter=4*Side A+4*Side B+4*Side C GO
Area of a Trapezoid
Area=((Base A+Base B)/2)*Height GO

11 Other formulas that calculate the same Output

Base b of Trapezoid given side d, base angle and other base
Base B=Base A-Side D*(sin(base angle 1+base angle 2))/sin(base angle 1) GO
Base b of Trapezoid given side c, base angle and other base
Base B=Base A-Side C*(sin(base angle 1+base angle 2))/sin(base angle 2) GO
Base b of Trapezoid given height, diagonals and angle between them
Base B=((Diagonal 1*Diagonal 2)/Height)*(sin(base angle 1)-Base A) GO
Base b of Trapezoid given height, base angle and other base
Base B=Base A-Height*(cot(base angle 1)+cot(base angle 2)) GO
Base b of an isosceles trapezoid if given diagonal, height, angle between the diagonals and base
Base B=((Diagonal^2/Height)*sin(Angle A))-Base A GO
Base of an isosceles trapezoid if given middle line and other base a
Base B=(2*Midline of a trapezoid)-Base A GO
Base b of Trapezoid when midline is given
Base B=(2*Midline of a trapezoid)-Base A GO
Base b of an isosceles trapezoid if given angle at the base, lateral side (leg) and other base
Base B=Base A-(2*Side C)*cos(Angle A) GO
Base b of an isosceles trapezoid if given angle at the base, height and other base
Base B=Base A-(2*Height)*cot(Angle A) GO
Base b of an isosceles trapezoid if given diagonal, lateral side (leg) and other base
Base B=(Diagonal^2-Side C^2)/Base A GO
Base b of Trapezoid
Base B=2*(Area/Height)-Base A GO

Side of a right trapezoid given lateral side c, d and base a Formula

Base B=Base A-sqrt(Side D^2-Side C^2)
bb=ba-sqrt(d^2-c^2)
More formulas
Side of a trapezoid given middle line and base a GO
Side of a trapezoid given middle line and base b GO
Side of a right trapezoid given lateral side d, base b and angle at base GO
Side of a right trapezoid given lateral side d, base a and angle at base GO
Side of a right trapezoid given lateral side c, base b and angle at base GO
Side of a right trapezoid given lateral side c, base a and angle at base GO
side of a right trapezoid given lateral side c, d and base b GO
Side a of a right trapezoid diagonals, lateral side (height) and angle between the diagonals GO
Side b of a right trapezoid diagonals, lateral side (height) and angle between the diagonals GO
Side a of a right trapezoid given area of a trapezoid, lateral side (height) and base b GO
Side b of a right trapezoid given area of a trapezoid, lateral side (height) and base a GO

What is a right trapezoid?

A right trapezoid is a trapezoid that has at least two right angles. A right isosceles trapezoid is a trapezoid that is simultaneously a right trapezoid and an isosceles trapezoid. In Euclidean geometry, such trapezoids are automatically rectangles.

How to Calculate Side of a right trapezoid given lateral side c, d and base a?

Side of a right trapezoid given lateral side c, d and base a calculator uses Base B=Base A-sqrt(Side D^2-Side C^2) to calculate the Base B, The side of a right trapezoid given lateral side c, d and base a formula is defined as b=a^2-sqrt(d^2-c^2) where a, b are bases and c, d are lateral sides. Base B and is denoted by bb symbol.

How to calculate Side of a right trapezoid given lateral side c, d and base a using this online calculator? To use this online calculator for Side of a right trapezoid given lateral side c, d and base a, enter Base A (ba), Side D (d) and Side C (c) and hit the calculate button. Here is how the Side of a right trapezoid given lateral side c, d and base a calculation can be explained with given input values -> 7 = 10-sqrt(5^2-4^2).

FAQ

What is Side of a right trapezoid given lateral side c, d and base a?
The side of a right trapezoid given lateral side c, d and base a formula is defined as b=a^2-sqrt(d^2-c^2) where a, b are bases and c, d are lateral sides and is represented as bb=ba-sqrt(d^2-c^2) or Base B=Base A-sqrt(Side D^2-Side C^2). Base A is the lowest part or edge of something, especially the part on which it rests or is supported, Side D is a straight line bounding a geometric figure. and Side C 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.
How to calculate Side of a right trapezoid given lateral side c, d and base a?
The side of a right trapezoid given lateral side c, d and base a formula is defined as b=a^2-sqrt(d^2-c^2) where a, b are bases and c, d are lateral sides is calculated using Base B=Base A-sqrt(Side D^2-Side C^2). To calculate Side of a right trapezoid given lateral side c, d and base a, you need Base A (ba), Side D (d) and Side C (c). With our tool, you need to enter the respective value for Base A, Side D and Side C 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 Base B?
In this formula, Base B uses Base A, Side D and Side C. We can use 11 other way(s) to calculate the same, which is/are as follows -
  • Base B=2*(Area/Height)-Base A
  • Base B=(2*Midline of a trapezoid)-Base A
  • Base B=Base A-Height*(cot(base angle 1)+cot(base angle 2))
  • Base B=Base A-Side D*(sin(base angle 1+base angle 2))/sin(base angle 1)
  • Base B=Base A-Side C*(sin(base angle 1+base angle 2))/sin(base angle 2)
  • Base B=((Diagonal 1*Diagonal 2)/Height)*(sin(base angle 1)-Base A)
  • Base B=(2*Midline of a trapezoid)-Base A
  • Base B=Base A-(2*Height)*cot(Angle A)
  • Base B=Base A-(2*Side C)*cos(Angle A)
  • Base B=(Diagonal^2-Side C^2)/Base A
  • Base B=((Diagonal^2/Height)*sin(Angle A))-Base A
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