Response:
The return on equity (ROE) would be altered by 8.52%
Clarification:
Initially, we determine the existing ROE utilizing the Dupont Formula, yielding ROE as follows:
ROE = Net Income/Sales * Sales/Total Assets * Total Assets/Equity
or
ROE = Net Profit Margin * Total Assets Turnover * Equity Multiplier
- Current ROE = 10600/295000 * 1.4 * 1.75 = 0.0880 or 8.8%
The condition states that net income might rise to 20850 while other factors remain unchanged. Therefore, to find the new ROE, we compute the updated Net Profit margin, keeping the total assets turnover and the equity multiplier constant due to the absence of sales, assets, or capital structure changes.
- New ROE = 20850/295000 * 1.4 * 1.75 = 0.17316 or 17.32%
- The ROE would have shifted by 17.32 - 8.80 = 8.52%
Answer:
P14 = $55.69545045394 rounded to $55.70
Explanation:
The dividend discount model (DDM) based on constant growth can help determine the current stock price. It assesses a stock’s price using the present value of the anticipated future dividends. The formula for determining today's price with a constant growth DDM is,
P0 = D1 / (r - g)
Where,
- D1 represents the expected dividend for Year 1 or the following year
- g denotes the constant growth rate for dividends
- r signifies the discount rate or the required rate of return
To find the stock price today, we will utilize the dividend expected in Year 1. Consequently, to compute the stock price 14 years into the future, we calculate D15. D15 can be figured out as follows,
D15 = D1 * (1+g)^14
D15 = 0.50 * (1+0.09)^14
D15 = $1.67086351362 rounded to $1.67
Now applying the DDM formula for the price,
P14 = 1.67086351362 / (0.12 - 0.09)
P14 = $55.69545045394 rounded to $55.70
Yes, it makes financial sense because few families utilized her early hours.
