How to use given Line-to-Line (LL) Short-Circuit (SC) information to calculate 3P SC contribution for Utility
If the 3P SC contribution from utility cannot be obtained, but the LL SC current is known, you can calculate the 3P SC contribution from the LL SC current.
Also, in PTW32, modeling a single-phase swing-bus (SB) generator is not allowed; therefore a Utility should be used. Here are the steps:
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)
Also, in PTW32, modeling a single-phase swing-bus (SB) generator is not allowed; therefore a Utility should be used. Here are the steps: