3) If all resistors are 12 ohms: a) What is the resistance between A and B
3 resistors are in series. All resistors have a resistance of 1.6 ohms. What is the equivalent resistance? Give your answer to one decimal place. Question 4 1 pts All resistors have a resistance of 4 ohms. What is the equivalent resistance? 8Ω 2Ω 16Ω 10Ω
a. Electrical resistors having a mean resistance of 30 ohms and a standard deviation of 3 ohms, what is the probability that a random sample of 29 resistors will have a combined resistance of more than 900 ohms? b. A tire manufacturer determines at what temperature the tires will tend to bubble. In a sample of 75 tires, the mean temperature was 120 degrees F. The manufacturer assumes that the standard deviation of this temperature from all tires is 12...
What is the equivalent resistance of a the following 3 resistors: R1 = 13 Ohms R2 = = 4 Ohms R3 = 42 Ohms In this circuit, R1 and R3 are connected in parallel, and then connected to R2 in series, as shown below: Ri 0--R2- R3
what is the smallest equivalent resistance when three resistors (1.54 ohms, 2.20 ohms, 3.39 ohms) are connected together?
four resistors each have a resistance of 1500 ohms. The equivalent resistance of the 4 resistors is ~2500 ohms. determine the arrangement of the four resistors (combination of parallel and series)
Suppose you have three resistors, 5.4 Ohms, 17.4 Ohms, and 48.4 Ohms. What is the maximum resistance you can make using all three resistors? Assume 3 significant figures in your answer.
Resistors of 3 Ohms, 9 Ohms, and 11 Ohms are connected purely in parallel to a 12 volt battery. All of these resistors dissipate different amounts of power. What is the greatest amount of power dissipated by one of these resistors in Watts?
1) for the combination of resistors shown, find the equivalent resistance between points A and B. Req= __ ohms see figure 3 (attached) 2) for the set up shown, find the equivalent resistance between points A and B. (See figure 4 attached) Req= ___ ohms
Problem 3 - The distribution of resistance for resistors of a certain type is known to be normal, with 10% of all resistors having a resistance exceeding 10.634 ohms, and 5% having a resistance smaller than 9.7565 ohms. What are the mean value and standard deviation of the resistance distribution?
If a certain machine makes electrical resistors that have an average resistance of 40 ohms and a standard deviation of 2 ohms, what is the probability that a random sample of 32 of these resistors has an average resistance of at most 39.5 ohms? Write the result with up to 4 decimals.