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Conditional probability is the probability of an event given that another event has occurred, expressed as P(A/B). It is used in scientific experiments and can be calculated by dividing the combined probability of the events by the probability of the second event. It has applications in medical research, engineering, and business analysis. Venn diagrams can illustrate the results. Calculations become more complex with more events.
Conditional probability is a term often used to describe the probability of a specific event given that a second event occurs. This probability is formally expressed as P(A/B). Conditional probability is a mathematical concept, but it is often used in scientific experiments where two or more event variables are involved.
To calculate the conditional probability, the combined probability of the first and second events is divided by the probability of the second event. For example, if there are 100 people in a room, 25% of whom have both brown hair and green eyes, and 40% of whom have green eyes, the conditional probability would be calculated by dividing 0.25 by 0.40. The result is 0.625. This means that there is a 62.5% chance that any individual selected from the group will have brown hair, given that they have green eyes.
Conditional probability has a number of applications in many fields. The formula can be easily applied to a variety of scientific experiments to obtain important information. Such information is important to medical and pharmaceutical researchers, all types of development engineers, and even business analysts.
Medical and pharmaceutical researchers may use probability data in relation to drug reactions or interactions to determine the likelihood that a patient has a certain condition under a certain set of circumstances, or to determine a patient’s likely response to a certain treatment in based on known variables. Engineers might use these equations in relation to failure rates, to choose the best possible materials for a project, or to determine curing times for certain types of materials. A business analyst may want to determine the likelihood of a customer purchasing a specific item, given that she already owns another specific item. This can be used to determine the best targets for marketing and advertising campaigns.
The illustration of conditional probability results is sometimes presented in a Venn diagram, which is a diagram of two or more overlapping circles. A circle represents cases where both the first and second events occur. The other circle represents cases where only the second event occurs. The overlapping areas represent the probability of the second event occurring, given that the first occurred.
Calculations for situations involving more than two events or variables become much more complex. Many suggest they can be simplified by using actual numbers rather than percentages or rates. Conditional probability is often the necessary first step in calculating advanced functions, such as inverse probability.
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