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Distance: The distance between the Rx and the Tx (dTx to Rx ) is calculated through multiplying a trialled path distance factor 
by the coverage radius Rmax such as 
Azimuth: The azimuth aRx to Tx of the Tx-Rx path is calculated trough a trial of path azimuth according to the defined distribution:
aRx to Tx = T(ARx to Tx) (Eq. 160)
The relative positioning of the pair of Tx and Rx is calculated in Cartesian coordinates. The relative positioning is always expressed relatively to the transmitter and is defined as:
∆X Tx/Rx = ∆X + dRx to Tx cos(aRx to Tx) (Eq. 161)
∆Y Tx/Rx = ∆Y + dRx to Tx sin(aRx to Tx) (Eq. 162)
Consequently, assuming that one of the two pair of transmitter and receiver is fixed, it is then possible to use the relative positioning to determine the absolute location of the second pair of transmitter and receiver.Interfering link to victim link path).
Within a generic system, the position of the receiver is always specified relative to the transmitter. For the relation between the interfering link and victim link, in a generic system the user may select the reference component as either the ILT or ILR, relative to either the VLT or VLR. This is illustrated below:
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For a cellular system as victim or interferer the base station of the reference cell is always used to specify the relative positioning, as illustrated below:
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The notation in this annex refers to positioning between a transmitter and receiver (Tx and Rx), but the same equations apply for any of the other positioning combinations outlined above.