data:image/png;base64,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

BCDF

itemitemNew GPA WeightedNew GPA Unwieghted

item

This code takes each item from the unweighted list and adds them togetherNew GPA UnwieghtedThis code will take the total and give us an Unweighted GPA for the semester Unweighted GPAThis code will take the Original GPA and classes taken as well as the semester gpa and classes taken and find the total GPA unweighted

New GPA WeightedWeighted GPA

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