d:["$","$L48",null,{"unit":{"id":30,"name":"Sequences & Series","slug":"sequences-series","topic":1,"subjects":["AAHL","AIHL","AISL","AASL","ecolint-y11-hl"],"isVideoReady":true,"videoId":"DI2cudLIWEk","concepts":[{"id":27,"name":"Arithmetic Sequences","slug":"arithmetic-sequences","description":"","subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"isPaywalled":false,"_count":{"notes":20},"skills":[{"id":602,"name":"Identifying arithmetic sequences","excludedSubjects":[],"courseCodes":[{"code":"Core 1.2","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:0:skills:0:courseCodes:0"},{"id":603,"name":"General term","excludedSubjects":[],"courseCodes":[{"code":"Core 1.2","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:0:skills:1:courseCodes:0"}],"hasNotes":true},{"id":28,"name":"Geometric Sequences","slug":"geometric-sequences","description":"","subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"isPaywalled":false,"_count":{"notes":15},"skills":[{"id":604,"name":"Identifying Geometric Sequences","excludedSubjects":[],"courseCodes":[{"code":"Core 1.3","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:1:skills:0:courseCodes:0"},{"id":40,"name":"General Term of a Geometric Sequence","excludedSubjects":[],"courseCodes":[{"code":"Core 1.3","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:1:skills:1:courseCodes:0"}],"hasNotes":true},{"id":31,"name":"Arithmetic Series","slug":"arithmetic-series","description":"","subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"isPaywalled":false,"_count":{"notes":13},"skills":[{"id":607,"name":"A series is the sum of a sequence","excludedSubjects":[],"courseCodes":[{"code":"Core 1.2","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:2:skills:0:courseCodes:0"},{"id":46,"name":"Calculating arithmetic series","excludedSubjects":[],"courseCodes":[{"code":"Core 1.2","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:2:skills:1:courseCodes:0"}],"hasNotes":true},{"id":860,"name":"Σ summation notation","slug":"summation-notation","description":"","subjects":["AAHL","AASL","AIHL","AISL"],"isPaywalled":false,"_count":{"notes":22},"skills":[{"id":47,"name":"Understanding summation notation","excludedSubjects":[],"courseCodes":[{"code":"Core 1.2","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:3:skills:0:courseCodes:0"},{"id":837,"name":"Properties of Σ","excludedSubjects":[],"courseCodes":[{"code":"Core 1.2","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:3:skills:1:courseCodes:0"},{"id":861,"name":"Sums with scalar multiples","excludedSubjects":[],"courseCodes":[{"code":"Core 1.2","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:3:skills:2:courseCodes:0"},{"id":862,"name":"Sum of a constant","excludedSubjects":[],"courseCodes":[{"code":"Core 1.2","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:3:skills:3:courseCodes:0"},{"id":863,"name":"Splitting a sum in Σ form","excludedSubjects":[],"courseCodes":[{"code":"Core 1.2","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:3:skills:4:courseCodes:0"},{"id":905,"name":"Sum of a sum","excludedSubjects":[],"courseCodes":[],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":null}],"hasNotes":true},{"id":859,"name":"Geometric Series","slug":"geometric-series","description":"

","subjects":["AAHL","AASL","AIHL","AISL"],"isPaywalled":false,"_count":{"notes":16},"skills":[{"id":606,"name":"Finite Geometric Series","excludedSubjects":[],"courseCodes":[{"code":"Core 1.3","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:4:skills:0:courseCodes:0"},{"id":608,"name":"Convergence","excludedSubjects":[],"courseCodes":[{"code":"AA 1.8","subjects":["AAHL","AASL"]}],"subjects":["ecolint-y11-hl","AAHL","AASL"],"courseCode":"$d:props:unit:concepts:4:skills:1:courseCodes:0"},{"id":51,"name":"Infinite Geometric Series","excludedSubjects":[],"courseCodes":[{"code":"AA 1.8","subjects":["AAHL","AASL"]}],"subjects":["ecolint-y11-hl","AAHL","AASL"],"courseCode":"$d:props:unit:concepts:4:skills:2:courseCodes:0"}],"hasNotes":true},{"id":906,"name":"Sequence Mode (Calculator)","slug":"sequence-mode-calculator","description":"","subjects":["AAHL","AASL","AIHL","AISL"],"isPaywalled":false,"_count":{"notes":4},"skills":[],"hasNotes":true},{"id":870,"name":"Compounding (Appreciation & Depreciation)","slug":"compounding-appreciation-depreciation","description":"

","subjects":["AIHL","AISL","AAHL","AASL"],"isPaywalled":false,"_count":{"notes":26},"skills":[{"id":872,"name":"Depreciation","excludedSubjects":[],"courseCodes":[{"code":"Core 1.4","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:6:skills:0:courseCodes:0"},{"id":871,"name":"Compound Interest Formula","excludedSubjects":[],"courseCodes":[{"code":"Core 1.4","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:6:skills:1:courseCodes:0"},{"id":883,"name":"Inflation & Real Value","excludedSubjects":[],"courseCodes":[{"code":"Core 1.4","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:6:skills:2:courseCodes:0"},{"id":896,"name":"Positive & Negative Cash Flows (TVM)","excludedSubjects":[],"courseCodes":[{"code":"Core 1.4","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:6:skills:3:courseCodes:0"},{"id":873,"name":"Using TVM Solver (Calculator) - Compound Interest","excludedSubjects":[],"courseCodes":[{"code":"Core 1.4","subjects":["AAHL","AIHL","AASL","AISL"]}],"subjects":["ecolint-y11-hl","AAHL","AIHL","AASL","AISL"],"courseCode":"$d:props:unit:concepts:6:skills:4:courseCodes:0"}],"hasNotes":true}],"themes":[{"id":873,"name":"Using TVM Solver (Calculator) - Compound Interest","description":"","subjects":["AIHL","AISL","AAHL","AASL"],"units":[{"id":864,"name":"Financial Mathematics"},{"id":30,"name":"Sequences & Series"}]},{"id":906,"name":"Sequence Mode (Calculator)","description":"","subjects":["AAHL","AASL","AIHL","AISL"],"units":[{"id":30,"name":"Sequences & Series"}]},{"id":905,"name":"Sum of a sum","description":"","subjects":["AAHL","AASL","AIHL","AISL"],"units":[{"id":30,"name":"Sequences & Series"}]},{"id":871,"name":"Compound Interest Formula","description":"","subjects":["AIHL","AISL","AAHL","AASL"],"units":[{"id":864,"name":"Financial Mathematics"},{"id":30,"name":"Sequences & Series"}]},{"id":28,"name":"Geometric Sequences","description":"","subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"units":[{"id":30,"name":"Sequences & Series"}]},{"id":31,"name":"Arithmetic Series","description":"","subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"units":[{"id":30,"name":"Sequences & Series"}]},{"id":859,"name":"Geometric Series","description":"

","subjects":["AAHL","AASL","AIHL","AISL"],"units":[{"id":30,"name":"Sequences & Series"}]},{"id":860,"name":"Σ summation notation","description":"","subjects":["AAHL","AASL","AIHL","AISL"],"units":[{"id":30,"name":"Sequences & Series"}]},{"id":861,"name":"Sums with scalar multiples","description":"","subjects":["AAHL","AASL","AIHL","AISL"],"units":[{"id":30,"name":"Sequences & Series"}]},{"id":863,"name":"Splitting a sum in Σ form","description":"","subjects":["AAHL","AASL","AIHL","AISL"],"units":[{"id":30,"name":"Sequences & Series"}]},{"id":862,"name":"Sum of a constant","description":"","subjects":["AAHL","AASL","AIHL","AISL"],"units":[{"id":30,"name":"Sequences & Series"}]},{"id":870,"name":"Compounding (Appreciation & Depreciation)","description":"

","subjects":["AIHL","AISL","AAHL","AASL"],"units":[{"id":864,"name":"Financial Mathematics"},{"id":30,"name":"Sequences & Series"}]},{"id":872,"name":"Depreciation","description":"","subjects":["AIHL","AISL","AAHL","AASL"],"units":[{"id":864,"name":"Financial Mathematics"},{"id":30,"name":"Sequences & Series"}]}]},"pages":[{"id":165,"unitId":30,"order":0,"text":"","section":"Sequences","timestamp":null,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":null,"createdAt":"2025-04-08T21:38:16.796Z","updatedAt":"2025-04-09T03:28:15.476Z","instance":null,"courseCode":null,"skill":null},{"id":164,"unitId":30,"order":1,"text":"$49","section":null,"timestamp":0,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":null,"createdAt":"2025-04-08T21:34:29.684Z","updatedAt":"2025-04-11T01:27:48.604Z","instance":null,"courseCode":null,"skill":null},{"id":151,"unitId":30,"order":2,"text":"","section":null,"timestamp":78,"skillId":602,"skillName":"Identifying arithmetic sequences","skillText":"

A sequence is arithmetic if the difference between consecutive terms is constant, ie u_{n+1}-u_{n}=d, the common difference, for all n. For example

1,6,11,16\\ldots

is arithmetic but

2,5,9,11

is not since 9-5=4\\ne5-2=3.

Example

Given that 2,2k+3,11 are consecutive terms in an arithmetic sequence, find k.

The difference between consecutive terms is a constant so:

\\begin{align}11-\\left(2k+3\\right) & =2k+3-2\\\\ 8-2k & =2k+1\\\\ 7 & =4k\\end{align}

So \\boxed{k=\\frac74}.

","skillCode":"Core 1.2","instanceId":null,"createdAt":"2025-04-08T21:33:40.528Z","updatedAt":"2025-04-11T01:28:28.342Z","instance":null,"courseCode":{"code":"Core 1.2","name":"Arithmetic sequences and series","isHL":false,"subjects":["AAHL","AIHL","AASL","AISL"]},"skill":{"id":602,"name":"Identifying arithmetic sequences","text":"

A sequence is arithmetic if the difference between consecutive terms is constant, ie u_{n+1}-u_{n}=d, the common difference, for all n. For example

1,6,11,16\\ldots

is arithmetic but

2,5,9,11

is not since 9-5=4\\ne5-2=3.

Example

Given that 2,2k+3,11 are consecutive terms in an arithmetic sequence, find k.

The difference between consecutive terms is a constant so:

\\begin{align}11-\\left(2k+3\\right) & =2k+3-2\\\\ 8-2k & =2k+1\\\\ 7 & =4k\\end{align}

So \\boxed{k=\\frac74}.

","code":"Core 1.2","courseCode":"$d:props:pages:2:courseCode"}},{"id":169,"unitId":30,"order":3,"text":"","section":null,"timestamp":208,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":701,"createdAt":"2025-04-08T21:39:04.177Z","updatedAt":"2025-04-11T01:28:50.962Z","instance":{"difficulty":0,"calculator":false,"hideMarks":true,"slAdjusted":true,"timeToSolve":60,"isPaywalled":false,"skills":[{"id":602,"questionIndices":[]}],"label":"Identify Arithmetic Sequences","gridCols":3,"nodes":[{"id":-1,"type":"text","content":"

Determine whether each of the following sequences is arithmetic, and state the common difference if so.

"},{"id":2361,"type":"question","content":"

3,7,11,15,19

"},{"id":2362,"type":"question","content":"

2,6,12,20,30

"},{"id":2363,"type":"question","content":"

-5,-2,1,4,7

"}],"isPublished":true,"isPrimary":true,"questions":[{"id":2361,"solution":"

Let's check if consecutive terms have the same difference:

\n\\begin{align}\n7 - 3 &= 4 \\\\\n11 - 7 &= 4 \\\\\n15 - 11 &= 4 \\\\\n19 - 15 &= 4\n\\end{align}\n

Since all differences between consecutive terms are equal to 4, this is an arithmetic sequence with common difference d = 4 .

\n","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

Arithmetic, d=3

\n","

Arithmetic, d=5

\n","

Not an arithmetic sequence.

\n"],"answer":"

Arithmetic, d=4

\n","marks":[]},{"id":2362,"solution":"

Let's check if consecutive terms have the same difference:

\n\\begin{align}\n6 - 2 &= 4 \\\\\n12 - 6 &= 6 \\\\\n20 - 12 &= 8 \\\\\n30 - 20 &= 10\n\\end{align}\n

Since the differences between consecutive terms are not equal (they are 4, 6, 8, and 10), this is not an arithmetic sequence.

\n","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

\\text{Arithmetic with } d=4

\n","

\\text{Arithmetic with } d=6

\n","

\\text{Arithmetic with } d=8

\n"],"answer":"

\\text{Not arithmetic}

\n","marks":[]},{"id":2363,"solution":"

Let's check if consecutive terms have the same difference:

\n\\begin{align}\n-2 - (-5) &= 3 \\\\\n1 - (-2) &= 3 \\\\\n4 - 1 &= 3 \\\\\n7 - 4 &= 3\n\\end{align}\n

Since all differences between consecutive terms are equal to 3, this is an arithmetic sequence with common difference d = 3 .

\n","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

Arithmetic, d=2

\n","

Not arithmetic

\n","

Arithmetic, d=4

\n"],"answer":"

Arithmetic, d=3

\n","marks":[]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[],"classId":700,"instanceId":701},"courseCode":null,"skill":null},{"id":172,"unitId":30,"order":4,"text":"","section":null,"timestamp":265,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":311,"createdAt":"2025-04-08T21:40:02.542Z","updatedAt":"2025-04-11T01:29:19.150Z","instance":{"difficulty":0,"calculator":null,"hideMarks":false,"slAdjusted":false,"timeToSolve":60,"isPaywalled":false,"skills":[{"id":602,"questionIndices":[]}],"label":"Solving for k from 3 consecutive arithmetic terms linear in k","gridCols":1,"nodes":[{"id":1054,"type":"question","content":"

An arithmetic sequence has consecutive terms 2+k,k-1,8-k. Find the value of k.

"}],"isPublished":true,"isPrimary":true,"questions":[{"id":1054,"solution":"

Since the terms are in arithmetic progression, the difference between consecutive terms is constant. This means

\n(k-1) - (2+k) = (8-k) - (k-1)\n

Simplify the left-hand side:

\n(k-1) - (2+k) = k - 1 - 2 - k = -3\n

Simplify the right-hand side:

\n(8-k) - (k-1) = 8 - k - k + 1 = 9 - 2k\n

Equate the two expressions:

\n-3 = 9 - 2k\n

Subtract 9 from both sides:

\n-12 = -2k\n

Divide by -2:

\nk = 6\n

So, the value of k is \\boxed{6}.

\n","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

\n","

-3

\n","

-6

\n"],"answer":"

\n","marks":[]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[],"classId":311,"instanceId":311},"courseCode":null,"skill":null},{"id":152,"unitId":30,"order":5,"text":"","section":null,"timestamp":318,"skillId":603,"skillName":"General term","skillText":"

The n^{\\th} term in an arithmetic sequence is given by

u_{n}=u_1+\\left(n-1\\right)d\\quad📖

where u_1 is the first term and d is the common difference.

Example

An arithmetic sequence has u_3=5 and u_7=-7. Find the first term and the common difference.

We have u_3=u_1+2d=5 and u_7=u_1+6d=-7. Subtracting one from the other:

\\begin{align}u_7-u_3=\\left(u_1+6d\\right)-\\left(u_1+2d\\right) & =-7-5\\\\ 4d & =-12\\end{align}

so \\boxed{d=-3}. Thus u_3=u_1-6=5\\Rightarrow\\boxed{u_1=11}

","skillCode":"Core 1.2","instanceId":null,"createdAt":"2025-04-08T21:33:40.528Z","updatedAt":"2025-04-11T01:29:32.329Z","instance":null,"courseCode":{"code":"Core 1.2","name":"Arithmetic sequences and series","isHL":false,"subjects":["AAHL","AIHL","AASL","AISL"]},"skill":{"id":603,"name":"General term","text":"

The n^{\\th} term in an arithmetic sequence is given by

u_{n}=u_1+\\left(n-1\\right)d\\quad📖

where u_1 is the first term and d is the common difference.

Example

An arithmetic sequence has u_3=5 and u_7=-7. Find the first term and the common difference.

We have u_3=u_1+2d=5 and u_7=u_1+6d=-7. Subtracting one from the other:

\\begin{align}u_7-u_3=\\left(u_1+6d\\right)-\\left(u_1+2d\\right) & =-7-5\\\\ 4d & =-12\\end{align}

so \\boxed{d=-3}. Thus u_3=u_1-6=5\\Rightarrow\\boxed{u_1=11}

","code":"Core 1.2","courseCode":"$d:props:pages:5:courseCode"}},{"id":170,"unitId":30,"order":6,"text":"","section":null,"timestamp":487,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":307,"createdAt":"2025-04-08T21:39:31.710Z","updatedAt":"2025-04-11T01:29:51.118Z","instance":{"difficulty":0,"calculator":null,"hideMarks":false,"slAdjusted":false,"timeToSolve":15,"isPaywalled":false,"skills":[{"id":603,"questionIndices":[]}],"label":"Finding nth term from closed form","gridCols":1,"nodes":[{"id":1050,"type":"question","content":"

Find the 11^{\\th} term of the arithmetic sequence u_{n}=4-3n.

"}],"isPublished":true,"isPrimary":true,"questions":[{"id":1050,"solution":"

Substituting n = 11 into the formula, we have:

\nu_{11} = 4 - 3(11)\n

Now, calculate 3 \\times 11:

\n3 \\times 11 = 33\n

Substitute this value back into the equation:

\nu_{11} = 4 - 33\n

Now, perform the subtraction:

u_{11}=\\boxed{-29}

","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

-33

\n","

-19

\n","

\n"],"answer":"

-29

\n","marks":[]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[],"classId":307,"instanceId":307},"courseCode":null,"skill":null},{"id":171,"unitId":30,"order":7,"text":"","section":null,"timestamp":512,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":727,"createdAt":"2025-04-08T21:39:32.894Z","updatedAt":"2025-04-11T01:30:15.204Z","instance":{"difficulty":0,"calculator":true,"hideMarks":true,"slAdjusted":true,"timeToSolve":60,"isPaywalled":false,"skills":[{"id":602,"questionIndices":[]},{"id":603,"questionIndices":[]}],"label":"Find Common Difference and Specific Term","gridCols":1,"nodes":[{"id":-1,"type":"text","content":"

A sequence has its 8^\\mathrm{th} term equal to 31 and its 15^\\mathrm{th} term equal to 59.

\n"},{"id":2386,"type":"question","content":"

Find the common difference of this arithmetic sequence.

\n"},{"id":2387,"type":"question","content":"

Calculate the 100^\\mathrm{th} term of this sequence.

\n"}],"isPublished":true,"isPrimary":true,"questions":[{"id":2386,"solution":"$4a","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

\\boxed{3}

\n","

\\boxed{6}

\n","

\\boxed{8}

\n"],"answer":"

\\boxed{4}

\n","marks":[]},{"id":2387,"solution":"$4b","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

403

\n","

427

\n","

391

\n"],"answer":"

399

\n","marks":[]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[],"classId":703,"instanceId":727},"courseCode":null,"skill":null},{"id":153,"unitId":30,"order":8,"text":"","section":null,"timestamp":632,"skillId":604,"skillName":"Identifying Geometric Sequences","skillText":"$4c","skillCode":"Core 1.3","instanceId":null,"createdAt":"2025-04-08T21:33:40.528Z","updatedAt":"2025-04-11T01:30:26.395Z","instance":null,"courseCode":{"code":"Core 1.3","name":"Geometric sequences and series","isHL":false,"subjects":["AAHL","AIHL","AASL","AISL"]},"skill":{"id":604,"name":"Identifying Geometric Sequences","text":"$4d","code":"Core 1.3","courseCode":"$d:props:pages:8:courseCode"}},{"id":173,"unitId":30,"order":9,"text":"","section":null,"timestamp":729,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1509,"createdAt":"2025-04-08T21:40:41.412Z","updatedAt":"2025-04-11T01:30:46.330Z","instance":{"difficulty":0,"calculator":false,"hideMarks":true,"slAdjusted":true,"timeToSolve":40,"isPaywalled":false,"skills":[],"label":"Identifying Geometric Sequence","gridCols":1,"nodes":[{"id":3076,"type":"question","content":"

Consider the following sequences:

\\begin{align}4,\\frac12,\\frac18,\\frac{1}{32}\\ldots & \\qquad1,-3,9,27\\ldots\\\\ 2,4,6,8\\ldots & \\qquad\\frac{1}{32},-\\frac14,2,-16\\ldots\\end{align}

State the common ratio r of the one that is geometric.

"}],"isPublished":true,"isPrimary":true,"questions":[{"id":3076,"solution":"

The geometric sequence is

\\frac{1}{32},-\\frac14,2,-16\\ldots

and has common ratio

r=-\\frac{16}{2}=\\boxed{-8}

","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

\n","

-\\frac{1}{8}

\n","

\\frac{1}{8}

\n"],"answer":"

-8

\n","marks":[]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[28],"classId":838,"instanceId":1509},"courseCode":null,"skill":null},{"id":174,"unitId":30,"order":10,"text":"","section":null,"timestamp":811,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1511,"createdAt":"2025-04-08T21:40:59.311Z","updatedAt":"2025-04-11T01:31:17.473Z","instance":{"difficulty":0,"calculator":false,"hideMarks":false,"slAdjusted":true,"timeToSolve":60,"isPaywalled":false,"skills":[],"label":"For what k is is geometric?","gridCols":1,"nodes":[{"id":3078,"type":"question","content":"

For what value(s) of k is the sequence 3,k+1,12 geometric?

"}],"isPublished":true,"isPrimary":true,"questions":[{"id":3078,"solution":"

A sequence is geometric if the quotient between successive terms is constant:

\\frac{12}{k+1}=\\frac{k+1}{3}\\left(=r\\right)

Cross multiplying:

\n(k+1)^2 = 36.\n

Taking the square root,

\nk+1 = \\pm 6.\n

Thus, the solutions are

k=6-1=\\boxed{5}\\quad\\text{or}\\quad k=-6-1=\\boxed{-7}.

","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

\n","

-7

\n","

7\\text{ or }\\ -5

"],"answer":"

5 \\text{ or } -7

","marks":[]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[28],"classId":840,"instanceId":1511},"courseCode":null,"skill":null},{"id":154,"unitId":30,"order":11,"text":"","section":null,"timestamp":861,"skillId":40,"skillName":"General Term of a Geometric Sequence","skillText":"

The n^{\\th} term of a geometric sequence is given by

u_{n}=u_1r^{n-1}\\quad📖

where u_1 is the first term and r is the common ratio.

Example

A geometric sequence has u_2=9 and u_5=\\frac13. Find the first term and the common ratio.

Using the formula, we have

\\begin{align}u_2=u_1r & =9\\\\ u_5=u_1r^4 & =\\frac13\\end{align}

Dividing u_5 by u_2:

\\frac{u_5}{u_2}=r^3=\\frac{1\\/3}{9}=\\frac{1}{27}

r=\\sqrt[3]{\\frac{1}{27}}=\\boxed{\\frac13}.

Now since u_2=u_1r=9, u_1=\\frac{9}{r}=9\\cdot3=\\boxed{27}.

","skillCode":"Core 1.3","instanceId":null,"createdAt":"2025-04-08T21:33:40.528Z","updatedAt":"2025-04-11T01:31:41.720Z","instance":null,"courseCode":{"code":"Core 1.3","name":"Geometric sequences and series","isHL":false,"subjects":["AAHL","AIHL","AASL","AISL"]},"skill":{"id":40,"name":"General Term of a Geometric Sequence","text":"

The n^{\\th} term of a geometric sequence is given by

u_{n}=u_1r^{n-1}\\quad📖

where u_1 is the first term and r is the common ratio.

Example

A geometric sequence has u_2=9 and u_5=\\frac13. Find the first term and the common ratio.

Using the formula, we have

\\begin{align}u_2=u_1r & =9\\\\ u_5=u_1r^4 & =\\frac13\\end{align}

Dividing u_5 by u_2:

\\frac{u_5}{u_2}=r^3=\\frac{1\\/3}{9}=\\frac{1}{27}

r=\\sqrt[3]{\\frac{1}{27}}=\\boxed{\\frac13}.

Now since u_2=u_1r=9, u_1=\\frac{9}{r}=9\\cdot3=\\boxed{27}.

","code":"Core 1.3","courseCode":"$d:props:pages:11:courseCode"}},{"id":175,"unitId":30,"order":12,"text":"","section":null,"timestamp":995,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1510,"createdAt":"2025-04-08T21:41:55.214Z","updatedAt":"2025-04-11T01:32:15.823Z","instance":{"difficulty":0,"calculator":true,"hideMarks":false,"slAdjusted":false,"timeToSolve":80,"isPaywalled":false,"skills":[],"label":"Given two non-consecutive terms, find another term","gridCols":1,"nodes":[{"id":-1,"type":"text","content":"

A geometric sequence has third term v_3=2 and sixth term v_6=-54.

"},{"id":3077,"type":"question","content":"

Find the 11^{\\th} term, v_{11}.

"}],"isPublished":true,"isPrimary":true,"questions":[{"id":3077,"solution":"

We can determine r using the given v_3 and v_6. Since

\nv_3=ar^2\\quad\\text{and}\\quad v_6=ar^5,\n

dividing gives

\n\\frac{v_6}{v_3}=\\frac{ar^5}{ar^2}=r^3.\n

Substitute the given values:

\nr^3=\\frac{-54}{2}=-27.\n

Taking the cube root yields

\nr=-3.\n

Now, compute

\nr^5=(-3)^5=-243,\n

v_{11}=v_6\\cdot r^5=-54\\times(-243)=\\boxed{13122}.

","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

-13122

\n","

8748

\n","

-8748

\n"],"answer":"

13122

\n","marks":[]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[28],"classId":839,"instanceId":1510},"courseCode":null,"skill":null},{"id":176,"unitId":30,"order":13,"text":"","section":null,"timestamp":1158,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":48,"createdAt":"2025-04-08T21:42:37.577Z","updatedAt":"2025-04-11T01:33:35.621Z","instance":{"difficulty":2,"calculator":null,"hideMarks":false,"slAdjusted":false,"timeToSolve":60,"isPaywalled":false,"skills":[{"id":40,"questionIndices":[]},{"id":603,"questionIndices":[]},{"id":604,"questionIndices":[]},{"id":606,"questionIndices":[]}],"label":"Terms of an arithmetic sequence are consecutive terms of a geometric sequence","gridCols":1,"nodes":[{"id":1,"type":"text","content":"

The first, fourth and tenth terms of an arithmetic sequence are consecutive terms of a geometric sequence with r\\ne1.

"},{"id":1986,"type":"question","content":"

Find the common ratio r.

"},{"id":1987,"type":"question","content":"

Given that the sum of the first 4 terms of the geometric sequence is 45, find the first term in the sequence.

"}],"isPublished":true,"isPrimary":true,"questions":[{"id":1986,"solution":"$4e","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

\n","

\\frac{3}{2}

\n","

\n"],"answer":"

\n","marks":[{"id":7623,"type":"M","criteria":"

Correct working leading to the solution

","isCritical":false},{"id":7624,"type":"A","criteria":"

Terms are u_1, u_1+3d and u_1+9d

","isCritical":false},{"id":7625,"type":"M","criteria":"

Use of the common ratio property

","isCritical":false},{"id":7622,"type":"A","criteria":"

u_1=3d

","isCritical":false},{"id":7626,"type":"A","criteria":"

(u_1+3d)^2=u_1(u_1+9d) or similar

","isCritical":false}]},{"id":1987,"solution":"

The sum of the first n terms in a geometric series is

S_{n}=u_1\\cdot\\frac{r^{n}-1}{r-1}

In this case:

S_4=u_1\\cdot\\frac{2^4-1}{2-1}=45

Hence

u_1\\cdot\\frac{15}{1}=45\\Rightarrow u_1=3

","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

\n","

\n"],"answer":"

\n","marks":[{"id":7906,"type":"A","criteria":"

u_1=3

","isCritical":false},{"id":7907,"type":"M","criteria":"

Attempt to use formula for finite geometric sum, or express sum of 4 terms in terms of u_1 and r

","isCritical":false},{"id":7905,"type":"A","criteria":"

u_1\\cdot\\frac{2^4-1}{2-1}=45 or equivalent

","isCritical":false}]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[28,31],"classId":48,"instanceId":48},"courseCode":null,"skill":null},{"id":166,"unitId":30,"order":14,"text":"","section":"Series","timestamp":null,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":null,"createdAt":"2025-04-08T21:38:30.018Z","updatedAt":"2025-04-09T03:28:15.476Z","instance":null,"courseCode":null,"skill":null},{"id":155,"unitId":30,"order":15,"text":"","section":null,"timestamp":1455,"skillId":607,"skillName":"A series is the sum of a sequence","skillText":"

The sum of terms in a sequence is called a series.

For example, if we have the sequence

1,2,3,4\\ldots

then we can construct the series

1+2+3+4+\\cdots

Because the series continues forever, we write S_{n} to denote the sum of the first n terms in the series.

For the series 1,2,3,4\\ldots this is

S_{n}=1+2+\\cdots+\\left(n-1\\right)+n

","skillCode":"Core 1.2","instanceId":null,"createdAt":"2025-04-08T21:33:40.528Z","updatedAt":"2025-04-11T01:35:35.568Z","instance":null,"courseCode":{"code":"Core 1.2","name":"Arithmetic sequences and series","isHL":false,"subjects":["AAHL","AIHL","AASL","AISL"]},"skill":{"id":607,"name":"A series is the sum of a sequence","text":"

The sum of terms in a sequence is called a series.

For example, if we have the sequence

1,2,3,4\\ldots

then we can construct the series

1+2+3+4+\\cdots

Because the series continues forever, we write S_{n} to denote the sum of the first n terms in the series.

For the series 1,2,3,4\\ldots this is

S_{n}=1+2+\\cdots+\\left(n-1\\right)+n

","code":"Core 1.2","courseCode":"$d:props:pages:15:courseCode"}},{"id":156,"unitId":30,"order":16,"text":"","section":null,"timestamp":1498,"skillId":46,"skillName":"Calculating arithmetic series","skillText":"$4f","skillCode":"Core 1.2","instanceId":null,"createdAt":"2025-04-08T21:33:40.528Z","updatedAt":"2025-04-11T01:36:57.536Z","instance":null,"courseCode":{"code":"Core 1.2","name":"Arithmetic sequences and series","isHL":false,"subjects":["AAHL","AIHL","AASL","AISL"]},"skill":{"id":46,"name":"Calculating arithmetic series","text":"$50","code":"Core 1.2","courseCode":"$d:props:pages:16:courseCode"}},{"id":178,"unitId":30,"order":17,"text":"","section":null,"timestamp":1858,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1544,"createdAt":"2025-04-08T21:46:57.850Z","updatedAt":"2025-04-11T01:37:15.497Z","instance":{"difficulty":0,"calculator":false,"hideMarks":false,"slAdjusted":false,"timeToSolve":25,"isPaywalled":false,"skills":[],"label":"Sum from first and n^th term","gridCols":1,"nodes":[{"id":3109,"type":"question","content":"

An arithmetic sequence has first term -4 and 12^{\\th} term 18. Find the sum of the first 12 terms.

"}],"isPublished":true,"isPrimary":true,"questions":[{"id":3109,"solution":"

We have the formula

S_{n}=\\frac{n}{2}\\left(u_1+u_{n}\\right)

When n=12:

S_{12}=\\frac{12}{2}\\cdot\\left(u_1+u_{12}\\right)

which in this case is

S_{12}=6\\left(-4+18\\right)=\\boxed{84}

","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

\n","

\n"],"answer":"

\n","marks":[]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[31],"classId":842,"instanceId":1544},"courseCode":null,"skill":null},{"id":177,"unitId":30,"order":18,"text":"","section":null,"timestamp":1916,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1539,"createdAt":"2025-04-08T21:46:38.450Z","updatedAt":"2025-04-11T01:37:46.059Z","instance":{"difficulty":0,"calculator":false,"hideMarks":false,"slAdjusted":false,"timeToSolve":20,"isPaywalled":false,"skills":[],"label":"Finite arithmetic sum using u_1 and d","gridCols":1,"nodes":[{"id":3104,"type":"question","content":"

An arithmetic sequence has first term 5 and common difference -3. Find the sum of the first 11 terms.

\n"}],"isPublished":true,"isPrimary":true,"questions":[{"id":3104,"solution":"

For an arithmetic sequence with first term u_1 and common difference d, the sum of the first n terms is:

S_{n}=\\frac{n}{2}\\left(2u_1+\\left(n-1\\right)d\\right)

In this problem, we have u_1=5, d = -3 and n=11:

\\begin{align}S_{11} & =\\frac{11}{2}\\left(10+10\\cdot\\left(-3\\right)\\right)\\\\ \\placeholder{} & =\\frac{11}{2}\\left(-20\\right)=\\boxed{-110}\\end{align}

","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

-55

\n","

-100

\n","

-120

\n"],"answer":"

-110

\n","marks":[]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[31],"classId":841,"instanceId":1539},"courseCode":null,"skill":null},{"id":191,"unitId":30,"order":19,"text":"","section":null,"timestamp":1997,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1631,"createdAt":"2025-04-08T21:52:48.284Z","updatedAt":"2025-04-11T01:38:56.241Z","instance":{"difficulty":1,"calculator":null,"hideMarks":false,"slAdjusted":true,"timeToSolve":60,"isPaywalled":false,"skills":[{"id":46,"questionIndices":[]},{"id":603,"questionIndices":[]}],"label":"Given two arithmetic sums, find all there is to know","gridCols":1,"nodes":[{"id":3186,"type":"question","content":"

An arithmetic sequence has u_9=20 and S_{12}=180. Find the value of u_1 and the value of d.

"}],"isPublished":true,"isPrimary":true,"questions":[{"id":3186,"solution":"$51","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

u_1=2,\\;d=4

\n","

u_1=8,\\;d=2

\n","

u_1=4,\\;d=-2

\n"],"answer":"

u_1=4,\\;d=2

\n","marks":[{"id":7710,"type":"A","criteria":"

u_1=4

","isCritical":false},{"id":7711,"type":"A","criteria":"

d=2

","isCritical":true},{"id":7712,"type":"M","criteria":"

Valid attempt to solve system of equations

","isCritical":false},{"id":7708,"type":"M","criteria":"

Attempt to use formula for S_{n}

","isCritical":false},{"id":7709,"type":"A","criteria":"

Correct system of equations

","isCritical":false}]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[31],"classId":850,"instanceId":1631},"courseCode":null,"skill":null},{"id":157,"unitId":30,"order":20,"text":"","section":null,"timestamp":2179,"skillId":51,"skillName":"Infinite Geometric Series","skillText":"$52","skillCode":"AA 1.8","instanceId":null,"createdAt":"2025-04-08T21:33:40.528Z","updatedAt":"2025-04-11T01:40:01.903Z","instance":null,"courseCode":{"code":"AA 1.8","name":"Sum of infinite geo sequence","isHL":false,"subjects":["AAHL","AASL"]},"skill":{"id":51,"name":"Infinite Geometric Series","text":"$53","code":"AA 1.8","courseCode":"$d:props:pages:20:courseCode"}},{"id":179,"unitId":30,"order":21,"text":"","section":null,"timestamp":2348,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1574,"createdAt":"2025-04-08T21:47:20.900Z","updatedAt":"2025-04-11T01:40:37.038Z","instance":null,"courseCode":null,"skill":null},{"id":159,"unitId":30,"order":22,"text":"","section":null,"timestamp":2405,"skillId":608,"skillName":"Convergence","skillText":"

A geometric series is said to converge if S_{\\infty} is finite - which means \\left|r\\right|<1\\Leftrightarrow-1<r<1.

Example

A geometric sequence has u_1=8 and u_4=2k+1. For what value(s) of k does the corresponding geometric series converge?

We have

u_4=u_1r^3=8\\cdot r^3=2k+1\\Rightarrow r^3=\\frac{2k+1}{8}

Now if -1<r<1, then -1<r^3<1:

-1<\\frac{2k+1}{8}<1

-8<2k+1<8

\\boxed{-\\frac92<k<\\frac72}

","skillCode":"AA 1.8","instanceId":null,"createdAt":"2025-04-08T21:33:40.528Z","updatedAt":"2025-04-11T01:40:54.732Z","instance":null,"courseCode":{"code":"AA 1.8","name":"Sum of infinite geo sequence","isHL":false,"subjects":["AAHL","AASL"]},"skill":{"id":608,"name":"Convergence","text":"

A geometric series is said to converge if S_{\\infty} is finite - which means \\left|r\\right|<1\\Leftrightarrow-1<r<1.

Example

A geometric sequence has u_1=8 and u_4=2k+1. For what value(s) of k does the corresponding geometric series converge?

We have

u_4=u_1r^3=8\\cdot r^3=2k+1\\Rightarrow r^3=\\frac{2k+1}{8}

Now if -1<r<1, then -1<r^3<1:

-1<\\frac{2k+1}{8}<1

-8<2k+1<8

\\boxed{-\\frac92<k<\\frac72}

","code":"AA 1.8","courseCode":"$d:props:pages:22:courseCode"}},{"id":183,"unitId":30,"order":23,"text":"","section":null,"timestamp":2545,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1634,"createdAt":"2025-04-08T21:50:15.336Z","updatedAt":"2025-04-11T01:41:31.488Z","instance":null,"courseCode":null,"skill":null},{"id":187,"unitId":30,"order":24,"text":"","section":null,"timestamp":2586,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1650,"createdAt":"2025-04-08T21:51:55.566Z","updatedAt":"2025-04-11T01:42:33.765Z","instance":null,"courseCode":null,"skill":null},{"id":158,"unitId":30,"order":25,"text":"","section":null,"timestamp":2725,"skillId":606,"skillName":"Finite Geometric Series","skillText":"

The sum of the first n terms in a geometric sequence is given by:

S_{n}=\\frac{u_1\\left(r^{n}-1\\right)}{r-1}=\\frac{u_1\\left(1-r^{n}\\right)}{1-r}\\quad📖

Example

A geometric sequence has u_1=27 and r=\\frac13. Find the sum of the first 4 terms.

\\begin{align}S_8=\\frac{27\\cdot\\left(1-\\frac{1}{3^4}\\right)}{1-\\frac13} & =\\frac{27\\cdot\\left(1-\\frac{1}{81}\\right)}{\\frac23}\\\\ \\placeholder{} & \\placeholder{}\\\\ \\placeholder{} & =\\frac{27-\\frac13}{\\frac23}\\\\ \\placeholder{} & \\placeholder{}\\\\ \\placeholder{} & =\\frac{3\\cdot27-3\\cdot\\frac13}{2}=\\boxed{40}\\end{align}

","skillCode":"Core 1.3","instanceId":null,"createdAt":"2025-04-08T21:33:40.528Z","updatedAt":"2025-04-11T01:42:53.693Z","instance":null,"courseCode":{"code":"Core 1.3","name":"Geometric sequences and series","isHL":false,"subjects":["AAHL","AIHL","AASL","AISL"]},"skill":{"id":606,"name":"Finite Geometric Series","text":"

The sum of the first n terms in a geometric sequence is given by:

S_{n}=\\frac{u_1\\left(r^{n}-1\\right)}{r-1}=\\frac{u_1\\left(1-r^{n}\\right)}{1-r}\\quad📖

Example

A geometric sequence has u_1=27 and r=\\frac13. Find the sum of the first 4 terms.

","code":"Core 1.3","courseCode":"$d:props:pages:25:courseCode"}},{"id":182,"unitId":30,"order":26,"text":"","section":null,"timestamp":2866,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1564,"createdAt":"2025-04-08T21:49:40.840Z","updatedAt":"2025-04-11T01:43:25.157Z","instance":{"difficulty":0,"calculator":true,"hideMarks":false,"slAdjusted":true,"timeToSolve":60,"isPaywalled":false,"skills":[{"id":606,"questionIndices":[]}],"label":"Finite geometric sum","gridCols":1,"nodes":[{"id":3129,"type":"question","content":"

A geometric series has first term v_1 = 2.2 and common ratio r = -1.5. Find the sum of the first 11 terms.

\n"}],"isPublished":true,"isPrimary":true,"questions":[{"id":3129,"solution":"

S_{n}=u_1\\cdot\\frac{r^{n}-1}{r-1}

The sum S_{11} of the first 11 terms of a geometric series with first term v_1 = 2.2 and common ratio r = -1.5 is given by

\nS_{11}=\\frac{2.2\\left(1-(-1.5)^{11}\\right)}{1-(-1.5)}.\n

Since

\n1-(-1.5)=2.5,\n

the expression becomes

\nS_{11}=\\frac{2.2\\left(1-(-1.5)^{11}\\right)}{2.5}.\n

Using a calculator, we find:

\n\\boxed{\n\\begin{array}{@{}l@{}}\n\\text{\\scriptsize NORMAL FLOAT AUTO REAL DEGREE MP}\\\\[0.5em]\n\\begin{array}{lr}\n\\rule{10em}{0pt} & \\\\\n(-1.5)^{11} & \\\\\n& -86.49755859 \\\\[0.5em]\n1-(-86.49755859) & \\\\\n& 87.49755859 \\\\[0.5em]\n2.2*87.49755859/2.5 & \\\\\n& 76.99785156 \\\\\n\\end{array}\n\\end{array}\n}\n

Rounded to 3 significant figures, the sum of the first 11 terms is approximately

\n\\boxed{77.0}.\n

","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

76.5

\n","

77.5

\n","

78.0

\n"],"answer":"

77.0

\n","marks":[]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[31],"classId":844,"instanceId":1564},"courseCode":null,"skill":null},{"id":160,"unitId":30,"order":27,"text":"","section":null,"timestamp":3008,"skillId":47,"skillName":"Sigma (Σ) notation for summation","skillText":"$54","skillCode":"Core 1.2","instanceId":null,"createdAt":"2025-04-08T21:33:40.528Z","updatedAt":"2025-04-11T01:43:41.137Z","instance":null,"courseCode":{"code":"Core 1.2","name":"Arithmetic sequences and series","isHL":false,"subjects":["AAHL","AIHL","AASL","AISL"]},"skill":{"id":47,"name":"Sigma (Σ) notation for summation","text":"$55","code":"Core 1.2","courseCode":"$d:props:pages:27:courseCode"}},{"id":180,"unitId":30,"order":28,"text":"","section":null,"timestamp":3283,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1593,"createdAt":"2025-04-08T21:47:40.662Z","updatedAt":"2025-04-11T01:45:16.452Z","instance":{"difficulty":0,"calculator":false,"hideMarks":false,"slAdjusted":false,"timeToSolve":30,"isPaywalled":false,"skills":[{"id":47,"questionIndices":[]}],"label":"Evaluate sum by hand","gridCols":1,"nodes":[{"id":3158,"type":"question","content":"

Find the value of \\sum_{k=2}^5\\left(k-3\\right)

"}],"isPublished":true,"isPrimary":true,"questions":[{"id":3158,"solution":"

We need to calculate

\n\\sum_{k=2}^5 (k-3) = (2-3)+(3-3)+(4-3)+(5-3)\n

Simplifying each term gives

-1+0+1+2=\\boxed{2}

","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

\n","

\n"],"answer":"

\n","marks":[]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[31],"classId":846,"instanceId":1593},"courseCode":null,"skill":null},{"id":161,"unitId":30,"order":29,"text":"","section":null,"timestamp":3329,"skillId":837,"skillName":"Properties of Σ","skillText":"$56","skillCode":"Core 1.2","instanceId":null,"createdAt":"2025-04-08T21:33:40.528Z","updatedAt":"2025-04-11T01:45:32.248Z","instance":null,"courseCode":{"code":"Core 1.2","name":"Arithmetic sequences and series","isHL":false,"subjects":["AAHL","AIHL","AASL","AISL"]},"skill":{"id":837,"name":"Properties of Σ","text":"$57","code":"Core 1.2","courseCode":"$d:props:pages:29:courseCode"}},{"id":181,"unitId":30,"order":30,"text":"","section":null,"timestamp":3738,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1612,"createdAt":"2025-04-08T21:47:48.749Z","updatedAt":"2025-04-11T01:46:19.069Z","instance":{"difficulty":0,"calculator":false,"hideMarks":false,"slAdjusted":false,"timeToSolve":180,"isPaywalled":false,"skills":[{"id":837,"questionIndices":[]},{"id":861,"questionIndices":[]},{"id":863,"questionIndices":[]}],"label":"Properties of sums","gridCols":1,"nodes":[{"id":-1,"type":"text","content":"

It is given that \\sum_{k=1}^{8}a_{k}=30, \\sum_{k=1}^4a_{k}=12, and \\sum_{k=5}^{8}b_{k}=5.

"},{"id":3168,"type":"question","content":"

Find \\sum_{k=5}^8\\left(2a_{k}-b_{k}\\right)

"}],"isPublished":true,"isPrimary":true,"questions":[{"id":3168,"solution":"

First, I need to find \\sum_{k=5}^{8}a_{k}. I can do this by using the first two given sums:

\n\\sum_{k=1}^{8}a_{k} = \\sum_{k=1}^{4}a_{k} + \\sum_{k=5}^{8}a_{k}\n

Substituting the known values:

\n30 = 12 + \\sum_{k=5}^{8}a_{k}\n

Solving for \\sum_{k=5}^{8}a_{k}:

\n\\sum_{k=5}^{8}a_{k} = 30 - 12 = 18\n

Now I can calculate \\sum_{k=5}^{8}2a_{k}-b_k:

\\begin{align}\\sum_{k=5}^82a_{k}-b_{k} & =\\sum_{k=5}^82a_{k}-\\sum_{k=5}^8b_{k}\\\\ & =2\\sum_{k=5}^8a_{k}-\\sum_{k=5}^8b_{k}\\\\ & =2(18)-5\\\\ & =36-5\\\\ & =\\boxed{31}\\end{align}

","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

\\boxed{36}

\n","

\\boxed{28}

\n","

\\boxed{25}

\n"],"answer":"

\\boxed{31}

\n","marks":[]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[860,861,863],"classId":847,"instanceId":1612},"courseCode":null,"skill":null},{"id":184,"unitId":30,"order":31,"text":"","section":"Paper 1 Problems","timestamp":null,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":null,"createdAt":"2025-04-08T21:50:52.375Z","updatedAt":"2025-04-09T03:28:15.476Z","instance":null,"courseCode":null,"skill":null},{"id":188,"unitId":30,"order":32,"text":"","section":null,"timestamp":3889,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1632,"createdAt":"2025-04-08T21:51:57.014Z","updatedAt":"2025-04-11T01:47:57.286Z","instance":null,"courseCode":null,"skill":null},{"id":189,"unitId":30,"order":33,"text":"","section":null,"timestamp":4164,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1685,"createdAt":"2025-04-08T21:51:58.062Z","updatedAt":"2025-04-11T01:48:49.308Z","instance":null,"courseCode":null,"skill":null},{"id":185,"unitId":30,"order":35,"text":"","section":null,"timestamp":4664,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":28,"createdAt":"2025-04-08T21:50:57.443Z","updatedAt":"2025-05-02T17:50:16.559Z","instance":null,"courseCode":null,"skill":null},{"id":192,"unitId":30,"order":36,"text":"","section":null,"timestamp":5083,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":743,"createdAt":"2025-04-08T22:49:34.559Z","updatedAt":"2025-04-11T01:50:43.998Z","instance":{"difficulty":3,"calculator":false,"hideMarks":false,"slAdjusted":true,"timeToSolve":60,"isPaywalled":false,"skills":[{"id":46,"questionIndices":[]},{"id":602,"questionIndices":[]},{"id":603,"questionIndices":[]}],"label":"Arithmetic Sequence Problem","gridCols":1,"nodes":[{"id":-1,"type":"text","content":"

An arithmetic sequence has u_1=2a-b, u_4=2b-a and u_7=6b-a, where a,b\\in\\R.

"},{"id":2407,"type":"question","content":"

Show that d=-4a.

"},{"id":-2,"type":"text","content":"

The arithmetic sequence has S_8=144.

"},{"id":3085,"type":"question","content":"

Find the value of u_{10}.

"}],"isPublished":true,"isPrimary":true,"questions":[{"id":2407,"solution":"$58","summary":null,"isAssistance":false,"graph":null,"mcqOptions":[],"answer":null,"marks":[{"id":7688,"type":"M","criteria":"

Considers the difference of two of the given terms

","isCritical":true},{"id":7687,"type":"A","criteria":"

Correct equation in a and b

","isCritical":true},{"id":7686,"type":"A","criteria":"

b=-3a or equivalent

","isCritical":true},{"id":7685,"type":"M","criteria":"

Attempt to use relationship between a and b to simplify expression for d, leading to the answer

","isCritical":false}]},{"id":3085,"solution":"$59","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

\n","

\n"],"answer":"

\n","marks":[{"id":7689,"type":"A","criteria":"

u_1=5a

","isCritical":false},{"id":7690,"type":"M","criteria":"

Attempt to equate formula for S_8 with 144

","isCritical":false},{"id":7691,"type":"A","criteria":"

a=-2

","isCritical":false},{"id":7692,"type":"A","criteria":"

u_{10}=62

","isCritical":false},{"id":7693,"type":"M","criteria":"

Valid method to find u_{10}

","isCritical":false}]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[31],"classId":705,"instanceId":743},"courseCode":null,"skill":null},{"id":167,"unitId":30,"order":37,"text":"","section":"Finance","timestamp":null,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":null,"createdAt":"2025-04-08T21:38:40.590Z","updatedAt":"2025-04-09T03:28:15.476Z","instance":null,"courseCode":null,"skill":null},{"id":186,"unitId":30,"order":40,"text":"","section":null,"timestamp":6017,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1624,"createdAt":"2025-04-08T21:51:10.434Z","updatedAt":"2025-04-11T01:52:34.902Z","instance":{"difficulty":0,"calculator":true,"hideMarks":false,"slAdjusted":true,"timeToSolve":60,"isPaywalled":false,"skills":[],"label":"Future value calculation","gridCols":1,"nodes":[{"id":3180,"type":"question","content":"

Maria invests $1000 in a savings account that pays a nominal annual interest rate of 7%, compounded quarterly. Find the balance of Maria's savings after 5 years, giving your answer to the nearest dollar.

"}],"isPublished":true,"isPrimary":true,"questions":[{"id":3180,"solution":"

FV=PV\\times\\left(1+\\frac{r}{100k}\\right)^{kn}

We substitute into the formula with

\nPV=1000,\\quad r=7,\\quad k=4,\\quad n=5.\n

Thus,

\nFV=1000\\cdot\\left(1+\\frac{7}{100\\cdot4}\\right)^{4\\cdot5}=1000\\cdot\\left(1+\\frac{7}{400}\\right)^{20}.\n

Using a calculator we compute:

\\boxed{\\begin{array}{l}\\scriptsize{\\text{NORMAL FLOAT AUTO REAL DEGREE MP}}\\\\ \\begin{array}{lr}\\rule{10em}{0pt} & \\\\ 1000\\ast\\left(1+\\dfrac{7}{100\\ast4}\\right)^{4\\ast5} & \\\\ & 1414.778196\\end{array}\\end{array}}

To the nearest dollar, this yields \\boxed{\\$1415}.

","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

\\$1400

\n","

\\$1420

\n","

\\$1390

\n"],"answer":"

\\$1415

\n","marks":[]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[],"classId":848,"instanceId":1624},"courseCode":null,"skill":null},{"id":193,"unitId":30,"order":41,"text":"","section":null,"timestamp":6113,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1462,"createdAt":"2025-04-08T22:50:01.625Z","updatedAt":"2025-04-11T01:54:28.873Z","instance":{"difficulty":1,"calculator":true,"hideMarks":false,"slAdjusted":false,"timeToSolve":60,"isPaywalled":false,"skills":[{"id":871,"questionIndices":[]},{"id":873,"questionIndices":[]},{"id":896,"questionIndices":[]}],"label":"Simple compound interest problem","gridCols":1,"nodes":[{"id":-1,"type":"text","content":"

Esther invests \\$12\\,000 in an index fund that pays 8\\% interest per annum, compounded monthly.

"},{"id":3020,"type":"question","content":"

Give an expression for the value of Esther's investment after n years.

"},{"id":3021,"type":"question","content":"

Calculate the amount of interest Esther will earn over the first 4 years. Give your answer to the nearest dollar.

"},{"id":-2,"type":"text","content":"

Esther wants to use the money to buy a car for \\$27\\,000.

"},{"id":3022,"type":"question","content":"

Find the number of years Esther will have to wait.

"}],"isPublished":true,"isPrimary":true,"questions":[{"id":3020,"solution":"

The formula for the future value A of an investment compounded periodically is:

\nA = P \\left( 1 + \\frac{r}{100k} \\right)^{kn} \\,\\,\\,\\,\\,\\left\\lbrace\\text{SL 1.4}\\right\\rbrace\n

where:

P is the principal amount
r is the annual interest rate
k is the number of compounding periods per year
n is the number of years

Substituting the given values:

A=12\\,000\\left(1+\\frac{0.08}{12}\\right)^{12n}

","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

12000\\left(1+\\frac{0.08}{12}\\right)^{n}

\n","

12000e^{0.08n}

\n","

12000\\left(1+0.08\\right)^{12n}

\n"],"answer":"

12000\\left(1+\\frac{0.08}{12}\\right)^{12n}

\n","marks":[{"id":7487,"type":"A","criteria":"

12\\,000\\left(1+\\frac{0.08}{12}\\right)^{12n} or equivalent

","isCritical":false}]},{"id":3021,"solution":"

In part (a) we found

A=12\\,000\\left(1+\\frac{0.08}{12}\\right)^{12n}

With n=4 we find

A=12\\,000\\left(1+\\frac{0.08}{12}\\right)^{48}=16\\,508

The interest earned is the difference between the future value and the initial principal:

\\text{Interest}=A-P=16\\,508-12\\,000=4\\,508

Thus, the interest earned over the first 4 years is approximately \\boxed{\\$4\\,508} .

","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

\\$4500

\n","

\\$4510

\n","

\\$4498

\n"],"answer":"

\\$4508

\n","marks":[{"id":7488,"type":"A","criteria":"

4508

","isCritical":false},{"id":7489,"type":"A","criteria":"

Balance of 16508 after 4 years

","isCritical":false}]},{"id":3022,"solution":"

Let's solve for how long Esther needs to wait until her investment reaches \\$27\\,000.

From part (a), we have:

A=12\\,000\\left(1+\\frac{0.08}{12}\\right)^{12n}

where A=27\\,000 and we need to solve for n.

Using the TI-84 Finance app:

Press [APPS] → Finance
Select TVM Solver
Enter:
- N = (leave blank to solve for)
- PV = -12000 (negative as it's money invested)
- PMT = 0
- FV = 27000
- P/Y = 12
- C/Y = 12
- I% = 8

Solving gives N=122.04 months or 10.17 years.

Since Esther can't withdraw a fraction of a year and needs the full amount, she must wait \\boxed{11} years .

","summary":null,"isAssistance":false,"graph":null,"mcqOptions":["

10 years

\n","

10.17 years

\n","

11.5 years

\n"],"answer":"

11 years

\n","marks":[{"id":7490,"type":"M","criteria":"

Attempt to solve for n, for example using technology

","isCritical":false},{"id":7491,"type":"A","criteria":"

Any value that rounds to 122 months

","isCritical":false},{"id":7492,"type":"A","criteria":"

11 years

","isCritical":false}]}],"frequency":0,"subjects":["AAHL","AASL","AIHL","AISL","ecolint-y11-hl"],"themes":[864,870,871,873,874],"classId":810,"instanceId":1462},"courseCode":null,"skill":null},{"id":168,"unitId":30,"order":42,"text":"","section":"Paper 2 Problems","timestamp":null,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":null,"createdAt":"2025-04-08T21:38:52.727Z","updatedAt":"2025-04-09T03:28:15.476Z","instance":null,"courseCode":null,"skill":null},{"id":195,"unitId":30,"order":44,"text":"","section":null,"timestamp":6570,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":1687,"createdAt":"2025-04-08T22:51:54.278Z","updatedAt":"2025-04-11T01:56:41.539Z","instance":null,"courseCode":null,"skill":null},{"id":196,"unitId":30,"order":45,"text":"","section":null,"timestamp":6976,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":682,"createdAt":"2025-04-08T22:52:30.882Z","updatedAt":"2025-04-11T02:00:34.304Z","instance":null,"courseCode":null,"skill":null},{"id":197,"unitId":30,"order":46,"text":"

That's it! We've covered all there is to know about sequences & series. If you want more practice, there are more problems right here.

Thank you for joining, and we hope learned a lot :)

","section":null,"timestamp":7918,"skillId":null,"skillName":null,"skillText":null,"skillCode":null,"instanceId":null,"createdAt":"2025-04-09T03:28:15.304Z","updatedAt":"2025-04-11T02:01:42.053Z","instance":null,"courseCode":null,"skill":null}],"videoId":"DI2cudLIWEk","videoStart":null,"videoEnd":null,"attempts":[],"sessionStartedAt":1744203600000,"data-sentry-element":"SessionRecording","data-sentry-component":"SessionRecordingPage","data-sentry-source-file":"page.tsx"}]