Networks Analysis And Synthesis Choose the incorrect statement. A branch formed by the parallel connection of any resistor R and a short circuit has the characteristic of a short circuit A branch formed by the parallel connection of any resistor R and open circuit has the characteristic of an open circuit A branch formed by the series connection of any resistor R and an open circuit has the characteristic of an open circuit A branch formed by the series connection of any resistor R and a short circuit has the characteristic of resistor R A branch formed by the parallel connection of any resistor R and a short circuit has the characteristic of a short circuit A branch formed by the parallel connection of any resistor R and open circuit has the characteristic of an open circuit A branch formed by the series connection of any resistor R and an open circuit has the characteristic of an open circuit A branch formed by the series connection of any resistor R and a short circuit has the characteristic of resistor R ANSWER DOWNLOAD EXAMIANS APP
Networks Analysis And Synthesis “In any linear bilateral network, if a source of e.m.f. E in any branch produces a current I in any other branch, then same e.m.f. acting in the second branch would produce the same current / in the first branch”. The above statement is associated with Superposition theorem Compensation theorem Reciprocity theorem None of these Superposition theorem Compensation theorem Reciprocity theorem None of these ANSWER DOWNLOAD EXAMIANS APP
Networks Analysis And Synthesis In a series parallel circuit, any two resistances in the same current path must be in Series with each other Series with the voltage source Parallel with each other Parallel with the voltage source Series with each other Series with the voltage source Parallel with each other Parallel with the voltage source ANSWER DOWNLOAD EXAMIANS APP
Networks Analysis And Synthesis Kirchhoff s current law states that Hebraic sum of the currents meeting at the junction is zero No current can leave the junction without some current entering it Net current flow at the junction is positive Total sum of currents meeting at the junction is zero Hebraic sum of the currents meeting at the junction is zero No current can leave the junction without some current entering it Net current flow at the junction is positive Total sum of currents meeting at the junction is zero ANSWER DOWNLOAD EXAMIANS APP
Networks Analysis And Synthesis This mention statement is associated with “In any network containing more than one sources of e.m.f. the current in any branch is the algebraic sum of a number of individual currents (the number being equal to the number of sources of e.m.f.), each of which is due to separate action of each source of e.m.f., taken order, when the remaining sources of e.m.f. are replaced by conductors, the resistances of which are equal to the internal resistances of the respective sources”. Superposition theorem Thevenin’s theorem Norton’s theorem None of these Superposition theorem Thevenin’s theorem Norton’s theorem None of these ANSWER DOWNLOAD EXAMIANS APP
Networks Analysis And Synthesis “In any network containing more than one sources of e.m.f. the current in any branch is the algebraic sum of a number of individual fictitious currents (the number being equal to the number of sources of e.m.f.), each of which is due to separate action of each source of e.m.f., taken in order, when the remaining sources of e.m.f. are replaced by conductors, the resistances of which are equal to the internal resistances of the respective sources”.The above statement is associated with None of these Superposition theorem Norton’s theorem Thevenin’s theorem None of these Superposition theorem Norton’s theorem Thevenin’s theorem ANSWER DOWNLOAD EXAMIANS APP