Answer:
IRR = 12.92%
Explanation:
<em>The IRR is the discount rate that equates the present value of cash inflows to that of cash outflows. At the IRR, the Net Present Value (NPV) of a project is equal to zero
</em>
<em>If the IRR greater than the required rate of return , we accept the project for implementation </em>
<em>If the IRR is less than that the required rate , we reject the project for implementation </em>
A project that provides annual cash flows of $24,000 for 9 years costs $110,000 today. Under the IRR decision rule, is this a good project if the required return is 8 percent?
Lets Calculate the IRR
<em>Step 1: Use the given discount rate of 10% and work out the NPV
</em>
NPV = 9000× (1-1.10^(-4)/0.1) - 27,000 =1528.78
<em>Step 2 : Use discount rate of 20% and work out the NPV (20% is a trial figure)
</em>
NPV = 9000× 1- 1.20^(-4)/0.2 - 27000 = -3701.38
<em>Step 3: calculate IRR
</em>
<em>IRR = a% + ( NPVa/(NPVa + NPVb)× (b-a)%</em>
IRR = 10% + 1528.78/(1528.78+3701.38)× (20-10)%= 0.12923
= 0.129230153 × 100
IRR = 12.92%
Answer:
Problem statement
Explanation:
Problem statement - it is referred to as the statement that given the clear and crystal information about the current situations. it is considered a good source of analyzing the real situations about the ongoing project.
This statement describes the current situations between the current and desired aim of the projects. it expressed the problem in two or three statements.
Answer:
Real rate interest = 2.675
Explanation:
given data
nominal rate of interest = 4.35 % = 0.0435
rate of inflation = 1.63 % = 0.0163
to find out
what is the real rate of interest
solution
we get here real rate of interest that is express as
Real rate interest = (1 + nominal rate) ÷ (1 + inflation rate) - 1 ...................1
put here value we get
Real rate interest = 
- 1
Real rate interest = 1.026763751 - 1
Real rate interest = 0.026763751
Real rate interest = 2.675
