What would be the hypothesis of mathematical induction for n(n + 1) < n! (where n 4) ?

It is assumed that at n = k, k(k + 1)! > (k + 1)!

It is assumed that at n = k, k(k + 1)! > k!

It is assumed that at n = k, k(k + 1)! < k!

It is assumed that at n = k, k(k + 1)! > (k + 1)!

It is assumed that at n = k, (k + 1)(k + 2)! < k!

Explore topic-wise MCQs in Mathematics.

This section includes 11 Mcqs, each offering curated multiple-choice questions to sharpen your Mathematics knowledge and support exam preparation. Choose a topic below to get started.

1.	What will be P(k + 1) for P(n) = n³ (n + 1)?
A.	(k + 1)<sup>4</sup>
B.	k<sup>4</sup> + 5k<sup>3</sup> + 9k<sup>2</sup> + 7k + 2
C.	k<sup>4</sup> + 6k<sup>3</sup> + 9k<sup>2</sup> + 7k + 2
D.	k<sup>4</sup> + 3k<sup>3</sup> + 9k<sup>2</sup> + 6k + 2
Answer» C. k<sup>4</sup> + 6k<sup>3</sup> + 9k<sup>2</sup> + 7k + 2

Discussion

2.	State whether the following series is true or not. 1 + 2 + 3 + ..+ n = ( frac{n(n + 1)}{2} )
A.	True
B.	False
Answer» B. False

Discussion

3.	n³ + 5n is divisible by which of the following?
A.	3
B.	5
C.	7
D.	11
Answer» B. 5

Discussion

4.	n² + 3n is always divisible by which number, provided n is an integer?
A.	2
B.	3
C.	4
D.	5
Answer» B. 3

Discussion

5.	If P(k) = k² (k + 3) (k² 1) is true, then what is P(k + 1)?
A.	(k + 1)<sup>2</sup> (k + 3) (k<sup>2</sup> 1)
B.	(k + 1)<sup>2</sup> (k + 4) (k<sup>2</sup> 1)
C.	(k + 1)<sup>2</sup> (k + 4) k (k + 2)
D.	(k + 1) (k + 4) k (k +2)
Answer» D. (k + 1) (k + 4) k (k +2)

Discussion

6.	What would be the hypothesis of mathematical induction for n(n + 1) < n! (where n 4) ?
A.	It is assumed that at n = k, k(k + 1)! > k!
B.	It is assumed that at n = k, k(k + 1)! < k!
C.	It is assumed that at n = k, k(k + 1)! > (k + 1)!
D.	It is assumed that at n = k, (k + 1)(k + 2)! < k!
Answer» C. It is assumed that at n = k, k(k + 1)! > (k + 1)!

Discussion

7.	P(n) = n(n² 1). Which of the following does not divide P(k+1)?
A.	k
B.	k + 2
C.	k + 3
D.	k + 1
Answer» D. k + 1

Discussion

8.	If 10³ⁿ + 2^{4k + 1}. 9 + k, is divisible by 11, then what is the least positive value of k?
A.	7
B.	6
C.	8
D.	10
Answer» E.

Discussion

9.	By principle of mathematical induction, 2^4n-1 is divisible by which of the following?
A.	8
B.	3
C.	5
D.	7
Answer» B. 3

Discussion

10.	7²ⁿ + 2^{2n 2} . 3^{n 1} is divisible by 50 by principle of mathematical induction.
A.	True
B.	False
Answer» C.

Discussion

11.	For principle of mathematical induction to be true, what type of number should n be?
A.	Whole number
B.	Natural number
C.	Rational number
D.	Any form of number
Answer» B. Natural number

Discussion

Explore topic-wise MCQs in Mathematics.

What will be P(k + 1) for P(n) = n3 (n + 1)?

State whether the following series is true or not.1 + 2 + 3 + ..+ n = ( frac{n(n + 1)}{2} )

n3 + 5n is divisible by which of the following?

n2 + 3n is always divisible by which number, provided n is an integer?

If P(k) = k2 (k + 3) (k2 1) is true, then what is P(k + 1)?

What would be the hypothesis of mathematical induction for n(n + 1) < n! (where n 4) ?

P(n) = n(n2 1). Which of the following does not divide P(k+1)?

If 103n + 24k + 1. 9 + k, is divisible by 11, then what is the least positive value of k?

By principle of mathematical induction, 24n-1 is divisible by which of the following?

72n + 22n 2 . 3n 1 is divisible by 50 by principle of mathematical induction.

For principle of mathematical induction to be true, what type of number should n be?

What will be P(k + 1) for P(n) = n³ (n + 1)?

State whether the following series is true or not.
1 + 2 + 3 + ..+ n = ( frac{n(n + 1)}{2} )

n³ + 5n is divisible by which of the following?

n² + 3n is always divisible by which number, provided n is an integer?

If P(k) = k² (k + 3) (k² 1) is true, then what is P(k + 1)?

P(n) = n(n² 1). Which of the following does not divide P(k+1)?

If 10³ⁿ + 2^{4k + 1}. 9 + k, is divisible by 11, then what is the least positive value of k?

By principle of mathematical induction, 2^4n-1 is divisible by which of the following?

7²ⁿ + 2^{2n 2} . 3^{n 1} is divisible by 50 by principle of mathematical induction.