Equivalent capacitance of the combination between point A and B as shown in the figure below is

To analyze the equivalent capacitance between points A and B, we need to first understand how the capacitors are arranged (in series, parallel, or a combination of both). Since the figure isn't available, I will outline a general approach to finding the equivalent capacitance.

1. Break Down the Problem

1. Identify the number of capacitors and their arrangement (series or parallel).
2. Note the capacitance values of each capacitor.

2. Relevant Concepts

1. For capacitors in series:

   • The equivalent capacitance $C_{eq}$ can be calculated using: $\frac{1}{C_{eq}} = \sum_{i=1}^{n} \frac{1}{C_i}$ where $C_i$ is the capacitance of each individual capacitor in series.

2. For capacitors in parallel:

   • The equivalent capacitance $C_{eq}$ is calculated as: $C_{eq} = \sum_{i=1}^{n} C_i$

3. Analysis and Detail

• If you have a configuration of capacitors, apply the appropriate formulas based on whether they are connected in series or parallel.
• If capacitors are in a mixed configuration (some in series and some in parallel), divide them into groups and calculate the equivalent capacitance for each group before combining them to get the total.

4. Verify and Summarize

• After calculating the equivalent capacitance, double-check to confirm if the arrangement and calculations align with the initial setup.
• Summarize the calculated equivalent capacitance between points A and B.

Final Answer

Please substitute the specific values and arrangements into the mentioned formulas to find the final equivalent capacitance between points A and B. If more specific information is provided, I can assist in calculating the precise value.