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10 January, 09:52

On July 1, Dichter Company obtained a $2,000,000, 180-day bank loan at an annual rate of 12%. The loan agreement requires Dichter to maintain a $400,000 compensating balance in its checking account at the lending bank. Dichter would otherwise maintain a balance of only $200,000 in this account. The checking account earns interest at an annual rate of 6%. Based on a 360-day year, the effective interest rate on the borrowing is

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  1. 10 January, 10:15
    0
    Answer: 12.67%

    Explanation:

    The effective interest rate on a borrowing is the net annual interest cost divided by the net available proceeds from the borrowing. Dichter gross annual interest cost is $240,000 ($2,000,000 x 12%). Dichter is required to maintain a compensating balance of $400,000, which is $200,000 more than their normal balance of $200,000. Therefore, Dichter earns incremental annual interest revenue of $12,000 ($200,000 x 6%) on the excess compensating balance. The net annual interest cost is $228,000 ($240,000 - $12,000). The net available proceeds from the borrowing is $1,800,000 ($2,000,000 loan less $200,000 excess compensating balance). Therefore, the effective annual interest rate is 12.67%
  2. 10 January, 10:16
    0
    The annual effective interest rate based on a 360 day period is 12.67%

    Explanation:

    The effective interest rate for a 180 day borrowing period is the ratio of net interest cost to net available proceeds.

    The net interest cost = the gross interest cost - the incremental interest revenue.

    The gross interest cost = $2,000,000 * 12% * (6 months : 12 months) = $2,000,000 * 0.12 * 0.5 = $120,000

    the incremental interest revenue = $200,000 * 6% * (6 months : 12 months) = $200,000 * 0.06 * 0.5 = $6,000

    Since the net interest cost = the gross interest cost - the incremental interest revenue

    Net interest cost = $120,000 - $6,000 = $114,000

    net available proceeds = $2000000 - $200000 = $1800000

    Therefore, the effective interest rate based om a 180 day period = net interest cost/net available proceeds = $114,000 / $1,800,000 = 0.0633 = 6.33%

    The annual effective interest rate based on a 360 day period = 6.33% * 2 = 12.67%
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