Fiona is trying to increase her outcomes to restore equity
Answer:
D. If the mean amount of money that students from the university spend on a first date is $100, the probability is 0.026 that a randomly selected group of 32 students from the university would spend a mean of $92.23 or less on their most recent first dates
Explanation:
Given that:
mean amount of money spent by the students is= $100
Surveyed of random selection of 32 students is obtained from the university
sample result a mean value of $92.23
The p-value = 0.026
The p-value is the probability value that helps to determinethe observed or more extreme results when the null hypothesis H₀ of a study question is true.
From the question; the correct interpretation of the p-value is :
If the mean amount of money that students from the university spend on a first date is $100, the probability is 0.026 that a randomly selected group of 32 students from the university would spend a mean of $92.23 or less on their most recent first dates
Answer:
1. Loss of Focus
2. Loss of motivation
3. Loss of drive for higher education
4. Decreased academic success
Explanation:
Answer:
Journal entry that Parent will make on the date of acquisition to record the investment in Son Inc. is <u>$1035000.</u>
Explanation:
Journal entry Parent make on the date of acquisition to record the investment in Son Inc.
The net worth of Son’s Inc. is $ 1150000. The parent acquires 90 % of it . So we assume that 90 % stock is held by parent for $ 1035000.
Answer:
P0 = $51.9956 rounded off to $52.00
Explanation:
The two stage growth model of DDM will be used to calculate the price of a stock whose dividends are expected to grow over time with two different growth rates. The DDM values a stock based on the present value of the expected future dividends from the stock.
The formula for price of the stock today under this model is,
P0 = D0 * (1+g1) / (1+r) + D0 * (1+g1)^2 / (1+r)^2 + ... + D0 * (1+g1)^n / (1+r)^n + [ (D0 * (1+g1)^n * (1+g2) / (r - g2)) / (1+r)^n ]
Where,
- D0 is the dividend today or most recently paid dividend
- g1 is the initial growth rate which is 20%
- g2 is the constant growth rate which is 8%
- r is the required rate of return
P0 = 2.5 * (1+0.2) / (1+0.15) + 2.5 * (1+0.2)^2 / (1+0.15)^2 +
2.5 * (1+0.2)^3 / (1+0.15)^3 +
[(2.5 * (1+0.2)^3 * (1+0.08) / (0.15 - 0.08) / (1+0.15)^3)
P0 = $51.9956 rounded off to $52.00