24. Assume that the resting heart rate in humans is normally distributed with a population mean...

Assume the resting heart rates for a sample of individuals are normally distributed with a mean...

Assume the resting heart rates for a sample of individuals are normally distributed with a mean of 85 and a standard deviation of 5. Use the​ 68-95-99.7 rule to find the following quantities. a. The relative frequency of rates less than 95 using the​ 68-95-99.7 rule is nothing. ​(Round to three decimal places as​ needed.) b. The relative frequency of rates greater than 90 using the​ 68-95-99.7 rule is nothing. ​(Round to three decimal places as​ needed.) c. The relative...

A researcher is interested in the average resting heart rates of elite athletes versus non-elite athletes....

A researcher is interested in the average resting heart rates of elite athletes versus non-elite athletes. The researcher wants to see if the average resting heart rates of elite athletes is lower than average resting heart rates of non-elite athletes. The researcher randomly sampled 45 elite athletes and 60 non-elite athletes. The average resting heart rate of the elite athletes was 46 bpm with a standard deviation of 14 bpm while the average resting heart rate of the non-elite athletes...

​1) X is normally distributed with a mean of 60 and a standard deviation of 12....

​1) X is normally distributed with a mean of 60 and a standard deviation of 12. ​​a) Find the probability that X is less than 42 ​​b) Find the probability that X is more than 70. ​2) Weights of Yellow Labradors are normally distributed with a mean of 55 pounds and a standard ​​deviation of 6.2 pounds. What proportion of Yellow Labradors weigh between 50 and 60 pounds?

Random samples of resting heart rates are taken from two groups. Population 1 exercises regularly, and...

Random samples of resting heart rates are taken from two groups. Population 1 exercises regularly, and Population 2 does not. The data from these two samples is given below: Population 1: 67, 66, 68, 72, 64, 69, 72 Population 2: 71, 71, 76, 69, 72, 70, 74, 77 pop1 <- c( 67, 66, 68, 72, 64, 69, 72 ) pop2 <- c(71, 71, 76, 69, 72, 70, 74, 77) Is there evidence, at an α=0.055α=0.055 level of significance, to conclude...

A normally distributed population has a mean of 70 and a standard deviation of 5. a....

A normally distributed population has a mean of 70 and a standard deviation of 5. a. Approximately 95% of the data will be within what two values? b. What percent of the data will be between 65 and 75?

Using the Karvonen Formula Worksheet provided list your Target Training Heart Rate in beats per minute...

Using the Karvonen Formula Worksheet provided list your Target Training Heart Rate in beats per minute (BPM) for the following zones: 50%=66 RHR, 65%=61 RHR, 75%=70 RHR, 85%=66 RHR & 95%=62 RHR Age: 24 Avg. Resting Heart Rate: 66 Target Training Heart Rates: 50% = 128 BPM 65% = 145 BPM 75% = 156 BPM 85% = 168 BPM 95% = 179 BPM

300 people’s resting respiration rates are recorded, and the mean of these rates is found to...

300 people’s resting respiration rates are recorded, and the mean of these rates is found to be 11.4 breaths per minute (bpm).  Test the claim, at the 1% significance level, that the mean resting respiration rate is lower than the normally accepted value of 12.  Assume a population standard deviation of 2.2 bpm.  

Consider a sample of resting heart rates in beats per minute given by members of this...

Consider a sample of resting heart rates in beats per minute given by members of this class: 55, 70, 80, 72, 90, 65. ] (a) Compute the sample mean resting heart rate of these 6 students. Do not use statistical features of your calculator. Be sure to use appropriate notation. (b) Compute the median resting heart rate of these 6 students. Do not use statistical features of your calculator. (c) Compute the sample standard deviation resting heart rate of these...

The mean resting pulse rate for men is 72 beats per minute. A simple random sample...

The mean resting pulse rate for men is 72 beats per minute. A simple random sample of men who regularly work out at Mitch's Gym is obtained and their resting pulse rates (in beats per minute) are listed below. Use a 0.05 significance level to test the claim that these sample pulse rates come from a population with a mean less than 72 beats per minute. Assume that the standard deviation of the resting pulse rates of all men who...

Random samples of resting heart rates are taken from two groups. Population 1 exercises regularly, and...

Random samples of resting heart rates are taken from two groups. Population 1 exercises regularly, and Population 2 does not. The data from these two samples is given below: Population 1: 65, 64, 69, 73, 67, 64, 70 Population 2: 74, 78, 75, 69, 69, 73, 79, 74 Is there evidence, at an α=0.05α=0.05 level of significance, to conclude that there those who exercise regularly have lower resting heart rates? (Assume that the population variances are equal.) Carry out an...