Answer:
If the effective tax rate increases then the net savings coming from investments will get lowered as a result the investment will have higher payback period (The increase in effective tax rate would lower demand of the product which means there is decline in net saving arising from the sale of the product). Likewise this decrease in annual net savings will also decrease the internal rate of return which shows that their are increased chances of project rejections. The NPV method is based on cash flows and relevant costing just like IRR and payback method but the only difference is that it assumes that the cash earned would be reinvested at cost of capital. The NPV will also decrease due to increased effective tax rate.
Answer:
Afghntyjnytnjtyjnmtymtumtumumyumyumjm
Explanation:
Answer:
A fixed interest rate loan is a loan where the interest rate doesn't fluctuate during the fixed rate period of the loan.
Explanation:
a fixed rate could also be calculated if you want to know how to calculate fixed rate i could tell you
Answer:
$2,584.34
Explanation:
we can use the present value of an ordinary formula to calculate this:
present value = annual payment x annuity factor
- present value = $21,000
- PV annuity factor, 8.25%, 14 periods = 8.12586
annual payment = present value / annuity factor = $21,000 / 8.12586 = $2,584.34
When the interest rates are not whole number, e.g. 4%, instead of trying to use a present value annuity table, you should look online for annuity calculators that will calculate the annuity factors for you.
Answer:
3.73 years or 4 years approx
Explanation:
The computation of the number of years taken for money invested for double is shown below:
As we know that
Amount = Principal × (1 + interest rate ÷ time period)^interest rate × time period
where,
We assume the principal be P
And, the amount is 2P
And, the other values would remain the same
So,
2P = P (1 + 0.2044 ÷ time period)^ 1 × time period
2 = (1.2044)^ time period
Now take the log both sides
ln2 = ln (1.2044)^time period
ln2 - time period ln (1.2044)
So,
time period = ln(2) ÷ ln (1.2044)
= 3.73 years or 4 years approx
