Search
You can find the results of your search below.
Fulltext results:
- ADS/BSc
- er notes==== <grid> <col sm="6"> <WRAP bsc center round 85%> **[[BSc:Notes of Mechanics]]**\\ Notes of ... authors for BSc or BS. </WRAP> <WRAP bsc center round 85%> **[[BSc:Notes of Vector Analysis]]**\\ Hand... made by Hameed Ullah. </WRAP> <WRAP bsc center round 85%> **[[BSc:Notes of Metric Spaces]]**\\ Notes ... itten by Umer Asghar. </WRAP> <WRAP bsc center round 85%> Notes of number theory for BSc. These notes
- Question 14 and 15 Exercise 6.2 @math-11-kpk:sol:unit06
- In how many ways can $7$ people be arranged at a round table so that 2 particular persons always sit tog... urnber of ways in which $7$ people can be seated around a round table without any condition is $6 !$ Now, let us assume these two particular people ALWAYS sit ... mber of ways in which $6$ people can be arranged around a round table is $5!$ And the two particular peo
- Question 5 & 6 Review Exercise 6 @math-11-kpk:sol:unit06
- ny different ways can be six children seated at a round table if certain two students refuse to sit next ... six so $$n=6$$ The total different arrangements round a circular table are $$(n-1) !=(6-1) !=5 !=120$$ ... ny different ways can be six children seated at a round table if certain two students insist on sitting n... e six so $n=6$. The total different arrangements round a circular table are $(n-1) !=(6-1) !=5 !=120$.
- Formatting Syntax @wiki
- If you want to try something, just use the [[playground:playground|playground]] page. The simpler markup is easily accessible via [[doku>toolbar|quickbuttons]], too. ====... Firefox it can be enabled through different workaround mentioned in the [[http://kb.mozillazine.org/Link
- Question 9 & 10 Review Exercise 6 @math-11-kpk:sol:unit06
- stion 10===== A party of $n$ men is to be seated around a circular table. Find the probability that two p... al number of ways that $n$ persons can be seated around a circular table are: $(n-1)$ ! If two persons s... d the total number of ways these $(n-1)$ can sit around table are: $(n-2) !$ the number of ways that $2$
- MATH-300: Basic Mathematics for Chemist @atiq
- Basic Mathematics for Chemist ====== <WRAP center round box 70%> //Without mathematics the sciences canno... /HTML> ===== Related material ===== <WRAP center round tip 80%> * http://en.wikipedia.org/wiki/Number
- Aurang Zaib @people
- ====== Aurang Zaib ====== <image shape="rounded">{{ :people:aurang-zaib.jpg?nolink|Mr. Aurang Zaib}}</ima... teemed academician with a robust educational background and a passion for teaching. He holds an M.Phil in
- Khuram Ali Khan
- oft Sets </WRAP> <WRAP half column> <image shape="rounded"> {{:dr_khuram.jpg?nolink&180|}} </image> </WRA
- Special Functions by Dr. Muhey-U-Din @notes
- a * Hypergeometric Function * Historical Background of Hypergeometric Function * Hypergeometric fun
- Akhtar Abbas @people
- ====== Akhtar Abbas ====== <image shape="rounded">{{ :people:akhtar-abbas.jpeg?nolink|}}</image> Mr. Akht
- Engr. Moin Latif @people
- or his contribution to the website. <image shape="rounded">{{ :people:engr-moin-latif.jpg?nolink&450x250
- Sheikh Muhammad Saleem Shahzad @people
- ikh Muhammad Saleem Shahzad ====== <image shape="rounded">{{ :people:sheikh-muhammad-saleem-shahzad.jpg?
- Unit 06: Permutation, Combination and Probability (Solutions) @math-11-kpk:sol
- ). * Find the arrangement of different objects around a circle. * Define combination of $n$ different
- Question 1 Review Exercise 6 @math-11-kpk:sol:unit06
- ow many different ways can $5$ couples be seated around a circular table if the couple must not be separa
- Question 1 Review Exercise 7 @math-11-kpk:sol:unit07
- ow many different ways can $5$ couples be seated around a circular table if the couple must not be separa