You draw five cards from a standard deck of 52 cards. P(hearts) = 4/5. What type of probability is illustrated and why?
I need help on this and can’t figure it out
since you did the actual draw, it's an experiment.
So, it's experimental probability.
However, in a standard deck of 52 cards, it's hard to see how any probability could be 4/5.
To determine the type of probability illustrated in this scenario, let's break it down.
The scenario involves drawing five cards from a standard deck of 52 cards. This implies that each card drawn is independent and unrelated to the others.
The question asks for the probability of drawing a heart, which is one of the four suits in a deck.
The given probability, P(hearts) = 4/5, indicates that there is a 4 out of 5 chance of drawing a heart.
Now, to determine the type of probability illustrated, we need to consider the definition of probability types:
1. Theoretical Probability: This type of probability is calculated based on theoretical models and assumptions. It involves dividing the number of favorable outcomes by the total number of possible outcomes.
2. Experimental Probability: This type of probability is calculated based on experimental data or real-life experiments. It involves conducting several trials or experiments to determine the probability of an event occurring.
In this scenario, the probability is given as 4/5, which suggests that it is not determined based on a theoretical or experimental approach. Instead, it seems to be known or given directly. Therefore, the type of probability illustrated is considered prior knowledge or given probability.
In summary, the given probability P(hearts) = 4/5 reflects prior knowledge or given probability because it is known directly and not calculated using a theoretical or experimental approach.