You will typically write a 500-word answer (+/- 50 words)

Explain three main features of economic transition? As an example consider the current challenges facing Russia in terms of economic growth.

Please take care of the word limit and answers should not be plagiarized

THANKYOU

1. Trace the history of a word (its etymology) like we did with calculate earlier in the chapter. Discuss how the meaning of the word (the symbol) has changed as it has gotten further from its original meaning. Two interesting words to trace are hazard and phony.

5. Of the 9-letter passwords formed by rearranging the letters AAAABBCCC (4 A’s, 2 B’s, and 3 C’s), I select one at random. Determine the following probabilities.

(a) Prob (my word is a palindrome and has no two C’s next to each other). 4 points

(b) Prob (my word has two C’s next to each other and the other C not next to them).

(c) Prob (my word has the three C’s next to each other and the B’s apart from each other).

Leave your probabilities with factorials in them.

5. Of the 9-letter passwords formed by rearranging the letters AAAABBCCC (4 A’s, 2 B’s, and 3 C’s), I select one at random. Determine the following probabilities.

(a) Prob (my word is a palindrome and has no two C’s next to each other).

(b) Prob (my word has two C’s next to each other and the other C not next to them).

(c) Prob (my word has the three C’s next to each other and the B’s apart from each other). Leave your probabilities with factorials in them.

3. An experiment consists of randomly rearranging the 10 letters of the word
QUARANTINE
into a sequence of 10 letters, where all possible orders of these 10 letters are equally likely. Find the probability of each of the following events:
(1) 2 the first three letters include no A’s;
(2) 3 the first three letters or the last three letters (or both) include no A’s;
(3) 2 the fourth letter is the first A;
(4) 3 the first letter and the last letter are the same;
(5) 2 the word ‘QUARANTINE’ is obtained;
(6)3 the sequence contains the word ‘RAN’

13. A digital computer has a memory unit with 32 bits per word. The instruction set consists of 260 different operations. All instructions have an operation code part (opcode) and an address part (allowing for only one address). Each instruction is stored in one word of memory.

a) How many bits are needed for the opcode?

b) How many bits are left for the address part of the instruction?

c) What is the maximum allowable size for memory?

d) What is the largest unsigned binary number that can be accommodated in one word of memory?

"Technical Communication: Global, Collaborative, and Digital" in Strategies for Technical Communication

1. Describe some things that a writer can do to "focus on the reader" when writing and designing technical documents.( in your own word , don't copy from any website )
2. Why is technical communication so often collaborative in nature?( in your own word , don't copy from any website )
3. Which two or three of the authors' strategies for working with teams do you think are the most helpful, and why?( in your own word , don't copy from any website )

A digital computer has a memory unit with 32 bits per word. The instruction set consists of 122 different operations. All instructions have an operation code part (opcode) and an address part (allowing for only one address). Each instruction is stored in one word of memory.

1. a) How many bits are needed for the opcode?

2. b) How many bits are left for the address part of the instruction?

3. c) What is the maximum allowable size for memory?

4. d) What is the largest unsigned binary number that can be accommodated in one word of memory?

Problem 3. A digital computer has a memory unit with 32 bits per word. The instruction set consists of 122 different operations. All instructions have an operation code part (opcode) and an address part (allowing for only one address). Each instruction is stored in one word of memory. a) How many bits are needed for the opcode? b) How many bits are left for the address part of the instruction? c) What is the maximum allowable size for memory? d) What is the largest unsigned binary number that can be accommodated in one word of memory?

Ann and Bill play the following game in which 4 gold coins are to be won. Ann selects a word from the set {up, out, over} and Bill selects a word from the same set (it could be the same word). If the words selected by the two players differ, then Ann wins one gold coin, and the remainder go to Bill. If the words selected by the two players are the same, then the number of gold coins won by Ann equals the number of letters in the chosen word, and the remainder go to Bill.

(a) Represent this scenario as a zero-sum 3 × 3 game.

(b) Calculate the equilibrium strategies for the game, and explain how the players should play the game using these strategies.

(c) Use the answer you deduced in part (b) to determine the game value v and show explicitly that Ann’s payoff is bounded above by this game value.