The probability should be 0 (zero). 153 is not between 1 and 100.
If you meant your number generator to return a number between 1 and 1000, the probability would be 1/1000 = .001 = .1%
30% chance. First, find the factors of 20: {1,2,4,5,10,20} There are 6 factors, out of 20 possible numbers. 6/20 = .3 = 30%
There are 4 nines and 4 twos, eight cards with the required outcome. So the probability of a nine or two is 8/52 = 2/13 or 15.38%
5%. There are ten numbers, and two coin choices, therefore 20 possibilities. Divide 100 by 20. You get 5. There you go, 5%. Make that into a fraction, and you have 1/20 (5/100).
Empirical
Yes, the noun 'select' is a abstract noun, a word for chosen or preferred people or things; a word for a concept. The abstract noun form of the verb to 'select' is the gerund, selecting; a word for a process. The abstract noun form of the adjective 'select' is selectness; a word for a quality.
There are infinitely many numbers and so the probability of the second event is 0. As a result the overall probability is 0.
1/26
infinite
30% chance. First, find the factors of 20: {1,2,4,5,10,20} There are 6 factors, out of 20 possible numbers. 6/20 = .3 = 30%
The best method for randomly choosing the next nucleotide to add to an imaginary DNA segment would be to use a random number generator that assigns each nucleotide (A, T, C, G) a number, and then select a number at random to determine which nucleotide to add next. This method ensures an equal probability of selecting each nucleotide.
Select 2 cards, do not put the 1st back in the deck. This is dependent probability. The outcome of drawing the 2nd card depends on the 1st card drawn. Select a card, look at it and put it back in the deck. Select a 2nd card. These are independent of each other. One does not change the probability for selecting the 2nd.
The answer depends on how many numbers you select!The answer depends on how many numbers you select!The answer depends on how many numbers you select!The answer depends on how many numbers you select!
Empirical
You randomly select one card from a 52-card deck. Find the probability of selecting the king of diamonds or the jack of
Selecting
There are 4 nines and 4 twos, eight cards with the required outcome. So the probability of a nine or two is 8/52 = 2/13 or 15.38%
5%. There are ten numbers, and two coin choices, therefore 20 possibilities. Divide 100 by 20. You get 5. There you go, 5%. Make that into a fraction, and you have 1/20 (5/100).