Consider an arithmetic sequen7v:ch/ bhx jr8ce 2,6,10,14, $\ldots $
1. Find the common difference, d .   
2. Find the 10th term in the sequence.   
3. Find the sum of the first 10 terms in the sequence.   

  An arithmetic sequence hdt j.5z v6)*s e9cdny;tz,ow pas $u_{1}=40, u_{2}=32, u_{3}=24$ .
1. Find the common difference, d .   
2. Find $u_{8}$ .   
3. Find $S_{8}$ .   

Only one of the following four sequences is arithmetic and only one of t*(zrg(z bar6y hem is geometri*(zbrz6r(ag yc.

$\begin{aligned}
a_{n} & =1,5,10,15, \ldots & c_{n} & =1.5,3,4.5,6, \ldots \\
b_{n} & =\frac{1}{2}, \frac{2}{3}, \frac{3}{4}, \frac{4}{5}, \ldots & d_{n} & =2,1, \frac{1}{2}, \frac{1}{4}, \ldots
\end{aligned}$

1. State which sequence is arithmetic and find the common difference of the sequence.
2. State which sequence is geometric and find the common ratio of the sequence.
3. For the geometric sequence find the exact value of the eighth term. Give your answer as a fraction.

Only one of the following fmh0ow:uy7 , 9nwitjc(l3 n5fn e8fs6pour sequences is arithmetic and only one of them is geometric.nt( 6fjnn fe:uww590 co i83ph y,7msl

$\begin{aligned}
a_{n} & =\frac{1}{3}, \frac{1}{4}, \frac{1}{5}, \frac{1}{6}, \ldots & c_{n} & =3,1, \frac{1}{3}, \frac{1}{9}, \ldots \\
b_{n} & =2.5,5,7.5,10, \ldots & d_{n} & =1,3,6,10, \ldots
\end{aligned}$

1. State which sequence is arithmetic and find the common difference of the sequence.
2. State which sequence is geometric and find the common ratio of the sequence.
3. For the geometric sequence find the exact value of the sixth term. Give your answer as a fraction.

Jeremy invests 8000 dollars into a savings accoundmrre /24gd9wsjs077uhd +yxt that pays an annual interest rate of 5.5 % , compounded a+9rd7w /y2sd0jh msu rx47dge nnually.
1. Write down a formula which calculates that total value of the investment after n years.
2. Calculate the amount of money in the savings account after:
1. 1 year;
2. 3 years.
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.

  Consider the infinite geometri0rf;yv l6dy).vqj 78 rrfg.cmc sequence 4480,-3360,2520,-1890, ...
1. Find the common ratio, r .   
2. Find the 20 th term.≈   
3. Find the exact sum of the infinite sequence.   

  $\text { The table shows the first four terms of three sequences: } u_{n}, v_{n} \text {, and } w_{n} \text {. }$



1. State which sequence is
$u_{n}$ is A $v_{n}$ is B $w_{n}$ is C

1. arithmetic; =  ----待选择----ABC 
2. geometric. =  ----待选择----ABC 
2. Find the sum of the first 50 terms of the arithmetic sequence.   
3 . Find the exact value of the 13 th term of the geometric sequence.   

  An arithmetic sequence is given byx-rmhtz*e6s 2hmva,b: s r) 3t 3,5,7, $\ldots $
1. Write down the value of the common difference, d .   
2. Find
1. $u_{10}$ ;   
2. $S_{10}$=   
3. Given that $u_{n}=253$ , find the value of n .   

  Consider the infinite geometric sequence 9000,-720 y r 8yu w+koip*6:ipromyl-150,5760,-4608, $\ldots $
1. Find the common ratio.   
2. Find the 25 th term.≈   
3. Find the exact sum of the infinite sequence.   

  A tennis ball bounces on the ground n times,i 27g9 xxm3i*y pxt7q5c l0wh u9tlsf. The heights of the bounces, $h_{1}, h_{2}, h_{3}, \ldots, h_{n}$ , form a geometric sequence. The height that the ball bounces the first time, $h_{1}$ , is 80 cm, and the second time, $h_{2}$ , is $60 \mathrm{~cm} $.
1. Find the value of the common ratio for the sequence.   
2. Find the height that the ball bounces the tenth time, $h_{10}$ .≈    cm
3. Find the total distance travelled by the ball during the first six bounces (up and down). Give your answer correct to 2 decimal places.≈    cm

  The third term, $u_{3}$ , of an arithmetic sequence is 7 . The common difference of the sequence, d , is 3 .
1. Find $u_{1}$ , the first term of the sequence.   
2. Find $u_{60}$ , the 60 th term of sequence.

The first and fourth terms of this arithmetic sequence are the first two terms of a geometric sequence.   
3. Calculate the sixth term of the geometric sequence.≈   

  The fifth term, $ u_{5}$ , of a geometric sequence is 125 . The sixth term, $u_{6}$ , is 156.25 .
1. Find the common ratio of the sequence. =   
2. Find $u_{1}$ , the first term of the sequence. =   
3. Calculate the sum of the first 12 terms of the sequence.≈   

  The fourth term, $u_{4}$ , of a geometric sequence is 135 . The fifth term, $u_{5}$ , is 81 .
1. Find the common ratio of the sequence. =   
2. Find $u_{1}$ , the first term of the sequence. =   
3. Calculate the sum of the first 20 terms of the sequence.≈   

  The fifth term, $u_{5}$ , of an arithmetic sequence is 25 . The eleventh term, $u_{11}$ , of the same sequence is 49 .
1. Find d , the common difference of the sequence.   
2. Find $u_{1}$ , the first term of the sequence.   
3. Find $S_{100}$ , the sum of the first 100 terms of the sequence.   

  A 3D printer builds a set of 49 Eiffel Tower Replicas in dvwt8jdfqv9 dl8d ( 2gudj+-+ rifferent sizes. The height of the largv+f+ 8v-ddg l8(jwrdujd9 t2qest tower in this set is $ 64 \mathrm{~cm}$ . The heights of successive smaller towers are 95 % of the preceding larger tower, as shown in the diagram below.



1. Find the height of the smallest tower in this set.≈    cm
2. Find the total height if all 49 towers were placed one on top of another.≈    cm

  Hannah buys a car for. 3a+,uswx4 irzbq d9,abqw4 xny4lt, $ 24900 . The value of the car depreciates by 16 % each year.
1. Find the value of the car after 10 years.

Patrick buys a car for 12000 dollars. The car depreciates by a fixed percentage each year, and after 6 years it is worth 6200 dollars . ≈   
2. Find the annual rate of depreciation of the car. ≈    %

Consider the following sequence of figur62ntd tho/1vp es.


Figure 1 contains 6 line segments.
1. Given that Figure n contains 101 line segments, show that n=20 .
2. Find the total number of line segments in the first 20 figures. __

  In an arithmetic sequence, u rqb.u*xi,e) $u_{5}=24$, $u_{13}=80$ .
1. Find the common difference.   
2. Find the first term.   
3. Find the sum of the first 20 terms in the sequence.   

  The first three terms of a geometricj2wi( n5 aq6gsy( iu-0 yd/a0c limth9 sequence are $u_{1}=32$, $u_{2}=-16$,$ u_{3}=8$ .
1. Find the value of the common ratio, r .   
2. Find $u_{6}$ . =   
3. Find $S_{\infty}$ . =   

  In an arithmetic sequend: o/p)okby s.ce, $u_{4}=12$, $u_{11}=-9$ .
1. Find the common difference.   
2. Find the first term.   
3. Find the sum of the first 11 terms in the sequence.   

  In an arithmetic sequence, the sum of the dd v 1pjz2 8 hc3m, xni7v)rpqs(-)ze raru(e22 nd and 6 th term is 32 .
Given that the sum of the first six terms is 120 , determine the first term and common difference of the sequence. $u_1$ =    d =   

  In an arithmetic sequence, the sum +-/jpfx8jhq. 9pfg 6fpbifw;of the 2 nd and 6 th term is 32 .
Given that the sum of the first six terms is 120 , determine the first term and common difference of the sequence.An arithmetic sequence has first term 45 and common difference -1.5 .
1. Given that the k th term of the sequence is zero, find the value of k .

Let $S_{n}$ denote the sum of the first n terms of the sequence.   
2. Find the maximum value of $S_{n}$ .   

The Australian Koala Foundation estimates thad8l wh-x -l;t ,ceph-styuait3v4 5e)t there are about 45000 koalas left in the wild in 2019 . A year before, incp,tevli-ehy34x s5 a-tl8u; hw-t d) 2018 , the population of koalas was estimated as 50000 . Assuming the population of koalas continues to decrease by the same percentage each year, find:
1. the exact population of koalas in 2022 ;
2. the number of years it will take for the koala population to reduce to half of its number in 2018 .

  Landmarks are placed along the road from London to Edi:stb f/ rx w1m1wlej88nburgh and the distance between bx8w1:e1fl tmwrj8/s each landmark is 16.1 $\mathrm{~km}$ . The first landmark placed on the road is 124.7 $\mathrm{~km}$ from London, and the last landmark is near Edinburgh. The length of the road from London to Edinburgh is 667.1 $\mathrm{~km} $.
1. Find the distance between the fifth landmark and London.   
2. Determine how many landmarks there are along the road.   

The first term of an arithmetic sequence is 24pn3jn2mt5 z,ehwy- *f cclt35 and the common difference is 16 .5 3zhy w 2npl-5ejt,t3ncfmc*
1. Find the value of the 62 nd term of the sequence.

The first term of a geometric sequence is 8 . The 4 th term of the geometric sequence is equal to the 13 th term of the arithmetic sequence given above. __
2. Write down an equation using this information. __
3. Calculate the common ratio of the geometric sequence. __

  On 1st of January 202 (pj; u 2 qgvid*81far17obdqf- kf8cmq z7xd/1, Fiona decides to take out a bank loan to purchase a new Tesla electric car. Fiona takes out a loan of P dollars with a bank that offers a nominal annual interest rate of 2.6 % , compo2gd;qx *u qp1 fvj d8d7kmzf qicrb18 a/(-f7ounded monthly.
The size of Fiona's loan at the end of each year follows a geometric sequence with common ratio, $\alpha$ .
1. Find the value of $\alpha$ , giving your answer to five significant figures.

The bank lets the size of Fiona's loan increase until it becomes triple the size of the original loan. Once this happens, the bank demands that Fiona pays the entire amount back to close the loan.≈   
2. Find the year during which Fiona will need to pay back the loan.   

  On Gary's 50 th birthday, he invests P dollars m 4qd6dtuv2a-aj0 qfh; ni8cl7r7w 7yin an account that pays a nominal annual interest rate of 5 % , compounded monthly. The amount of money in Gary' cdn07 8ltfv2ur47y jhwamqa- q67i;ds account at the end of each year follows a geometric sequence with common ratio, $\alpha$ .
1. Find the value of $\alpha$ , giving your answer to four significant figures.

Gary makes no further deposits or withdrawals from the account.≈   
2. Find the age Gary will be when the amount of money in his account will be double the amount he invested.   

  In an arithmetic sequence, the third term is 41 and the ninth term is qo9uo -)r1q8 q2cged4 jja8sm 23 .
1. Find the common difference.   
2. Find the first term.   
3. Find the smallest value of n such that $S_{n}<0$ .   

  The first three terms ov/76fq1 y* q oo: pu1fvkc:tvzf a geometric sequence are $ u_{1}=0.8, u_{2}=2.4, u_{3}=7.2 $.
1. Find the value of the common ratio, r .   
2. Find the value of $S_{8}$ .   
3. Find the least value of n such that $S_{n}>35000$ .   

  The first three terms of a geometric sequence m8a q7 dbxq hwp11:p7nare $u_{1}=0.4, u_{2}=0.6, u_{3}=0.9$a .
1. Find the value of the common ratio, r .≈    !num!2%
2. Find the sum of the first ten terms in the sequence.   
3. Find the greatest value of n such that $S_{n}<650$ .   

  In a geometric sequence, gzum 78cb/n(a $u_{2}=6, u_{5}=20.25$ .
1. Find the common ratio, r .   
2. Find $u_{1}$ .   
3. Find the greatest value of n such that $u_{n}<200$ .   

  In this question give allhv5r /c15op ka p6so5a answers correct to the nearest whole number.
A population of goats on an island starts at 232 . The population is expected to increase by 15 \% each year.
1. Find the expected population size after:
1. 10 years;≈   
2. 20 years.≈   
2. Find the number of years it will take for the population to reach 15000 .   

Maria invests $ 25000 into a savings account that pays a nominal annual interest rate of 4.25 % , compounded monthly.
1. Calculate the amount of money in the savings account after 3 years.
2. Calculate the number of years it takes for the account to reach 40000 dollars.

  Greg has saved 2000 British pounds (GBP) over th 83qk 9p.ucvogi-jly - qyh d;6y*cc;ze last six months. He decided to deposit his savings in a bank which offers a nominal annual interest r -iukqv6ycy;zjqy o9 clcg* ;-3d 8.phate of 8 % , compounded monthly, for two years.
1. Calculate the total amount of interest Greg would earn over the two years. Give your answer correct to two decimal places.

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.≈   

Emily deposits 2000 Australiq.c:z ve*(pl(bvj7q kan dollars (AUD) into a bank account. The bank pays a nominq((z*:p q.vjb vck7le al annual interest 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.

Emily will withdraw the money back from her bank account when the amount reaches 3000 AUD.
2. Find the time, in months, until Emily withdraws the money from her bank account.

  In this question give all anmhxem en23ihdi* f107swers correct 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.≈   

  Julia wants to buy a house that requires a deposit of ,vmtpt , ux/ wvs3p *0gt;2zlh+wv ;un74000 Australian dollars (AUDn/xuz; ,ugt0w tp*w;th3 vp,s+2lvm v).
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.

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.   

  Ali bought a car for p q(o;v7/ro mc5 lrfascq+r la0 8on8/ $ 18000 . The value of the car depreciates by 10.5 % each year.
1. Find the value of the car at the end of the first year.≈   
2. Find the value of the car after 4 years.≈   
3. Calculate the number of years it will take for the car to be worth exactly half its original value. ≈   

  On 1st of January 2022 , Grace invests P doa: .y0eh;qiwellars in an account that pays a nominal annual interest rate of 6 % , compoundei0.w;h q: eaeyd quarterly. The amount of money in Grace's account at the end of each year follows a geometric sequence with common ratio, $\alpha$ .
1. Find the value of $\alpha$ , giving your answer to four significant figures.

Grace makes no further deposits or withdrawals from the account.≈   
2. Find the year in which the amount of money in Grace's account will become triple the amount she invested.    years

Let $u_{n}=5 n-1$ , for $n \in \mathbb{Z}^{+}$ .
1. 1. Using sigma notation, write down an expression for $u_{1}+u_{2}+u_{3}+\cdots+u_{10}$ .
2. Find the value of the sum from part (a) (i).

A geometric sequence is defined by $v_{n}=5 \times 2^{n-1}$ , for $n \in \mathbb{Z}^{+}$ .
2. Find the value of the sum of the geometric series $\sum_{k=1}^{6} v_{k}$ .

  Peter is playing on a swing during a school lunch break. The heig 0ips +94hbd)fl2 fkvey8ryd.ht of the first swing le9v8hp2yi+k)4fd sf0br d .ywas 2 $\mathrm{~m}$ and every subsequent swing was 84 % of the previous one. Peter's friend, Ronald, gives him a push whenever the height falls below $1 \mathrm{~m}$ .
1. Find the height of the third swing.≈   
2. Find the number of swings before Ronald gives Peter a push. n =   
3. Calculate the total height of swings if Peter is left to swing until coming to rest.   

Sarah walks to school each morning. During the first jsqc(8pri y nu97pjf3;e-uw1minute, she travels 130 metres. In each subsequent minute, she travels 5 metres less than the distance she travelled during the previous minute. The distance from her home to school is 950 metres. Sarah leaves her house at 8: 00 np-euc(is8rqf9 pj73y w u1;j am and must be at school by 8: 10 am. Will Sarah arrive to school on time? Justify your answer.

Jack rides his bike to work each morning. During the c;op;ry9j;u f first minute, he travels 160 metres. In each subsequent minute, he travels 80 % of the distance travelled during the previous minute. The distance from his home to work is 750 metres. Jack leaves his hou o jy;p;cuf9r;se at 8:30 am and must be at work at 8:40 am. Will Jack arrive to work on time? Justify your answer.

  The third term of an arithmetic6 he(5 gzxq,vzbjg t*9)ntdz ; sequence is equal to 7 and the sum of the first 8 terms is 20 z5(gv;9txb6 qh,jdn t*)e zzg. Find the common difference and the first term.   

  The first term and the common ratio of a ge/5h* fywrv*j *hra;ft ometric series are denoted, respectively, b*y;v*r*5/frj hahf twy $u_{1}$ and r , where $u_{1}$, $r \in \mathbb{Q}$ . Given that the fourth term is 64 and the sum to infinity is 625 , find the value of $u_{1}$ and the value of r .$u_{1}$ =    r =   

  The seventh term of an arithmetic sequence is equal to 1 and the sum o y+vz gr)mds,jnpq2/c :/w2lgf the first 16 terms is 52 . Find the comn2gvr+ ds2w,m):clqygj/ z /pmon difference and the first term. $u_1$ =   

  $\text { The sum of an infinite geometric sequence is } 27 \text {. The second term of the sequence is } 6 \text {. Find the possible values of } r \text {. }$      

  $\text { The sum of the first three terms of a geometric sequence is } 92.5 \text {, and the sum of the infinite sequence is } 160 \text {. Find the common ratio. }$   

  The 1st, 5 th and 13 .fnknl )8t ph d,q:w0fth terms of an arithmetic sequence, with common difference d ,:q)p hl wdn.8ktfnf0, $d \neq 0$ , are the first three terms of a geometric sequence, with common ratio r, $r \neq 1$ . Given that the 1 st term of both sequences is 12 , find the value of d and the value of r . r =    d =   

  $\text { The sum of the first three terms of a geometric sequence is } 81.3 \text {, and the sum of the infinite sequence is } 300 \text {. Find the common ratio. }$   

  It is known that the be vs s 04t;l2(1so55ilpfjxmnumber of trees in a small forest will decrease by 5 % each year unless some new trees are planted. At the end of each year, 600 new trees ;0to5lfss xp(mjlse5 bi214v are planted to the forest At the start of 2021 , there are 8200 trees in the forest.
1. Show that there will be roughly 9060 trees in the forest at the start of 2026 . ≈   
2. Find the approximate number of trees in the forest at the start of 2041 .≈   

  $\text { 1. The following diagram shows }[\mathrm{PQ}] \text {, with length } 4 \mathrm{~cm} \text {. The line is divided into an infinite number of line segments. The diagram shows the first four segments. }$




$\text { 1. The following diagram shows }[\mathrm{PQ}] \text {, with length } 4 \mathrm{~cm} \text {. The line is divided into an infinite number of line segments. The diagram shows the first four segments. }$The length of the line segments are m $\mathrm{~cm}$, $m^{2} \mathrm{~cm}, m^{3} \mathrm{~cm}, \ldots ,$ where $0\lt n \lt1$ .
Show that $m=\frac{4}{5}$ .   
2. The following diagram shows [RS], with length l $\mathrm{~cm}$ , where l$\gt $1 . Squares with side lengths $n \mathrm{~cm}, n^{2} \mathrm{~cm}, n^{3} \mathrm{~cm}, \ldots$ , where $0\lt n \lt1$ , are drawn along [RS]. This process is carried on indefinitely. The diagram shows the first four squares.


$\text { The total sum of the areas of all the squares is } \frac{25}{11} \text {. Find the value of } l \text {. }$   

The first three terms of an infinite geometric sequence are v 7:ziy)a cpm1kgg((b k-4,4, k+2 , where p(v17 bz)kgyig:m (ac$k \in \mathbb{Z}$ .
1. 1. Write down an expression for the common ratio, r .
2. Hence show that k satisfies the equation $k^{2}-2 k-24=0$ .
2. 1. Find the possible values for k .
2. Find the possible values for r .
3. The geometric sequence has an infinite sum.
1. Which value of r leads to this sum. Justify your answer.
2. Find the sum of the sequence.

  Let $f(x)=e^{3 \sin \left(\frac{\pi x}{4}\right)}$ , for x>0 .
The k th maximum point on the graph of f has x -coordinate $x_{k}$ , where k $\in \mathbb{Z}^{+}$ .
1. Given that $x_{k+1}=x_{k}+d$ , find d .   
2. Hence find the value of n such that $\sum_{k=1}^{n} x_{k}=992$ .   

Alex and Julie each have a goal of saving 30000 dollars to put towards a hous ; *u9zg6o ivlr9dr0qee deposit. They eauldogirz*r0v9 69;q e ch have 16000 dollars to invest.
1. Alex chooses his local bank and invests his 16000 dollars in a savings account that offers an interest rate of 5 % per annum compounded annually.
1. Find the value of Alex's investment after 7 years, to the nearest hundred dollars.
2. Alex reaches his goal after n years, where n is an integer. Determine the value of n .
2. Julie chooses a different bank and invests her 16000 dollars in a savings account that offers an interest rate of r % per annum compounded monthly, where r is set to two decimal places.
Find the minimum value of r needed for Julie to reach her goal after 10 years.
3. Xavier also wants to reach a savings goal of 30000 dollars. He doesn't trust his local bank so he decides to put his money into a safety deposit box where it does not earn any interest. His system is to add more money into the safety deposit box each year. Each year he will add one third of the amount he added in the previous year.
1. Show that Xavier will never reach his goal if his initial deposit into the safety deposit box is 16000 dollars.
2. Find the amount Xavier needs to initially deposit in order to reach his goal after 7 years. Give your answer to the nearest dollar.

Grant wants to save 40000 dollars over 5 years to help his son pay for his colh, e)9i* s qvy+pw d e;))sq0iigloj/blege tuition. He deposits 20000 dollars into a savings account) ei ;g0*/qvh+ipbsiow s9yqldj, e)) that has an interest rate of 6 % per annum compounded monthly for 5 years.
1. Show that Grant will not be able to reach his target.
2. Find the minimum amount, to the nearest dollar, that Grant would need to deposit initially for him to reach his target.

Grant only has 20000 dollars to invest, so he asks his sister, Caroline, to help him accelerate the saving process. Caroline is happy to help and offers to contribute part of her income each year. Her annual income is 37500 dollars per year. She starts by contributing one fifth of her annual income, and then decreases her contributions by half each year until the target is reached. Caroline's contributions do not yield any interest.
3. Show that Grant and Caroline together can reach the target in 5 years.

Grant and Caroline agree that Caroline should stop contributing once she contributes enough to complement the deficit of Grant's investment.
4. Find the whole number of years after which Caroline will will stop contributing.

The first three terms of an infinite skzi3mmk - 1ym,;d8vlli- 5 zyx8xb;izequence, in order, are $2 \ln x, q \ln x, \ln \sqrt{x}$ where x>0 .
First consider the case in which the series is geometric.
1. 1. Find the possible values of q .
2. Hence or otherwise, show that the series is convergent.
2. Given that q>0 and $ S_{\infty}=8 \ln 3$ , find the value of x .

Now suppose that the series is arithmetic.
3. 1. Show that $q=\frac{5}{4}$ .
2. Write down the common difference in the form $m \ln x$ , where $m \in \mathbb{Q}$ .
4. Given that the sum of the first n terms of the sequence is $\ln \sqrt{x^{5}}$ , find the value of n .

  The sides of a square 8gi w*zaasz8 nwp /9jz3l-/ zak0clh6are 8 $\mathrm{~cm}$ long. A new square is formed by joining the midpoints of the adjacent sides and two of the resulting triangles are shaded as shown. This process is repeated 5 more times to form the right hand diagram below.




1. Find the total area of the shaded region in the right hand diagram above.≈   
2. Find the total area of the shaded region if the process is repeated indefinitely.≈   

The first two terms of an infinite geometric sequence, in order, aau,bo7jr l7w/l1a g n8re

$3 \log _{3} x, 2 \log _{3} x, \text { where } x>0 \text {. }$

1. Find the common ratio, r .
2. Show that the sum of the infinite sequence is $9 \log _{3} x$ .

The first three terms of an arithmetic sequence, in order, are

$\log _{3} x, \log _{3} \frac{x}{3}, \log _{3} \frac{x}{9}, \text { where } x>0$ .

3. Find the common difference d , giving your answer as an integer.

Let S_{6} be the sum of the first 6 terms of the arithmetic sequence. __
4. Show that $S_{6}=6 \log _{3} x-15$
5. Given that $S_{6}$ is equal to one third of the sum of the infinite geometric sequence, find x , giving your answer in the form $a^{p}$ where a, $p \in \mathbb{Z}$ .

Given a sequence of integers, between 20 and 300 , which are divisible by yet,6r3yp .gd9 .
1. Find their sum.
2. Express this sum using sigma notation.

An arithmetic sequence has first term -500 and common difference of 8 . The sum of the first n terms of this sequence is negative.
3. Find the greatest value of n .

  The first three terms of a geome-ed xz j+:of-ra, 3 w, xoqksp(jt5+rztric sequence are $\ln x^{9}, \ln x^{3}, \ln x$ , for x>0 .
1. Find the common ratio.   
2. Solve $\sum_{k=1}^{\infty} 3^{3-k} \ln x=27$ . $a^b$ a =    b =   

The first two terms of an infinite geometricwb1lg(;5 zzvm sequence are $u_{1}=20$ and $u_{2}=16 \sin ^{2} \theta$ , where $0<\theta<2 \pi$ , and $\theta \neq \pi$ .
1. 1. Find an expression for r in terms of $\theta$ .
2. Find the possible values of r .
2. Show that the sum of the infinite sequence is $\frac{100}{3+2 \cos 2 \theta}$ .
3. Find the values of $\theta$ which give the greatest value of the sum.

Bill takes out a bank loan of 100000 dollars to buy g)/db,z.fil9o j /uh da premium electric car, at an annual interest rate of 5.49 % . The interest is calculated at the end of each year ando zdb. f/,jhi9g /)lud added to the amount outstanding.
1. Find the amount of money Bill would owe the bank after 10 years. Give your answer to the nearest dollar.

To pay off the loan, Bill makes quarterly deposits of P dollars at the end of every quarter in a savings account, paying a nominal annual interest rate of 3.2 % . He makes his first deposit at the end of the first quarter after taking out the loan.
2. Show that the total value of Bill's savings after 10 years is $P\left[\frac{1.008^{40}-1}{1.008-1}\right]$ .
3. Given that Bill's aim is to own the electric car after 10 years, find the value for P to the nearest dollar.

Melinda visits a different bank and makes a single deposit of Q dollars, the annual interest rate being 3.5 % .
4. 1. Melinda wishes to withdraw 8000 dollars at the end of each year for a period of n years. Show that an expression for the minimum value of Q is

$\frac{8000}{1.035}+\frac{8000}{1.035^{2}}+\frac{8000}{1.035^{3}}+\cdots+\frac{8000}{1.035^{n}}$ .

2. Hence, or otherwise, find the minimum value of Q that would permit Melinda to withdraw annual amounts of 8000 dollars indefinitely. Give your answer to the nearest dollar.

This question asks you to invedij23vw7xu; estigate some properties of hexagonal numbers.
Hexagonal numbers can be represented by dots as shown below where $h_{n}$ denotes the n th hexagonal number, $n \in \mathbb{N}$ .


Note that 6 points are required to create the regular hexagon $h_{2}$ with side of length 1 , while 15 points are required to create the next hexagon $h_{3}$ with side of length 2 , and so on.
1. Write down the value of $h_{5}$ .
2. By examining the pattern, show that $ h_{n+1}=h_{n}+4 n+1, n \in \mathbb{N} $.
3. By expressing $h_{n}$ as a series, show that $h_{n}=2 n^{2}-n, n \in \mathbb{N}$ .
4. Hence, determine whether 2016 is a hexagonal number.
5. Find the least hexagonal number which is greater than 80000 .
6. Consider the statement:
45 is the only hexagonal number which is divisible by 9 .
Show that this statement is false.

Matt claims that given $h_{1}=1 $ and $h_{n+1}=h_{n}+4 n+1, n \in \mathbb{N}$ , then

$h_{n}=2 n^{2}-n, \quad n \in \mathbb{N}$

7. Show, by mathematical induction, that Matt's claim is true for all $ n \in \mathbb{N}$ .

The cubic polynomial equation 9)7tux3qtxb y $x^{3}+b x^{2}+c x+d=0$ has three roots $x_{1}$, $x_{2}$ and $x_{3}$ . By expanding the product $\left(x-x_{1}\right)\left(x-x_{2}\right)\left(x-x_{3}\right) $, show that
1. 1. $ b=-\left(x_{1}+x_{2}+x_{3}\right)$ ;
2. $c=x_{1} x_{2}+x_{1} x_{3}+x_{2} x_{3}$ ;
3. $d=-x_{1} x_{2} x_{3}$ .

It is given that b=-9 and c=45 for parts (b) and (c) below.
2. 1. In the case that the three roots $x_{1}$, $x_{2}$ and $x_{3}$ form an arithmetic sequence, show that one of the roots is 3 .
2. Hence determine the value of d .
3. In another case the three roots form a geometric sequence. Determine the value of d .