The array factor of 4- isotropic elements of broadside array is given by ____________(a) \(\frac{sin(2kdcosθ)}{2kdcosθ} \)(b) \(\frac{sin(kdcosθ)}{2kdcosθ} \)(c) \(\frac{sin(2kdcosθ)}{kdcosθ} \)(d) \(\frac{cos(2kdcosθ)}{2kdcosθ} \)I have been asked this question in an international level competition.This intriguing question comes from Radiation Pattern for 4-Isotropic Elements in portion Antenna Array of Antennas

The array factor of 4- isotropic elements of broadside array is given

1.	The array factor of 4- isotropic elements of broadside array is given by ____________(a) \(\frac{sin(2kdcosθ)}{2kdcosθ} \)(b) \(\frac{sin(kdcosθ)}{2kdcosθ} \)(c) \(\frac{sin(2kdcosθ)}{kdcosθ} \)(d) \(\frac{cos(2kdcosθ)}{2kdcosθ} \)I have been asked this question in an international level competition.This intriguing question comes from Radiation Pattern for 4-Isotropic Elements in portion Antenna Array of Antennas
Answer» Correct option is (a) \(\frac{SIN(2kdcosθ)}{2kdcosθ} \) The explanation: Normalized ARRAY factor is given by \(AF=\frac{sin(Nᴪ/2)}{N \frac{ᴪ}{2}}\) And ᴪ=kdcosθ+β Since its given BROAD side array β=0, ᴪ=kdcosθ+β=kdcosθ \(\frac{Nᴪ}{2}=2kdcosθ\) \(AF=\frac{sin(Nᴪ/2)}{N \frac{ᴪ}{2}}=\frac{sin(2kdcosθ)}{2kdcosθ} \)

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