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- Bartletts_bisection_theorem abstract "Bartlett's Bisection Theorem is an electrical theorem in network analysis due to Albert Charles Bartlett. The theorem shows that any symmetrical two-port network can be transformed into a lattice network. The theorem often appears in filter theory where the lattice network is sometimes known as a filter X-section following the common filter theory practice of naming sections after alphabetic letters to which they bear a resemblance.The theorem as originally stated by Bartlett required the two halves of the network to be topologically symmetrical. The theorem was later extended by Wilhelm Cauer to apply to all networks which were electrically symmetrical. That is, the physical implementation of the network is not of any relevance. It is only required that its response in both halves are symmetrical.".
- Bartletts_bisection_theorem thumbnail Bartlett1.svg?width=300.
- Bartletts_bisection_theorem wikiPageID "19539839".
- Bartletts_bisection_theorem wikiPageLength "8474".
- Bartletts_bisection_theorem wikiPageOutDegree "31".
- Bartletts_bisection_theorem wikiPageRevisionID "611545006".
- Bartletts_bisection_theorem wikiPageWikiLink Albert_Charles_Bartlett.
- Bartletts_bisection_theorem wikiPageWikiLink All-pass_filter.
- Bartletts_bisection_theorem wikiPageWikiLink Balanced_line.
- Bartletts_bisection_theorem wikiPageWikiLink Category:Analog_circuits.
- Bartletts_bisection_theorem wikiPageWikiLink Category:Electronic_design.
- Bartletts_bisection_theorem wikiPageWikiLink Category:Filter_theory.
- Bartletts_bisection_theorem wikiPageWikiLink Category:Linear_filters.
- Bartletts_bisection_theorem wikiPageWikiLink Duality_(electrical_circuits).
- Bartletts_bisection_theorem wikiPageWikiLink Electronic_filter.
- Bartletts_bisection_theorem wikiPageWikiLink Electronic_filter_topology.
- Bartletts_bisection_theorem wikiPageWikiLink File:Bartlett1.svg.
- Bartletts_bisection_theorem wikiPageWikiLink File:Bartlett2.svg.
- Bartletts_bisection_theorem wikiPageWikiLink File:Bartlett_examples1.svg.
- Bartletts_bisection_theorem wikiPageWikiLink File:Bartlett_examples2.svg.
- Bartletts_bisection_theorem wikiPageWikiLink File:Bartlett_impedance_scaling.svg.
- Bartletts_bisection_theorem wikiPageWikiLink Filter_design.
- Bartletts_bisection_theorem wikiPageWikiLink Impedance_matching.
- Bartletts_bisection_theorem wikiPageWikiLink Inductor.
- Bartletts_bisection_theorem wikiPageWikiLink Lattice_phase_equaliser.
- Bartletts_bisection_theorem wikiPageWikiLink Network_analysis_(electrical_circuits).
- Bartletts_bisection_theorem wikiPageWikiLink Node_(circuits).
- Bartletts_bisection_theorem wikiPageWikiLink Port_(circuit_theory).
- Bartletts_bisection_theorem wikiPageWikiLink Prototype_filter.
- Bartletts_bisection_theorem wikiPageWikiLink Superposition_theorem.
- Bartletts_bisection_theorem wikiPageWikiLink Theorem.
- Bartletts_bisection_theorem wikiPageWikiLink Topology_(electrical_circuits).
- Bartletts_bisection_theorem wikiPageWikiLink Two-port_network.
- Bartletts_bisection_theorem wikiPageWikiLink Wilhelm_Cauer.
- Bartletts_bisection_theorem wikiPageWikiLinkText "Bartlett's bisection theorem".
- Bartletts_bisection_theorem wikiPageUsesTemplate Template:About.
- Bartletts_bisection_theorem wikiPageUsesTemplate Template:Reflist.
- Bartletts_bisection_theorem subject Category:Analog_circuits.
- Bartletts_bisection_theorem subject Category:Electronic_design.
- Bartletts_bisection_theorem subject Category:Filter_theory.
- Bartletts_bisection_theorem subject Category:Linear_filters.
- Bartletts_bisection_theorem hypernym Theorem.
- Bartletts_bisection_theorem type Circuit.
- Bartletts_bisection_theorem type Filter.
- Bartletts_bisection_theorem comment "Bartlett's Bisection Theorem is an electrical theorem in network analysis due to Albert Charles Bartlett. The theorem shows that any symmetrical two-port network can be transformed into a lattice network.".
- Bartletts_bisection_theorem label "Bartlett's bisection theorem".
- Bartletts_bisection_theorem sameAs Q4865376.
- Bartletts_bisection_theorem sameAs m.02w85h9.
- Bartletts_bisection_theorem sameAs Q4865376.
- Bartletts_bisection_theorem wasDerivedFrom Bartletts_bisection_theorem?oldid=611545006.
- Bartletts_bisection_theorem depiction Bartlett1.svg.
- Bartletts_bisection_theorem isPrimaryTopicOf Bartletts_bisection_theorem.