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Binomial Theorem Class 11 MCQs Questions with Answers
Students are advised to solve the Binomial Theorem Multiple Choice Questions of Class 11 Maths to know different concepts. Practicing the MCQ Questions on Binomial Theorem Class 11 with answers will boost your confidence thereby helping you score well in the exam.
Explore numerous MCQ Questions of Binomial Theorem Class 11 with answers provided with detailed solutions by looking below.
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Question 1.
The number (101)100 – 1 is divisible by
(a) 100
(b) 1000
(c) 10000
(d) All the above
Answer
Answer: (d) All the above
Given, (101)100 – 1 = (1 + 100)100 – 1
= [100C0 + 100C1 × 100 + 100C2 × (100)² + ……….+ 100C100 × (100)100] – 1
= 1 + [100C1 × 100 + 100C2 × (100)² + ……….+ 100C100 × (100)100] – 1
= 100C1 × 100 + 100C2 × (100)² + ……….+ 100C100 × (100)100
= 100 × 100 + 100C2 × (100)² + ……….+ 100C100 × (100)100
= (100)² + 100C2 × (100)² + ……….+ 100C100 × (100)100
= (100)² [1 + 100C2 + ……….+ 100C100 × (100)98]
Which is divisible by 100, 1000 and 10000
Question 2.
The value of -1° is
(a) 1
(b) -1
(c) 0
(d) None of these
Answer
Answer: (b) -1
First we find 10
So, 10 = 1
Now, -10 = -1
Question 3.
If the fourth term in the expansion (ax + 1/x)ⁿ is 5/2, then the value of x is
(a) 4
(b) 6
(c) 8
(d) 5
Answer
Answer: (b) 6
Given, T4 = 5/2
⇒ T3+1 = 5/2
⇒ ⁿC3 × (ax)n-3 × (1/x)³ = 5/2
⇒ ⁿC3 × an-3 × xn-3 × (1/x)² = 5/2
Clearly, RHS is independent of x,
So, n – 6 = 0
⇒ n = 6
Question 4.
The number 111111 ………….. 1 (91 times) is
(a) not an odd number
(b) none of these
(c) not a prime
(d) an even number
Answer
Answer: (c) not a prime
111111 ………….. 1 (91 times) = 91 × 1 = 91, which is divisible by 7 and 13.
So, it is not a prime number.
Question 5.
In the expansion of (a + b)ⁿ, if n is even then the middle term is
(a) (n/2 + 1)th term
(b) (n/2)th term
(c) nth term
(d) (n/2 – 1)th term
Answer
Answer: (a) (n/2 + 1)th term
In the expansion of (a + b)ⁿ
if n is even then the middle term is (n/2 + 1)th term
Question 6.
The number of terms in the expansion (2x + 3y – 4z)ⁿ is
(a) n + 1
(b) n + 3
(c) {(n + 1) × (n + 2)}/2
(d) None of these
Answer
Answer: (c) {(n + 1) × (n + 2)}/2
Total number of terms in (2x + 3y – 4z)ⁿ is
= n+3-1C3-1
= n+2C2
= {(n + 1) × (n + 2)}/2
Question 7.
If A and B are the coefficient of xⁿ in the expansion (1 + x)2n and (1 + x)2n-1 respectively, then A/B equals
(a) 1
(b) 2
(c) 1/2
(d) 1/n
Answer
Answer: (b) 2
A/B = ²ⁿCn/ 2n-1Cn
= {(2n)!/(n! × n!)}/{(2n – 1)!/(n! × (n – 1!))}
= {2n(2n – 1)!/(n(n – 1)! × n!)}/{(2n – 1)!/(n! × (n – 1!))}
= 2
So, A/B = 2
Question 8.
The coefficient of y in the expansion of (y² + c/y)5 is
(a) 29c
(b) 10c
(c) 10c³
(d) 20c²
Answer
Answer: (c) 10c³
We have,
Tr+1 = 5Cr ×(y²)5-r × (c/y)r
⇒ Tr+1 = 5Cr × y10-3r × cr
For finding the coefficient of y,
⇒ 10 – 3r = 1
⇒ 33r = 9
⇒ r = 3
So, the coefficient of y = 5C3 × c³
= 10c³
Question 9.
The coefficient of x-4 in (3/2 – 3/x²)10 is
(a) 405/226
(b) 504/289
(c) 450/263
(d) None of these
Answer
Answer: (d) None of these
Let x-4 occurs in (r + 1)th term.
Now, Tr+1 = 10Cr × (3/2)10-r ×(-3/x²)r
⇒ Tr+1 = 10Cr × (3/2)10-r ×(-3)r × (x)-2r
Now, we have to find the coefficient of x-4
So, -2r = -4
⇒ r = 2
Now, the coefficient of x-4 = 10C2 × (3/2)10-2 × (-3)2
= 10C2 × (3/2)8 × (-3)2
= 45 × (3/2)8 × 9
= (312 × 5)/28
Question 10.
If n is a positive integer, then 9n+1 – 8n – 9 is divisible by
(a) 8
(b) 16
(c) 32
(d) 64
Answer
Answer: (d) 64
Let n = 1, then
9n+1 – 8n – 9 = 91+1 – 8 × 1 – 9 = 9² – 8 – 9 = 81 – 17 = 64
which is divisible by 64
Let n = 2, then
9n+1 – 8n – 9 = 92+1 – 8 × 2 – 9 = 9³ – 16 – 9 = 729 – 25 = 704 = 11 × 64
which is divisible by 64
So, for any value of n, 9n+1 – 8n – 9 is divisible by 64
Question 11.
The general term of the expansion (a + b)ⁿ is
(a) Tr+1 = ⁿCr × ar × br
(b) Tr+1 = ⁿCr × ar × bn-r
(c) Tr+1 = ⁿCr × an-r× bn-r
(d) Tr+1 = ⁿCr × an-r × br
Answer
Answer: (d) Tr+1 = ⁿCr × an-r × br
The general term of the expansion (a + b)ⁿ is
Tr+1 = ⁿCr × an-r × br
Question 12.
In the expansion of (a + b)ⁿ, if n is even then the middle term is
(a) (n/2 + 1)th term
(b) (n/2)th term
(c) nth term
(d) (n/2 – 1)th term
Answer
Answer: (a) (n/2 + 1)th term
In the expansion of (a + b)ⁿ,
if n is even then the middle term is (n/2 + 1)th term
Question 13.
The smallest positive integer for which the statement 3n+1 < 4ⁿ is true for all
(a) 4
(b) 3
(c) 1
(d) 2
Answer
Answer: (a) 4
Given statement is: 3n+1 < 4ⁿ is
Let n = 1, then
31+1 < 41 = 3² < 4 = 9 < 4 is false
Let n = 2, then
32+1 < 4² = 3³ < 4² = 27 < 16 is false
Let n = 3, then
33+1 < 4³ = 34 < 4³ = 81 < 64 is false
Let n = 4, then
34+1 < 44 = 35 < 44 = 243 < 256 is true.
So, the smallest positive number is 4
Question 14.
The number of ordered triplets of positive integers which are solution of the equation x + y + z = 100 is
(a) 4815
(b) 4851
(c) 8451
(d) 8415
Answer
Answer: (b) 4851
Given, x + y + z = 100
where x ≥ 1, y ≥ 1, z ≥ 1
Let u = x – 1, v = y – 1, w = z – 1
where u ≥ 0, v ≥ 0, w ≥ 0
Now, equation becomes
u + v + w = 97
So, the total number of solution = 97+3-1C3-1
= 99C2
= (99 × 98)/2
= 4851
Question 15.
if n is a positive ineger then 2³ⁿ – 7n – 1 is divisible by
(a) 7
(b) 9
(c) 49
(d) 81
Answer
Answer: (c) 49
Given, 2³ⁿ – 7n – 1 = 23×n – 7n – 1
= 8ⁿ – 7n – 1
= (1 + 7)ⁿ – 7n – 1
= {ⁿC0 + ⁿC1 7 + ⁿC2 7² + …….. + ⁿCn 7ⁿ} – 7n – 1
= {1 + 7n + ⁿC2 7² + …….. + ⁿCn 7ⁿ} – 7n – 1
= ⁿC2 7² + …….. + ⁿCn 7ⁿ
= 49(ⁿC2 + …….. + ⁿCn 7n-2)
which is divisible by 49
So, 2³ⁿ – 7n – 1 is divisible by 49
Question 16.
The greatest coefficient in the expansion of (1 + x)10 is
(a) 10!/(5!)
(b) 10!/(5!)²
(c) 10!/(5! × 4!)²
(d) 10!/(5! × 4!)
Answer
Answer: (b) 10!/(5!)²
The coefficient of xr in the expansion of (1 + x)10 is 10Cr and 10Cr is maximum for r = 10/ = 5
Hence, the greatest coefficient = 10C5
= 10!/(5!)²
Question 17.
If A and B are the coefficient of xn in the expansion (1 + x)2n and (1 + x)2n-1 respectively, then A/B equals
(a) 1
(b) 2
(c) 1/2
(d) 1/n
Answer
Answer: (b) 2
A/B = ²ⁿCn/2n-1Cn
= {(2n)!/(n! × n!)}/{(2n – 1)!/(n! × (n – 1!))}
= {2n(2n – 1)!/(n(n – 1)! × n!)}/{(2n – 1)!/(n! × (n – 1!))}
= 2
So, A/B = 2
Question 18.
(1.1)10000 is _____ 1000
(a) greater than
(b) less than
(c) equal to
(d) None of these
Answer
Answer: (a) greater than
Given, (1.1)10000 = (1 + 0.1)10000
= 10000C0 + 10000C1 ×(0.1) + 10000C2 × (0.1)² + other +ve terms
= 1 + 10000 × (0.1) + other +ve terms
= 1 + 1000 + other +ve terms
> 1000
So, (1.1)10000 is greater than 1000
Question 19.
If n is a positive integer, then (√3+1)²ⁿ + (√3−1)²ⁿ is
(a) an odd positive integer
(b) none of these
(c) an even positive integer
(d) not an integer
Answer
Answer: (c) an even positive integer
Since n is a positive integer, assume n = 1
(√3 + 1)² + (√3 – 1)²
= (3 + 2√3 + 1) + (3 – 2√3 + 1) {since (x + y)² = x² + 2xy + y²}
= 8, which is an even positive number.
Question 20.
if y = 3x + 6x² + 10x³ + ………. then x =
(a) 4/3 – {(1 × 4)/(3² × 2)}y² + {(1 × 4 × 7)/(3² ×3)}y³ – ………..
(b) -4/3 + {(1 × 4)/(3² × 2)}y² – {(1 × 4 × 7)/(3² ×3)}y³ + ………..
(c) 4/3 + {(1 × 4)/(3² × 2)}y² + {(1 × 4 × 7)/(3² ×3)}y³ + ………..
(d) None of these
Answer
Answer: (d) None of these
Given, y = 3x + 6x² + 10x³ + ……….
⇒ 1 + y = 1 + 3x + 6x² + 10x³ + ……….
⇒ 1 + y = (1 – x)-3
⇒ 1 – x = (1 + y)-1/3
⇒ x = 1 – (1 + y)-1/3
⇒ x = (1/3)y – {(1 × 4)/(3² × 2)}y² + {(1 × 4 × 7)/(3² × 3!)}y³ – ………..
Expanding binomials calculator using the binomial theorem formula.
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