Answer:
The bank would be willing to lend $ 86,141.35
Explanation:
The concept of calculation of time value of money is the basis of this question.Loan amount would be the present value of monthly repayment of loan.
Steps are as follows:
1: We have to Calculate present value of monthly repayment for first 3 years by following formula
Present value = Monthly Payment * Present value of annuity of 1 =$1,300*31.794659
=$41,333.06
Working is as follows:
Present value of annuity of 1 =(1-(1+i)^-n)/i
=(1-(1+0.006875)^-36)/0.00687 . = =31.794659
Where i 8.25%/12 = 0.006875
n 3*12 = 36
Step-2:Calculation of present value of monthly repayment for next 2 years
Present value = Monthly Payment * Present value of annuity of 1*Present value of 1
= $ 2,600 * 22.0549002 * 0.781412
= $ 44,808.29
Working:
Present value of annuity of 1 = (1-(1+i)^-n)/i = (1-(1+0.006875)^-24)/0.006875 i 8.25%/12 = 0.006875 = 22.0549002 n 2*12 = 24
Present value of 1 = (1+0.006875)^-36
= 0.78141172
Step-3:Calculation of loan amount
Loan amount = Present value of monthly repayments
= $ 41,333.06 + $ 44,808.29
= $ 86,141.35
Answer: The bank would be willing to lend the business owner a sum of $86,141.35
Explanation: For this question, we shall be calculating the time value of money. The amount of the loam that the bank would lend to the business owner would be the present value of monthly repayment of loan.
We calculate thus:
Present value = Monthly Payment X Present value of annuity of 1 =$1,300 X 31.794659
=$41,333.06
We calculate for annuity thus:
Present value of annuity of 1 =(1-(1+i)^-n)/i
i = 8.25%/12 = 0.0825/12 = 0.006875
n = 3 X 12 = 36
Therefore:
= (1-(1+0.006875)^-36)/0.006875 =31.794659
Now, we calculate the present value of monthly repayment for next 2 years:
Present value = Monthly Payment X Present value of annuity of 1 X Present value of 1
= $2,600 X 22.0549002 X 0.781412 = $ 44,808.29
We calculate thus:
Present value of annuity of 1 = (1-(1+i)^-n)/i
i = 8.25%/12 = 0.0825/12 = 0.006875
n = 2*12 = 24
= (1-(1+0.006875)^-24)/0.006875
= 22.0549002
Present value of 1 = (1+0.006875)^-36 = 0.78141172
Now, we calculate the loan amount: Loan amount = Present value of monthly repayments
= $ 41,333.06 + $ 44,808.29
= $ 86,141.35
