Basic Counting & Binomial Theorem

1. Core Concept

Permutations & Combinations (P&C) is the mathematics of counting without actually listing every possibility. Permutations deal with arrangements (Order matters!), while Combinations deal with selections (Order does not matter!). The Binomial Theorem provides a fast algebraic method to expand (x+y)ⁿ using combination formulas as coefficients.

2. Key Formulas

Fundamental Principles:

AND (Multiplication): If task A can be done in m ways and task B in n ways, both occur in m × n ways.
OR (Addition): If task A or task B can be done (mutually exclusive), they occur in m + n ways.

n! = n × (n-1) × ... × 1 | 0! = 1

ⁿP_r = n! / (n-r)!

Permutations: Arrangements.

ⁿC_r = n! / (r!(n-r)!)

Combinations: Selections (Order does not matter).

Why ⁿC_r Formula Works

We first arrange r objects from n (ⁿP_r ways), but since order does not matter in combinations, each selection of r objects is overcounted r! times. Hence:

ⁿC_r = ⁿP_r / r!

ⁿP_r = r! × ⁿC_r

The Bridge: First select r, then arrange in r! ways.

Binomial Theorem:

(x + y)ⁿ = ∑_r=0ⁿ ⁿC_r x^n−r y^r

Full Binomial Expansion for positive integer n.

T_r+1 = ⁿC_r x^n-r y^r

General Term: Used to find specific coefficients (Index r starts from 0).

Middle Term Concept

Total number of terms in (x+y)ⁿ is (n + 1).

If n is even → One middle term = T_(n/2)+1
If n is odd → Two middle terms = T_(n+1)/2 and T_(n+3)/2

3. Important Results

Symmetry: ⁿC_r = ⁿC_n-r
Pascal’s Identity: ⁿC_r + ⁿC_r-1 = ⁿ⁺¹C_r
Sum of Binomial Coefficients: ⁿC₀ + ⁿC₁ + ... + ⁿC_n = 2ⁿ
Circular Permutations: Arrange n objects in a circle = (n-1)!. (If necklace: (n-1)! / 2).
Beggar's Method (Stars and Bars): Distributing n identical items among r distinct people = ^n+r-1C_r-1.

4. Conceptual Insights

Grouping/Division:

Dividing m+n+p objects into three unequal groups: (m+n+p)! / (m!n!p!). If group sizes are equal (e.g., three groups of size m), divide by 3! to account for identical groups: (3m)! / ((m!)³ × 3!).

Pascal's Triangle:

Each coefficient in an expansion (x+y)ⁿ is simply the sum of the two directly above it in the previous row.

5. Common Mistakes

P vs C Confusion: Use Combinations (C) for committees, teams, or hands of cards. Use Permutations (P) for passwords, seating arrangements, or words.
Index Trap: The General Term formula T_r+1 gives the (r+1)^th term, not the r^th term. To find the 5th term, plug in r=4.
Middle Term Trap: If n is odd, there are 2 middle terms: T_(n+1)/2 and T_(n+3)/2.

6. Example Applications

Term Independent of x:

Find the term without x in (x² + 1/x)⁹.

Method: Write T_r+1 = ⁹C_r(x²)^9-r(x^-1)^r. The power of x is 18 - 2r - r = 18 - 3r. Set to 0 &implies; r=6. The term is T₇ = ⁹C₆.

Dictionary Rank:

Find rank of "MATH" (A, H, M, T).
Words starting with A: 3! = 6
Words starting with H: 3! = 6
Words starting with M: Next letter must be A. Then H, T (MATH) = 1st word.
Rank = 6 + 6 + 1 = 13.

7. IAT Exam Focus Points

Key Exam Focus:

Beggar's Method: Be ready for x + y + z = 10 with constraints like x≥1, y≥2. Distribute minimums first!
Repeated Letters: Rank of "INDIA" or "BANANA". Don't forget to divide by factorials of repeating letters.
Coefficient Extraction: Finding coefficient of x^k in (1+x)^m(1-x)ⁿ.
Binomial Series: Practice using x=1, x=-1, x=i or calculus techniques on (1+x)ⁿ to evaluate summation series.
Derangement (D_n): Number of ways objects can none occupy their original spot. D_n = n![1 - 1/1! + 1/2! - 1/3! + ... + (-1)ⁿ/n!].

8. Practice Mock Test

Ready to test your knowledge?

Take a quick 15-question assessment specifically designed for P&C and Binomial Theorem. Challenge yourself with IAT-level questions.

Start Practice Mock

Basic Counting Techniques & Binomial Theorem