An experiment involves picking a card from a selection of cards numbered 5, 10, and 15. In equation form, what is the probability model for this experiment? List the values of x in ascending order.
The probability model for this experiment can be represented as:
P(x=5) = 1/3
P(x=10) = 1/3
P(x=15) = 1/3
In ascending order, the values of x are: 5, 10, 15.
To determine the probability model for this experiment, let's consider the values of x.
Given that there are three cards numbered 5, 10, and 15, the possible values of x can be 5, 10, or 15.
The probability model can be represented as follows:
P(x = 5) = probability of picking the card numbered 5
P(x = 10) = probability of picking the card numbered 10
P(x = 15) = probability of picking the card numbered 15
As there are no additional details or information provided about the experiment, we can assume that each card has an equal chance of being selected. Thus, the probability of picking any particular card is 1/3.
Therefore, the probability model for this experiment is:
P(x = 5) = 1/3
P(x = 10) = 1/3
P(x = 15) = 1/3
Listing the values of x in ascending order, we have:
x = 5, 10, 15
To determine the probability model for this experiment, we need to calculate the probability of each possible outcome. Since there are three cards numbered 5, 10, and 15, the total number of possible outcomes is 3.
Let's denote the probability of picking the card numbered 5 as P(5), the probability of picking the card numbered 10 as P(10), and the probability of picking the card numbered 15 as P(15).
The probability model for this experiment can be represented by the equation:
P(5) + P(10) + P(15) = 1
Since there are three possible outcomes with equal likelihood, we can assume that P(5) = P(10) = P(15) = x.
Substituting these values into the equation, we get:
x + x + x = 1
3x = 1
x = 1/3
So, the probability model for this experiment is:
P(5) = P(10) = P(15) = 1/3
The values of "x" in ascending order are:
1/3, 1/3, 1/3