diff --git a/docs/Module2_EssentialsOfPython/Basic_Objects.ipynb b/docs/Module2_EssentialsOfPython/Basic_Objects.ipynb
index 93cddd44..fdf2f054 100644
--- a/docs/Module2_EssentialsOfPython/Basic_Objects.ipynb
+++ b/docs/Module2_EssentialsOfPython/Basic_Objects.ipynb
@@ -128,7 +128,7 @@
     "\n",
     "**Reading Comprehension: Understanding the modulo operator**\n",
     "\n",
-    "The modulo operator, `%`, is not commonly seen in mathematics textbooks. It is, however, a very useful operation to have at our disposal. `x % y` (said as x \"mod\" y in programmer's jargon) returns the *remainder* of `x / y`, when `x` and `y are non-negative numbers. For example: \n",
+    "The modulo operator, `%`, is not commonly seen in mathematics textbooks. It is, however, a very useful operation to have at our disposal. `x % y` (said as x \"mod\" y in programmer's jargon) returns the *remainder* of `x / y`, when `x` and `y` are non-negative numbers. For example:\n",
     "\n",
     "- $\\frac{3}{2} = 1 + \\frac{1}{2}$. 2 \"goes into\" 3 one time, leaving a remainder of 1. Thus `3 % 2` returns `1`\n",
     "- $\\frac{9}{3} = 3$. 3 \"goes into\" 9 three times, and leaves no remainder. Thus `9 % 3` returns `0`\n",