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What is the probability of independent events A and B occurring with probabilities of 0.35 and 0.20 respectively in the context of cryptocurrency?

avatarp9fkuev110Nov 28, 2021 · 3 years ago5 answers

In the context of cryptocurrency, what is the likelihood of both event A and event B happening independently, given that event A has a probability of 0.35 and event B has a probability of 0.20?

What is the probability of independent events A and B occurring with probabilities of 0.35 and 0.20 respectively in the context of cryptocurrency?

5 answers

  • avatarNov 28, 2021 · 3 years ago
    The probability of independent events A and B occurring can be calculated by multiplying their individual probabilities. In this case, the probability of event A happening is 0.35 and the probability of event B happening is 0.20. To find the probability of both events happening, we multiply these probabilities together: 0.35 * 0.20 = 0.07. Therefore, the probability of both event A and event B occurring is 0.07.
  • avatarNov 28, 2021 · 3 years ago
    When it comes to cryptocurrency, the probability of independent events A and B occurring can be determined by multiplying their respective probabilities. In this scenario, event A has a probability of 0.35 and event B has a probability of 0.20. By multiplying these probabilities, we get the probability of both events happening: 0.35 * 0.20 = 0.07. Hence, the likelihood of event A and event B occurring together is 0.07.
  • avatarNov 28, 2021 · 3 years ago
    Calculating the probability of independent events A and B occurring in the context of cryptocurrency requires multiplying their individual probabilities. In this case, event A has a probability of 0.35 and event B has a probability of 0.20. By multiplying these probabilities, we obtain the probability of both events happening: 0.35 * 0.20 = 0.07. Therefore, the likelihood of event A and event B occurring together is 0.07.
  • avatarNov 28, 2021 · 3 years ago
    The probability of independent events A and B happening in the context of cryptocurrency can be determined by multiplying their respective probabilities. Event A has a probability of 0.35, while event B has a probability of 0.20. Multiplying these probabilities gives us the probability of both events occurring: 0.35 * 0.20 = 0.07. Hence, the probability of event A and event B happening together is 0.07.
  • avatarNov 28, 2021 · 3 years ago
    In the context of cryptocurrency, the probability of independent events A and B occurring can be calculated by multiplying their individual probabilities. Event A has a probability of 0.35, and event B has a probability of 0.20. By multiplying these probabilities, we find that the probability of both events happening is 0.07.