- Arts & Culture 4970
- Books in Foreign Languages 205
- Business & Economics 4686
- Computers 2361
- Dictionaries & Encyclopedias 672
- Education & Science 82143
- Abstracts 1263
- Astrology 13
- Astronomy 13
- Biology 39
- Chemistry 3835
- Coursework 3731
- Culture 32
- Diplomas 2596
- Drawings 1697
- Ecology 31
- Economy 329
- English 1253
- Entomology 2
- Ethics, Aesthetics 29
- For Education Students 23168
- Foreign Languages 122
- Geography 20
- Geology 17
- History 231
- Maps & Atlases 41
- Mathematics 6324
- Musical Literature 5
- Pedagogics 229
- Philosophy 190
- Physics 12931
- Political Science 132
- Practical Work 111
- Psychology 492
- Religion 50
- Russian and culture of speech 103
- School Textbooks 69
- Sexology 67
- Sociology 53
- Summaries, Cribs 763
- Tests 20867
- Textbooks for Colleges and Universities 546
- Theses 189
- To Help Graduate Students 24
- To Help the Entrant 112
- Vetting 357
- Works 58
- Информатика 9

- Engineering 3241
- Esoteric 1136
- Fiction 3198
- For Children 426
- House, Family & Entertainment 2643
- Law 2876
- Medicine 1239
- Newspapers & Magazines 337
- Security 315
- Sport, Tourism 988
- Website Promotion 694

# In the game, 80% of ripe watermelon, the rest underripe

Refunds: 0

Uploaded:

**15.01.2013**

Content: 30115152131440.rar (25,13 kB)

# Description

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 r

# Additional information

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

The task of the theory of probability

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 ripe;

b) not all ripe.

In the game, 80% of ripe watermelon, the rest underripe. Randomly selected four watermelon. What is the probability that among them:

a) at least 3 r