What is the total number of possible arrangements of three letters?

What is the total number of possible arrangements of three letters?

The second space can be filled by any of the remaining 3 letters. The third space can be filled by any of the 2 remaining letters and the final space must be filled by the one remaining letter. The total number of possible arrangements is therefore 4 × 3 × 2 × 1 = 4!

What are the steps involved in the process of Manpower Planning?

1. Importance of Manpower Planning 2. Manpower Estimation3. Preparing Manpower Inventory 4. Process of Manpower Planning 5. Methods 6. Determining Manpower Gaps. 7. Needs 8. Framework 9. Approaches for Developing Manpower Planning 10.

How to estimate manpower in an organization?

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Therefore, manpower estimation is required to be done properly which involves the estimation of the quantity and quality of right type of people or human force. It is obvious that the basis of the manpower estimation should be the annual budget and also long-term corporate plan.

Is Manpower Planning most irrevocable to corporate strategy?

Robert William Pollock, CEO, Drake International observed, “From this angle (critical path) comes the proposition that, to be effective, manpower planning most irrevocably is tied to corporate strategy, and the reasons for this are laid out and analyzed.

How many ways can you arrange the word “arrangement”?

“ARRANGEMENT” is an eleven-letter word. If there were no repeating letters, the answer would simply be 11! = 39916800. However, since there are repeating letters, we have to divide to remove the duplicates accordingly. There are 2 As, 2 Rs, 2 Ns, 2 Es Therefore, there are 11! 2! ⋅ 2! ⋅ 2! ⋅ 2! = 2494800 ways of arranging it.

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How many ways can 3 women be selected from a group?

No. of ways 3 women can be selected from a group of 4 women = 4 C 3 = 4! / (3!*1!) = 4 ways. Problem 2: Among a set of 5 black balls and 3 red balls, how many selections of 5 balls can be made such that at least 3 of them are black balls.

How many different ways can the letters p q are and s?

How many different ways can the letters P, Q, R, S be arranged? The answer is 4! = 24. The first space can be filled by any one of the four letters. The second space can be filled by any of the remaining 3 letters. The third space can be filled by any of the 2 remaining letters and the final space must be filled by the one remaining letter.