Search results
Learn how to use the symbols =, ≠, > and < to compare values and solve problems. See examples, definitions and tips for remembering the meaning and order of the symbols.
Learn how to remember and use the symbols for inequalities, such as >, ≤, ≥, and ≠. See examples, mnemonics, and key tips for working with inequalities in math problems.
Learn how to use the greater than symbol (>) to compare two values and see examples of its application in maths. Find out the meaning, usage and difference of less than symbol (<) and other related symbols.
- Greater than symbol is used when we have to compare two values, in which one value is greater than another value. It is denoted by the symbol ‘>’....
- Less than symbol is used to compare two quantities where one is smaller than the other. It is denoted by the symbol ‘<’. Examples are: 9<10, 9 is...
- The smaller than symbol is, the less than a symbol, used to compare if one value is smaller than the other one. For example, 8 is smaller than 10,...
- In linear inequalities, greater than or equal to the symbol is used when we are uncertain if the one value is greater than or equal to another valu...
- 0.5 is greater than 0.25. Symbolically it is represented as 0.5>0.25.
- We can check either by rationalising the denominator or finding the actual value of ⅗ and ½. By rationalisation, we get; ⅗ x (2/2) and ½ x (5/5)...
In mathematical writing, the greater-than sign is typically placed between two values being compared and signifies that the first number is greater than the second number. Examples of typical usage include 1.5 > 1 and 1 > −2 .
When a number is bigger than or smaller than another number, greater than less than symbols are used. If the first number is greater than the second number, greater than symbol (>) is used. If the first number is less than the second number, less than symbol (<) is used .
- The greater than and less than symbols are generally used to represent the inequality expressions. The symbol used to represent greater than is “>”...
- The different inequality symbols are: Greater than (>) Less than (<) Not equal to (≠) Greater than or equal to (≥) Less than or equal to (≤)
- No, 0.1 is not greater than 1. 0.1 is less than 1, and it is mathematically represented by 0.1 < 1.
- The two general methods used to remember the greater than and less than symbols are: Alligator method L method
- Yes, -0.1 is less than 0.1. The mathematical expression for the given statement is -0.1 < 0.1.
Learn what the greater than symbol (>) means and how to use it in math, coding and other contexts. Download the symbol in various formats, such as data, code point, TeX and SVG.
Learn how to compare numbers using the symbol > and its meaning. See examples, practice problems, and frequently asked questions about greater than sign.