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CanadaON
Grade 11

Differing frequencies (payments and compounding interest)

Interactive practice questions

Jenny opens a high-interest savings account where interest of $6.48%$6.48% per annum is compounded monthly. Her initial deposit is $\$12000$$12000 and she makes monthly deposits of $\$300$$300.

a

Complete the table below, rounding each answer to the nearest cent, and using the rounded answer to calculate the amounts for the following month.

Month

Balance at beginning of month ($\$$$) Interest ($\$$$) Deposit ($\$$$) Balance at end of month ($\$$$)
1 $12000$12000 $64.80$64.80 $300$300 $12364.80$12364.80
2 $\editable{}$ $\editable{}$ $\editable{}$ $\editable{}$
3 $\editable{}$ $\editable{}$ $\editable{}$ $\editable{}$
4 $\editable{}$ $\editable{}$ $\editable{}$ $\editable{}$
5 $\editable{}$ $\editable{}$ $\editable{}$ $\editable{}$
b

For many investment accounts, interest is calculated daily, but paid into the account on a monthly basis. Choose the most accurate statement.

The interest earned over a year would be more since compounding more regularly results in faster exponential growth.

A

The interest earned over a year would be less since the daily interest rate would be a lot smaller.

B

The interest earned over a year would be the same.

C
Easy
12min

Bill has won $\$260000$$260000 and sets up an annuity earning $4.8%$4.8% interest per annum, compounded annually.

At the end of each year Bill withdraws $\$18000$$18000.

Easy
9min

Mr and Mrs Lyne have a $\$520000$$520000 mortgage for their home. They are charged $\frac{26}{5}%$265% interest per annum, compounded monthly and make monthly repayments of $\$3750$$3750.

Easy
10min

Iain opens a savings account which earns interest of $12%$12% compounded quarterly. He also adds an additional deposit to his account each year. The balance of the investment, in dollars, at the end of each year where interest is compounded quarterly is given by$B_n=\left(1+0.03\right)^4\times B_{n-1}+4000$Bn=(1+0.03)4×Bn1+4000, where $B_0=22000$B0=22000.

Easy
6min
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Outcomes

11U.C.3.3

Solve problems, using a scientific calculator, that involve the calculation of the amount, A (also referred to as future value, FV), the principal, P (also referred to as present value, PV), or the interest rate per compounding period, i, using the compound interest formula in the form A = P(1 + i)^n [or FV = PV(1 + i)^n]

11U.C.3.4

Determine, through investigation using technology, the number of compounding periods, n, using the compound interest formula in the form A = P(1 + i)^n [or FV = PV(1 + i)^n ]; describe strategies

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