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Steradian

Reference data and engineering information about steradian for miscellaneous applications.

steradian

Overview

Engineering reference data for Steradian in miscellaneous.

Key Formulas

Unit Conversion

y=xky = x \cdot k

Multiply by conversion factor.

Linear Interpolation

y=y1+(xx1)(y2y1)x2x1y = y_1 + \frac{(x - x_1)(y_2 - y_1)}{x_2 - x_1}

Estimate between two known points.

Percentage

p=partwhole×100%p = \frac{\text{part}}{\text{whole}} \times 100\%

Part as fraction of whole.

Variables

SymbolDescriptionUnit
xxInput value
yyOutput value
kkConversion factor

Definition and Properties

The steradian (symbol: sr) is the SI unit for measuring solid angles. It is derived from the radian, which measures plane angles, extended to three dimensions.

Geometric Definition: One steradian is the solid angle subtended at the center of a sphere by a surface area equal to the square of the sphere's radius.

1 sr=Area on sphere surfacer21 \text{ sr} = \frac{\text{Area on sphere surface}}{r^2}

Total Solid Angle: The entire surface of a sphere subtends a solid angle of exactly:

Ωsphere=4πr2r2=4π sr12.566 sr\Omega_{\text{sphere}} = \frac{4\pi r^2}{r^2} = 4\pi \text{ sr} \approx 12.566 \text{ sr}

Key Relations:

  • A hemisphere (half-sphere) subtends 2π2\pi sr at its center.
  • A right circular cone with half-angle θ\theta subtends Ω=2π(1cosθ)\Omega = 2\pi (1 - \cos\theta) sr.
  • The steradian is a dimensionless quantity (sr = m²/m² = 1).

Practical Visualization:

  • A sphere of radius 1 meter has a surface area of 4π4\pi m², so one steradian corresponds to an area of 1 m² on that sphere.
  • On Earth (radius ≈ 6371 km), one steradian covers approximately 40.7 million km²—about 8% of the planet's surface.

References