Answer:
The total effective capacitance is 2.033 μF
Explanation:
As the complete question is not given, the complete question is found online and is as attached herewith.
As with resistors start as far away from where you want total capacitance to be, so we have 3 capacitors in series, the 24 μF, the 12 μF, and the 8 μF
[tex]\dfrac{1}{C_{effective1}}=\dfrac{1}{C_{24}}+\dfrac{1}{C_{12}}+\dfrac{1}{C_{8}}=\dfrac{1}{24}+\dfrac{1}{12}+\dfrac{1}{8}=\dfrac{1}{4}\\C_{effective1}=4 \mu F[/tex]
Next we have two 4 μF capacitors in parallel so we can combine them to
[tex]C_{effective2}=C_4+C_{effective1}\\C_{effective2}=4+4\\C_{effective2}=8 \mu F\\[/tex]
Now we just have three capacitors in series so the total is
[tex]\dfrac{1}{C_{effective1}}=\dfrac{1}{C_{5}}+\dfrac{1}{C_{effective2}}+\dfrac{1}{C_{6}}=\dfrac{1}{5}+\dfrac{1}{8}+\dfrac{1}{6}=0.49166\\C_{effectivet}=1/0.49166=2.033 \mu F[/tex]
So the total effective capacitance is 2.033 μF
