In mathematics, the Borel algebra is the smallest σ-algebra on the real numbersR containing the
intervals, and the Borel measure is the measure on this σ-algebra which gives to the interval [a, b] the measure b - a (where a < b).
The Borel measure is not complete, which is why in practice the complete Lebesgue measure is preferred: every Borel measurable set is also Lebesgue measurable, and the measures of the set agree.