How the Factorial Function came into Existence.
A note on the Factorial Function Write down 0,1,2,3,4,5 and put parallel square of each number like 0,1,4,9,16,25, then start to subtract the bigger one to the lower one (1–0),(4–1),(9–4),(16–9) and (25–16) to get 1,3,5,7,9 and again subtract the bigger one to the lower one (3–1),(5–3),(7–5) and (9–7) to get (2,2,2,2). Again we squared each number, at the same time we cubed each number (0,1,8,27,64,125,216) and the same procedure follows, subtract the bigger one to the lower one (1–0),(8–1),(27–8),(64–27) ,(125–64) and(216–125) to get (1,7,19,37,61,91) and again (7–1),(19–7),(37–19),(61–37) and (91–61), to get (6,12,18,24,30) same again(12–6),(18–12),24–18) and (30–24) till the result come out here we get (6,6,6,6). At the same time if we do it again for 4 and 5 (power).When we get 2 for 2 ,6 for 3 ,24 for 4 and 120 for 5. The result is the factorial function. https://piyushtheorem.wordpress.com/2017/02/08/a-note-on-the-factorial-function/
MANAGING THE SOFTWARE SYSTEM
Sharing the notes of MANAGING THE SYSTEM in brief. If you want to see related videos click on this link - https://www.youtube.com/results?search_query=MANAGING+THE+Software+SYSTEM+Ajaze+Khan
Process of Dispersion Trench
Process of Dispersion Trench with proper labelling and diagram
Method of Distribution
Method of Distribution
Distribution system and layout of distribution system
Distribution system and layout of distribution