Binomial Theorem Class 11

In binomial theorem class 11, chapter 8 provides the information regarding the introduction and basic definitions for binomial theorem in a detailed way. To score good marks in binomial theorem class 11 concepts, go through the given problems here. Solve all class 11 Maths Chapter 8 problems in the book by referring to the examples to clarify your binomial theorem concepts.

Binomial Theorem Class 11 Topics

The topics and sub-topics covered in binomial theorem class 11 are:

• Introduction
• Binomial theorem for positive integral indices
• Binomial theorem for any positive integer n
• Special Cases
• General and Middle Term

Binomial Theorem Class 11 Notes

The binomial theorem states a formula for the expression of the powers of sums. The most succinct version of this formula is shown immediately below:

From the above representation, we can expand (a + b)ⁿ as given below:

(a + b)ⁿ = ⁿC₀ aⁿ + ⁿC₁ a^n-1 b + ⁿC₂ a^n-2 b² + … + ⁿC_n-1 a b^n-1 + ⁿC_n bⁿ

This is the binomial theorem formula for any positive integer n.

Some special cases from the binomial theorem can be written as:

• (x + y)ⁿ = ⁿC₀ xⁿ + ⁿC₁ x^n-1 by+ ⁿC₂ x^n-2 y² + … + ⁿC_n-1 x y^n-1 + ⁿC_n xⁿ
• (x – y)ⁿ = ⁿC₀ xⁿ – ⁿC₁ x^n-1 by + ⁿC₂ x^n-2 y² + … + (-1)^n nC_n xⁿ
• (1 – x)ⁿ = ⁿC₀ – ⁿC₁ x + ⁿC₂ x² – …. (-1)^{n n}C_n xⁿ

Also, ⁿC₀ = ⁿC_n = 1

However, there will be (n + 1) terms in the expansion of (a + b)ⁿ.

General and Middle terms

Consider the binomial expansion, (a + b)ⁿ = ⁿC₀ aⁿ + ⁿC₁ a^n-1 b + ⁿC₂ a^n-2 b² + … + ⁿC_n-1 a b^n-1 + ⁿC_n bⁿ

Here,

First term = ⁿC₀ aⁿ

Second term = ⁿC₁ a^n-1 b

Third term = ⁿC₂ a^n-2 b²

Similarly, we can write the (r + 1)th term as:

ⁿC_r a^n-r b^r

This is the general term of the given expansion.

Thus, (r + 1)Th term, i.e. T_r+1 = ⁿC_r a^n-r b^r is called the middle term of the expansion (a + b)ⁿ.

Learn more about the general and middle terms of the binomial expansion here.

Binomial Theorem Class 11 Examples

Example 1: Expand: [x² + (3/x)]⁴, x ≠ 0

Solution:

[x² + (3/x)]⁴

Using binomial theorem,

[x² + (3/x)]⁴ = ⁴C₀ (x²)⁴ + ⁴C₁ (x²)³ (3/x) + ⁴C₂ (x²)² (3/x)² + ⁴C₃ (x²) (3/x)³ + ⁴C₄ (3/x)⁴

= x⁸ + 4 x⁶ (3/x) + 6 x⁴ (9/x²) + 4 x² (27/x³) + (81/x⁴)

= x⁸ + 12x⁵ + 54x² + (108/x) + (81/x⁴)

Example 2: Compute (98)⁵

Solution:

Let us write the number 98 as the difference between the two numbers.

98 = 100 – 2

So, (98)⁵ = (100 – 2)⁵

Using binomial expansion,

(98)⁵ = ⁵C₀ (100)⁵ – ⁵C₁ (100)⁴ (2) + ⁵C₂ (100)³ (2)² – ⁵C₃ (100)² (2)³ + ⁵C₄ (100) (2)⁴ – ⁵C₅ (2)⁵

=  10000000000 – 5 × 100000000 × 2 + 10 × 1000000 × 4 – 10 ×10000 × 8 + 5 × 100 × 16 – 32

= 10040008000 – 1000800032 

= 9039207968

Example 3: Find the coefficient of x⁶y³ in the expansion (x + 2y)⁹.

Solution:

Let x⁶y³ be the (r + 1)th term of the expansion (x + 2y)⁹.

So,

T_r+1 = ⁹C_r x^9-r (2y)^r

x⁶y³ = ⁹C_r x^9-r 2^r y^r

By comparing the indices of x and y, we get r = 3.

Coefficient of x⁶y³ = ⁹C₃ (2)³

= 84 × 8

= 672

Therefore, the coefficient of x⁶y³ in the expansion (x + 2y)⁹ is 672.

Example 4: The second, third and fourth terms in the binomial expansion (x + a)ⁿ are 240, 720 and 1080, respectively. Find x, a and n.

Solution:

Given,

Second term = T₂ = 240

Third term = T₃ = 720

Fourth term = T₄ = 1080

Now,

T₂ = T₁₊₁ = ⁿC₁ x^n-1 (a)

ⁿC₁ x^n-1 a = 240….(i)

Similarly,

ⁿC₂ x^n-2 a² = 720….(ii)

ⁿC₃ x^n-3 a³ = 1080….(iii)

Dividing (ii) by (i),

[ⁿC₂ x^n-2 a²]/ [ⁿC₁ x^n-1 a] = 720/240

[(n – 1)!/(n – 2)!].(a/x) = 6

(n – 1) (a/x) = 6

a/x = 6/(n – 1)….(iv)

Similarly, by dividing (iii) by (ii),

a/x = 9/[2(n – 2)]….(v)

From (iv) and (v),

6/(n – 1) = 9/[2(n – 2)]

12(n – 2) = 9(n – 1)

12n – 24 = 9n – 9

12n – 9n = 24 – 9

3n = 15

n = 5

Subsituting n = 5 in (i),

⁵C₁ x⁴ a = 240

ax⁴ = 240/5

ax⁴ = 48….(vi)

Substituting n = 5 in (iv),

a/x = 6/(5 – 1)

a/x = 6/4 = 3/2

a = (3x/2)

Putting this oin equ (vi), we get;

(3x/2) x⁴ = 48

x⁵ = 32

x⁵ = 25

⇒ x = 2

Substituting x = 2 in a = (3x/2)

a = 3(2)/2 = 3

Therefore, x = 2, a = 3 and n = 5.

Practice Problems

1. The coefficients of three consecutive terms in the expansion of (1 + a)ⁿ are in the ratio1: 7 : 42. Find n.
2. What is the middle term in the expansion of [3x – (x³/6)]⁷?
3. If the coefficients of a^r-1, a^r and a^r+1 in the expansion of (1 + a)ⁿ are in arithmetic progression, prove that n² – n(4r + 1) + 4r² – 2 = 0.

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