Regular probability of this and that or this and that or problem!
According to the given table the probability that BOS had at the 2nd pick is 11.1%. The cell corresponding to BOS and pick 2 shows 11.1%.
However, to verify if our claim is correct we might add up the probabilities of BOS at every pick starting from 1 to 14 and check if it adds up to 100% as it should.
10.3+11.1+12.0+0+23.7+34.2+8.2+0.3+0+0+0+0+0+0= 99.8
100% (It may so happen that some probabilities at some picks were
in second decimal places and when they were rounded off 0.2% of
probability was not accounted for)
Similarly to verify we can add up the probabilities of all teams at the 2nd pick and check if it is equal to 100%
21.5+18.8+15.7+11.2+11.1+7.1+4.9+3.3+2.0+1.3+0.9+0.8+0.7+0.6=
99.9
100%
Our verification was correct and the probabilities do add up to 100% in each case.
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what is the probability of rolling a 2,3, or 6 on a regular six sided die?
Two regular 6-sided dice are tossed. Compute the probability that the sum of the pips on the upward faces of the 2 dice is the following. (See the figure below for the sample space of this experiment. Enter your probability as a fraction.) At least 9
what is the probability of rolling a number greater than 6 on a regular six-sided die?
what is the probability of rolling a number greater than 1 on a regular six-sided die?
Four people get on a bus that makes six regular stops. Find the probability that at least two of the people get off on the same stop.
is this model (Bernoulli)
a regular probability model based on the criteria
listed here:
please justify your answers for each condition
1. Probability model: { f(r, ?)-ge ( 1-U)'-*, ? E (0, 1 ), r E { 0.1 } }
A regular six-sided die is rolled 9 times. What is the probability of getting a 1 or 6 on exactly 7 of those rolls?
Please solve this probability and statistics problem The lecturer has four 6-sided dice, of which three are regular (results 1, ...,6 are equally probable). One die is deformed so that results 1 and 6 each have probability 0.3, and each other result has probability 0.1. The lecturer has chosen one die randomly and rolled it five times, obtaining the result sequence (6, 6, 2, 4, 6). We denote = 1 if the chosen die is regular, and = 2 if...