RD Chapter 18 Binomial Theorem Ex 18.2 Solutions

Question - 11 : - Does the expansion of (2x² – 1/x) contain any term involving x9?

Answer - 11 : -

Given:

(2x² –1/x)

If x⁹ occursat the (r + 1)th term in the given expression.

Then, we have:

T_r+1 = ⁿC_r x^n-r a^r

For this term tocontain x⁹, we must have

40 – 3r = 9

3r = 40 – 9

3r = 31

r = 31/3

It is not possible,since r is not an integer.

Hence, there is noterm with x⁹ in the given expansion.

Question - 12 : - Show that the expansion of (x2 + 1/x)¹² does not contain any term involving x^-1.

Answer - 12 : -

Given:

(x² +1/x)¹²

If x^-1 occursat the (r + 1)th term in the given expression.

Then, we have:

T_r+1 = ⁿC_r x^n-r a^r

For this term tocontain x^-1, we must have

24 – 3r = -1

3r = 24 + 1

3r = 25

r = 25/3

It is not possible,since r is not an integer.

Hence, there is noterm with x^-1 in the given expansion.

Question - 13 : -
Find the middle term in the expansion of:
(i) (2/3x – 3/2x)²⁰
(ii) (a/x + bx)¹²
(iii) (x² – 2/x)¹⁰
(iv) (x/a – a/x)¹⁰

Answer - 13 : -

(i) (2/3x – 3/2x)²⁰

We have,

(2/3x – 3/2x)²⁰ where,n = 20 (even number)

So the middle term is(n/2 + 1) = (20/2 + 1) = (10 + 1) = 11. ie., 11^th term

Now,

T₁₁ =T₁₀₊₁

= ²⁰C₁₀ (2/3x)^20-10 (3/2x)¹⁰

= ²⁰C₁₀ 2¹⁰/3¹⁰ ×3¹⁰/2¹⁰ x^10-10

= ²⁰C₁₀

Hence, the middle termis ²⁰C₁₀.

(ii) (a/x + bx)¹²

We have,

(a/x + bx)¹² where,n = 12 (even number)

So the middle term is(n/2 + 1) = (12/2 + 1) = (6 + 1) = 7. ie., 7^th term

Now,

T₇ = T₆₊₁

= 924 a⁶b⁶

Hence, the middle termis 924 a⁶b⁶.

(iii) (x² –2/x)¹⁰

We have,

(x² –2/x)¹⁰ where, n = 10 (even number)

So the middle term is(n/2 + 1) = (10/2 + 1) = (5 + 1) = 6. ie., 6^th term

Now,

T₆ = T₅₊₁

Hence, the middle termis -8064x⁵.

(iv) (x/a – a/x)¹⁰

We have,

(x/a – a/x)¹⁰ where,n = 10 (even number)

So the middle term is(n/2 + 1) = (10/2 + 1) = (5 + 1) = 6. ie., 6^th term

Now,

T₆ = T₅₊₁

Hence, the middle termis -252.

Question - 14 : -
Find the middle terms in the expansion of:
(i) (3x – x³/6)⁹
(ii) (2x² – 1/x)⁷
(iii) (3x – 2/x²)¹⁵
(iv) (x⁴ – 1/x³)¹¹

Answer - 14 : -

(i) (3x – x³/6)⁹

We have,

(3x – x³/6)⁹ where,n = 9 (odd number)

So the middle termsare ((n+1)/2) = ((9+1)/2) = 10/2 = 5 and

((n+1)/2 + 1) =((9+1)/2 + 1) = (10/2 + 1) = (5 + 1) = 6

The terms are 5^th and6^th.

Now,

T₅ = T₄₊₁

Hence, the middle termare 189/8 x¹⁷ and -21/16 x¹⁹.

(ii) (2x² –1/x)⁷

We have,

(2x² –1/x)⁷ where, n = 7 (odd number)

So the middle termsare ((n+1)/2) = ((7+1)/2) = 8/2 = 4 and

((n+1)/2 + 1) =((7+1)/2 + 1) = (8/2 + 1) = (4 + 1) = 5

The terms are 4^th and5^th.

Now,

Hence, the middle termare -560x⁵ and 280x².

(iii) (3x – 2/x²)¹⁵

We have,

(3x – 2/x²)¹⁵ where,n = 15 (odd number)

So the middle termsare ((n+1)/2) = ((15+1)/2) = 16/2 = 8 and

((n+1)/2 + 1) =((15+1)/2 + 1) = (16/2 + 1) = (8 + 1) = 9

The terms are 8^th and9^th.

Now,

Hence, the middle termare (-6435×3⁸×2⁷)/x⁶ and (6435×3⁷×2⁸)/x⁹.

(iv) (x⁴ –1/x³)¹¹

We have,

(x⁴ –1/x³)¹¹

where, n = 11 (oddnumber)

So the middle termsare ((n+1)/2) = ((11+1)/2) = 12/2 = 6 and

((n+1)/2 + 1) =((11+1)/2 + 1) = (12/2 + 1) = (6 + 1) = 7

The terms are 6^th and7^th.

Now,

T₇ = T₆₊₁

Hence, the middle termare -462x⁹ and 462x².

Question - 15 : -
Find the middle terms in the expansion of:
(i) (x – 1/x)¹⁰
(ii) (1 – 2x + x²)ⁿ
(iii) (1 + 3x + 3x² + x³)²ⁿ
(iv) (2x – x²/4)⁹
(v) (x – 1/x)²ⁿ⁺¹
(vi) (x/3 + 9y)¹⁰
(vii) (3 – x³/6)⁷
(viii) (2ax – b/x²)¹²
(ix) (p/x + x/p)⁹
(x) (x/a – a/x)¹⁰

Answer - 15 : -

(i) (x – 1/x)¹⁰

We have,

(x – 1/x)¹⁰ where,n = 10 (even number)

So the middle term is(n/2 + 1) = (10/2 + 1) = (5 + 1) = 6. ie., 6^th term

Now,

T₆ = T₅₊₁

Hence, the middle termis -252.

(ii) (1 – 2x + x²)ⁿ

We have,

(1 – 2x + x²)ⁿ =(1 – x)²ⁿ where, n is an even number.

So the middle term is(2n/2 + 1) = (n + 1)th term.

Now,

T_n = T_n+1

= ²ⁿC_n (-1)ⁿ (x)ⁿ

= (2n)!/(n!)² (-1)ⁿ xⁿ

Hence, the middle termis (2n)!/(n!)² (-1)ⁿ xⁿ.

(iii) (1 + 3x + 3x² +x³)²ⁿ

We have,

(1 + 3x + 3x² +x³)²ⁿ = (1 + x)⁶ⁿ where, n is aneven number.

So the middle term is(n/2 + 1) = (6n/2 + 1) = (3n + 1)th term.

Now,

T_2n =T_3n+1

= ⁶ⁿC_3n x³ⁿ

= (6n)!/(3n!)² x³ⁿ

Hence, the middle termis (6n)!/(3n!)² x³ⁿ.

(iv) (2x – x²/4)⁹

We have,

(2x – x²/4)⁹ where,n = 9 (odd number)

So the middle termsare ((n+1)/2) = ((9+1)/2) = 10/2 = 5 and

((n+1)/2 + 1) =((9+1)/2 + 1) = (10/2 + 1) = (5 + 1) = 6

The terms are 5^th and6^th.

Now,

T₅ = T₄₊₁

And,

T₆ = T₅₊₁

Hence, the middle termis 63/4 x¹³ and -63/32 x¹⁴.

(v) (x – 1/x)²ⁿ⁺¹

We have,

(x – 1/x)²ⁿ⁺¹ where,n = (2n + 1) is an (odd number)

So the middle termsare ((n+1)/2) = ((2n+1+1)/2) = (2n+2)/2 = (n + 1) and

((n+1)/2 + 1) =((2n+1+1)/2 + 1) = ((2n+2)/2 + 1) = (n + 1 + 1) = (n + 2)

The terms are (n + 1)^th and(n + 2)^th.

Now,

T_n = T_n+1

And,

T_n+2 =T_n+1+1

Hence, the middle termis (-1)ⁿ.²ⁿ⁺¹C_n x and (-1)ⁿ⁺¹.²ⁿ⁺¹C_n (1/x).

(vi) (x/3 + 9y)¹⁰

We have,

(x/3 + 9y)¹⁰ where,n = 10 is an even number.

So the middle term is(n/2 + 1) = (10/2 + 1) = (5 + 1) = 6. i.e., 6th term.

Now,

T₆ = T₅₊₁

Hence, the middle termis 61236x⁵y⁵.

(vii) (3 – x³/6)⁷

We have,

(3 – x³/6)⁷ where,n = 7 (odd number).

So the middle termsare ((n+1)/2) = ((7+1)/2) = 8/2 = 4 and

((n+1)/2 + 1) =((7+1)/2 + 1) = (8/2 + 1) = (4 + 1) = 5

The terms are 4^th and5^th.

Now,

T₄ = T₃₊₁

= ⁷C₃ (3)^7-3 (-x³/6)³

= -105/8 x⁹

And,

T₅ = T₄₊₁

= ⁹C₄ (3)^9-4 (-x³/6)⁴

Hence, the middleterms are -105/8 x⁹ and 35/48 x¹².

(viii) (2ax – b/x²)¹²

We have,

(2ax – b/x²)¹² where,n = 12 is an even number.

So the middle term is(n/2 + 1) = (12/2 + 1) = (6 + 1) = 7. i.e., 7th term.

Now,

T₇ = T₆₊₁

Hence, the middle termis (59136a⁶b⁶)/x⁶.

(ix) (p/x + x/p)⁹

We have,

(p/x + x/p)⁹ where,n = 9 (odd number).

So the middle termsare ((n+1)/2) = ((9+1)/2) = 10/2 = 5 and

((n+1)/2 + 1) =((9+1)/2 + 1) = (10/2 + 1) = (5 + 1) = 6

The terms are 5^th and6^th.

Now,

T₅ = T₄₊₁

And,

T₆ = T₅₊₁

= ⁹C₅ (p/x)^9-5 (x/p)⁵

Hence, the middleterms are 126p/x and 126x/p.

(x) (x/a – a/x)¹⁰

We have,

(x/a – a/x)¹⁰ where,n = 10 (even number)

So the middle term is(n/2 + 1) = (10/2 + 1) = (5 + 1) = 6. ie., 6^th term

Now,

T₆ = T₅₊₁

Hence, the middle termis -252.

Question - 16 : -
Find the term independent of x in the expansion of the followingexpressions:
(i) (3/2 x² – 1/3x)⁹
(ii) (2x + 1/3x²)⁹
(iii) (2x² – 3/x³)²⁵
(iv) (3x – 2/x²)¹⁵
(v) ((√x/3) + √3/2x²)¹⁰
(vi) (x – 1/x²)³ⁿ
(vii) (1/2 x^1/3 + x^-1/5)⁸
(viii) (1 + x + 2x³) (3/2x² – 3/3x)⁹
(ix) (∛x + 1/2∛x)¹⁸, x> 0
(x) (3/2x² – 1/3x)⁶

Answer - 16 : -

(i) (3/2 x² –1/3x)⁹

Given:

(3/2 x² –1/3x)⁹

If (r + 1)th termin the given expression is independent of x.

Then, we have:

T_r+1 = ⁿC_r x^n-r a^r

For this term to beindependent of x, we must have

18 – 3r = 0

3r = 18

r = 18/3

= 6

So, the required termis 7^th term.

We have,

T₇ = T₆₊₁

= ⁹C₆ ×(3^9-12)/(2^9-6)

= (9×8×7)/(3×2) × 3^-3 ×2^-3

= 7/18

Hence, the termindependent of x is 7/18.

(ii) (2x + 1/3x²)⁹

Given:

(2x + 1/3x²)⁹

If (r + 1)th termin the given expression is independent of x.

Then, we have:

T_r+1 = ⁿC_r x^n-r a^r

For this term to beindependent of x, we must have

9 – 3r = 0

3r = 9

r = 9/3

= 3

So, the required termis 4^th term.

We have,

T₄ = T₃₊₁

= ⁹C₃ ×(2⁶)/(3³)

= ⁹C₃ ×64/27

Hence, the termindependent of x is ⁹C₃ × 64/27.

(iii) (2x² –3/x³)²⁵

Given:

(2x² –3/x³)²⁵

If (r + 1)th termin the given expression is independent of x.

Then, we have:

T_r+1 = ⁿC_r x^n-r a^r

= ²⁵C_r (2x²)^25-r (-3/x³)^r

= (-1)^r ²⁵C_r×2^25-r × 3^r x^50-2r-3r

For this term to beindependent of x, we must have

50 – 5r = 0

5r = 50

r = 50/5

= 10

So, the required termis 11^th term.

We have,

T₁₁ =T₁₀₊₁

= (-1)¹⁰ ²⁵C₁₀ ×2^25-10 × 3¹⁰

= ²⁵C₁₀ (2¹⁵ ×3¹⁰)

Hence, the termindependent of x is ²⁵C₁₀ (2¹⁵ ×3¹⁰).

(iv) (3x – 2/x²)¹⁵

Given:

(3x – 2/x²)¹⁵

If (r + 1)th termin the given expression is independent of x.

Then, we have:

T_r+1 = ⁿC_r x^n-r a^r

= ¹⁵C_r (3x)^15-r (-2/x²)^r

= (-1)^r ¹⁵C_r ×3^15-r × 2^r x^15-r-2r

For this term to beindependent of x, we must have

15 – 3r = 0

3r = 15

r = 15/3

= 5

So, the required termis 6^th term.

We have,

T₆ = T₅₊₁

= (-1)⁵ ¹⁵C₅ ×3^15-5 × 2⁵

= -3003 × 3¹⁰ ×2⁵

Hence, the termindependent of x is -3003 × 3¹⁰ × 2⁵.

(v) ((√x/3) + √3/2x²)¹⁰

Given:

((√x/3) + √3/2x²)¹⁰

If (r + 1)th termin the given expression is independent of x.

Then, we have:

T_r+1 = ⁿC_r x^n-r a^r

For this term to beindependent of x, we must have

(10-r)/2 – 2r = 0

10 – 5r = 0

5r = 10

r = 10/5

= 2

So, the required termis 3^rd term.

We have,

T₃ = T₂₊₁

Hence, the termindependent of x is 5/4.

(vi) (x – 1/x²)³ⁿ

Given:

(x – 1/x²)³ⁿ

If (r + 1)th termin the given expression is independent of x.

Then, we have:

T_r+1 = ⁿC_r x^n-r a^r

= ³ⁿC_r x^3n-r (-1/x²)^r

= (-1)^r ³ⁿC_r x^3n-r-2r

For this term to beindependent of x, we must have

3n – 3r = 0

r = n

So, the required termis (n+1)th term.

We have,

(-1)ⁿ ³ⁿC_n

Hence, the termindependent of x is (-1)ⁿ ³ⁿC_n

(vii) (1/2 x^1/3 +x^-1/5)⁸

Given:

(1/2 x^1/3 +x^-1/5)⁸

If (r + 1)th termin the given expression is independent of x.

Then, we have:

T_r+1 = ⁿC_r x^n-r a^r

For this term to beindependent of x, we must have

(8-r)/3 – r/5 = 0

(40 – 5r – 3r)/15 = 0

40 – 5r – 3r = 0

40 – 8r = 0

8r = 40

r = 40/8

= 5

So, the required termis 6th term.

We have,

T₆ = T₅₊₁

= ⁸C₅ ×1/(2^8-5)

= (8×7×6)/(3×2×8)

= 7

Hence, the termindependent of x is 7.

(viii) (1 + x + 2x³)(3/2x² – 3/3x)⁹

Given:

(1 + x + 2x³)(3/2x² – 3/3x)⁹

If (r + 1)th termin the given expression is independent of x.

Then, we have:

(1 + x + 2x³)(3/2x² – 3/3x)⁹ =

= 7/18 – 2/27

= (189 – 36)/486

= 153/486 (divide by9)

= 17/54

Hence, the termindependent of x is 17/54.

(ix) (∛x + 1/2∛x)¹⁸, x > 0

Given:

(∛x + 1/2∛x)¹⁸, x > 0

If (r + 1)th termin the given expression is independent of x.

Then, we have:

T_r+1 = ⁿC_r x^n-r a^r

For this term to beindependent of r, we must have

(18-r)/3 – r/3 = 0

(18 – r – r)/3 = 0

18 – 2r = 0

2r = 18

r = 18/2

= 9

So, the required termis 10th term.

We have,

T₁₀ =T₉₊₁

= ¹⁸C₉ ×1/2⁹

Hence, the termindependent of x is ¹⁸C₉ × 1/2⁹.

(x) (3/2x² –1/3x)⁶

Given:

(3/2x² –1/3x)⁶

If (r + 1)th termin the given expression is independent of x.

Then, we have:

T_r+1 = ⁿC_r x^n-r a^r

For this term to beindependent of r, we must have

12 – 3r = 0

3r = 12

r = 12/3

= 4

So, the required termis 5th term.

We have,

T₅ = T₄₊₁

Hence, the termindependent of x is 5/12.

Question - 17 : -
If the coefficients of (2r + 4)th and (r – 2)th terms in the expansion of(1 + x)¹⁸ are equal, find r.

Answer - 17 : -

Given:

(1 + x)¹⁸

We know, thecoefficient of the r term in the expansion of (1 + x)ⁿ is ⁿC_r-1

So, the coefficientsof the (2r + 4) and (r – 2) terms in the given expansion are ¹⁸C_2r+4-1 and ¹⁸C_r-2-1

For these coefficientsto be equal, we must have

¹⁸C_2r+4-1 = ¹⁸C_r-2-1

¹⁸C_2r+3 = ¹⁸C_r-3

2r + 3 = r – 3 (or) 2r+ 3 + r – 3 = 18 [Since, ⁿC_r = ⁿC_s =>r = s (or) r + s = n]

2r – r = -3 – 3 (or)3r = 18 – 3 + 3

r = -6 (or) 3r = 18

r = -6 (or) r = 18/3

r = -6 (or) r = 6

∴ r = 6 [since, rshould be a positive integer.]

Question - 18 : -
If the coefficients of (2r + 1)th term and (r + 2)th term inthe expansion of (1 + x)⁴³ are equal, find r.

Answer - 18 : -

Given:

(1 + x)⁴³

We know, thecoefficient of the r term in the expansion of (1 + x)ⁿ is ⁿC_r-1

So, the coefficientsof the (2r + 1) and (r + 2) terms in the given expansion are ⁴³C_2r+1-1 and ⁴³C_r+2-1

For these coefficientsto be equal, we must have

⁴³C_2r+1-1 = ⁴³C_r+2-1

⁴³C_2r = ⁴³C_r+1

2r = r + 1 (or) 2r + r+ 1 = 43 [Since, ⁿC_r = ⁿC_s =>r = s (or) r + s = n]

2r – r = 1 (or) 3r + 1= 43

r = 1 (or) 3r = 43 – 1

r = 1 (or) 3r = 42

r = 1 (or) r = 42/3

r = 1 (or) r = 14

∴ r = 14 [since, value‘1’ gives the same term]

Question - 19 : -
Prove that the coefficient of (r + 1)th term in the expansion of (1+ x)^{n + 1} is equal to the sum of the coefficientsof rth and (r + 1)th terms in the expansion of (1 + x)ⁿ.

Answer - 19 : -

We know, thecoefficients of (r + 1)th term in (1 + x)ⁿ⁺¹ is ⁿ⁺¹C_r

So, sum of thecoefficients of the rth and (r + 1)th terms in (1 + x)ⁿ is

(1 + x)ⁿ = ⁿC_r-1 + ⁿC_r

= ⁿ⁺¹C_r [since, ⁿC_r+1 + ⁿC_r = ⁿ⁺¹C_r+1]

Hence proved.

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