The following probabilities are based on data collected from U.S. adults during the National Health Interview Survey 2005-2007. Individuals are placed into a weight category based on weight, height, gender and age. Underweight Healthy Weight Overweight (Not Obese) Obese Probability 0.019 0.377 0.35 0.254 Based on this data, what is the probability that a randomly selected U.S. adult who weighs more than the healthy weight range is obese? 0.421

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adnansoomro2019 adnansoomro2019 · Answer 1 · 2020-05-06T11:21:23+02:00

Answer:

Required Probability =0.421

Step-by-step explanation:

Let's first arrange the data given in a more presentable way: So, we have the following probabilities for different categories.

Underweight (UW) = 0.019

Healthy Weight (HW) = 0.377

Overweight but Not Obese (NO) = 0.35

Obese (O) = 0.254

Now, let's calculate the probability that a randomly selected American adult who weighs more than the healthy weight range is obese:

Required Probability = Probability(obese)/Probability(Overweight + Obese)

= P (O) /P(NO + O)

=0.254/(0.35+0.254)

Required Probability =0.421

where, O for Obese and NO for Not Obese or Overweight but Not Obese.

So, the correct answer = 0.421

andromache andromache · Answer 2 · 2022-02-15T12:00:48+01:00

andromache andromache

The probability that a randomly selected U.S is 0.421

Required Probability = Probability(obese) ÷ Probability(Overweight + Obese)

= P (O) ÷P(NO + O)

=0.254 ÷(0.35+0.254)

=0.421

here O for Obese

NO for Not Obese

Overweight but Not Obese.

Learn more about the data here: https://brainly.com/question/23119770

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