In November 2024
Search & Filtering
Identify the appropriate distribution function if we want to select 20 random numbers between 0 and 9.
The Following are the height in centimeters and weights in kilogram of 5 teachers in a certain schools.Determine they relationship between the height (cm) and weight (kg)
Teacher A B C D E
HEIGHT (cm) X 163,160,168,159,170
Weight (kg) Y 52, 50, 64, 51, 69
Solve r and interpret the result
X 2,4,6,7,10
Y 8,10,12,6,16
In the given table on the below, solve for Pearson r and interpret the result
X 80,84,86,87,89,90,91,93,94,96
Y 78,83,80,84,89,90,88,91,93,96
2. Consider the population consisting of the values (1, 2, 8). List all possible samples of size 2 which can be drawn without replacement from the population. Find the following:
a. Population mean
b. Population variance
c. Population standard deviation
d. Mean of the samples and mean of the sampling distribution of mean
e. Variance of the sampling distribution of means
f. Standard deviation of the sampling distribution of means
The cashier of a fastfood restaurant claims that the average amount spent by customers for dinner is P 120. 00. A sample
of 50 customers over a month period was randomly selected and it was found out that the average amount spent for dinner
was P 112. 50. Using a 0.05 level of significance, can it be concluded that the average amount spent by customers is more
than P 120. 00? Assume that the population standard deviation is P 6.50. (Use Critical Value Method)
suppose that during any hour in a large department store, the average number of shoppers is 448, with a standard deviation of 21 shoppers. what is the probability that a random sample of 49 different shopping hours will yield a sample mean between 441 and 446 shoppers?
The weights (in kg) of 11 Stem B follow a normal distribution and has a mean of 52 and a standard deviation of 4. How many students have weights greater than 56?
It is claimed that a new diet will reduce a person’s weight by 4.5 kg, on average, in a period
of 2 weeks. The weights of 10 women who followed the diet were recorded before and after
a 2-week period, yielding the following data:
Woman Weight After
1
2
3
4
5
6
7
8
9
10
Weight Before
59.4
68.2
63.6
56.7
62.6
64.0
69.0
61.7
60.3
58.5
weight After
58.7
62.3
60.2
54.4
59.9
58.5
62.1
58.1
54.9
60.0
At the 0.05 level of significance, test the hypothesis that the diet reduces the mean weight by
4.5 kg against the alternative hypothesis that the mean weight is less than 4.5 kg.
In a dental surgery conducted by a country dental health team, 500 adults were asked to
give the reason for their last visit to a dentist. Of the 220 who had less than a high-school
education or better, 150 stated that they went for preventative reasons. Construct a 95
percent confidence interval.
Americans ate an average of 25.7 pounds of confectionery products each last year and
spent an average of $61.50 per person doing so. If the standard deviation of consumption is 3.75 pounds and the standard deviation of the amount spent is %5.89, find the following:
a. The probability that the sample mean confectionary consumption for a random sample
of 40 American consumers was greater than 27 pounds.
b. The probability that for a random sample of 50, the sample mean for confectionary
spending exceeded $60.00
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