9606 / 1000 = 9.606
9.606 x 20.04 (from loan amortization table) = 192.50

The formula is very difficult to write on this website so I’ll break it into two parts.
Let i = the interest rate per period (assume 1 month), so i = 0.075/12 = 0.00625
Let n be the number of periods (months in this case; n=60)
Let a new variable, called “a” be equal to the following-

a = (1-(1+i)^-n) / i = (1-(1.00625)^-60) / 0.00625
a = 49.90530818

The monthly payment then equals $9606 / a = $192.4845342
or simply $192.48.

Note: add the end of 1 month when the first payment is made, $60.04 would be interest owed (9606 x 0.00625) and the remainder of the payment (192.48 – 60.04 = 132.44) would go to reduce the principal amount still owed.) At the end of 2 months when the 2nd payment is made, the outstanding loan balance would be $9606.00 – $132.454 = $9473.56. The interest due on this amount would be $59.21 (9473.56 x 0.00625) and the balance of the 2nd payment would be $133.27 which would go to reduce the principal amount owed.

9606 = Payment/(.075/12) x (1-1/((1+(.075/12)))^60)

or Payment = 9606*(.075/12)/((1-1/((1+(.075/12)))^60)) = $192.48

You forgot to properly account for the compounding interest and only wanted to pay one year’s worth.

FYI — How you were figuring the amount is incorrect on a couple of points. First, you only calculated interest for 1 year ($720.45) For 5 years, interest would be more like $3600! However, you don’t owe that much interest over the life of the loan, because you keep making payments. Each payment reduces the amount you owe, thus reducing the interest burden on the outstanding principal.

Although the payment amount doesn’t change over the life of the loan, how it gets divided up does. Early on, most of your payment goes to interest, while toward the end of the 5 years, most of your payment applies toward principal.

good luck!