Variable outcome probability price 1,500 0.3 350 0.7 yield (ton) 11 0.55 4 0.45 cost ($) 3500 0.25 7500 0.75 0.412588 is the net return if price =350, yield = 11 and cost = 7,500
<h3>What is
net return?</h3>
The overall rate of return on an investment before any fees, commissions, or expenses is known as the gross rate of return. A month, quarter, or year is used as the unit of measurement for the gross rate of return. In comparison, the net rate of return provides a more accurate assessment of return by excluding fees and costs.
A gross rate of return is the return on an investment before any costs or deductions.
The investment's return after charges like taxes, inflation, and other fees is known as a net rate of return.
The expenditure ratio of a fund measures how difficult it is to determine the net rate of return compared to the gross rate of return.
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Answer:
15%
Explanation:
Data provided in the question
Ending share price = $110
Initial price = $100
Dividend received = $5
The computation of the total return is shown below:
= {(Ending share price - initial price) + Dividend} ÷ (Initial price) × 100
= {($110 - $100) + $5} ÷ ($100) × 100
= $15 ÷ $100 × 100
= 15%
Basically we use the above formula so that the total return could come
Answer:
A. business level strategies
Explanation:
Business level strategies -
It refers to the strategy taken by the business or organisation , in order to satisfy the needs of the human being , is referred to as business level strategies.
The method is adapted for the betterment of the business or firm , by making the consumers happy and satisfied.
Hence , from the given information of the question,
The correct option is A. business level strategies .
Answer:
Annual withdraw= $143,023.66
Explanation:
Giving the following information:
Present value (PV)= $2,000,000
Number of periods (n)= 57
Interest rate (i)= 7% a year
<u>To calculate the annual withdrawal, we need to use the following formula:</u>
Annual withdraw= (PV*i) / [1 - (1+i)^(-n)]
Annual withdraw= (2,000,000*0.07) / [1 - (1.07^-57)]
Annual withdraw= $143,023.66
