A capacitor of capacitance c is charged to potential difference v and after charging it is connected to another identical uncharged capacitor then find out ratio of energy of the system finally initially
Answers
Answer:
2.25
Explanation:
A capacitor of capacitance 'C' is initially charged to a potential difference 'V' volt. now it is connected to a battery of 2V volt with opposite polarity . the ratio of heat generated to the final energy stored in the capacitor will be?
Report by Ammu289 22.06.2018
Answers
The Brain
gungunjain32
Gungunjain32 · Ambitious
Know the answer? Add it here!
JinKazama1
JinKazama1 Samaritan
^_^ ,Look for Attachment for charge Distribution in Capacitor .
This will certainly Boost your thinking, (•_^)
Final Answer : 2.25
Steps:
1) Initially, Capacitor will be charged to chage q(i) = CV on one side of plate capacitor .
After that, on changing the polarity of Battery and of EMF 2V ,Final charge on same side of plate capacitor q(f) = -C (2V) .
2) Hence, magnitude of charge transferred by Battery of 2V is
| CV - (-2CV)| = 3CV
Now,
Work done by battery = Charge transferred * EMF
= (3CV) *(2V) = 6CV^2
3) Change in Electrostatic Energy of Capacitor,
del(U) =
\frac{1}{2} c {v(f)}^{2} - \frac{1}{2} c {v(i)}^{2} \\ \\ = \frac{1}{2} c(( {2v)}^{2} - ( {v)}^{2} ) = \frac{1}{2} c(3 {v}^{2} )
4)
W(B) = del(U) + Heat
Don't fear , this just Energy Conservation •_^
= > 6c {v}^{2} = \frac{3}{2} c {v}^{2} + heat \: \\ = > heat \: = \frac{9}{2} c {v}^{2}
5) Now,
Ratio of Heat Generated to Final Energy of Capacitor = Heat / Final Energy of Capacitor
= \frac{ \frac{9}{2}c {v}^{2} }{ \frac{1}{2} c \times {(2v)}^{2} } = \frac{9}{4} = 2.25
Hence, Required Ratio is 2.25
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