Compute Solid Angle of Cone: θ | Hi Everyone

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To compute the solid angle of a cone with a known apex angle θ, the correct approach involves using double integration. The integral should be set up as ∫₀²π ∫₀θ sin(θ) dθ dφ, ensuring that φ is integrated from 0 to 2π. A common mistake is to incorrectly set the limits of integration, such as using -θ instead of 0 for the inner integral. The discussion highlights the importance of correctly applying the integration limits to achieve the right result. Understanding these details is crucial for accurately calculating the solid angle of a cone.
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Hi everyone

I'd like to compute the solide angle defined by a cone whose angle θ is known.
I tried with the definition but I probably mistook since it lead me to compute an integral worth...0.
I then tried with a rule of three, but the result I get is clearly wrong too.

Could you explain me how to proceed?
 
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Try this:
\int_0^{2\pi}\,\int_0^\theta\,sin\theta\,\mathrm{d}\theta\,\mathrm{d}\phi

for a cone with apex angle 2theta

via wikipedia
 
Thank you emgram769: In fact that's almost what I tried to do but I took the second integral with -theta instead of 0 (and we should take 0 because phi is integrated over 2Pi)
 

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