TutorChase logo
OCR GCSE Maths (Higher) Study Notes

1.5.1 Quantitative Ordering

Quantitative ordering is an essential skill in mathematics, enabling students to arrange numbers and expressions based on their magnitude. This involves a deep understanding of various symbols like =, ≠, >, <, ≥, and ≤, which are fundamental in comparing and ordering quantities.

Introduction to Symbols

Understanding the symbols used in quantitative ordering is crucial for accurately comparing and ordering different quantities:

  • Equals (=): Indicates equality between two quantities.
  • Not equal (≠): Shows that two quantities are different.
  • Greater than (>): Indicates the left quantity is larger.
  • Less than (<): Indicates the left quantity is smaller.
  • Greater than or equal to (≥): The left quantity is larger or equal.
  • Less than or equal to (≤): The left quantity is smaller or equal.

Number Line Concept

A number line is a visual tool that helps in comparing and ordering numbers. It's a straight line with numbers placed at intervals, where each position corresponds to a particular value. The further right a number is, the greater its value.

Number line

Image courtesy of Cuemath

Ordering Whole Numbers

ordering numbers

To order whole numbers:

1. Compare their highest place value.

2. If equal, compare the next highest place value, and so on.

3. Arrange based on the comparison.

Example: Ordering Numbers

Order the numbers 215, 219, and 203.

Solution:

1. All numbers have "2" in the hundreds place.

2. Compare the tens place: 1 (in 215), 1 (in 219), 0 (in 203).

3. Order: 203, 215, 219.

Negative Numbers

Negative numbers are always less than positive numbers. On a number line, moving left indicates decreasing value.

Example: Comparing Negatives

Which is larger: -8 or -3?

Solution:

Since -3 is closer to zero than -8, -3 is larger than -8.

Fractions and Decimals

Ordering fractions and decimals involves converting them to a common format.

Ordering Fractions

Convert fractions to decimals or find a common denominator.

Ordering fractions

Image courtesy of All Math

Example: Ordering Fractions

Order 12,34,\frac{1}{2}, \frac{3}{4}, and 23\frac{2}{3}.

Solution:

1. Convert to decimals: 0.5, 0.75, 0.66.

2. Order: 12\frac{1}{2} (0.5), 23\frac{2}{3} (0.66), 34\frac{3}{4} (0.75).

Inequalities with Variables

Use inequalities to compare and order algebraic expressions by solving or simplifying them.

Example: Algebraic Ordering

Order x+2x + 2 and 3x13x - 1 when x=2x = 2.

Solution:

x+2=2+2=4x + 2 = 2 + 2 = 43x1=3(2)1=53x - 1 = 3(2) - 1 = 5

Order: x + 2 &lt; 3x - 1

Exercises

1. Whole Numbers

Order: 432, 423, 342.

Solution:

1. Compare hundreds places.

2. Compare tens place if necessary.

3. Compare units place if necessary.

4. Order: 342, 423, 432

2. Negative Numbers

Compare: -10 and -20.

Solution:

-10 is greater than -20 because it is closer to zero on the number line.

3. Fractions

Order: 45,34,\frac{4}{5}, \frac{3}{4}, and 56\frac{5}{6}.

Solution:

1. Convert each to decimals or find a common denominator.

2. Compare the results.

3. Order: 34\frac{3}{4}, 45\frac{4}{5}, and 56\frac{5}{6}

Hire a tutor

Please fill out the form and we'll find a tutor for you.

1/2
About yourself
Alternatively contact us via
WhatsApp, Phone Call, or Email