Jeremy invests 8000 into a savings account 9 )cohp7 b(+cz)g utahw w;fh4that pays an annual interest rate of 5.5 +hh7f cc gwat 49;zu(pw boh))%, compounded annually.

1.Write down a formula which calculates that total value of the investment after n years.
FV=x(1+y)$^n$;x=  ,y=  .
2.Calculate the amount of money in the savings account after:
2.1.
1 year;FV=  .
2.2.
3 years.FV≈  .

3.Jeremy wants to use the money to put down a $10000 deposit on an apartment. Determine if Jeremy will be able to do this within a 5-year timeframe. ----待选择----yesno 

  In this question give all answers cord /wumvl ;8u6lrect to two decimal places.

Mia deposits 4000 Australian dollars (AUD) into a bank account. The bank pays a nominal annual interest rate of 6 %, compounded semi-annually.

1.Find the amount of interest that Mia will earn over the next 2.5 years.

Ella also deposits AUD into a bank account. Her bank pays a nominal annual interest rate of 4 %, compounded monthly. In 2.5 years, the total amount in Ella's account will be 4000 AUD.

2.Find the amount that Ella deposits in the bank account.
PV≈   AUD

  Maria invests 25000 into a savings account that pays ak5juw26 n vy8dl5t9;mewubg 4 nominal annual interest rate of 4.25 %, compounded monthlyml2wb t5ejynd; k 8uwg9456uv.

1.Calculate the amount of money in the savings account after 3 years.
FV≈  .
2.Calculate the number of years it takes for the account to reach 40000.
Hence it takes    yearsfor the account to reach 40000.

  Hannah buys a car for 24900. The value of the car depreciates bo 9e1,plu w:lhy 16 % each year. 9wepu, l :ohl1

1.Find the value of the car after 10 years.
FV≈  .

Patrick buys a car for 12000. The car depreciates by a fixed amount each year, and after 6 years it is worth 6200.

2.Find the annual rate of depreciation of the car.
r≈  %

  In this question give all answers correct tt:.8 ey5tw9 w. x7x+jsf,vtgrfsv 8meom1+too two decimal places.

Elena invests in a retirement plan in which equal payments of €1500 are made at the beginning of each year. Interest is earned on each payment at a rate of 2.49 % per year, compounded annually.

Find the value of the investment after 25 years.
Hence the value of the investment after 25 years is €=  .

Find the amount of interest Elena will earn on the investment over 25 years.
The amount of interest earned on the investment over 25 years is=€  .

  Edward wants to buy a new car, anj2b6z:idns*8i-fdqz vs ; x 0fd he decides to take out a loan of 70000 Australian dollars from a bank. The loan is for 6 years, with a nominal annual interest rate of 7.2%, compounded monthly. Edward will pay the l vz;xz sndb2f i:0qij*d6-f8s oan in fixed monthly instalments.

1.Determine the amount Edward should pay each month. Give your answer to the nearest dollar.
Hence Edward should pay    each month.
2.Calculate the amount Edward will still owe the bank at the end of the third year.
Therefore the outstanding balance is   
​

  Isabella and Charlotte bos bs4x+r99xlk th receives 80000 Australian dollars (AUD) on their 18th birthday to invest for later in their+ssrlx 99xbk4 life.

Isabella deposits her 80000 AUD in a bank account that pays a nominal annual interest rate of x %, compounded monthly.

1.The amount in a bank account after 6 years will be 100000 AUD. Find the nominal annual interest rate. Give your answer correct to two decimal places.
x≈  %
Charlotte uses her 80000 AUD to buy a house that increases in value at a rate of 3 % per year.

2.Find the house price after 6 years.
FV≈  AUD

  In this question give all answers c72a4ia)p trwn orrect to two decimal places.

Charlie deposits 8000 Canadian dollars (CAD) into a bank account. The bank pays a nominal annual interest rate of 5 %, compounded semi-monthly.

1.Find the amount of interest that Charlie will earn over the next 2 years.

Oscar also deposits CAD into a bank account. His bank pays a nominal annual interest rate of 6 %, compounded quarterly. In 2 years, the total amount in Oscar's account will be $8000 CAD.

2.Find the amount that Oscar deposits in the bank account.
PV≈  CAD.

  Ali bought a car for 18000. The value of the car depreciates by 1:0vuo0 cl7/v lof+yqm 0.5 % each year. lly 0f0/7qv+:moouv c

1.Find the value of the car at the end of the first year.
FV≈  .
2.Find the value of the car after 4 years.
FV≈  .
3.Calculate the number of years it will take for the car to be worth exactly half its original value.
n≈  years.

  Benjamin spends € 32000 buying bitcoi gen4 n8xst p8:o6rw3jgm/hu7n mining hardware for his cryptocurrency minnr4 x:p8 ueh /jg3t7gm8ns6wo ing business. The hardware depreciates by 16 % each year.

1.Find the value of the hardware after two years.
FV≈€   .
2.Find the number of years it will take for the hardware to be worth less than €8000.
Hence it takes    years for the hardware to be worth less than

  In this question give all ans jd 3thqrg-,o;wers correct to two decimal places.

George invests in a retirement plan in which equal payments of 2750 are made at the end of each year. Interest is earned on each payment at a rate of 3 % per year, compounded semi-annually.

1.Find the value of the investment after 20 years.
Hence the value of the investment after 20 years is   .
2.Find the amount of interest George will earn on the investment over 20 years.
The amount of interest earned on the investment over 20 years is   .

  Charles plans to invest in a retirement plan toj.3hp j(6 zkozi4n -for 30 years. In this plan, he will deposit 1000 British pounds (GBP) at the end of every month and receive a 6.5% interest rate per annum, compounded monk4 jz6ph3.o(oj- nitzthly.

1.Find the future value of the investment at the end of the 30 years. Give your answer correct to the nearest pound.
Hence the value of the investment at the end of the 30 years is   GBP.
After the 30-year period, Charles will start receiving regular monthly payments of 1500 GBP.

2.Calculate the number of years it will take Charles's monthly retirement payments to match the total amount originally invested.
Hence Charles breaks even with the amount he invested after   years.

  At the beginning of each year, Jack invests 5000 in az9ivz8 vhrb5z7s .u 9e savings account that pays 4% annual interest, compounded 9hzsrvivz57b8 9 ue. zquarterly

1.Find the number of years it will take until Jack has 100000 in his account.
Hence it will take    years until Jack has 100000 in his account.
At the beginning of each year, John invests 6000 in a savings account that pays an annual interest rate, compounded semi-annually. After 20 years John has 200000 in his account.

2.Find the annual interest rate.
Hence the annual interest rate is   %
​

  Alex invests an amount of USD into a savings account which pays 3.3% (p.a.) )eq rf /wau5p*interest, compounded monthly. After5 eu rw)/p*qfa 5 years Alex has 8000 USD in the account.

1.Find the amount of USD initially invested, rounding your answer to two decimal places.

With this money, Alex purchases a used car for 5000 dollars, and sells it 3 years later for 4200.

2.Find the rate at which the car depreciates per year over the 3 year period.
We can use the compound depreciation formula to solve for r=  .

  Michael buys a second hand gc k1cvna*x)gwxx,3sq6;d k( Tesla car for $18000. The value of the car depreciates by 10% each year.

1.Find the total amount the car will depreciate after 5 years, giving your answer correct to the nearest dollar.

The price of a different used car depreciates by 5% each year.

2.Find the value reduction of this car after 4 years as a percentage, when compared to the original purchase price.
Hence, the reduction in price after 4 years as a percentage is =  %

  Mike wants to deposit pbrm3 lo(z,.xcart of his savings in a bank account that pays an annual interest rate of 4.1% compounded annually. The annual inflation rate is expected to be 3% per year throughout the following 8 years. Mike wants hicxzlmbor 3( ,.s initial deposit to have a real value of 5000 after 8 years, compared to current values.

The bank gives Mike two proposals: 
Proposal 1:A one-time investment at the start of the 8-year period.

Proposal 2:Invest 2000 at the start of the 8-year period and make payments of $ x at the end of each year.

1.Find the minimum amount Mike should deposit if he accepts proposal 1. Round your answer to the nearest dollar.

2.Find the minimum value of the annual payments, x, if Mike accepts proposal 2. Round your answer to the nearest dollar.
Hence the amount Mike should pay each year is   .
​

  Greg has saved 2000 British pounds (GBP)ot cte1 -a99mo over the last six months. He decided to deposit his savings in a bank which offers a nominal annual interest rate of 8%, compounded monthly, for t cma1 t9e-9ootwo years.

1.Calculate the total amount of interest Greg would earn over the two years. Give your answer correct to two decimal places.
Hence, using the compound interest formula, we get   GBP; Hence the total amount of interest earned is   GBP.
Greg would earn the same amount of interest, compounded semi-annually, for two years if he deposits his savings in a second bank.

2.Calculate the nominal annual interest rate the second bank offers.
Hence, using the compound interest formula, we obtain r≈  %.

  Smith has saved $5000 from working a part-time job and wants to invest this money so that it grows over time. His bank offers a savings account that pays an annual interest rate of 4.2%, compounded quarterly.

1.Find how many years it will take for Smith's investment amount to double in value, rounding your answer to the nearest integer.
n=  .
Smith wants his money to grow faster than this first option. His wants to invest the money so that it will double in value in 5 years. He considers an high-growth, higher-risk option, which pays an annual interest of r%, compounding half-yearly.

2.Determine the value of r required in this option, rounding your answer to two decimal places.
r=  %.

  Emily deposits 2000 Australian dollars (AUD) into a baniguofw i 4.)p3k account. The bank pays a nominal annual inteii.u3o g4pf)w rest rate of 4 %, compounded monthly.

1.Find the amount of money that Emily will have in her bank account after 5 years. Give your answer correct to two decimal places.
FV=  AUD.
Emily will withdraw the money back from her bank account when the amount reaches 3000 AUD.

2.Find the time, in full years, until Emily withdraws the money from her bank account.
n≈  .

  In this question give all an+i .hbpco/0ha vkx: dl0w:1g oswers correct to the nearest whole number.

Michelle takes out a loan of $12000. The unpaid balance on the loan has an interest rate of 4.3 % per year, compounded annually.

1.The loan is to be repaid in payments of $1500 made at the end of each year.
Hence it will take    years to repay the loan.
1.1.Find the number of years it will take to repay the loan.

1.2.Calculate the total amount that has been paid in amortising the loan.

2.The loan is to be amortised over 5 years.

2.1.Find the annual payment made at the end of each year.
Hence the annual payment is   .
2.2.Calculate the total amount that has been paid in amortising the loan.
The total amount that has been paid in amortising the loan is ≈  .

  In this question give all answers corh c1uwe))ac5 xrect to two decimal places.

Stella receives a loan of € 32000 for her flower shop business at an interest rate 5.29 % per year, compounded monthly. She agrees to pay back the loan in 60 equal installments, made at the end of each month over the next five years.

1.Calculate the amount of monthly installment.
Hence the amount of monthly installment is €  .
Four years after she starts repaying the loan, Stella decides to repay the rest in a final single installment.

2.Calculate the amount owing at the end of the four years.
Hence the amount still owing at the end of the four years is €  .
​

  Julia wants to buy a house that requires a deposit of 74000 Austras.crxyl* zm,1d+x 0wilian dollars (AUD). lm. ,*sc1wxrx y+0zid

Julia is going to invest an amount of AUD in an account that pays a nominal annual interest rate of 5.5 %, compounded monthly.

1.Find the amount of AUD Julia needs to invest to reach 74000 AUD after 8 years. Give your answer correct to the nearest dollar.
Hence, using the compound interest formula, we get PV≈  AUD.

Julia's parents offer to add 5000 AUD to her initial investment from part (a), however, only if she invests her money in a more reliable bank that pays a nominal annual interest rate only of 3.5 %, compounded quarterly.

2.Find the number of years it would take Julia to save the 74000 AUD if she accepts her parents money and follows their advice. Give your answer correct to the nearest year.
Hence it would take Julia    years to save the 74000 AUD.

  Olivia takes a mortgage (loan) of 250000 to buy an apartment in Sydney. In cmqg+de7ajj 1e6 7fy*i9 gfa+terest on the loan accumulates at the rate of 3.49 % per year, compounded semi-annually. Olivia agrees with the bank to amortise the loan in monthly pay*f1a 6jy gaejm+9d+ iq7f 7gecments, made at the beginning of each month.

1.Given that the loan is to be amortised over 30 years, find:

1.1.the monthly payment amount;
Hence the amount of monthly payment is   .

1.2.the total amount paid in amortising the loan.
The total amount that has been paid in amortising the loan is≈  .

2.Olivia has the capacity to increase her monthly payments by $85. Justify to Olivia why this may be a smart financial choice.
Olivia will save (≈)  years.

  Phil's phone shop seluoseiy 5wbh+j15-m,z ls Azura smartphones for $1499 and Bellson smartphones for $850. It is expected that a Bellson smartphone will depreciate at a rate of 20% per year.

After 2 years, an Azura smartphone is worth approximately $735.

1.Show that the expected annual depreciation rate of an Azura smartphone is 30%.2
Hence, using the compound depreciation formula, we get r=  %.

An Azura smartphone and a Bellson smartphone will have the same value n years after they were purchased.

2.Find the value of n.
Hence, using the compound depreciation formula, we obtain n ≈  .
3.Comment on the validity of your answer to part (b).

  Bruce goes into a car dealership to purchase a new vehicle. The one he e zcw)ao9ml5j z:m(b)wants to buy costs 16000, however he doesn't have that much money in his bank. The salesman offers him a financing option of a 30 % deposit followed byoew5 czb)ljmam:9() z 12 monthly payments of 1150.

1.Find the amount of the deposit.
The amount of the deposit is PV=  .
2.Calculate the total cost of the loan under this financing option.
The total cost of the loan is FV=  .
Bruce's father generously offers him an interest free loan of

16000 to buy the car to avoid the expensive loan repayments. They agree that Bruce will repay the loan by paying his father $x in the first month and y every following month until the 16000 is repaid.
The total amount Bruce's father receives after 12 months is 5200. This can be expressed by the equation x+11y=5200. The total amount that Bruce's father receives after 24 months is 10600.

3.Write down a second equation involving x and y.
x+  y=  
4.Determine the value of x and the value of y.
X=  ; Y=  .
5.Calculate the number of months it will take Bruce's father to receive the 16000.
N=  .
Bruce decides to buy a cheaper car for 12000 and invest the remaining $4000. He is considering two investment options over four years.

Option A: Compound interest at an annual rate of 6.5 %.
Option B: Compound interest at a nominal annual rate of 6 %, compounded monthly.

Express each answer in part (f) to the nearest dollar.

Calculate the value of each investment option after four years.

6.1.Option A.
Hence, using the compound interest formula, we get FV≈  .
6.2.Option B.
Hence, using the compound interest formula, we obtain FV≈  .

  Ray takes out a loan oy w )i:gafqnfcm5.1t0f $200000 to purchase a house. He agrees to pay the bank $1250 at the end of every month to amortise the loan, and interest accumulates on the balance at a rate of 3.79 % per year, compounded monthly.

1.Find the number of years and months it takes to pay back the loan.
Hence it takes    years and    months
18 years and 8 months to pay back the loan.
2.Calculate the total amount that Ray has paid in amortising the loan.

3.Ray decides to increase the monthly payment to $1500. Justify this decision.

  Tom takes out a loan of g.tzah;j5v . q$80000 to purchase some new machinery for his farming business. He agrees to pay the bank $1200 at the end of every month to amortise the loan. Interest accumulates on the balance at a rate of 5.65 % per year, compounded monthly.

1.Find the number of years and months it takes to pay back the loan.
Hence it with take    and    months to pay back the loan.
2.Calculate the total amount that Tom pays in amortising the loan.

3.Tom decides to increase the monthly payment to $1500. How much interest will Tom save in comparison to the former payment schedule.

  Nathan receives a lumpmiu6 r( o(mlnpzm 34s9 sum inheritance of 55000 and invests the money into a savings account with an annual im 64 us(m39lpon zrm(interest rate of 7.5%, compounded quarterly.

1.Calculate the value of Nathan's investment after 5 years, rounding your answer to the nearest dollar.3After m months, the amount in the savings account has increased to more than 70000.
FV=  .
2.Find the minimum value of m, where m∈N.
m=  months.
Nathan is saving to purchase a property. The price of the property is 150000. Nathan puts down a 15% deposit and takes out a loan for the remaining amount.

3.Write down the loan amount.
The loan duration is for eight years, compounded monthly, with equal monthly payments of 1500 made by Nathan at the end of each month.
Loan amount=  .
4.For this loan,
4.1.findthe amount of interest paid by Nathan over the life of the loan.
Interst paid=  .
4.2.the annual interest rate of the loan, correct to two decimal places.
The annual interest rate of the loan is   %
After 5 years of paying this loan, Nathan decides to pay the outstanding loan amount in one final payment.

5.Find the amount of the final payment after 5 years, rounding your answer to the nearest dollar.
The final payment after 5 years is(≈)   .
6.Find the amount Nathan saved by making this final payment after 5 years, rounding your answer to the nearest dollar.
Amount saved=  .

  Lily and Eva both receive 50000 Australian dollars (AUD)kvs ,h )kbx7w4 on their 18th birthday. Lily deposits her 50000 AUD into a bank account. The hsxvk )wk74 b,bank pays an annual interest rate of 5 %, compounded yearly. Eva invests her 50000 AUD into a high-yield mutual fund that returns a fixed amount of 3000 AUD per year.

1.Calculate:

1.1.the amount in Lily's bank account at the end of the first year;
Hence, using the compound interest formula, we get FV=  AUD.
1.2.the total amount of Eva's funds at the end of the first year.
We have FV=  .
2.Write down an expression for:

2.1.the amount in Lily's bank account at the end of the nth year;
Hence, using the compound interest formula, we obtain FV=x(1+y)$^n$.x=  ,y=  .
2.2.the total amount of Eva's funds at the end of the nth year.
We have FV=50000+(x)n.x=  .
3.Calculate the year in which the amount in Lily's bank account becomes
greater than the amount in Eva's fund.
Hence this will happen in   th year
​
4.Calculate:

4.1.the interest amount that Lily earns if invested for 12 years, giving your answer correct to two decimal places;

4.2.the amount of funds that Eva earns for her investment if invested for
12 years.

  Ann is considering investicp mxcql+0p;79 ,av epng $85000 into a term deposit in one of two banks. The first bank offers an annual interest rate of 3 %, compounding monthly. The second bank offers a fixed payment amount of 250 per month.

1.Calculate:

1.1.the amount that would be in the account in the first bank at the end of the first year;
Using the compound interest formula, we get FV(≈)   .
1.2.the amount that would be in the account in the second bank at the end of the first year.
We have FV=  .
2.Write down an expression for:

2.1.the amount in the account in the first bank at the end of the nth year;

2.2.the amount in the account in the second bank at the end of the nth year.

3.Calculate the year in which the amount in the first bank account becomes
greater than the amount in the second bank.
Hence this will happen in   th year
4.Calculate:

4.1.the interest that Ann would earn if she invested in the first bank for 10 years;

4.2.the interest that Ann would earn if she invested in the second bank for 10 years.
Hence the amount of interest earned in the second bank is