help with finance (1 Viewer)

stressedadfff

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i dont really get wha tit means by 'charged monthly' and then '5 annual isntallments?

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Greninja340

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the interest is applied monthly and the principal amount is paid off in 5 yearly instalments
 

cossine

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i dont really get wha tit means by 'charged monthly' and then '5 annual isntallments?

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The "charged monthly" is the rate at which interest in being charged. So since the rate is 15% p.a. 15% is the yearly rate. You need to divide by 12 to get the monthly rate you are being charged.

Annual meaning yearly. Note p.a is per annum meaning per a year.

Installment is referring to the payment of the loan.

So '5 annual installments' is basically saying make 5 payments to pay off the loan and the payment is made each year.
 

stressedadfff

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The "charged monthly" is the rate at which interest in being charged. So since the rate is 15% p.a. 15% is the yearly rate. You need to divide by 12 to get the monthly rate you are being charged.

Annual meaning yearly. Note p.a is per annum meaning per a year.

Installment is referring to the payment of the loan.

So '5 annual installments' is basically saying make 5 payments to pay off the loan and the payment is made each year.
oh i see thanks! i just dont get how to solve it would it monthly or yearly.... tkrjlerjbd
 

CM_Tutor

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oh i see thanks! i just dont get how to solve it would it monthly or yearly.... tkrjlerjbd
The important thing to recognise is:
  • if interest is charged at 12% pa, and compounded yearly, then interest will be charged once at 12%, so if you owe $A at the start of the year, the amount owing at the end of the year (before any payment is made) is
  • if interest is charged at 12% pa, and compounded monthly, then interest will be charged at 1% but at the end of each month, and compounding, so if you owe $A at the start of the year, the amount owing at the end of the year (before any payment is made) is
 

stressedadfff

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The important thing to recognise is:
  • if interest is charged at 12% pa, and compounded yearly, then interest will be charged once at 12%, so if you owe $A at the start of the year, the amount owing at the end of the year (before any payment is made) is

  • if interest is charged at 12% pa, and compounded monthly, then interest will be charged at 1% but at the end of each month, and compounding, so if you owe $A at the start of the year, the amount owing at the end of the year (before any payment is made) is
i think what im confused about is some of the annuities go like
A1= P(r)^12
A2 = P(r)^11
how come the n is decreasing as the year is going on, im not sure when to use this type? :(
 

CM_Tutor

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i think what im confused about is some of the annuities go like
A1= P(r)^12
A2 = P(r)^11
how come the n is decreasing as the year is going on, im not sure when to use this type? :(
Suppose I invest $1000 on 1 Jan each year, and it earns interest at 12% pa, compounded monthly. I start on 1 Jan 2022. How much will I have on 31 Dec 2030?

Let $An be the amount the nth deposit grows to. So, $A1 is invested for all of 2022, 2023, 2024, ... and 2030, so for 9 years:


$A2 is invested on 1 Jan 2023 and so grows for all of 2023, 2024, 2025, ... and 2030, so for 8 years:


$A3 is invested on 1 Jan 2024 and so grows for all of 2024, 2025, 2026, ... and 2030, so for 7 years:


Continuing on until the investment on 1 Jan 2030, which grows for only 1 year. It is the 9th investment, and so is $A9:


So, on 31 Dec 2030, the amount that I will have is


Do you see that the powers decrease as each subsequent investment is compounding for a shorter period of time?

Many would approach this by defining $An as the total amount at the time the nth deposit is made, but this makes for a more complicated approach (in my opinion) as you can equally treat each investment as a single account that grows without interruption and a new account is set up for the next deposit. You can then simply add up the accounts to get the total investment.
 

stressedadfff

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Suppose I invest $1000 on 1 Jan each year, and it earns interest at 12% pa, compounded monthly. I start on 1 Jan 2022. How much will I have on 31 Dec 2030?

Let $An be the amount the nth deposit grows to. So, $A1 is invested for all of 2022, 2023, 2024, ... and 2030, so for 9 years:


$A2 is invested on 1 Jan 2023 and so grows for all of 2023, 2024, 2025, ... and 2030, so for 8 years:


$A3 is invested on 1 Jan 2024 and so grows for all of 2024, 2025, 2026, ... and 2030, so for 7 years:


Continuing on until the investment on 1 Jan 2030, which grows for only 1 year. It is the 9th investment, and so is $A9:


So, on 31 Dec 2030, the amount that I will have is


Do you see that the powers decrease as each subsequent investment is compounding for a shorter period of time?

Many would approach this by defining $An as the total amount at the time the nth deposit is made, but this makes for a more complicated approach (in my opinion) as you can equally treat each investment as a single account that grows without interruption and a new account is set up for the next deposit. You can then simply add up the accounts to get the total investment.
thank you thank you!!
 

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