This would apply to parallel capacitors, but not to capacitors in series.maulucci said:q1=C1V and q2=C2V
q=q1+q2=(C1+C2)V
CsV=q=(C1+C2)V
Cs=C1+C2
maulucci said:I tried to work it out and i was wondering if this was the correct way to show wht the question is asking for
q1=C1V and q2=C2V
q=q1+q2=(C1+C2)V <----
CsV=q=(C1+C2)V
Cs=C1+C2
You did not show it, you just assumed it.maulucci said:To show that they are equal charges q1=q2
Why ^(-1)?q=Cs^-1V
How did you get that?q=(C1^-1+C2^-1)V
A capacitor series circuit is a type of electrical circuit where two or more capacitors are connected in a series, meaning that the positive terminal of one capacitor is connected to the negative terminal of another. This results in a single path for the current to flow.
The relationship between capacitors in a series circuit can be derived using the equation Cs = C1 + C2 + C3 + ..., where Cs is the total capacitance and C1, C2, C3, etc. are the individual capacitances of each capacitor. This means that the total capacitance of a series circuit is equal to the sum of the individual capacitances.
When capacitors are connected in a series, the total capacitance decreases. This is because the individual capacitances are added together, resulting in a smaller total capacitance compared to just one capacitor on its own.
Equivalent capacitance in a series circuit refers to the single value of capacitance that would have the same effect as the combination of multiple capacitors in the circuit. It is calculated using the formula 1/Cs = 1/C1 + 1/C2 + 1/C3 + ..., where Cs is the equivalent capacitance and C1, C2, C3, etc. are the individual capacitances.
Capacitors in a series circuit can be used for a variety of purposes, such as filtering out unwanted frequencies, smoothing out voltage fluctuations, and storing electrical energy. They can also be used to create a larger effective capacitance than what is available with a single capacitor.