Probabilidade Exercicios Resolvidos -

Given: [ P(D) = 0.001,\quad P(T^+|D) = 0.99,\quad P(T^+|\neg D) = 0.01 ] By Bayes' theorem: [ P(D|T^+) = \fracD)P(D)P(T^+ ] [ = \frac0.99 \times 0.0010.99 \times 0.001 + 0.01 \times 0.999 ] [ = \frac0.000990.00099 + 0.00999 = \frac0.000990.01098 \approx 0.09016 ]

Red suits = hearts + diamonds → 2 suits × 3 face cards = 6 [ P = \frac652 = \frac326 \approx 0.1154 ] probabilidade exercicios resolvidos

About 9.02%. Despite high accuracy, low prevalence means most positives are false positives. Exercise 5: Binomial Probability Problem: A fair coin is tossed 5 times. What is the probability of getting exactly 3 heads? Solution: Binomial with ( n=5, k=3, p=0.5 ): [ P(X=3) = \binom53 (0.5)^3 (0.5)^2 = 10 \times (0.5)^5 ] [ = 10 \times \frac132 = \frac1032 = \frac516 = 0.3125 ] Given: [ P(D) = 0

3 face cards per suit × 4 suits = 12 face cards [ P = \frac1252 = \frac313 \approx 0.2308 ] What is the probability of getting exactly 3 heads

After removing 1 red, left: 3 red + 6 blue = 9 marbles. [ P(B_2 | R_1) = \frac69 = \frac23 ]

Probabilidade Exercicios Resolvidos -

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