diff --git a/source/content/posts/Measure Theory Introduction.md b/source/content/posts/Measure Theory Introduction.md index 35f5f4e..a47e9c9 100644 --- a/source/content/posts/Measure Theory Introduction.md +++ b/source/content/posts/Measure Theory Introduction.md @@ -22,7 +22,7 @@ These questions all relate to the idea of measuring the size of sets. While we c To develop a consistent way of measuring, we start by thinking about simple, intuitive cases: -1. **Length of Intervals**: We know that the length of an interval \([a, b]\) on the real line is $b - a$. +1. **Length of Intervals**: We know that the length of an interval $[a, b]$ on the real line is $b - a$. 2. **Area of Rectangles**: We also know that the area of a rectangle with sides of length $a$ and $b$ is $a \times b$. These concepts of length and area are familiar and straightforward, but how can we extend them to more complex or irregular sets?