sdugre
Electrical
- Sep 9, 2005
- 7
I am in the process of calculating sequence impedances for a triplexed 750MCM, 34.5kV, EPR cable with copper tape shield, and am running into some problems.
The cable vendor, Prysmian, provided all the relevant cable data, including a shield resistance of 34.4 ohm/mi, which sounded high to me. I questioned this, and he responded that it was calculated "using contact resistance method from ICEA P-45-482 for helically applied tape, not overlapped" which is A = 1.27*n*w*b, where A is the effective cross sectional area of the shield in cmil, n is the number of tapes, w is the width of tape in mils, and b is thickness of the tape in mils. Since the result is in terms of area, it seems you need the resistivity of the tape shield to derive the resistance. The formula also seems to imply that the shield resistance is independent of the diameter of the shield, which seems wrong to me.
To satisfy my own curiosity, I checked a few text books to see if I could corroborate this. Every source I found used a different formula which does take the shield diameter into account. Here is an example from "Distribution System Modeling and Analysis" by W. Kersting: R = 7.94x10^8*p/(d*T) where R is the shield resistance in ohm/mi, p is the resistivity in ohm-m @ 50C, d is the outside diameter of the shield in inches, and T is the shield thickness in mils. Using the same cable data provided by Prysmian, and a resistivity of 2.3715x10^-8 ohm-m (which is suggested as average in the text), I come up with a shield resistance of 3.36 ohm/mi, which is an order of magnitude smaller than the value provided by Prysmian.
So which method is more correct? Any input on how you calculate shield resistance would be appreciated.
Thanks!
The cable vendor, Prysmian, provided all the relevant cable data, including a shield resistance of 34.4 ohm/mi, which sounded high to me. I questioned this, and he responded that it was calculated "using contact resistance method from ICEA P-45-482 for helically applied tape, not overlapped" which is A = 1.27*n*w*b, where A is the effective cross sectional area of the shield in cmil, n is the number of tapes, w is the width of tape in mils, and b is thickness of the tape in mils. Since the result is in terms of area, it seems you need the resistivity of the tape shield to derive the resistance. The formula also seems to imply that the shield resistance is independent of the diameter of the shield, which seems wrong to me.
To satisfy my own curiosity, I checked a few text books to see if I could corroborate this. Every source I found used a different formula which does take the shield diameter into account. Here is an example from "Distribution System Modeling and Analysis" by W. Kersting: R = 7.94x10^8*p/(d*T) where R is the shield resistance in ohm/mi, p is the resistivity in ohm-m @ 50C, d is the outside diameter of the shield in inches, and T is the shield thickness in mils. Using the same cable data provided by Prysmian, and a resistivity of 2.3715x10^-8 ohm-m (which is suggested as average in the text), I come up with a shield resistance of 3.36 ohm/mi, which is an order of magnitude smaller than the value provided by Prysmian.
So which method is more correct? Any input on how you calculate shield resistance would be appreciated.
Thanks!
