Supposed that the mean body temperature for adults has a normal distribution with mean = 98.2F...
. Body temperatures of adults are normally distributed with a mean of 98.60 degrees and a standard deviation of 0.73 degrees. a. What is the probability of a randomly selected adult having a body temperature less than 99.6 degrees or greater than 100.6 degrees? b. What is the probability of a randomly selected adult having a body temperature that differs from the population mean by less than 1 degree?
Suppose that internal body temperatures of adults, that are 20 or older, follow a normal distribution with mean 36.42°C and standard deviation .48°C What is the probability that the internal body temperature of a randomly selected adult is found to be greater than 37.8°C
the body temperatures of adults are normally distributed with a mean of 98.6 degrees Fahrenheit and a standard deviation of 0.60 degrees Fahrenheit if 36 adults are randomly selected find the probability that their mean body temperature is greater than 98.4 degrees Fahrenheit
Body temperatures of adults are normally distributed with a mean of 98.60 degrees Fahrenheit and a standard deviation of 0.73 degrees Fahrenheit. Find the z- scores (round two decimal places) and the probability of a healthy adult having a body temperature between 98 to 99 degrees Fahrenheit (round four decimal places)?
For a healthy human, a body temperature follows a normal distribution with Mean of 98.2 degrees Fahrenheit and Standard Deviation of 0.26 degrees Fahrenheit. For an individual suffering with common cold, the average body temperature is 100.6 degrees Fahrenheit with Standard deviation of 0.54 degrees Fahrenheit. Simulate 10000 healthy and 10000 unhealthy individuals and answer questions 14 to 16. 14. If person A is healthy and person B has a cold, which of the events are the least likely? Pick...
1) Body temperatures vary according to the normal model with a mean of 36.8qC and a standard deviation of 0.4qC. a) What is the probability that a randomly selected person has a body temperature between 36.8qC and 37.0qC? [2 ] b) If random sample of 9 people is selected, what is the probability that average body temperature for the sample is greater than 37.0qC? [2] c) What is the body temperature that corresponds to the 99th percentile?
Question 29 (1 point) Find the indicated probability. Empirical evidence shows that the "normal" resting adult body temperature is normally distributed with a mean of 98.2 degrees Fahrenheit and a standard deviation of 0.7 degrees Fahrenheit. What is the probability that a randomly selected adult has a "normal" resting body temperature that is greater than 99 degrees Fahrenheit? 0.13 0.05 0.87 0.95 0.34
Body temperatures of adults are normally distributed with a mean of 98.60 °F and a standard deviation of 0.73 °F. What is the probability of a healthy adult having a body temperature between 97 °F and 99 °F?
Suppose the body temperatures in the population of all healthy adults follow a normal distribution with a mean of 98.6 degrees F and a standard deviation of 0.7 degrees F. Would it be unusual for a healthy adult to have a temperature of 100.5 degrees F? A. Yes. B. No. C. I have no idea. D. None of the above.
Question 6 9 pts The lengths of all pregnancies are normally distributed with a mean of 273 days and a standard deviation of 20 days. If 64 women are randomly selected, find the probability that they have a mean pregnancy between 270.5 days and 275.5 days. Question 7 9 pts The distribution of body temperatures of all adults has a mean of 98.6°F and a standard deviation of 0.60° F. If a sample of 49 adults are randomly selected, find...