VCE General Maths Recursion and Financial Modelling 2021 Exam 2 Mini Test
VCAA General Maths Exam 2
This is the full VCE General Maths Exam with worked solutions. You can also try Mini-Tests, which are official VCAA exams split into short tests you can do anytime.
Number of marks: 9
Reading time: 2 minutes
Writing time: 14 minutes
Instructions
β’ Answer all questions in the spaces provided.
β’ Write your responses in English.
β’ In all questions where a numerical answer is required, you should only round your answer when instructed to do so.
β’ Unless otherwise indicated, the diagrams in this book are not drawn to scale.
Recursion and financial modelling - 2021 - Exam 2
Sienna invests $420 000 in a perpetuity from which she will receive a regular monthly payment of $1890.
The perpetuity earns interest at the rate of 5.4% per annum.
a. Determine the total amount, in dollars, that Sienna will receive after one year of monthly payments. 1 mark
b. Write down the value of the perpetuity after Sienna has received one year of monthly payments. 1 mark
c. Let \(S_n\) be the value of Sienna's perpetuity after \(n\) months.
Complete the recurrence relation, in terms of \(S_0\), \(S_{n+1}\) and \(S_n\), that would model the value of this perpetuity over time. Write your answers in the boxes provided. 1 mark
\(S_0 = \) , \(S_{n+1} = \) \( \times S_n - 1890 \)
Sienna owns a coffee shop.
A coffee machine, purchased for $12 000, is depreciated in value using the unit cost method.
The rate of depreciation is $0.05 per cup of coffee made.
The recurrence relation that models the year-to-year value, in dollars, of the coffee machine is
\(M_0 = 12\,000, \quad M_{n+1} = M_n - 1440\)
a. Calculate the number of cups of coffee that the machine produces per year. 1 mark
b. The recurrence relation above could also represent the value of the coffee machine depreciating at a flat rate.
What annual flat rate percentage of depreciation is represented? 1 mark
c. Complete the rule below that gives the value of the coffee machine, \(M_n\), in dollars, after \(n\) cups have been produced. Write your answers in the boxes provided. 1 mark
\(M_n = \) \( + \) \( \times n \)
For renovations to the coffee shop, Sienna took out a reducing balance loan of $570 000 with interest calculated fortnightly.
The balance of the loan, in dollars, after \(n\) fortnights, \(S_n\), can be modelled by the recurrence relation
\(S_0 = 570\,000, \quad S_{n+1} = 1.001S_n - 1193\)
a. Calculate the balance of this loan after the first fortnightly repayment is made. 1 mark
b. Show that the compound interest rate for this loan is 2.6% per annum. 1 mark
c. For the loan to be fully repaid, to the nearest cent, Siennaβs final repayment will be a larger amount.
Determine this final repayment amount.
Round your answer to the nearest cent. 1 mark
End of Question and Answer Book
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