Day and Associates is experiencing a period of abnormal growth. The last dividend paid by Day was $0.75. Next year, they anticipate growth in dividends and earnings of 25% followed by negative 5% growth in the second year. The company will level off to a normal growth rate of 8% in year three and is expected to maintain an 8% growth rate for the foreseeable future. Investors require a 12% rate of return on Day.
What is the approximate amount that an investor would be willing to pay today for the two years of abnormal dividends?
First find the abnormal dividends and then discount them back to the present. $0.75 × 1.25 = $0.9375 × 0.95 = $0.89. D1 = $0.9375; D2 = $0.89. At this point you can use the cash flow keys with CF0 = 0, CF1 = $0.9375 and CF2 = $0.89. Compute for NPV with I/Y = 12. NPV = $1.547. Alternatively, you can put the dividends in as future values, solve for present values and add the two together.
What would an investor pay for Day and Associates today?
Here we find P2 using the constant growth dividend discount model. P2 = $0.89 × 1.08 / (0.12 – 0.08) = $24.03. Discount that back to the present at 12% for 2 periods and add it to the answer in the previous question. N = 2; I/Y = 12; PMT = 0; FV = $24.03; CPT &rarr PV = $19.16. Add $1.55 (the present value of the abnormal dividends) to $19.16 and you get $20.71.
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