A recurring decimal exists when decimal numbers repeat forever. For example, \(0. \dot{3}\) means 0.333333... - the decimal never ends. Dot notation is used with recurring decimals. The dot above the ...

The video starts by explaining the relationship between fractions and decimals, emphasizing that both represent parts of a whole. You’ll learn the basic process of converting a fraction to a decimal ...

1. A fraction cannot have zero as denominator. 2. To simplify a continued fraction always starts from bottom and work upwards. 3. Conversion of a Decimal Fraction into a Vulgar Fraction To convert a ...

Explore decimal fractions to represent and connect fractions and decimals. Represent fractions as parts of a set using the decimal fraction one-tenth (0.1). Practice reading decimals. Explore mixed ...

Dot notation is used with recurring decimals. The dot above the number shows which numbers recur, for example \(0.5\dot{7}\) is equal to 0.5777777... and \(0.\dot{2}\dot{7}\) is equal to 0.27272727 ...