Learning Resource Type

Classroom Resource

Cyberchase Games: Equivalent Halves

Subject Area

Mathematics

Grade(s)

3

Overview

Find thirteen ways to show one half by solving this brain teaser from Cyberchase.

    Mathematics (2019) Grade(s): 3

    MA19.3.15

    Explain equivalence and compare fractions by reasoning about their size using visual fraction models and number lines.

    Unpacked Content

    UP:MA19.3.15

    Vocabulary

    • Equivalence
    • Visual fraction model
    • Number line
    • Numerator
    • Denominator
    • Reasoning
    • Conclusions
    • Comparison
    • Point

    Knowledge

    Students know:
    • Fractions with different names can be equal.
    • Two fractions are equivalent if they are the same size, cover the same area, or are at the same point on a number line.
    • Unit fraction counting continues beyond 1 and whole numbers can be written as fractions.
    • Use a variety of area models and length models to show that a whole number can be expressed as a fraction and to show that fractions can be equivalent to whole numbers.
    • Comparing two fractions is only reasonable if they refer to the same whole.
    • The meaning of comparison symbols , = .
    • Reason about the size of a fraction to help compare fractions.
    • Use a variety of area and length models to represent two fractions that are the same size but have different names.
    • Use a fraction model to explain how equivalent fractions can be found.
    • Use a variety of area models and length models to demonstrate that any fraction that has the same nonzero numerator and denominator is equivalent to 1.
    • Use models to show that the numerator of a fraction indicates the number of parts, so if the denominators of two fractions are the same, the fraction with the greater numerator is the greater fraction.
    • Use models to show that the denominator of a fraction indicates the size of equal parts a whole is partitioned into, and that the greater the denominator, the smaller the parts.-Determine when two fractions can not be compared because they do not refer to the same size whole.

    Skills

    Students are able to:
    • Explain equivalence of two fractions using visual models and reasoning about their size.
    • Compare two fractions with same numerators or with same denominators using visual models and reasoning about their size.
    • Express whole numbers as fractions.
    • Identify fractions equivalent to whole numbers.
    • Record comparisons of two fractions using , or = and justify conclusion.
    • Explain that the whole must be the same for the comparing of fractions to be valid.

    Understanding

    Students understand that:
    • A fraction is a quantity which can be illustrated with a length model or an area model.
    • Two fractions can be the same size but have different fraction names.
    • A fraction can be equivalent to a whole number.
    • Any fraction that has the same nonzero numerator and denominator is equivalent to 1.
    • The numerator of a fraction indicates the number of parts, so if the denominators of two fractions are the same, the fraction with the greater number of parts is the greater fraction.
    • The denominator of a fraction indicates the size of equal parts in a whole, so the greater the denominator, the smaller the size of the parts in a whole.
    Link to Resource

    CR Resource Type

    Interactive/Game

    Resource Provider

    PBS
    Accessibility
    License

    License Type

    CUSTOM
    ALSDE LOGO