Answer:
A. Nonprogrammed; reflective; programmed; reactive
Explanation:
Decisions that are programmed tend to happen more often and are executed swiftly, nearly automatically, without requiring extensive contemplation, thanks to what we refer to as the reactive system.
On the other hand, nonprogrammed decisions arise in unique or unfamiliar circumstances and necessitate more profound contemplation and comprehension of the matter at hand. These decisions are analyzed using the reflective system of the brain.
Thus, the accurate response is A. Nonprogrammed; reflective; programmed; reactive
The dividend payout ratio calculates to be 46.19%. The procedure involves applying the DuPont identity to obtain this figure. Initially, one utilizes the DuPont identity of RoE. The debt ratio is equivalently represented in another form where D/E denotes the Debt-Equity Ratio. By substituting the D/E ratio from the question into the debt ratio formula, one can derive the relationship between RoE and the earnings growth rate g via a formula, where p is the dividend payout ratio. Plugging in the necessary values yields p = 0.461988304 or 46.19%.
Answer:
Explanation:
The one-year forward rate for year 2 is as follows:
(1+4.75%)(1+f)=(1+4.95%)^2
(1+4.75%)(1+f)=1.10145025
(1+F)=1.10145025/1.0475
(1+f)=1.0515
f= 5.15%
The one-year forward rate for year 3 is calculated as:
(1+4.95%)^2 (1+f)=(1+5.25%)^3
(1+4.95%)^2 (1+f)=1.16591345312
(1+f)=1.16591345312
/1.10145025
(1+f)=1.0585
f=5.85%
For the one-year forward rate for year 4:
(1+5.25%)^3 (1+f)=(1+5.65%)^4
(1+f)=1.0685
f= 6.85%
Response: $75,000
Clarification:
According to real estate principles, the 1% rule suggests evaluating property prices. It asserts that the rent should be at least 1% of the property's purchase price on a monthly basis.
The greater the rental percentage over 1%, the better the deal.
In this scenario, the most suitable option would be $75,000 since;
1,000 divided by 75,000 multiplied by 100 results in
1.33%.
The $1,000 falls above 1% of $75,000, making it a very good investment.
