Binomial Theorem for Competitive Exam Success

Binomial Theorem

Q. Calculate the coefficient of x^2 in the expansion of (2x + 3)^4.

A. 36
B. 48
C. 54
D. 64

Solution

The coefficient of x^2 is C(4,2) * (2)^2 * (3)^2 = 6 * 4 * 9 = 216.

Correct Answer: B — 48

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Q. Calculate the coefficient of x^2 in the expansion of (x + 1/2)^6.

A. 15/4
B. 45/8
C. 15/8
D. 5/4

Solution

The coefficient of x^2 is C(6,2) * (1/2)^2 = 15 * 1/4 = 15/4.

Correct Answer: B — 45/8

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Q. Calculate the coefficient of x^2 in the expansion of (x + 1/2)^8. (2021)

A. 28
B. 56
C. 70
D. 84

Solution

The coefficient of x^2 is C(8,2) * (1/2)^6 = 28 * 1/64 = 28/64 = 7/16.

Correct Answer: C — 70

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Q. Calculate the coefficient of x^2 in the expansion of (x + 1/x)^6. (2019)

A. 15
B. 30
C. 20
D. 10

Solution

The coefficient of x^2 is given by 6C2 * (1)^4 = 15.

Correct Answer: A — 15

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

A. 96
B. 144
C. 192
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. Calculate the coefficient of x^3 in the expansion of (x + 1/2)^6.

A. 20
B. 30
C. 40
D. 50

Solution

The coefficient of x^3 is given by C(6,3) * (1/2)^3 = 20 * 1/8 = 2.5.

Correct Answer: A — 20

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Q. Calculate the coefficient of x^3 in the expansion of (x - 1)^5.

A. -5
B. 10
C. -10
D. 5

Solution

The coefficient of x^3 is C(5,3) * (-1)^2 = 10.

Correct Answer: B — 10

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Q. Calculate the coefficient of x^4 in the expansion of (3x - 2)^6.

A. 540
B. 720
C. 810
D. 960

Solution

The coefficient of x^4 is C(6,4) * (3)^4 * (-2)^2 = 15 * 81 * 4 = 4860.

Correct Answer: A — 540

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Q. Calculate the coefficient of x^4 in the expansion of (x + 1/2)^6. (2021)

A. 15/8
B. 45/8
C. 5/8
D. 1/8

Solution

The coefficient of x^4 is C(6,4)(1/2)^2 = 15 * 1/4 = 15/4.

Correct Answer: B — 45/8

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

A. 15
B. 60
C. 90
D. 120

Solution

The coefficient of x^4 is C(6,4) * 2^2 = 15 * 4 = 60.

Correct Answer: C — 90

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Q. Calculate the coefficient of x^4 in the expansion of (x + 3)^6. (2021)

A. 54
B. 81
C. 108
D. 729

Solution

The coefficient of x^4 is C(6,4)(3)^2 = 15 * 9 = 135.

Correct Answer: C — 108

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Q. Calculate the coefficient of x^4 in the expansion of (x + 5)^6.

A. 150
B. 600
C. 750
D. 1000

Solution

The coefficient of x^4 is C(6,4) * 5^2 = 15 * 25 = 375.

Correct Answer: C — 750

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Q. Calculate the coefficient of x^5 in the expansion of (x + 2)^7.

A. 21
B. 42
C. 63
D. 84

Solution

The coefficient of x^5 is C(7,5) * (2)^2 = 21 * 4 = 84.

Correct Answer: C — 63

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Q. Calculate the coefficient of x^5 in the expansion of (x - 3)^7. (2021)

A. -189
B. -243
C. -126
D. -21

Solution

The coefficient of x^5 is C(7,5) * (-3)^2 = 21 * 9 = -189.

Correct Answer: A — -189

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Q. Calculate the term containing x^3 in the expansion of (2x + 5)^6. (2000)

A. 1500
B. 1800
C. 2000
D. 2500

Solution

The term containing x^3 is C(6,3) * (2)^3 * (5)^(6-3) = 20 * 8 * 125 = 20000.

Correct Answer: B — 1800

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Q. Calculate the term containing x^3 in the expansion of (x + 2)^7.

A. 56
B. 84
C. 112
D. 128

Solution

The term containing x^3 is C(7,3) * (2)^4 = 35 * 16 = 560.

Correct Answer: B — 84

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Q. Calculate the term independent of x in the expansion of (2x - 3)^5.

A. -243
B. 0
C. 243
D. 81

Solution

The term independent of x is C(5,5) * (2x)^0 * (-3)^5 = 1 * 1 * (-243) = -243.

Correct Answer: A — -243

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Q. Calculate the term independent of x in the expansion of (2x^2 - 3x + 4)^3.

A. 12
B. 24
C. 36
D. 48

Solution

The term independent of x occurs when the powers of x cancel out. The term is C(3,0)(4)^3 + C(3,1)(-3x)(4)^2 + C(3,2)(-3x)^2(4) + C(3,3)(-3x)^3 = 64 - 36 + 0 + 0 = 28.

Correct Answer: B — 24

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Q. Calculate the term independent of x in the expansion of (2x^2 - 3x + 4)^5.

A. 80
B. 120
C. 160
D. 200

Solution

The term independent of x occurs when the powers of x cancel out. This can be calculated using the binomial expansion.

Correct Answer: C — 160

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Q. Calculate the term independent of x in the expansion of (2x^2 - 3x)^4.

A. -81
B. 108
C. -108
D. 81

Solution

The term independent of x occurs when 2k = 4, k = 2. The term is C(4,2) * (2x^2)^2 * (-3x)^2 = 6 * 4 * 9 = -216.

Correct Answer: C — -108

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Q. Calculate the term independent of x in the expansion of (x/2 - 3)^6.

A. 729
B. 729/64
C. 729/32
D. 729/16

Solution

The term independent of x occurs when k = 3, which gives C(6,3) * (x/2)^3 * (-3)^3 = 20 * (1/8) * (-27) = -67.5.

Correct Answer: B — 729/64

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Q. Calculate the term independent of x in the expansion of (x/2 - 3)^8.

A. -3
B. -8
C. 0
D. 256

Solution

The term independent of x occurs when k = 4. Thus, the term is C(8,4) * (x/2)^4 * (-3)^4 = 70 * (1/16) * 81 = 256.

Correct Answer: D — 256

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Q. Calculate the term independent of x in the expansion of (x^2 - 3x + 2)^4.

A. 8
B. 12
C. 16
D. 20

Solution

The term independent of x occurs when the powers of x cancel out. The term is C(4,2) * (2)^2 * (-3)^2 = 6 * 4 * 9 = 216.

Correct Answer: B — 12

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Q. Calculate the value of (1 + 3)^5 using the binomial theorem.

A. 81
B. 243
C. 125
D. 256

Solution

(1 + 3)^5 = 4^5 = 1024.

Correct Answer: B — 243

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Q. Determine the coefficient of x^4 in the expansion of (2x - 3)^6.

A. 540
B. 720
C. 810
D. 960

Solution

The coefficient of x^4 is given by 6C4 * (2)^4 * (-3)^2 = 15 * 16 * 9 = 2160.

Correct Answer: B — 720

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Q. Find the coefficient of x^0 in the expansion of (2x - 3)^3.

A. -27
B. -24
C. -18
D. -12

Solution

The coefficient of x^0 is (-3)^3 = -27.

Correct Answer: A — -27

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Q. Find the coefficient of x^1 in the expansion of (x + 4)^3.

A. 12
B. 48
C. 36
D. 24

Solution

The coefficient of x^1 is C(3,1) * (4)^2 = 3 * 16 = 48.

Correct Answer: A — 12

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

A. 540
B. 720
C. 810
D. 960

Solution

The coefficient of x^2 is given by 6C2 * (2)^2 * (3)^4 = 15 * 4 * 81 = 4860.

Correct Answer: A — 540

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Q. Find the coefficient of x^2 in the expansion of (x + 4)^5. (2023)

A. 80
B. 100
C. 120
D. 160

Solution

The coefficient of x^2 is C(5,2)(4)^3 = 10 * 64 = 640.

Correct Answer: A — 80

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

A. 100
B. 150
C. 200
D. 250

Solution

The coefficient of x^2 is C(5,2) * (-5)^3 = 10 * (-125) = -1250.

Correct Answer: A — 100

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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 problem-solving skills. Practicing MCQs and objective questions on the Binomial Theorem is essential for effective exam preparation, allowing you to tackle important questions with confidence and improve your scores.

What You Will Practise Here

Understanding the Binomial Theorem and its applications
Deriving the Binomial Expansion formula
Identifying coefficients in binomial expansions
Solving problems using Pascal's Triangle
Exploring special cases of the Binomial Theorem
Applying the theorem in probability and statistics
Practicing previous years' exam questions related to the Binomial Theorem

Exam Relevance

The Binomial Theorem is frequently included in the syllabus for CBSE, State Boards, NEET, and JEE exams. Students can expect questions that require them to apply the theorem to find coefficients, expand binomials, or solve related problems. Common question patterns include direct application of the theorem, multiple-choice questions on coefficients, and problems that involve real-life applications of binomial expansions.

Common Mistakes Students Make

Confusing the terms of the expansion and their respective coefficients
Overlooking the conditions for applying the Binomial Theorem
Making arithmetic errors while calculating coefficients
Failing to recognize the significance of special cases
Misinterpreting the question requirements in objective formats

FAQs

Question: What is the Binomial Theorem?
Answer: The Binomial Theorem provides a formula for the expansion of powers of binomials, expressed as (a + b)^n, where n is a non-negative integer.

Question: How can I find the coefficients in a binomial expansion?
Answer: Coefficients can be found using the formula C(n, k) = n! / (k!(n-k)!), where C(n, k) represents the binomial coefficient for the k-th term in the expansion.

Question: Are there any shortcuts for solving Binomial Theorem problems?
Answer: Yes, using Pascal's Triangle can help quickly identify coefficients and simplify calculations in binomial expansions.

Now is the time to enhance your understanding of the Binomial Theorem! Dive into our practice MCQs and test your knowledge to excel in your exams. Remember, consistent practice is the key to mastering this topic!

Binomial Theorem

Binomial Theorem MCQ & Objective Questions

What You Will Practise Here

Exam Relevance

Common Mistakes Students Make

FAQs

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