Reg Edwards wrote:
The Zo of the Beverage is 60 * Ln( 4 * Height / d ) ohms, where d is
wire diameter. When terminated its input resistance at LF is Zo (see
the Bible, the ARRL Antenna Book). A typical value of Zo is 550 ohms.
Note that radiation resistance does not enter the formula although it
cannot be denied radiation does occur. The formula is a close
approximation which serves present purposes.
Putting two Beverages back-to-back to make a dipole we get an input
impedance of 1100 ohms. The infinite dipole is in the same high
impedance ballpark.
To calculate Zo of an isolated infinite dipole we shall have to change
dimensions Height above ground disappears and is replaced by
wavelength (or frequency).
Zo = 60 * ( Ln( Wavelength / 2 / d ) - 1 ) ohms, approximately.
A more exact formula involves inverse hyperbolic functions and
wavelength, height, wire length, and wire diameter, but nobody ever
uses it. You won't find it in Terman.
On the favourite American 40-meter band with a 14 AWG infinitely long
wire Zo = 505 ohms.
Which makes the dipole input impedance = 1010 ohms but a nice, round
1000 ohms is near enough for me.
Your 'infinite shield' is a fair description for the return path but
the end-effect is fairly large. I prefer 'the rest of the Universe'.
But the nearest point is still the Earth's surface.
I leave the people, who attempted to use Smith Charts and Eznec to
solve the interesting problem, to fathom out where they (or the charts
or Eznec) went wrong.
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Reg.
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