CGS e.m. unit to Siemens volt
CGS EMU
S.V
Conversion History
| Conversion | Reuse | Delete |
|---|---|---|
1 CGS EMU (CGS e.m. unit) → 10 S.V (Siemens volt) Just now |
Quick Reference Table (CGS e.m. unit to Siemens volt)
| CGS e.m. unit (CGS EMU) | Siemens volt (S.V) |
|---|---|
| 0.1 | 1 |
| 0.5 | 5 |
| 1 | 10 |
| 5 | 50 |
| 10 | 100 |
| 30 | 300 |
| 100 | 1,000 |
About CGS e.m. unit (CGS EMU)
The CGS electromagnetic unit (CGS e.m. unit) of current equals exactly 10 amperes, numerically identical to the biot and the EMU of current — all three are names for the same quantity within the CGS-EMU system. The term "CGS e.m. unit" is used explicitly when distinguishing the electromagnetic subsystem from the electrostatic (ESU) or Gaussian subsystems within CGS. In the CGS-EMU framework, resistance, capacitance, and inductance take unfamiliar dimensions compared to SI; the system is now of historical and theoretical interest only. Modern engineering and science universally use SI.
1 CGS e.m. unit = 10 A. A 100 A industrial busbar carries 10 CGS e.m. units. The designation appears only in pre-1960 electrical engineering literature.
About Siemens volt (S.V)
The siemens volt (S·V) is a derived expression equal to one ampere, arising from Ohm s law in conductance form: I = G × V, where G is conductance in siemens (S) and V is voltage in volts. Since one siemens equals one ampere per volt, S·V = (A/V)·V = A exactly. The S·V notation rarely appears in practical measurement — current is universally reported in amperes — but it occurs in network analysis and conductance-based circuit modeling, particularly in nodal admittance matrix methods used in power systems and RF circuit simulation. It illustrates that current, conductance, and voltage are linked rather than independent.
A conductor with 0.5 S conductance across 2 V passes 1 S·V = 1 A. Admittance matrix formulations in power flow analysis express branch currents as S·V products.
CGS e.m. unit – Frequently Asked Questions
Why were "absolute" and "practical" electrical units different in the 19th century?
The CGS e.m. unit of current (10 A) was inconveniently large for everyday lab work, while the CGS e.m. unit of resistance (the abohm, 10⁻⁹ Ω) was absurdly small. Physicists created "practical" units — the ampere, volt, and ohm — as decimal multiples that gave human-scale numbers. The ampere was set at 0.1 abampere. These practical units eventually became SI, while the "absolute" CGS units became historical footnotes.
Why does the CGS system have three different subsystems for the same physics?
In the 19th century, electricity and magnetism were treated as partially separate phenomena, leading to separate "natural" unit choices. The EMU system normalized magnetic permeability to 1; the ESU system normalized electric permittivity to 1; the Gaussian system mixed both. Once Maxwell unified electromagnetism, this fragmentation became unnecessary — but the systems persisted in literature for a century.
How did physicists handle the factor-of-10 difference between CGS e.m. units and practical amperes?
They introduced "practical" units — the ampere, volt, and ohm — as decimal multiples of CGS-EMU quantities. The ampere was defined as 0.1 abampere (CGS e.m. unit). This practical system eventually became SI, while the "absolute" CGS units faded. The factor of 10 was chosen for human-scale convenience.
What other CGS electromagnetic units still show up in modern contexts?
The gauss (magnetic flux density, = 10⁻⁴ tesla) remains surprisingly common — refrigerator magnets are rated in gauss, and MRI field strengths are often quoted in both tesla and gauss. The oersted (magnetic field strength) appears in materials science. These CGS-EMU holdouts persist because their numerical values are more convenient for everyday magnets.
When did the transition from CGS to SI happen in practice?
The SI was officially adopted in 1960, but the transition took decades. Most physics journals required SI by the 1970s, though astrophysics and plasma physics held onto Gaussian CGS into the 2000s. Some subfields never fully switched — you can still find new papers using gauss and oersted alongside tesla and A/m.
Siemens volt – Frequently Asked Questions
When would anyone actually use siemens volts instead of just amperes?
In nodal admittance matrix analysis of power grids and RF networks, bus currents are computed as the product of an admittance matrix (siemens) and a voltage vector (volts). The intermediate result is naturally in S·V before being labelled as amperes. It is a computational stepping stone rather than a measurement unit.
What is a siemens and where does the name come from?
The siemens (S) is the SI unit of electrical conductance — the reciprocal of resistance in ohms. One siemens means one ampere flows per volt applied. It is named after Werner von Siemens (1816–1892), German inventor and industrialist who founded the Siemens company and pioneered telegraph and electrical engineering.
How does conductance-based analysis differ from resistance-based?
In complex networks with many parallel paths, adding conductances (siemens) is simpler than combining resistances — parallel conductances just add, like parallel resistances require reciprocal math. Power system load-flow software uses admittance (Y = G + jB in siemens) matrices because they are sparse and computationally efficient.
Is siemens volt the same as watt per volt?
Yes, dimensionally they are both equal to one ampere: S·V = (A/V)·V = A, and W/V = (V·A)/V = A. The difference is conceptual — S·V emphasizes conductance times voltage (Ohm's law), while W/V emphasizes power divided by voltage (the power equation). Same number, different story.
Why does the admittance matrix method dominate power systems analysis?
Power grids have thousands of buses and transmission lines. The admittance matrix is large but very sparse (most buses connect to only a few neighbors), making it ideal for efficient numerical solvers. Expressing branch currents as Y·V (siemens times volts) enables Newton-Raphson load flow algorithms that converge in just 3–5 iterations for most grids.