Ch 13 Better Alt Text

chapters/13/1/Percentiles.ipynb

@@ -230,7 +230,7 @@
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",
       "text/plain": [
-       "<Figure size 432x288 with 1 Axes>"
+       "Histogram with 'Midterm' on the x-axis and 'Percent per unit' on the y-axis. There is a bar with height of just about 5 is at 0, then there is a gap between that bar and any other comparatively tall bars until about x=10. from x=10 to x=25 bars have varying heights between about 4 to about 7."
       ]
      },
      "metadata": {},