NCERT Solutions For Class 11 Math Chapter – 8 Miscelleneous Exercise

NCERT SolutoIns For Class 11 Math Chapter – 8 Miscelleneous Exercise

1. Find a, b and n in the expansion of (a + b)ⁿ if the first three terms of the expansion are 729, 7290 and 30375, respectively.

Solution:

We know that (r + 1)^th term, (T_r+1), in the binomial expansion of (a + b)ⁿ is given by

T_r+1 = ⁿC_r a^n-t b^r

The first three terms of the expansion are given as 729, 7290 and 30375 respectively. Then we have,

T₁ = ⁿC₀ a^n-0 b⁰ = aⁿ = 729….. 1

T₂ = ⁿC₁ a^n-1 b¹= na^n-1 b = 7290…. 2

T₃ = ⁿC₂ a^n-2 b² = {n (n -1)/2 }a^n-2 b² = 30375……3

Dividing 2 by 1 we get

$\frac{na^{n-1}b}{a^{n}} = \frac{7290}{729} \\ \frac{nb}{a} = 10$

Dividing 3 by 2 we get

$\frac{n(n-1)a^{n-2}b^{2}}{2na^{n-1}b} = \frac{30375}{7290} \\ \frac{(n-1)b}{2a} = \frac{30375}{7290} \\ \frac{(n-1)b}{a} = \frac{30375}{7290} \times 2 =\frac{25}{3} \\ \frac{(nb)}{a} -\frac{b}{a} = \frac{25}{3} \\ 10 -\frac{b}{a} = \frac{25}{3} \\ \frac{b}{a} = 10 – \frac{25}{3} = \frac{5}{3}$

From 4 and 5 we have

n. 5/3 = 10

n = 6

Substituting n = 6 in 1 we get

a⁶ = 729

a = 3

From 5 we have, b/3 = 5/3

b = 5

Thus a = 3, b = 5 and n = 76

2. Find a if the coefficients of x² and x³ in the expansion of (3 + a x)⁹ are equal.

Solution:

NCERT Solutions for Class 11 Maths Chapter 8 Binomial Theorem Image 32

NCERT Solutions for Class 11 Maths Chapter 8 Binomial Theorem Image 33

NCERT Solutions for Class 11 Maths Chapter 8 Binomial Theorem Image 34

3. Find the coefficient of x⁵ in the product (1 + 2x)⁶ (1 – x)⁷ using binomial theorem.

Solution:

(1 + 2x)⁶ = ⁶C₀+ ⁶C₁ (2x) + ⁶C₂ (2x)² + ⁶C₃ (2x)³ + ⁶C₄ (2x)⁴ + ⁶C₅ (2x)⁵ + ⁶C₆ (2x)⁶

= 1 + 6 (2x) + 15 (2x)² + 20 (2x)³ + 15 (2x)⁴ + 6 (2x)⁵ + (2x)⁶

= 1 + 12 x + 60x² + 160 x³ + 240 x⁴ + 192 x⁵ + 64x⁶

(1 – x)⁷ = ⁷C₀ – ⁷C₁ (x) + ⁷C₂(x)² – ⁷C₃(x)³ + ⁷C₄(x)⁴ – ⁷C₅(x)⁵ + ⁷C₆(x)⁶– ⁷C₇(x)⁷

= 1 – 7x + 21x² – 35x³ + 35x⁴ – 21x⁵ + 7x⁶ – x⁷

(1 + 2x)⁶ (1 – x)⁷ = (1 + 12 x + 60x² + 160 x³ + 240 x⁴ + 192 x⁵ + 64x⁶) (1 – 7x + 21x² – 35x³ + 35x⁴ – 21x⁵ + 7x⁶ – x⁷)

192 – 21 = 171

Thus, the coefficient of x⁵ in the expression (1+2x)⁶(1-x)7 is 171.

4. If a and b are distinct integers, prove that a – b is a factor of aⁿ – bⁿ, whenever n is a positive integer. [Hint write aⁿ = (a – b + b)ⁿ and expand]

Solution:

In order to prove that (a – b) is a factor of (aⁿ – bⁿ), it has to be proved that

aⁿ – bⁿ = k (a – b) where k is some natural number.

a can be written as a = a – b + b

aⁿ = (a – b + b)ⁿ= [(a – b) + b]ⁿ

= ⁿC₀ (a – b)ⁿ + ⁿC₁ (a – b)^n-1b + …… + ⁿC _n bⁿ

aⁿ – bⁿ = (a – b) [(a –b)^n-1 + ⁿC₁ (a – b)^n-1b + …… + ⁿC _n bⁿ]

aⁿ – bⁿ = (a – b) k

Where k = [(a –b)^n-1 + ⁿC₁ (a – b)^n-1b + …… + ⁿC _n bⁿ] is a natural number

This shows that (a – b) is a factor of (aⁿ – bⁿ), where n is positive integer.

5. Evaluate

Solution:

Using binomial theorem the expression (a + b)⁶ and (a – b)⁶, can be expanded

(a + b)⁶ = ⁶C₀ a⁶ + ⁶C₁ a⁵ b + ⁶C₂ a⁴ b² + ⁶C₃ a³ b³ + ⁶C₄ a² b⁴ + ⁶C₅ a b⁵+ ⁶C₆ b⁶

(a – b)⁶= ⁶C₀ a⁶ – ⁶C₁ a⁵ b + ⁶C₂ a⁴ b² – ⁶C₃ a³ b³ + ⁶C₄ a² b⁴ – ⁶C₅ a b⁵+ ⁶C₆ b⁶

Now (a + b)⁶ – (a – b)⁶ =⁶C₀ a⁶ + ⁶C₁ a⁵ b + ⁶C₂ a⁴ b² + ⁶C₃ a³ b³ + ⁶C₄ a² b⁴ + ⁶C₅ a b⁵+ ⁶C₆ b⁶ – [⁶C₀ a⁶ – ⁶C₁ a⁵ b + ⁶C₂ a⁴ b² – ⁶C₃ a³ b³ + ⁶C₄ a² b⁴ – ⁶C₅ a b⁵+ ⁶C₆ b⁶]