The annual household incomes, in thousands of dollars, for 500 households in a small community are summarized in the histogram below.
Q. 2
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Q. 3
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
Q. 4
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
Q. 5
BFlGsR85BMIRUVhDJ71XKYQesIxsW V34KxkaMj6KTYnQSAEkUbR89xkDpd DgnDh60V9H5dtwC74y8sHk2MEzbHL 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
Q. 6
OOWDpT5ch0mXnGNexjwhEdD5JuWlZ XWqodr32zj2qy9PQ5VCgO8cjKq7eF 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
Q. 7
TodzQSs85MkBc6YeWpEnGOqhkzPTQ 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 />
Which of the following values best
describes a typical household income
for this community?
1.40
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