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31 votes
Let be the density function for the shelf life of a brand of banana which lasts up to weeks. Time, , is measured in weeks and . Incorrect answer icon Your answer is incorrect. Find the mean shelf life of a banana using . Round your answer to one decimal place. Mean

User TheNotSoWise
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1 Answer

21 votes
21 votes

The question is incomplete. The complete question is :

Let
p(t) = -0.0375t^2 + 0.225t be the density function for the shelf life of a brand of banana which lasts up to 4 weeks. Time, t, is measured in weeks and
$0 \leq t \leq 4$. Incorrect answer icon Your answer is incorrect. Find the mean shelf life of a banana using . Round your answer to one decimal place.

Answer:

2.4

Explanation:

Given :


p(t) = -0.0375t^2 + 0.225t

Mean :


$=\int_0^4 tp (t) \ dt$


$=\int_0^4 t (0.0375 t^2 + 0.225t) \ dt$


$=-0.0375 \int_0^4 t^3 \ dt + 0.225 \int_0^4 t^2 \ dt$


$=-0.0375 \left[ (t^4)/(4) \right]^4_0 + 0.225 \left[ (t^3)/(3) \right]^4_0$


$=-0.0375 (64) + 0.225 \left( (64)/(3) \right)$


$=-2.5 + 4.8$

= 2.4

Therefore, the mean is 2.4

User Hamed F
by
2.8k points
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