Respuesta :
Answer:
i) If a customer returns to the store with a DVD player that needs warranty repair work, what is the probability that it is a brand 1 DVD player
[tex]P(\frac{D_{1} }{R} ) =0.6097[/tex]
ii) If a customer returns to the store with a DVD player that needs warranty repair work, what is the probability that it is a brand 2 DVD player
[tex]P(\frac{D_{2} }{R} ) =0.2926[/tex]
iii) If a customer returns to the store with a DVD player that needs warranty repair work, what is the probability that it is a brand 2 DVD player
[tex]P(\frac{D_{3} }{R} ) =0.09756[/tex]
Step-by-step explanation:
Explanation:-
Given data
Let D₁ be the event of brand 1 DVD players
Given P( D₁) = 50% = 0.5
Let D₂ be the event of brand 2 DVD players
Given P( D₂) = 30% = 0.3
Let D₃ be the event of brand 3 DVD players
Given P(D₃ ) = 20% = 0.2
Let 'R' be the event of brand 1's DVD players require warranty repair work
Given data
[tex]P(\frac{R}{D_{1} } ) = 0.25[/tex]
[tex]P(\frac{R}{D_{2} } ) = 0.20[/tex]
[tex]P(\frac{R}{D_{3} } ) = 0.10[/tex]
If a customer returns to the store with a DVD player that needs warranty repair work, what is the probability that it is a brand 1 DVD player
[tex]P(\frac{D_{1} }{R} ) = \frac{P(D_{1} )P(\frac{R}{D_{1} }) }{P(D_{1} )P(\frac{R}{D_{1} }) +P(D_{2}) P(\frac{R}{D_{2} } )+P(D_{3}P(\frac{R}{D_{3} } ) }[/tex]
Substitute all values
[tex]P(\frac{D_{1} }{R} ) = \frac{0.50 X 0.25 }{0.50 X 0.25+0.30 X 0.20 + 0.20 X 0.10 }[/tex]
[tex]P(\frac{D_{1} }{R} ) = \frac{0.125}{0.205} =0.6097[/tex]
If a customer returns to the store with a DVD player that needs warranty repair work, what is the probability that it is a brand 2 DVD player
[tex]P(\frac{D_{2} }{R} ) = \frac{P(D_{2} )P(\frac{R}{D_{2} }) }{P(D_{1} )P(\frac{R}{D_{1} }) +P(D_{2}) P(\frac{R}{D_{2} } )+P(D_{3}P(\frac{R}{D_{3} } ) }[/tex]
[tex]P(\frac{D_{2} }{R} ) = \frac{0.30 X 0.20 }{0.50 X 0.25+0.30 X 0.20 + 0.20 X 0.10 }[/tex]
[tex]P(\frac{D_{2} }{R} ) = \frac{0.06}{0.205} =0.2926[/tex]
If a customer returns to the store with a DVD player that needs warranty repair work, what is the probability that it is a brand 3 DVD player
[tex]P(\frac{D_{3} }{R} ) = \frac{P(D_{3}) P(\frac{R}{D_{3} } )}{P(D_{1} )P(\frac{R}{D_{1} }) +P(D_{2}) P(\frac{R}{D_{2} } )+P(D_{3}P(\frac{R}{D_{3} } ) }[/tex]
[tex]P(\frac{D_{3} }{R} ) = \frac{0.20 X 0.10 }{0.50 X 0.25+0.30 X 0.20 + 0.20 X 0.10 }[/tex]
[tex]P(\frac{D_{3} }{R} ) = \frac{0.02}{0.205} =0.09756[/tex]
1) The probability that a randomly selected purchaser has bought a brand 1 DVD player that will need repair while under warranty is 12.50%.
2) The probability that a randomly selected purchaser has a DVD player that will need repair while under warranty is 20.50%.
3) If a customer returns to the store with a DVD player that needs warranty repair work, the probability that it is a brand 1 DVD player is 60.975%, a brand 2 DVD player is 29.268%, and a brand 3 DVD player is 9.756%.
Since a chain of video stores sells three different brands of DVD players, and of its DVD player sales, 50% are brand 1, 30% are brand 2, and 20% are brand 3, and each manufacturer offers a 1-year warranty on parts and labor, and it is known that 25% of brand 1's DVD players require warranty repair work, whereas the corresponding percentages for brands 2 and 3 are 20% and 10%, respectively, to determine 1) what is the probability that a randomly selected purchaser has bought a brand 1 DVD player that will need repair while under warranty, 2) what is the probability that a randomly selected purchaser has a DVD player that will need repair while under warranty, and 3) if a customer returns to the store with a DVD player that needs warranty repair work, what is the probability that it is a brand 1 DVD player, a brand 2 DVD player and a brand 3 DVD player, the following calculations must be performed:
1)
- 50 x 0.25 = X
- 12.50 = X
2)
- (50 x 0.25) + (30 x 0.20) + (20 x 0.10) = X
- 12.50 + 6 + 2 = X
- 20.50 = X
3)
- 12.50 x 100 / 20.50 = X
- 60.975 = X
- 6 x 100 / 20.50 = X
- 29.268 = X
- 2 x 100 / 20.50 = X
- 9.756 = X
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