--- id: aliases: [] tags: - destiny/fleeting - status/incomplete - topic/electrical - type/encyclopedia --- # Conductor Sizing Conductors are sized to be suitable for the load, overcurrent protection is sized to protect the conductors. ## "The 80% Rule" "The 80% Rule" is a rule of thumb referring to a common convention of several articles including: * [[nfpa-70_210_branch-circuits#210.19(A)(1) General.]] * [[nfpa-70_215_feeders#215.2(A)(1) General.]] * [[nfpa-70_430_motors#430.22 Single Motor.]] which paraphrased states: > ... the minimum conductor size shall have an ampacity > not less than the noncontinuous load > plus 125 percent of the continuous load When the rule is repeated, the noncontinuous load is ignored and it is stated that conductors are suitable for 80% their listed rating, since 80% is the reciprocal of 125%. ## Branch Circuits ### Receptacle Branch > [!important] > There is no maximum number of receptacles per circuit _in any occupancy_. It is a common misconception that the limit can be calculated with a formula like $$ \frac{1.25(180VA)}{120V} = 1.875A, \quad \frac{20A}{1.875A} = 10.\bar{6} $$ but the 180VA per yoke load specified in [[nfpa-70_220_load-calculations#220.14(I) Receptacle Outlets.|220.14(I)]] is specifically for calculating service and feeder sizing. Per [[nfpa-70_210_branch-circuits#210.19(A)(1) General.|210.19(A)(1)]] a receptacle branch circuit's load is the load of the equipment intended to be served by it. Where general-use receptacles are provided without specific equipment in mind, circuits will be engineered at the minimum load. If a receptacle circuit's load is a whole multiple of 180VA there's a good chance that's the number of devices, or at least was at some point in the design. ## Feeders > [!cite] NEC Article 250 (emphasis added) > ### 250.122 Size of Equipment Grounding Conductors > #### (A) General. > Copper, aluminum, or copper-clad aluminum > equipment grounding conductors of the wire type > shall not be smaller than shown in Table 250.122, > but in no case shall they be required to be larger > than the circuit conductors supplying the equipment... Apparently in the 2026 NEC First Draft Meetings, Code Making Panel 5 clarified that the equipment grounding conductor (EGC) never needs to be larger than the largest ungrounded conductor in any raceway when installed in parallel. I can not find a source to verify this. Statements from other reputable sources including Mike Holt are in contradiction to this idea. *** Given a minimum ampacity, find all valid configurations. > [!cite] NEC Article 310 (emphasis added) > #### 310.10(H) Conductors in Parallel. > ##### (1) General. > Aluminum, copper-clad aluminum, or copper conductors, > for each phase, polarity, neutral, or grounded circuit > shall be permitted to be connected in parallel > (electrically joined at both ends) > _only in sizes 1/0 AWG and larger_ > where installed in accordance with 310.10(H)(2) through (H)(6). Rank by total cost of install. ### Complexity to Ignore #### Conductor Material Tinned copper and copper-clad aluminum conductors can be assumed out of scope. ### Complexity to Respect #### Equipment Grounding Conductor Material Wire and EGC conductors are usually assumed to match, but it is sometimes necessary to use a copper EGC with aluminum wires, either for spec requirements or conduit fill considerations. ## Voltage Drop $$ V_d = I \times R \times L \times M $$ where * $V_d$ = Voltage Drop in volts ($V$) * $I$ = Current in Amperes ($A$) * $R$ = Feeder linear resistance in ohms per foot ($VA^{-1}\text{ft}^{-1}$) * $L$ = Length of wire one way in feet ($\text{ft}$) * $M$ = Multiplier * $2$ for 1-phase * $\sqrt{3}$ for 3-phase It is often more useful to know the maximum length a certain wiring configuration is suitable for. $$ L = \frac{ V_d }{ I \times M } \times \frac{1}{R} $$ * $L$ = Max length of wire one way in feet ($\text{ft}$) * $\frac{ V_d }{ I \times M }$ = Max circuit resistance in ohms ($VA^{-1}$) > [!info] Ohm's Law > > $$ > V = I \times R, \quad R = \frac{ V }{ I }, \quad I = \frac{ V }{ R } > $$ > [!important] > "Current" is not the OCPD rating, > but the actual load. ## Transformers $$ I = \frac{S}{ \sqrt{3} \times V \times E } $$ * $I$ = nameplate current rating * $S$ = nameplate kVA rating * $V$ = feeder voltage * $E$ = efficiency ## Parallel Runs $$ \frac{1}{R_{\text{eq}}} = \frac{1}{R_1} + \frac{1}{R_2} + \frac{1}{R_3} + \dots $$ where $R_1 = R_n$: $$ \begin{align*} \frac{1}{R_{\text{eq}}} &= P \times \left(\frac{1}{R_1}\right) \\ &= \frac{P}{R_1} \\ R_{\text{eq}} &= \frac{R_1}{P} \end{align*} $$ where * $P$ = Number of parallel runs