Payal Priya
Birsa Institute of Technology (BIT), Sindri
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7 Other formulas that you can solve using the same Inputs

Area of a Circle when area of sector is given
Area of Circle=Area of Sector*(360/Central Angle) GO
Area of the sector when radius and central angle are given
Area of Sector=(pi*(Radius)^2/360)*Central Angle GO
Length of a chord when radius and central angle are given
Chord Length=2*Radius*sin(Central Angle/2) GO
Arc length of the circle when central angle and radius are given
Arc Length=(pi*Radius*Central Angle)/180 GO
Length of arc when central angle and radius are given
Arc Length=(pi*Radius*Central Angle)/180 GO
Area of sector when radius and central angle are given
Area=(pi*Radius^2*Central Angle)/360 GO
Value of inscribed angle when central angle is given
Inscribed Angle=Central Angle/2 GO

4 Other formulas that calculate the same Output

Inscribed angle when radius and length for minor arc are given
Inscribed Angle=(90*Length of Minor Arc)/(pi*Radius) GO
Inscribed angle when radius and length for major arc are given
Inscribed Angle=(90*Length of Major Arc)/(pi*Radius) GO
Inscribed angle when other inscribed angle is given
Inscribed Angle=180-Inscribed angle 2 GO
Value of inscribed angle when central angle is given
Inscribed Angle=Central Angle/2 GO

Inscribed angle of the circle when the central angle of the circle is given Formula

Inscribed Angle=Central Angle/2
More formulas
Area of a Trapezoid GO
Area of a Sector GO
Inscribed angle when other inscribed angle is given GO
Arc length of the circle when central angle and radius are given GO
Area of the sector when radius and central angle are given GO
Area of sector when radius and central angle are given GO
Heron's formula GO
Eccentricity of an ellipse (a>b) GO
Eccentricity of an ellipse (b>a) GO
Directrix of an ellipse(a>b) GO
Directrix of an ellipse(b>a) GO
Latus Rectum of an ellipse (a>b) GO
Latus Rectum of an ellipse (b>a) GO
Length of major axis of an ellipse (a>b) GO
Length of the major axis of an ellipse (b>a) GO
Length of minor axis of an ellipse (a>b) GO
Length of minor axis of an ellipse (b>a) GO
Linear eccentricity of an ellipse GO
Semi-latus rectum of an ellipse GO
Eccentricity of an ellipse when linear eccentricity is given GO
Semi-major axis of an ellipse GO
Semi-minor axis of an ellipse GO
Latus rectum of an ellipse when focal parameter is given GO
Linear eccentricity of ellipse when eccentricity and major axis are given GO
Linear eccentricity of an ellipse when eccentricity and semimajor axis are given GO
Semi-latus rectum of an ellipse when eccentricity is given GO
Eccentricity of hyperbola GO
Linear eccentricity of the hyperbola GO
Semi-latus rectum of hyperbola GO
Focal parameter of the hyperbola GO
Latus Rectum of hyperbola GO
Length of transverse axis of hyperbola GO
Length of conjugate axis of the hyperbola GO
Eccentricity of hyperbola when linear eccentricity is given GO
Length of latus rectum of parabola GO
Number of diagonal of a regular polygon with given number of sides GO
Altitude/height of a triangle on side c given 3 sides GO
Length of median (on side c) of a triangle GO
Length of angle bisector of angle C GO
Circumradius of a triangle given 3 sides GO
Distance between circumcenter and incenter by Euler's theorem GO
Circumradius of a triangle given 3 exradii and inradius GO
Inradius of a triangle given 3 exradii GO
Side of a Rhombus GO
Perimeter of a Rhombus GO
Diagonal of a Rhombus GO
Area of Ellipse GO
Circumference of Ellipse GO
Axis 'a' of Ellipse when Area is given GO
Axis 'b' of Ellipse when area is given GO
Length of radius vector from center in given direction whose angle is theta in ellipse GO

What is inscribed angle and central angle of the circle and how it is calculated when central angle of the circle is given ?

Inscribed angle is the angle inside the circle, the apex of which lies on the circle and the central angle circle is the angle, the apex of which is the center of the circle. When the central angle is given inscribed angle is half of the central angle of the circle.

How to Calculate Inscribed angle of the circle when the central angle of the circle is given ?

Inscribed angle of the circle when the central angle of the circle is given calculator uses Inscribed Angle=Central Angle/2 to calculate the Inscribed Angle, Inscribed angle of the circle when the central angle of the circle is given is the angle inside the circle, the apex of which lies on the circle. Inscribed Angle and is denoted by θ symbol.

How to calculate Inscribed angle of the circle when the central angle of the circle is given using this online calculator? To use this online calculator for Inscribed angle of the circle when the central angle of the circle is given , enter Central Angle (θ) and hit the calculate button. Here is how the Inscribed angle of the circle when the central angle of the circle is given calculation can be explained with given input values -> 22.5 = 45/2.

FAQ

What is Inscribed angle of the circle when the central angle of the circle is given ?
Inscribed angle of the circle when the central angle of the circle is given is the angle inside the circle, the apex of which lies on the circle and is represented as θ=θ/2 or Inscribed Angle=Central Angle/2. A central angle is an angle whose apex (vertex) is the center O of a circle and whose legs (sides) are radii intersecting the circle in two distinct points A and B.
How to calculate Inscribed angle of the circle when the central angle of the circle is given ?
Inscribed angle of the circle when the central angle of the circle is given is the angle inside the circle, the apex of which lies on the circle is calculated using Inscribed Angle=Central Angle/2. To calculate Inscribed angle of the circle when the central angle of the circle is given , you need Central Angle (θ). With our tool, you need to enter the respective value for Central Angle 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 Inscribed Angle?
In this formula, Inscribed Angle uses Central Angle. We can use 4 other way(s) to calculate the same, which is/are as follows -
  • Inscribed Angle=(90*Length of Minor Arc)/(pi*Radius)
  • Inscribed Angle=(90*Length of Major Arc)/(pi*Radius)
  • Inscribed Angle=180-Inscribed angle 2
  • Inscribed Angle=Central Angle/2
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