Search
You can find the results of your search below.
Matching pagenames:
Fulltext results:
- Short Term Preparation FSc/ICS 1 @fsc-part1-ptb
- o help the students and teachers at no cost by [[:people:salman-sherazi|M Salman Sherazi]]. ====Summary==
- FSc/ICS Part 1 (Mathematics): PTB
- can get benefits to teach their students. Lot of people (students and teachers) help us to manage this pa
- FSc/ICS Part 2 (Mathematics): PTB
- can get benefits to teach their students. Lot of people (students and teachers) help us to manage this pa
- Definitions: FSc Part 1 (Mathematics): PTB by Aurang Zaib @fsc-part1-ptb
- PTB) Lahore, Pakistan. We are very thankful to [[:people:aurang-zaib]] for his valuable contribution. ===
- Aurang Zaib @people
- === Aurang Zaib ====== <image shape="rounded">{{ :people:aurang-zaib.jpg?nolink|Mr. Aurang Zaib}}</image>
- People
- ====== People ====== On this page, we have given the the list of all students, teachers or faculty member... ery thankful to all of them. - [[:atiq]] - [[people:farooq]] - [[:khuram]] - [[:imran]] - [[people:umer]] - [[people:anwar-khan]] - Mr. Muhammad Idress - [[people:moin]] - Muhammad Marwan - Mr.
- About Us
- sing http://www.photofuneditor.com/ * See the [[people]] page for list of contributors to this website.
- Topology and Functional Analysis Solved Paper by Noman Khalid @notes
- e solved papers are written and provided by Mr. [[people:noman-khalid]]. We are very thankful to him for p
- FSc/ICS Part 1 (Mathematics): KPK
- can get benefits to teach their students. Lot of people (students and teachers) help us to manage this pa
- Question 1 Review Exercise 7 @math-11-kpk:sol:unit07
- rue">(a): $768)$</collapse> vi. A committee of 4 people will be selected from 8 girls and 12 boys in a cl
- Question 9 & 10 Review Exercise 6 @math-11-kpk:sol:unit06
- ing the total number of ways of sitting these $n$ people in which two men want to sit together are: $$(n-2
- Question 5 & 6 Review Exercise 6 @math-11-kpk:sol:unit06
- n-1) !=(5-1) !=4 !=24$$ =====Question 6===== Six people including Faisal and Saima are to be seated at a ... ution==== The total number of ways sitting of six people around a circular table are: $$(n-1) !=(6-1) !=5 ... he total number of ways to give seat to these six people are: $$4 ! \cdot 2 !=48$$ Because the five people will permute by $(5-1) !$ and Faisal and Saima can per
- Question 1 Review Exercise 6 @math-11-kpk:sol:unit06
- rue">(a): $768)$</collapse> vi. A committee of 4 people will be selected from 8 girls and 12 boys in a cl
- Question 7 and 8 Exercise 6.3 @math-11-kpk:sol:unit06
- n. =====Question 7===== Consider a group of $20$ people. If everyone shakes hands with everyone else, how
- Question 14 and 15 Exercise 6.2 @math-11-kpk:sol:unit06
- $ =====Question 15===== In how many ways can $7$ people be arranged at a round table so that 2 particular... er? ====Solution==== Nurnber of ways in which $7$ people can be seated around a round table without any co... is $6 !$ Now, let us assume these two particular people ALWAYS sit together and let us consider them as one unit. Number of ways in which $6$ people can be arranged around a round table is $5!$ And