The “loss surface area” from a prime-focus feed
The “loss surface area” from a prime-focus feed is just the blocked (shadowed) aperture from the feed assembly (feed + support struts). You can estimate it with:
- Dish area: Adish=π(D/2)2A_\text{dish}=\pi (D/2)^2
- Feed blockage (assuming a circular feed of diameter dfd_f): Afeed=π(df/2)2A_\text{feed}=\pi (d_f/2)^2
- Strut blockage (very rough but handy): if you have NN struts of width ww running about a radius, projected area ≈N w (D/2)\approx N \, w \, (D/2)
So:
Ablocked≈Afeed+N w D2,Fraction blocked=AblockedAdishA_\text{blocked} \approx A_\text{feed} + N\,w\,\frac{D}{2}, \quad \text{Fraction blocked} = \frac{A_\text{blocked}}{A_\text{dish}}
Below is a concrete example using a fairly typical L-band prime-focus scalar/corrugated feed df=0.25 md_f = 0.25\,\text{m} with 3 struts each w=0.02 mw=0.02\,\text{m}:
| Dish Ø (m) | Dish area (m²) | Blocked area (m²) | % of aperture blocked | Rough gain hit* |
| 1 | 0.785 | 0.079 | 10.07% | ~0.92 dB |
| 3 | 7.069 | 0.139 | 1.97% | ~0.17 dB |
| 5 | 19.635 | 0.199 | 1.01% | ~0.09 dB |
| 10 | 78.540 | 0.349 | 0.44% | ~0.04 dB |
*Very rough: ηblock≈(1−fraction)2\eta_\text{block} \approx (1 – \text{fraction})^2, loss =10log10ηblock=10\log_{10}\eta_\text{block}. Real losses depend on illumination taper and diffraction, so treat as ballpark.
Want different assumptions? Plug in your actual feed diameter and strut width/count with the same formulas. For reference, if your feed is smaller/larger:
- df=0.10 md_f=0.10\,\text{m}: a 1 m dish blocks ~4.8% (~0.43 dB), a 3 m dish ~1.4% (~0.12 dB).
- df=0.30 md_f=0.30\,\text{m}: a 1 m dish ~12.8% (~1.19 dB), a 3 m dish ~2.3% (~0.20 dB).