Adding Columns with Dates

Trying to add up two different columns-

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I think I got the first figured out, it would be a sum of all charge offs w/in a certain quarter this was my formula:

=SUM(COUNTIFS({Credit Card Charge Offs Range 1}, AND(IFERROR(MONTH(@cell), 0) = 4, IFERROR(YEAR(@cell), 0) = 2020)), (COUNTIFS({Credit Card Charge Offs Range 1}, AND(IFERROR(MONTH(@cell), 0) = 5, IFERROR(YEAR(@cell), 0) = 2020))), (COUNTIFS({Credit Card Charge Offs Range 1}, AND(IFERROR(MONTH(@cell), 0) = 6, IFERROR(YEAR(@cell), 0) = 2020))))

But how do I add the AMOUNT that was charged off for those months which is another column? Screen shot of my two columns below for reference.

data:image/png;base64,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