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AQA 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}

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