[FREE PDF] CAIIB ABM Module A | PYQs & New Pattern Questions

This article is ideal for:

• Bankers appearing for CAIIB ABM June 2025
• Anyone struggling with statistics and numericals
• Professionals looking for quick revision with conceptual clarity

So let’s get started and unlock the scoring power of Module A!

Understanding Skewness and Kurtosis

Skewness refers to the degree of asymmetry in a distribution of values. If the data is symmetrically distributed, the skewness is zero. However, if one tail of the data is longer or fatter than the other, the distribution is skewed.

• Positive Skewness: Tail on the right side; mean > median > mode
• Negative Skewness: Tail on the left side; mean < median < mode
• Symmetrical Distribution: Mean = Median = Mode

Kurtosis measures the “tailedness” of the data distribution.

• Mesokurtic: Normal distribution
• Leptokurtic: More peaked; heavy tails (high risk)
• Platykurtic: Flat top; lighter tails (lower risk)

In banking, skewness and kurtosis help in understanding credit score distributions or investment returns behavior.

Dispersion and Coefficient of Variation

Dispersion indicates the spread of values around the central tendency (mean). Key measures include:

• Range = Max – Min
• Variance = Average of squared deviations from the mean
• Standard Deviation (SD) = Square root of variance

Coefficient of Variation (CV) is a standardized measure of dispersion:

CV = (Standard Deviation / Mean) × 100

This is useful when comparing the consistency of two datasets. For example, comparing two branches’ loan recovery percentages – the one with a lower CV is more consistent and less risky.

Probability Concepts for Bankers

Probability represents the likelihood of an event occurring. It ranges between 0 and 1.

There are three main types:

• Classical Probability: Based on theoretical logic (e.g., coin toss)
• Empirical Probability: Based on past data or experiments (e.g., loan default rate)
• Subjective Probability: Based on intuition or experience

Important Probability Rules

• Addition Rule: P(A or B) = P(A) + P(B) – P(A and B)
• Multiplication Rule: P(A and B) = P(A) × P(B|A)

Banking Example: What is the probability that a customer from a high-risk region (Event A) who also has a bad CIBIL score (Event B) will default? Use joint probability to evaluate it.

Correlation and Regression – Predicting Relationships

Correlation quantifies the degree to which two variables are related.

Correlation Coefficient (r) ranges from -1 to +1:

• r = 1: Perfect positive correlation
• r = -1: Perfect negative correlation
• r = 0: No linear correlation

Regression helps in predicting one variable based on another.

Simple Linear Regression Formula: Y = a + bX

• a = Intercept
• b = Slope of the line = r(σy/σx)

Use case: Predicting future loan default % (Y) based on past missed EMI data (X).

[FREE PDF] CAIIB ABM Module A | Key Questions & PYQs with Examples

Sampling and Estimation

Sampling is the process of selecting a subset (sample) from a larger group (population) to estimate characteristics of the whole.

Sampling Methods:

• Simple Random Sampling: Equal chance for each member
• Stratified Sampling: Division into subgroups (strata) for accuracy
• Cluster Sampling: Divide into clusters; sample entire clusters

Estimation involves predicting population parameters from sample statistics.

Point Estimate: A single value (e.g., sample mean)

Interval Estimate: A range of values with confidence levels

Confidence Interval Formula: Mean ± Z(σ/√n)

Use case in banking: Estimating customer satisfaction by surveying a sample of 200 account holders instead of all 10,000.

Probability Distributions – Binomial & Normal

Binomial Distribution: Deals with discrete outcomes like success/failure (e.g., loan approval/rejection)

• Conditions: Fixed number of trials, only 2 outcomes, constant probability
• Formula: P(x) = nCx × p^x × (1-p)^(n-x)

Normal Distribution: Bell-shaped curve – used for continuous data like customer ratings, loan amounts, etc.

• Symmetrical
• Mean = Median = Mode
• 68%-95%-99.7% Rule applies

Use case: In credit scoring models, loan risk data typically follows a normal distribution. This helps banks standardize and automate decisions.

📥 Download PDF – Formula Sheet + Solved Questions

What’s Inside:

• All statistical formulas for Module A
• Concept explanations in bullet format
• Solved examples and MCQs with solutions
• Short tricks for last-minute revision

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💬 Conclusion

Statistics in ABM Module A doesn’t have to be hard. Once you understand the building blocks – from mean and dispersion to probability and sampling – it becomes logical and interesting.

Next steps:

• Revise with our formula sheet daily
• Practice MCQs using mock tests
• Ask doubts in our YouTube comment section
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