Multiplication principle - practice problems - page 4 of 27
Number of problems found: 525
- Roads
There are four roads from city A to city B. There are five roads from city B to city C. How many different routes can we take from city A to city C via city B? - The box
The box contains five chocolate, three fruit, and two menthol candies. We choose sweets at random from the box. What probability will we take out one chocolate, one fruit, and one menthol candy without a return? - Beads
How many ways can we thread four red, five blue, and six yellow beads onto a thread? - Telephone numbers
How many 7-digit telephone numbers can we put together so that each number consists of different digits? - Chocolates
How many ways can we distribute eight different chocolates to four children? - Probability
In the lottery, numbers are drawn five from 50. What are the chances you will win the first prize? - Combinatorics
The city has 7 fountains. Works only 6. How many options are there that can squirt? - Bits, bytes
Calculate how many different numbers can be encoded in a 16-bit binary word. - Groups 72194
I have eight groups. How could they place first, second, and third? - Probability 59073
A group of n people, including Jano and Fero, randomly line up. What probability will there be exactly r people (r - Probability 32951
Determine the probability that when drawing three cards from a complete set of 32 marriage cards, it will be the same acorns or the kings themselves. - 4-digit 32251
How many 4-digit numbers to two decimal places do we create when we use the numbers 7, 5, 0, 3 - Determined 16233
How many lines are determined by 5 points if three lie in one line? - Triangles 8306
Find out how many triangles you create from lines 7 dm, 5 dm, 10 dm, 12 dm, and 15 dm long. - Assemble 6449
How many natural numbers less than 400 can I assemble if the numbers do not repeat? - 6 married
Six married couples are in a room. If two people are chosen at random. Find the probability that; a). they are married. b). one is male, and one is female. - Gold, silver, bronze
How many ways can we divide gold, silver, and bronze medals if six people compete? - Word MATEMATIKA
How many words can be created from the phrase MATEMATIKA by changing the letters' order, regardless of whether the words are meaningful? - Tokens
The non-transparent bags are red, white, yellow, and blue tokens. We 3times pulled one token and again returned it, writing down all possibilities. - One green
In the container are 45 white and 15 green balls. We randomly select five balls. What is the probability that there will be one green ball maximally?
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