C Curriculum Explorer
Mathematics·Ratio & Proportion·conceptual

Ratio Notation and Relationships

Understand that a multiplicative relationship between two quantities can be expressed as a ratio; use ratio notation; simplify ratios

Suggested ages 12–14

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Evidence of understanding

  • Explain why 'for every 2 red beads there are 5 blue beads' can be written as 2:5 or as 2/5 of the blue count
  • Identify the multiplicative relationship in a table of values (e.g. y is always 3 times x)
  • Connect the ratio a:b to the fraction a/b and to the linear function y = (a/b)x

Assessment prompt

Can Ratio Notation and Relationships explain why a ratio like 3:4 is really the same as the fraction ¾ — and show how that relationship connects to a straight-line graph through the origin?

Standards alignment

7.RP.2US · ccss-math

Recognize and represent proportional relationships

Common Core State Standards for Mathematics · 7

7.RP.2aUS · ccss-math

Decide whether two quantities are in a proportional relationship

Common Core State Standards for Mathematics · 7

7.RP.2cUS · ccss-math

Represent proportional relationships by equations

Common Core State Standards for Mathematics · 7

KS3.Maths.Ratio.6GB · uk-nc-2013

Multiplicative Relationships

The national curriculum in England: Key stages 1 and 2 framework document · Key Stage 3

KS3.Maths.Ratio.7GB · uk-nc-2013

Relate Ratios to Fractions and Functions

The national curriculum in England: Key stages 1 and 2 framework document · Key Stage 3