in one common system for finding a grade - point average, or gpa,\na = 4, b = 3, c = 2, d = 1, f = 0.\nthe…

in one common system for finding a grade - point average, or gpa,\na = 4, b = 3, c = 2, d = 1, f = 0.\nthe gpa is calculated by multiplying the number of credit hours for a course and the number assigned to each grade, and then adding these products. then divide this sum by the total number of credit hours. because each course grade is weighted according to the number of credits of the course, gpa is called a weighted mean.\ncalculate the gpa for this transcript:\nthe grade point average is .\n(round to the nearest hundredth as needed.)

in one common system for finding a grade - point average, or gpa,\na = 4, b = 3, c = 2, d = 1, f = 0.\nthe gpa is calculated by multiplying the number of credit hours for a course and the number assigned to each grade, and then adding these products. then divide this sum by the total number of credit hours. because each course grade is weighted according to the number of credits of the course, gpa is called a weighted mean.\ncalculate the gpa for this transcript:\nthe grade point average is .\n(round to the nearest hundredth as needed.)

Answer

Explanation:

Step1: Calculate product for each grade - credit pair

For the first B (3 points) with 2 credit - hours: $3\times2 = 6$. For the second B (3 points) with 3 credit - hours: $3\times3=9$. For the third B (3 points) with 2 credit - hours: $3\times2 = 6$. For the C (2 points) with 5 credit - hours: $2\times5 = 10$.

Step2: Calculate the sum of the products

$6 + 9+6 + 10=31$.

Step3: Calculate the total number of credit - hours

$2 + 3+2 + 5=12$.

Step4: Calculate the GPA

$GPA=\frac{31}{12}\approx2.58$.

Answer:

$2.58$