022. Equivalent Fractions and Simplifying Them
Learning Intentions
- To understand what it means for two fractions to be equivalent
- Simplify fractions by dividing by their highest common factor
Pre-requisite Summary
- Understand that a fraction represents equal parts of a whole
- Know the meaning of numerator and denominator
- Be able to Identify factors of whole numbers
- Understand that multiplying or dividing two numbers by the same non-zero whole number can preserve a relationship
- Be able to Solve the highest common factor of two numbers
- Recognise that fractions can name the same amount in different ways
Worked Examples
Worked Example 1
a) Explain what it means for
b) Decide whether
c) Justify your answer.
Worked Example 2
a) Find two fractions equivalent to
b) Find two fractions equivalent to
Worked Example 3
Simplify each fraction by dividing by the highest common factor:
a)
b)
Worked Example 4
Simplify each fraction by dividing by the highest common factor:
a)
b)
Worked Example 5
a) Decide whether
b) Simplify both fractions.
c) Explain how the simplified forms help.
Worked Example 6
a) Simplify
b) Explain why the simplified fraction is equivalent to the original fraction.
Problems
Problem 1
a) Explain what it means for
b) Decide whether
c) Justify your answer.
Problem 2
a) Find two fractions equivalent to
b) Find two fractions equivalent to
Problem 3
Simplify each fraction by dividing by the highest common factor:
a)
b)
Problem 4
Simplify each fraction by dividing by the highest common factor:
a)
b)
Problem 5
a) Decide whether
b) Simplify both fractions.
c) Explain how the simplified forms help.
Problem 6
a) Simplify
b) Explain why the simplified fraction is equivalent to the original fraction.
Exercises
Understanding and Fluency
Exercise 1.
State whether each pair of fractions is equivalent:
a)
b)
c)
Exercise 2.
State whether each pair of fractions is equivalent:
a)
b)
c)
Exercise 3.
Find two fractions equivalent to each fraction:
a)
b)
c)
Exercise 4.
Find two fractions equivalent to each fraction:
a)
b)
c)
Exercise 5.
Simplify each fraction by dividing by the highest common factor:
a)
b)
c)
Exercise 6.
Simplify each fraction by dividing by the highest common factor:
a)
b)
c)
Exercise 7.
Simplify each fraction by dividing by the highest common factor:
a)
b)
c)
Exercise 8.
Decide whether the fractions are equivalent by simplifying:
a)
b)
c)
Reasoning
Exercise 9.
Explain why multiplying the numerator and denominator of a fraction by the same whole number gives an equivalent fraction.
Exercise 10.
A student says
Exercise 11.
Explain why dividing the numerator and denominator by the highest common factor gives the fraction in simplest form.
Exercise 12.
A student simplifies
Problem-solving
Exercise 13.
A pizza is cut into
Exercise 14.
A ribbon is divided into
Exercise 15.
A class completed
Exercise 16.
On a number line, one point is labelled
Exercise 17.
A rectangle has
Exercise 18.
A fraction is equivalent to
Potential Misunderstandings
- Students may think equivalent fractions must have the same numerator or the same denominator
- Students may change only the numerator or only the denominator when generating equivalent fractions
- Students may not recognise that equivalent fractions represent the same quantity
- Students may simplify by subtracting rather than dividing
- Students may divide the numerator and denominator by different numbers
- Students may stop simplifying before the fraction is in simplest form
- Students may not Use the highest common factor and therefore may simplify only part of the way
- Students may confuse simplifying a fraction with changing its value