Answer:
$33,600.94
Step-by-step explanation:
the present value of the loan = annuity payment x annuity factor = $10,600 x 3.1699 = $33,600.94
we can check that this amount is correct by:
first payment = $10,600 - ($33,600.94 x 10%) = $7,239.91
principal balance after first payment = $33,600.94 - $7,239.91 = $26,361.03
second payment = $10,600 - ($26,361.03 x 10%) = $7,963.90
principal balance after second payment = $26,361.03 - $7,963.90 = $18,397.13
third payment = $10,600 - ($18,397.13 x 10%) = $8,760.29
principal balance after third payment = $18,397.13 - $8,760.29 = $9,636.84
fourth payment = $10,600 - ($9,636.84 x 10%) = $9,636.32
principal balance after fourth payment = $9,636.84 - $9,636.32 = $0.52 (rounding error)