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The number of ways one can arrange three identical capacitor to obtain distinct effective capacitance is
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Answers
Using single capacitors you can make 3 combinations by simply using one capacitor.
Using pairs of capacitors you can make 6 combinations. You can pick two of them in 3 ways and for each of them you get a different capacitance in series and in parallel.
Using all three capacitors you can make 8 combinations:
- All three in series: 1,
- all three in parallel: 1,
- two in series in parallel with one: 3,
- two in parallel in series with one: 3.
The total thus equals 3+6+8=17.
The main thing to note is that the order of capacitors in series or in parallel does not matter.
Answer:
The Numbers of ways one can arrange three identical capacitor to obtain district effective capacitance is ==)
● By having and by using Single Capacitor you are able to make Three combination of capacitor by simply using of the one capacitor
● By using the pairs of Capacitor you can able to make six combinations of capacitor . you can pick two of them in Different three ways and for each of them you get a different capacitor in series and in the parallel.
● By Using this all capacitors you can make More other eight combinations