diff --git a/site/posts/multivariable-thomas-16.7.html b/site/posts/multivariable-thomas-16.7.html
index 4b6b101..62a08dc 100644
--- a/site/posts/multivariable-thomas-16.7.html
+++ b/site/posts/multivariable-thomas-16.7.html
@@ -4,7 +4,7 @@
     Hello again! We're on the penultimate section in the chapter and in the entire book. In this section, we're covering <i>Stokes' Theorem</i>. Stokes' theorem
     is an application of Green's theorem in 3 dimensions. This is much harder to visualize, but essentially, with Stokes' theorem, we can find the circulation of
     a vector field on a curved surface. The critical idea is that, for a smooth open surface `S` with a smooth boundary curve `C`, the circulation about
-    `C` is the surface integral of the curl over `S`: `int_C F cdot dr = INT INT_k (grad times F) cdot k dA`. This has an interesting consequence:
+    `C` is the surface integral of the curl over `S`: `int_C F cdot dr = int int_k (grad times F) cdot k dA`. This has an interesting consequence:
     the circulation about any two open surfaces with the same boundary curve is the same.
 </p>
 <p>
diff --git a/site/posts/multivariable-thomas-16.8.html b/site/posts/multivariable-thomas-16.8.html
new file mode 100644
index 0000000..6fa4526
--- /dev/null
+++ b/site/posts/multivariable-thomas-16.8.html
@@ -0,0 +1,12 @@
+[!]
+[=post-]
+<p>
+    Hello, everybody! This is the very last section in the Thomas textbook, and boy is it a doozy. We're finally applying divergence!
+</p>
+[/]
+[=title "Multivariable Exam 3 Review: Thomas 16.8"]
+[=author "Tyler Clarke"]
+[=date "2025-4-16"]
+[=subject "Calculus"]
+[=unpub]
+[#post.html]
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