The pulse rates of 155 randomly selected adult males vary from a low of 41 bpm to a high of 109 bpm. Find the minimum sample size required to estimate the mean pulse rate of adult males. Assume that we want 90% confidence that the sample mean is within 2 bpm of the population mean. Complete parts (a) through (c) below. a. Find the sample size using the range rule of thumb to estimate Ο n= Type a whole number.,) (Type a whole number.) b. Assume that Ο = 11.6 bpm, based on the value s = 11.6 bpm from the sample of 155 male pulse rates. n= (Type a whole number.) c. Compare the results from parts (a) and (b). Which result is likely to be better? The result from part (a)_________the result from part (b). The result from______is likely larger than smaller than the same size as
Accepted Solution
A:
Answer:Part (a): 194; part (b): 90 and part (c): larger thanStep-by-step explanation:Part (a): Range is 109-41 = 68Std. deviation = range/4 = 68/4 = 17For n, Error (E) = z of 90%*std. dev/[tex]\sqrt{x}[/tex]nSo n = (z of 90%*std. dev/E)^square...(i)Z value for 90% confidence = 1-alpha = 0.90 alpha = 0.1We take alpha/2 for z value calculation, so 0.1/2 is 0.05. Look up the z table and you get 1.64.Going back to equation (i),n = (z of 90%*std. dev/E)^square = (1.64*17/2)^square = 194.32 = 194N must be a whole number that is why we have approximated it to 194.Part (b): Put given values in equation (i)n = (z of 90%*std. dev/E)^square = (1.64*11.6/2)^sqaure = 90.478 =90.5 = 900.5 is rounded down if the number on the left is an even number and is rounded up when the number on the left is odd. Here, 90 is an even number so we rounded down.Part (c): The result from part (a)_________the result from part (b).Since, 194 is 'larger than' 90 hence, result from part (a) is larger than the result from part (b). Also, result form part (a) is likely to be better as larger sample size gives more reliable results.