50 Ω, 80 Ω, and 77 Ω resistors are connected in series with one another. This combination is connected to a 120V battery. Find
(a) the equivalent resistance of the series resistors,
(b) the total current provided by the battery.
50 Ω, 80 Ω, and 77 Ω resistors are connected in series with one another. This...
50 Ω, 80 Ω, and 50 Ω resistors are connected in series with one another. This combination is connected to a 120V battery. Find (a) the equivalent resistance of the series resistors, (b) the total current provided by the battery. break down each step please so i can see how you got answer
Three 4.3 Ω resistors are connected in series with a 16.0 V battery. Find the following. (a) the equivalent resistance of the circuit (b) the current in each resistor (c) Repeat for the case in which all three resistors are connected in parallel across the battery. equivalent resistance ______ current in each resistor _______
Three 4.3 Ω resistors are connected in series with a 16.0 V battery. Find the following. (a) the equivalent resistance of the circuit (b) the current in each resistor (c) Repeat for the case in which all three resistors are connected in parallel across the battery. equivalent resistance ______ current in each resistor _______
Three resistors in a series connected to a battery A 2.90 Ω resistor, a 5.79 Ω resistor, and a 9.96 Ω resistor are connected in series with a 15.0 V battery. What is the equivalent resistance? What is the current in each resistor?
Three resistors with values of 7.0 Ω , 14 Ω , and 20 Ω are connected in series in a circuit with a 9.0 V battery. A) What is the total equivalent resistance? B) What is the current in each resistor? C) At what rate is energy delivered to the 20 Ω resistor?
Three resistors, 25 Ω, 60 Ω, and 69 Ω, are connected in series, and a 0.38-A current passes through them. What are (a) the equivalent resistance and (b) the potential difference across this equivalent resistance?
Two resistors connected in series have an equivalent resistance of 667.1 Ω. When they are connected in parallel, their equivalent resistance is 157.4 Ω. Find the resistance of each resistor. a-) small resistance? b-)large resistance?
Two resistors connected in series have an equivalent resistance of 699.9 Ω. When they are connected in parallel, their equivalent resistance is 124.3 Ω. Find the resistance of each resistor. Ω (small resistance) Ω (large resistance)
(a) What is the equivalent resistance of six resistors connected in series with a 16.0-V battery if each resistor has a value of 23.0 Ω? (answer in Ω) (b) Determine the current flowing through each of the six resistors. (answer in A) (c) If the six resistors were instead connected in parallel across the battery, what would be the equivalent resistance? (answer in Ω) (d) Determine the current through each resistor for this parallel connection (answer in A)
Two resistors, ?1=2.47 Ω and ?2=5.35 Ω , are connected in series to a battery with an EMF of 24.0 V and negligible internal resistance. Find the current ?1 through ?1 and the potential difference ?2 across ?2