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Probability & Statistics Notes

Questions

~2 questions per paper

Difficulty

Medium

Importance

Medium yield for HPCL/NTPC/ONGC

Overview

Probability and Statistics deal with the analysis of random phenomena and data interpretation. In PSU exams, this topic is critical for reliability analysis and quality control, requiring a solid grasp of distribution properties and central tendency metrics.

Random Variables and Probability Measures

A random variable maps outcomes of a random process to numerical values. Mastering the distinction between discrete and continuous variables is essential for selecting the correct probability mass or density function.

  • P(A|B) = P(A intersection B) / P(B)
  • Sum of all probabilities in a distribution equals 1
  • E[X] = summation(x*P(x)) for discrete variables
  • Independent events: P(A intersection B) = P(A)*P(B)

Standard Probability Distributions

Discrete distributions like Binomial and Poisson model counting processes, while the Normal distribution handles continuous data. These are frequently used to solve PSU-level questions involving production failure rates and error analysis.

  • Binomial: P(X=r) = nCr * p^r * q^(n-r)
  • Poisson: P(X=k) = (lambda^k * e^-lambda) / k!
  • Normal distribution follows the bell curve shape
  • Mean of Binomial distribution = np

Measures of Central Tendency and Dispersion

These metrics describe the behavior of a dataset. Understanding mean, median, mode, and variance is vital for interpreting raw data sets provided in technical exam questions.

  • Mean = (sum of values) / N
  • Variance = E[X^2] - (E[X])^2
  • Standard Deviation = square root of Variance
  • Mode is the most frequently occurring value

Formula Sheet

P(A|B) = P(A cap B) / P(B)

E[X] = sum(x * P(x))

Var(X) = E[X^2] - (E[X])^2

P(X=k) = (lambda^k * exp(-lambda)) / k!

Exam Tip

Always verify if the given events are independent or dependent before applying multiplication rules, as this is the most common trap in conditional probability questions.

Common Mistakes

  • Confusing the Binomial distribution (fixed trials) with Poisson (rate-based events)
  • Forgetting to subtract the square of the mean when calculating variance
  • Misinterpreting 'at least' or 'at most' conditions leading to incorrect summation ranges

More Revision Notes

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