Statistics Exam 3

Number of children in household Frequency 0 - 5 1 - 9 2 - 9 3 - 7 4 - 0 5 - 1 What is the mean number of children in each household?

1.7

One common system for computing a grade point average​ (GPA) assigns 4 points to an​ A, 3 points to a​ B, 2 points to a​ C, 1 point to a​ D, and 0 points to an F. What is the GPA of a student who gets an A in a 2-credit course, a B in each of three 3-credit courses, a C in a 2-credit course, and a D in a 3-credit course? The mean grade point score is__________?

2.6

A student earned grades of​ C, A,​ B, and A. Those courses had these corresponding numbers of credit​ hours: 4​, 3​, 1​, and 3. The grading system assigns quality points to letter grades as​ follows: A=4, B=3, C=2, D=1, and F=0. Compute the grade point average​ (GPA) and round the result to two decimal places.

3.18

Speed (miles per hour) Frequency 42-45 -23 46-49 - 16 50-53 - 7 54-57 - 4 58-61 - 1 What is the mean of the data?

47.1

Empirical rule

68% within 1 SD 95% within 2 SD 99.7% within 3 SD

What percentages are associated with the Empirical Rule?

68%, 95%, 99.7%

Range rule of thumb/significant

95% lands within 2 standard deviations from the mean

A student earned grades of 66​, 77​, 88​, and 95 on her four regular tests. She earned a grade of 70 on the final exam and 70 on her class projects. Her combined homework grade was 85. The four regular tests count for​ 40% of the final​ grade, the final exam counts for​ 30%, the projects count for​ 10% and homework counts for​ 20%. What is her weighted mean​ grade?

=77.6

How to find Mean

dividing the sum of all values in a data set by the number of values

How to find Midrange

Add together the maximum and minimum data value and divide by two.

Mean

Add up all the values and divide by the number of values

he body temperatures of a group of healthy adults have a​ bell-shaped distribution with a mean of 98.18°F and a standard deviation of 0.54°F. Using the empirical​ rule, find each approximate percentage below. a. What is the approximate percentage of healthy adults with body temperatures within 2 standard deviations of the​ mean, or between 97.10°F and 99.26°​F? b. What is the approximate percentage of healthy adults with body temperatures between 97.64°F and 98.72°​F?

Approximately 9595​% of healthy adults in this group have body temperatures within 2 standard deviations of the​ mean, or between 97.10°F and 99.26°F. ​(Type an integer or a decimal. Do not​ round.) Part 2 b. Approximately 6868​% of healthy adults in this group have body temperatures between 97.64°F and 98.72°F. ​(Type an integer or a decimal. Do not​ round.)

Weighted Mean

Calculating gpa's

normally distributed

Every value is spread out

A​ student's course grade is based on one midterm that counts as 10​% of his final​ grade, one class project that counts as 15​% of his final​ grade, a set of homework assignments that counts as 45​% of his final​ grade, and a final exam that counts as 30​% of his final grade. His midterm score is 81​, his project score is 97​, his homework score is 75​, and his final exam score is 66. What is his overall final​ score? What letter grade did he earn​ (A, B,​ C, D, or​ F)? Assume that a mean of 90 or above is an​ A, a mean of at least 80 but less than 90 is a​ B, and so on.

Final Score 76.1 Letter Grade is a C

How to find Mode

Find the number that appears the most often.

Use the empirical rule to solve the problem. At one​ college, GPA's are normally distributed with a mean of 2.38 and a standard deviation of 0.47. Between what two values do approximately 68​% of the​ GPA's lie?

Lower bound​ = 1.911.91 Upper bound​ = 2.85

Mean of Frequency Distribution

Make a table with midpoints and f*x

Midrange

Maximum data + Minimum data divided by 2

Median

Middle number (least to greatest)

Outliers

Numbers that are much greater or much less than the other numbers in the set

the less standard deviation

closer to the mean

Listed below are the amounts​ (dollars) it costs for marriage proposal packages at different baseball stadiums. Find the​ range, variance, and standard deviation for the given sample data. Include appropriate units in the results. Are there any​ outliers, and are they likely to have much of an effect on the measures of​ variation? 40 50 50 55 70 95 95 100 195 212 270 375 500 2000 2750

Range of sample data= 2710 Dollars Standard Deviation of Sample data= 802.5. Dollars Variance of Sample data= 644071.8 Dollars Squared

Range

Take maximum value minus the minimum value

Distribution is symmetrical

The higher values look like a pyramid in the middle of the graph

Distribution is skewed to the right

The higher values will be on the left side

Distribution is skewed to the left

The higher values will be on the right side

Mode

The number that shows up the most

to find the percentile

count up to the number then divide by numbers (ex. 44/50

How to find midpoints

add and divide by 2

significantly high values

add the standard deviation twice to the mean

How to find Median

arrange numbers from least to greatest and find the middle value and if there are two add the two numbers together and divide by 2.

the greater the standard deviation

farther from the mean

how to calculate z score

given value is first on top, mean goes second on top, then subtract top number then divide by standard deviation

If standard deviation for set data is 0 then all values will be

identical

z scores

measure the distance of a score from the mean in units of standard deviation

Sample

specific group that you will collect data from

Variance

standard deviation squared

significantly low values

subtract standard deviation twice from the mean

Population

the entire group that you want to draw conclusions about

Midpoints

the point halfway between the endpoints (ex. 40+44 then divide by 2)

When data value are less than the mean

the z score is negative

n represents

total number of values added up

data value is considered signifigantly low or high when

z score is -2 or greater than 2