Thinking Summary · 1
MasteredVisual Logic: 0 of 1 parts shaded.
[Discovery] Shade 2/9 on a fraction bar so we can compare it to 3/8.
1
Active StepWelcome to "Pie Portion Match", a 4th Grade Comparefractions mission at the Explorer (core) level, staged in our bakery scenario. The mission opens with a hands-on prompt: "Shade 2/9 on a fraction bar so we can compare it to 3/8." You'll work with the numbers 2, 9, 3 and arrive at a final answer of 9 across 3 guided steps.
Behind the bakery story, this lesson is really about comparefractions aligned to CCSS 4.NF.A.2. Compare two fractions with different numerators and different denominators by creating common denominators or by comparing to a benchmark fraction. The key strategy this mission asks you to internalise: Compare 16/72 vs 27/72.
A general pattern to watch for in 4th Grade comparefractions — illustrated with example numbers below, which may differ from this lesson's: Comparing denominators only (assuming bigger denom ⇒ bigger fraction). Bigger denominator = SMALLER pieces. 1/8 < 1/4, even though 8 > 4. If you get stuck on "Pie Portion Match", the adaptive Socratic hints below escalate from a gentle nudge to a worked-out strategy — the same way a one-on-one tutor would coach you through it.
Grade 4 · Comparefractions
Mission Progress
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Thinking Summary · 1
MasteredVisual Logic: 0 of 1 parts shaded.
[Discovery] Shade 2/9 on a fraction bar so we can compare it to 3/8.
1
Active StepEverything you need to know about the Socratic experience.
Shade 2/9 on a fraction bar so we can compare it to 3/8. Hint: Cut the bar into 9 equal parts and shade 2.
Compared to 1/2, is 2/9 bigger, smaller, or equal? If you get stuck, the adaptive hint is: Benchmarks make comparison fast.
Explorer missions hit the core abstraction at typical numeric ranges — this is where conceptual mastery is built. Within 4th Grade Comparefractions, expect numbers in the corresponding range.
Cross-multiplying without remembering which side is which. Cross-multiply pairs with their *opposite* denominator. Or just stick with the common-denominator picture.
Addfractions (Adding like fractions uses the same common-denominator move.). Open /grade-4/addfractions to start that topic's missions.
Yes. Every mission, handbook page, and topic hub is mapped to a specific CCSS code (visible in the page header). The curriculum follows the CCSS coherence map: Grade 1 number sense → Grade 3 multiplicative thinking → Grade 6 ratio reasoning, with each grade building strictly on the prior year's foundations.
Socratic teaching answers a question with a better question. Instead of "the answer is 12", the system asks "if you had 3 groups of 4, how could you skip-count?" The goal is to externalize the learner's reasoning so they hear themselves think. Every Inquiry AI hint follows this pattern: nudge → reframe → analogy → only then a worked example, in that order.