Two capacitance of 6\(\mu\)F and 8\(\mu\)F are connected in series. What additional capacitance must be connected in series with this combination to give a total of 3\(\mu\)F
3\(\mu\)F
16\(\mu\)F
24\(\mu\)F
30\(\mu\)F
Explanation
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let unknown be =R
1/6+1/8+1/R=1/3
14/48+1/R=1/3
7/24+1/R=1/3
factorize out
7R+24/24R=1/3
cross multiply
24R×1=3(7R+24)
24R= 21R+72
CLT
24R-21R=72
3R=72
divide both sides by 3
R=72/3
R=24
The question says:
You have 6μF and 8μF in series
Then you add another capacitor in series
Final total becomes 3μF
Find the new capacitor.
Step 3: First, combine 6μF and 8μF
Since they are in series, we use:
1/C = 1/6 + 1/8
Don’t rush. Do it calmly.
LCM is 24:
1/6 = 4/24
1/8 = 3/24
So:
1/C = 7/24
Flip it:
C = 24/7
So those two behave like 24/7 μF
Step 4: Now add the unknown capacitor
Let’s call it X
Still in series, so:
1/Total = 1/(24/7) + 1/X
Total is 3μF, so:
1/3 = 7/24 + 1/X
Step 5: Solve slowly
Convert 1/3:
1/3 = 8/24
So:
8/24 = 7/24 + 1/X
Subtract:
1/X = 1/24
Flip it:
X = 24 μF
Final Answer: 24 μF
or this one
1/3 = 1/6 + 1/8 + 1/x
Combine the easy ones first:
1/6 + 1/8
LCM = 24
= 4/24 + 3/24
= 7/24
So now:
1/3 = 7/24 + 1/x
Convert 1/3:
1/3 = 8/24
So:
8/24 = 7/24 + 1/x
Subtract:
1/x = 1/24
Flip:
x = 24 μF
