www.vustudents.ning.com

# MTH202 Discrete Mathematics Assignment No 02 Fall 2020 Solution / Discussion

MTH202 Discrete Mathematics Assignment No 02 Fall 2020 Solution / Discussion

Views: 531

### Replies to This Discussion

Share the Assignment Questions & Discuss Here....

Stay touched with this discussion, Solution idea will be uploaded as soon as possible in replies here before the due date.

MTH202_2_Solution-fall-2020

MTH202_2_Solution-fall-2020.docx

MTH202_Assignment_No_02_Solution_Fall_2020

MTH202_Assignment_No_02_Solution_Fall_2020

MTH202_Assignment_No_02_Solution_Fall_2020

MTH202_Assignment_No_02_Solution_Fall_2020

# Mth 202 Solution#2 || 2021

Assignment No.2  MTH202 (Fall 2020)

Maximum Marks: 10                      Due Date:1st Feb, 2021

DON’T MISS THESE: Important instructions before attempting the solution of this assignment:

• To solve this assignment, you should have good command over 23-28  lectures.
• Try to get the concepts, consolidate your concepts and ideas from these questions which you learn in the these lectures.
• Upload assignments properly through LMS, No Assignment will be accepted through email.
• Don’t use colorful back grounds in your solution files.
• Use Math Type or Equation Editor etc for mathematical symbols.
• You should remember that if we found the solution files of some students are same then we will reward zero marks to all those students.
• Try to make solution by yourself and protect your work from other students, otherwise you and the student who send same solution file as you will be given zero marks.
• Also remember that you are supposed to submit your assignment in Word format any other like scan images etc will not be accepted and we will give zero marks correspond to these assignments.

Question                                                                                    Marks:10

By using Mathematical Induction prove that (n+1)!>2^(n+1) for n, where n is a positive integer greater than or equal to 4.

MTH202 Assignment Solution 2 Fall 2020 Solution

First,  check the case

((4) +1)! = 120 > 32 = 2(4)+1

Next, we want to show that

(n+1)!>22+1

Þ (n + 2)! >

2n+2

Since (n+2)>2(n+2) for all

n ³ 4 and by hypothesis

(n + 1)!>2n+1

We Get

(n+2)!=(n + 2) (n + 2)!>2.2n+1

= 2n+2

1

2

3

4

5

## Latest Activity

sanni khan and sanni khan are now friends
5 minutes ago
++❤MQ++❤❤❤ updated their profile
11 minutes ago
13 minutes ago
++❤MQ++❤❤❤ liked + !! Ήලᵯᵯℹ Ⲥⱨ !! +!!'s discussion ######intzar######
13 minutes ago
Dua fatima joined + M.Tariq Malik's group

1 hour ago

### !!!!!!!!!!!!!!!!!!!!!!!!!!!!

1 hour ago
Ammara Sabir liked + !! Ήලᵯᵯℹ Ⲥⱨ !! +!!'s discussion ######intzar######
2 hours ago
Ahmed joined + M.Tariq Malik's group

2 hours ago