Binomial Theorem for Competitive Exam Success

Binomial Theorem

Q. Determine the coefficient of x^5 in the expansion of (3x - 4)^7.

A. 252
B. 336
C. 672
D. 840

Solution

The coefficient of x^5 in (3x - 4)^7 is C(7, 5) * (3)^5 * (-4)^2 = 21 * 243 * 16 = 68016.

Correct Answer: A — 252

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Q. Find the coefficient of x^2 in the expansion of (2x - 3)^4.

A. 36
B. 48
C. 54
D. 72

Solution

Using the binomial theorem, the coefficient of x^2 in (2x - 3)^4 is given by 4C2 * (2)^2 * (-3)^2 = 6 * 4 * 9 = 216.

Correct Answer: C — 54

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Q. Find the coefficient of x^2 in the expansion of (3x - 2)^5.

A. -60
B. -90
C. 90
D. 60

Solution

The coefficient of x^2 in (3x - 2)^5 is given by 5C2 * (3x)^2 * (-2)^3 = 10 * 9 * (-8) = -720.

Correct Answer: B — -90

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Q. Find the coefficient of x^2 in the expansion of (x + 4)^6.

A. 96
B. 144
C. 216
D. 256

Solution

The coefficient of x^2 is given by C(6, 2)(4)^4 = 15 * 256 = 3840.

Correct Answer: A — 96

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Q. Find the coefficient of x^3 in the expansion of (3x - 4)^5.

A. -540
B. -720
C. 720
D. 540

Solution

The coefficient of x^3 in (3x - 4)^5 is given by 5C3 * (3)^3 * (-4)^2 = 10 * 27 * 16 = -720.

Correct Answer: B — -720

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Q. Find the coefficient of x^3 in the expansion of (x + 1)^8.

A. 56
B. 70
C. 84
D. 120

Solution

The coefficient of x^3 in (x + 1)^8 is given by 8C3 = 56.

Correct Answer: C — 84

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Q. Find the coefficient of x^4 in the expansion of (x + 1)^8.

A. 70
B. 80
C. 90
D. 100

Solution

The coefficient of x^4 is C(8, 4) = 70.

Correct Answer: A — 70

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Q. Find the coefficient of x^5 in the expansion of (3x + 2)^6.

A. 486
B. 729
C. 729
D. 486

Solution

The coefficient of x^5 in (3x + 2)^6 is C(6, 5)(3)^5(2)^1 = 6 * 243 * 2 = 2916.

Correct Answer: A — 486

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Q. Find the value of (1 + x)^6 when x = 2.

A. 64
B. 128
C. 256
D. 512

Solution

Using the binomial theorem, (1 + 2)^6 = 3^6 = 729.

Correct Answer: C — 256

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Q. Find the value of (a + b)^4 when a = 2 and b = 3.

A. 81
B. 125
C. 625
D. 256

Solution

Using the binomial theorem, (a + b)^4 = C(4, 0)a^4b^0 + C(4, 1)a^3b^1 + C(4, 2)a^2b^2 + C(4, 3)a^1b^3 + C(4, 4)a^0b^4. Substituting a = 2 and b = 3 gives 16 + 4*6 + 6*9 + 4*27 + 81 = 81.

Correct Answer: A — 81

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Q. Find the value of k if the coefficient of x^2 in the expansion of (x + k)^4 is 6.

A. 1
B. 2
C. 3
D. 4

Solution

The coefficient of x^2 in (x + k)^4 is C(4, 2) * k^2 = 6. Thus, 6k^2 = 6, giving k^2 = 1, so k = 1 or -1.

Correct Answer: B — 2

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Q. Find the value of k in the expansion of (x + 2)^6 such that the term containing x^4 is 240.

A. 4
B. 5
C. 6
D. 3

Solution

The term containing x^4 is C(6,4) * (2)^2 * x^4 = 15 * 4 * x^4 = 60x^4. Setting 60 = 240 gives k = 4.

Correct Answer: A — 4

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Q. Find the value of the binomial coefficient C(7, 4).

A. 21
B. 35
C. 42
D. 70

Solution

C(7, 4) = 7! / (4! * (7-4)!) = 7! / (4! * 3!) = (7*6*5)/(3*2*1) = 35.

Correct Answer: B — 35

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Q. Find the value of the coefficient of x^4 in the expansion of (x - 2)^6.

A. 15
B. 20
C. 30
D. 40

Solution

Using the binomial theorem, the coefficient of x^4 in (a + b)^n is given by nCk * a^(n-k) * b^k. Here, n=6, a=x, b=-2, and k=2. Thus, the coefficient is 6C2 * (1)^4 * (-2)^2 = 15 * 4 = 60.

Correct Answer: C — 30

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Q. If the expansion of (x + y)^n has 15 terms, what is the value of n?

A. 14
B. 15
C. 16
D. 17

Solution

The number of terms in the expansion of (x + y)^n is n + 1. Therefore, n + 1 = 15, which gives n = 14.

Correct Answer: A — 14

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Q. In the expansion of (2 + 3x)^5, what is the coefficient of x?

A. 15
B. 30
C. 45
D. 60

Solution

The coefficient of x is given by C(5, 1) * (2)^4 * (3) = 5 * 16 * 3 = 240.

Correct Answer: A — 15

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Q. In the expansion of (2 - x)^5, what is the coefficient of x^3?

A. -80
B. -60
C. 60
D. 80

Solution

The coefficient of x^3 in (2 - x)^5 is given by 5C3 * 2^2 * (-1)^3 = 10 * 4 * (-1) = -40.

Correct Answer: A — -80

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Q. In the expansion of (2x + 5)^3, what is the coefficient of x^2?

A. 30
B. 60
C. 90
D. 120

Solution

The coefficient of x^2 in (2x + 5)^3 is given by 3C2 * (2x)^2 * 5^1 = 3 * 4 * 5 = 60.

Correct Answer: B — 60

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Q. In the expansion of (2x - 3)^4, what is the coefficient of x^3? (2023)

A. -108
B. -72
C. 72
D. 108

Solution

The coefficient of x^3 in (2x - 3)^4 is given by 4C1 * (2)^3 * (-3)^1 = 4 * 8 * (-3) = -96. The coefficient is -108.

Correct Answer: A — -108

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Q. In the expansion of (2x - 3y)^5, what is the coefficient of x^3y^2?

A. -720
B. -540
C. 540
D. 720

Solution

The coefficient is C(5,3) * (2)^3 * (-3)^2 = 10 * 8 * 9 = 720.

Correct Answer: C — 540

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Q. In the expansion of (3x - 2)^4, what is the coefficient of x^1?

A. -48
B. -72
C. 72
D. 48

Solution

The coefficient of x^1 in (3x - 2)^4 is given by 4C3 * (3x)^1 * (-2)^3 = 4 * 3 * (-8) = -96.

Correct Answer: B — -72

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Q. In the expansion of (3x - 2)^5, what is the coefficient of x^3?

A. -240
B. -360
C. 360
D. 240

Solution

The coefficient of x^3 in (3x - 2)^5 is given by 5C2 * (3)^3 * (-2)^2 = 10 * 27 * 4 = -1080.

Correct Answer: B — -360

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Q. In the expansion of (3x - 4)^7, what is the coefficient of x^5? (1920)

A. 1260
B. 1440
C. 1680
D. 1920

Solution

Using the binomial theorem, the coefficient of x^5 in (3x - 4)^7 is given by 7C5 * (3)^5 * (-4)^2 = 21 * 243 * 16 = 21 * 3888 = 81588.

Correct Answer: A — 1260

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Q. In the expansion of (a + b)^6, what is the coefficient of a^2b^4?

A. 15
B. 30
C. 45
D. 60

Solution

The coefficient of a^2b^4 in (a + b)^6 is given by 6C2 = 15.

Correct Answer: B — 30

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Q. In the expansion of (a + b)^n, if the coefficient of a^3b^2 is 60, what is the value of n?

A. 5
B. 6
C. 7
D. 8

Solution

C(n,3) * b^2 = 60. For n = 5, C(5,3) = 10, which does not satisfy. For n = 6, C(6,3) = 20, which does not satisfy. For n = 7, C(7,3) = 35, which does not satisfy. For n = 8, C(8,3) = 56, which satisfies.

Correct Answer: B — 6

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Q. In the expansion of (x + 2)^5, what is the coefficient of x^4?

A. 5
B. 10
C. 20
D. 30

Solution

The coefficient of x^4 is given by C(5, 4)(2)^1 = 5 * 2 = 10.

Correct Answer: B — 10

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Q. In the expansion of (x + 2)^8, what is the coefficient of x^6?

A. 28
B. 56
C. 84
D. 112

Solution

The coefficient of x^6 in (x + 2)^8 is C(8, 6) * (2)^2 = 28 * 4 = 112.

Correct Answer: C — 84

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Q. In the expansion of (x + 3)^5, what is the coefficient of x^3?

A. 60
B. 90
C. 100
D. 120

Solution

Using the binomial theorem, the coefficient of x^3 in (x + 3)^5 is given by 5C3 * (3)^2 = 10 * 9 = 90.

Correct Answer: B — 90

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Q. In the expansion of (x + 3)^6, what is the coefficient of x^4?

A. 540
B. 720
C. 810
D. 900

Solution

Using the binomial theorem, the coefficient of x^4 in (x + 3)^6 is given by 6C4 * (3)^2 = 15 * 9 = 135.

Correct Answer: B — 720

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Q. In the expansion of (x - 1)^8, what is the coefficient of x^5?

A. -56
B. -8
C. 8
D. 56

Solution

The coefficient of x^5 in (x - 1)^8 is C(8,5) * (-1)^3 = 56 * (-1) = -56.

Correct Answer: A — -56

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Binomial Theorem MCQ & Objective Questions

The Binomial Theorem is a crucial topic in mathematics that plays a significant role in various school and competitive exams. Understanding this theorem not only helps in solving complex problems but also enhances your ability to tackle objective questions effectively. Practicing MCQs related to the Binomial Theorem can significantly improve your exam preparation and boost your confidence in answering important questions.

What You Will Practise Here

Understanding the Binomial Theorem and its applications
Deriving the Binomial expansion formula
Identifying coefficients in binomial expansions
Solving problems involving positive and negative integer exponents
Exploring the concept of binomial coefficients
Applying the theorem in real-life scenarios and word problems
Analyzing patterns in binomial expansions through diagrams

Exam Relevance

The Binomial Theorem is frequently featured in CBSE, State Boards, NEET, and JEE exams. Students can expect questions that require them to apply the theorem to find specific coefficients or to expand binomial expressions. Common question patterns include multiple-choice questions that test conceptual understanding and application of the theorem in various contexts.

Common Mistakes Students Make

Confusing the terms of the binomial expansion with those of other algebraic expressions
Misapplying the formula for binomial coefficients
Overlooking the importance of signs in expansions involving negative exponents
Failing to simplify expressions correctly after applying the theorem

FAQs

Question: What is the Binomial Theorem?
Answer: The Binomial Theorem provides a formula for expanding expressions raised to a power, expressed as (a + b)^n.

Question: How can I use the Binomial Theorem in exams?
Answer: You can use it to solve problems involving expansions, coefficients, and applications in various mathematical contexts.

Start solving practice MCQs on the Binomial Theorem today to enhance your understanding and prepare effectively for your exams. Test your knowledge and boost your confidence with our objective questions!

Binomial Theorem

Binomial Theorem MCQ & Objective Questions

What You Will Practise Here

Exam Relevance

Common Mistakes Students Make

FAQs

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