Answer :
The distribution is uniform for 50 ≤ x ≤ 52.
where x = minutes per class.
The probability P(x < 50.6) is the shaded portion of the distribution.
Its value is
(50.6 - 50)/(52 - 50) = 0.3
Answer:
The probability is 0.3 or 30%
where x = minutes per class.
The probability P(x < 50.6) is the shaded portion of the distribution.
Its value is
(50.6 - 50)/(52 - 50) = 0.3
Answer:
The probability is 0.3 or 30%
Answer:
The probability of the class length is less than [tex]50.6[/tex] min is [tex]0.3[/tex] min.
Step-by-step explanation:
Given: The lengths of a professor's classes has a continuous uniform distribution between [tex]50.0[/tex] min and [tex]52.0[/tex] min.
From the question,
The lengths of a professor's classes has a continuous uniform distribution between [tex]50\leq{x}\leq52[/tex], where [tex]x=[/tex] minutes per class.
The probability of class length is less than [tex]50.6[/tex] min is [tex]P(x<50.6)[/tex] is calculated as
[tex]\frac{(50.6 - 50)}{(52 - 50)}=\frac{0.6}{2}\\[/tex]
[tex]=0.3[/tex]
Therefore, the probability of the class length is less than [tex]50.6[/tex] min is [tex]0.3[/tex] min.
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