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Starting with the definition of Conditional Probability | Starting with the definition of Conditional Probability | ||
[[File:Bayes derivation.png|500px|thumbnail]] | [[File:Bayes derivation.png|500px|thumbnail]] | ||
| − | In | + | In Step 1 with the definition of conditional probabilities, it is assumed that P(A) and P(B) are not 0. |
| − | In | + | In Step 2 we multiply both sides by P(B) and in step 3 we multiply both sides by P(A) and we end up with the same result on the right hand side of each. |
| − | In | + | In Step 4 we are able to set both left sides equal to each other since they both have the same right hand side. |
| − | In | + | In Step 5 we divide both sides by P(B) and we arrive at Baye's Theorem. |
| + | |||
| + | It is also important to introduce the law of total probability: | ||
| + | [[File:total_prob.png|300px|thumbnail]] | ||
Revision as of 12:15, 10 November 2022
Probability : Group 4
Kalpit Patel Rick Jiang Bowen Wang Kyle Arrowood
This is an edit
Probability, Conditional Probability, Bayes Theorem Disease example
Definition: Probability is a measure of the likelihood of an event to occur. Many events cannot be predicted with total certainty. We can predict only the chance of an event to occur i.e., how likely they are going to happen, using it. Probability can range from 0 to 1, where 0 means the event to be an impossible one and 1 indicates a certain event. The probability of all the events in a sample space adds up to 1.
Notation:
1) Event: A, B, C...
2) Probability of an event to occur: P(A), P(B), P(C)...
Formula for probability:
Baye's Theorem Derivation:
Starting with the definition of Conditional Probability
In Step 1 with the definition of conditional probabilities, it is assumed that P(A) and P(B) are not 0.
In Step 2 we multiply both sides by P(B) and in step 3 we multiply both sides by P(A) and we end up with the same result on the right hand side of each.
In Step 4 we are able to set both left sides equal to each other since they both have the same right hand side.
In Step 5 we divide both sides by P(B) and we arrive at Baye's Theorem.
It is also important to introduce the law of total probability:
