Moment of Inertia of Circular Section given Shear Stress Calculator

The Moment of Inertia of Circular Section given Shear Stress formula is defined as a measure of the tendency of an object to resist changes in its rotational motion, calculated in terms of shear stress, radius, and beam width, providing insights into the structural integrity of circular sections under stress and is represented as I = (F_s*2/3*(r^2-y^2)^(3/2))/(𝜏_beam*B) or Moment of Inertia of Area of Section = (Shear Force on Beam*2/3*(Radius of Circular Section^2-Distance from Neutral Axis^2)^(3/2))/(Shear Stress in Beam*Width of Beam Section). Shear Force on Beam is the force which causes shear deformation to occur in the shear plane, Radius of Circular Section is the distance from the center of a circle to any point on its boundary, it represent the characteristic size of a circular cross-section in various applications, Distance from Neutral Axis is the perpendicular distance from a point in an element to the neutral axis, it is the line where element experiences no stress when the beam is subjected to bending, Shear Stress in Beam is force tending to cause deformation of a material by slippage along a plane or planes parallel to the imposed stress & Width of Beam Section is the width of the rectangular cross-section of the beam parallel to the axis in consideration.