Math, asked by uske, 4 months ago

M purchases a house, paying ₹5,00,000 as down payment and promising to pay ₹20,000 every quarter
for the next 10 years. The seller figured interest at 6% compounded quarterly.
() What was the cash value of the house?
() If M missed the first 12 payments, what must she pay at the time the 13th payment is due to bring
herself up to date?
() After making 8 payments, M wished to discharge her remaining indebtedness by a single payment
at the time when the 9th regular payment was due. What must she pay in addition to the regular
payment then due?
() If M missed the first 10 payments, what must she pay when the 11th payment is due, in order to
discharge her entire indebtedness?

Answers

Answered by shivakumar0820
3

Answer:

mark me brainlinest plzzzz

Step-by-step explanation:

Thank you for asking this question. Here is your answer:

PV = 4000 x sum of 1/(1+r)^n

= 4000 x sum of 1/(1.05)^25

= 56,375.77

Now we will calculate the total price here:

down price + pv

= 20,000 + 56,375

= 76,375

76,375 is the final answer for this question.

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