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SAT × IB Guide

SAT Math for IB Students — the gaps your syllabus doesn't cover

If you're studying IB Maths (any of the four courses) and planning to sit the Digital SAT, this page is your shortcut. IB is far more rigorous than the SAT — but there are three specific places you'll still lose marks unless you drill them. Here's exactly what and how.

Applies to the Digital SAT (2024+). Not the old paper SAT.

44
SAT Math questions total
70%
Algebra & Advanced Math — where IB AA students excel
15-20%
Problem-solving & Data — where all IB students find gaps
15%
Geometry & Trigonometry — mostly prior learning

1. IB vs SAT — the philosophy gap

Why the SAT feels weirdly easy in places and awkwardly hard in others.

The SAT Math section assumes students have already mastered middle-school arithmetic — ratios, rates, percentages, unit conversions. The IB syllabus assumes the same, but treats it as Prior Learning and never actively teaches it again. The result: IB students lose easy marks on SAT questions that a well-prepared GCSE student would get in seconds.

Conversely, the SAT rewards structural algebra fluency: recognising that y=a(xh)2+k has vertex (h,k), or that if p(x) has factor (xr) then p(r)=0. IB AA students eat this for breakfast. IB AI students — who lean heavily on their GDC — sometimes forget how to do this manually.

The one-sentence summary: IB AA students should worry about middle-school arithmetic; IB AI students should worry about manual algebra.

2. Content gaps by IB course

The table below is the entire analysis in one view. Bookmark it.

IB Course Assumed as prior learning (self-study) Missing from active syllabus SAT strategy
SL AA
  • Ratios, rates, percentages, unit conversions
  • Basic circle properties, angles, triangle-sum theorems
  • Inference from sample statistics
  • Calculating margin of error
Rigorous algebra foundation. Perfect for SAT Algebra + Advanced Math. Only real weakness: middle-school arithmetic tricks.
SL AI
  • Ratios, rates, percentages, unit conversions
  • Basic circle properties, angles, triangle-sum theorems
  • Margin of error
  • Manual algebraic manipulation of polynomial and rational expressions
  • Completing the square
Highly GDC-dependent. Desmos helps on the SAT, but the "Equivalent Expressions" domain still demands manual algebra practice.
HL AA
  • Ratios, rates, percentages, unit conversions
  • Basic circle properties, angles, triangle-sum theorems
  • Inference from sample statistics
  • Calculating margin of error
Mathematically over-prepared. Watch out for silly percentage/ratio errors — that's where HL AA students most often drop marks.
HL AI
  • Ratios, rates, percentages, unit conversions
  • Basic circle properties, angles, triangle-sum theorems
  • Heavy manual manipulation of algebraic, non-linear, and polynomial expressions
Covers almost all SAT stats (confidence intervals!) but the modelling-heavy syllabus means manual polynomial algebra needs targeted practice.

3. SL AA students — what to drill

You're the best-placed of the four courses. Focus on the small stuff.

Algebra & Advanced Math (70% of SAT)

You're solid here. Skim these to make sure you're fluent in SAT phrasing:

Linear equations & inequalities in context

Word problems where you set up ax+b=c from real-world text. Practise fast translation.

Systems of equations

Two lines, substitution/elimination. SAT variant: "for what value of k do these have no solution?" parallel lines, same slope.

Quadratics & parabolas

Vertex form a(xh)2+k, factored form a(xr1)(xr2), standard form. Know all three and how to convert between them.

Equivalent expressions & polynomials

Factor theorem: if p(r)=0 then (xr) is a factor. Very common SAT question type.

Exponential functions

Growth/decay: y=abt where b>1 growth, 0<b<1 decay. Half-life = when bt=12.

Non-linear systems

Line meets parabola: substitute and solve the quadratic. Discriminant tells you 0, 1 or 2 intersections.

Problem-solving & Data Analysis (your weak spot)

Drill these — they're not in AA active syllabus:

  • Ratios, rates, unit conversions. "A car travels 60 km in 45 minutes. What's its speed in m/s?"
  • Percentages & proportions. "A price rose 20% then fell 20%. Net change?" (Answer: 4%.)
  • One-variable statistics. Reading medians, quartiles and box plots quickly.
  • Two-variable data & evaluating claims. Scatterplots and whether a claim is supported by the data.

Geometry & Trigonometry

  • Lines, angles, triangles — SOHCAHTOA, similar triangles, angle-sum properties
  • Right-triangle trig, circles (area, circumference, arcs, sectors)
  • Area, surface area, volume — cones, spheres, cylinders (formulas given on SAT)

4. SL AI students — what to drill

You need manual algebra practice more than the others. That's the honest truth.

Priority #1 — Manual algebra fluency

The Digital SAT gives you Desmos, but structural questions still need you to see patterns:

  • Given f(x)=x2+6x+9, express as (x+a)2. (Answer: (x+3)2.)
  • If x24x2=?, simplify. (Answer: x+2, for x2.)
  • For what value of c does x28x+c have a double root? (Answer: c=16.)
Warning: Solving these by graphing works but wastes 40+ seconds per question on a timed test. Fluency here is speed, not just correctness.

Priority #2 — Middle-school arithmetic

Same as SL AA — see section 3 above.

What you're strong at (relative to SL AA)

  • Two-variable data & scatterplot modelling — this is your bread and butter
  • Exponential growth/decay word problems — you've done these in units 4-5
  • Real-world statistical reasoning — reading tables, understanding sampling bias

5. HL AA students — what to drill

You are mathematically over-prepared. Don't let that make you complacent.

Every SAT algebra/advanced math topic is well within your comfort zone. Your risk is silly errors on easy questions:

  • Rushed percentage calculations ("15% of 80" without a calculator, in 15 seconds)
  • Unit conversion mistakes (1 km = 1000 m; 1 hour = 60 min = 3600 s)
  • Reading scatterplot axes correctly under time pressure

Do the SL AA drill list above, but focus your time on timed sets of 20 middle-school arithmetic questions — you should aim for 30 seconds each.

Bonus for HL AA: The SAT includes very light margin-of-error / confidence questions. You've done these in HL AA Unit 4 (statistics), but the SAT phrasing can be unfamiliar — do 5-10 official College Board practice questions on this topic.

6. HL AI students — what to drill

Best-prepared for stats. Weakest for polynomial manipulation.

Where HL AI shines

  • Statistics & probability — you've done confidence intervals, chi-squared, correlation and regression. The SAT stats questions will feel easy.
  • Modelling — exponentials, logistic, piecewise. The SAT variants are simpler than what you're used to.
  • Matrices — not on the SAT, but the algebraic thinking transfers.

Priority — manual polynomial algebra

Same as SL AI, but the SAT will push you slightly further with rational expressions:

  • Simplify x25x+6x2. (Factor numerator: (x2)(x3) answer x3.)
  • Combine: 2x+3x+1. (Common denominator x(x+1) 5x+2x(x+1).)
  • Solve: x+1x2=3x+1=3(x2)x=72.

7. The Desmos game-changer

The Digital SAT includes a full graphing Desmos calculator throughout the entire 44-question section.

This is transformational for IB AI students (who are already GDC-fluent) and undersold for IB AA students (who don't drill graphing calculators as heavily). What Desmos does for you on the SAT:

  • Systems of equations — type both equations, read intersection off the graph in 5 seconds.
  • Quadratic vertex & roots — graph the parabola, click the vertex/roots for exact coordinates.
  • Function evaluation — type f(x)=2x23x+1, then evaluate f(5) by typing f(5) directly.
  • Solving equations — graph both sides as separate functions and read the intersection.
Practice tip: Do at least 5 full SAT modules using Desmos, even if you'd prefer to do them by hand. You need muscle memory for typing expressions fast under pressure.

The site student.desmos.com or the Bluebook practice app both give you access to the exact SAT-issue version.

8. A 3-week SAT plan for IB students

Assumes ~5 hours per week alongside your IB studies.

Week 1 — Diagnostic + gap identification

  • Take one full official Bluebook practice test (2h 14min for Math + Reading)
  • Score it and identify your two weakest sub-domains
  • Read the two relevant sub-topic notes above in detail

Week 2 — Targeted drilling

  • 4 × 30-minute drill sets on your weakest sub-domain (10-15 questions each)
  • 2 × 30-minute drill sets on your second-weakest sub-domain
  • 1 × 45-minute Desmos speed session (mixed topics, aim for < 60s per question)

Week 3 — Full-length simulation + review

  • Take another full Bluebook practice test under real timing
  • Score it; compare to Week 1 diagnostic
  • Spend the remaining time reviewing your mistakes: annotate why each mistake happened (setup error, arithmetic slip, misread, ran out of time)
Realistic expectation: IB students who follow this plan typically add 40-80 points to their SAT Math score in 3 weeks. AA HL students starting near 750 often hit 780-800.

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