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-rw-r--r--build/website/mathematics/calculus/derivative_identities.pdfbin31247 -> 31245 bytes
-rw-r--r--build/website/mathematics/calculus/source/derivative_identities.ms2
-rw-r--r--website/mathematics/calculus/derivative_identities.pdfbin31247 -> 31245 bytes
-rw-r--r--website/mathematics/calculus/source/derivative_identities.ms2
4 files changed, 2 insertions, 2 deletions
diff --git a/build/website/mathematics/calculus/derivative_identities.pdf b/build/website/mathematics/calculus/derivative_identities.pdf
index 9363ec9..a3f7f9a 100644
--- a/build/website/mathematics/calculus/derivative_identities.pdf
+++ b/build/website/mathematics/calculus/derivative_identities.pdf
Binary files differ
diff --git a/build/website/mathematics/calculus/source/derivative_identities.ms b/build/website/mathematics/calculus/source/derivative_identities.ms
index 4f91fce..bc566ab 100644
--- a/build/website/mathematics/calculus/source/derivative_identities.ms
+++ b/build/website/mathematics/calculus/source/derivative_identities.ms
@@ -111,7 +111,7 @@ derivative definition. Here, we will discuss the power rule, or $x sup n$ for an
integer $n$.
.PP
-If we just plug it into the general form form directly:
+If we just plug it into the general form directly:
.EQ
f'(x) = {{(x + h)} sup {n} - {x} sup {n}} over h
.EN
diff --git a/website/mathematics/calculus/derivative_identities.pdf b/website/mathematics/calculus/derivative_identities.pdf
index 9363ec9..a3f7f9a 100644
--- a/website/mathematics/calculus/derivative_identities.pdf
+++ b/website/mathematics/calculus/derivative_identities.pdf
Binary files differ
diff --git a/website/mathematics/calculus/source/derivative_identities.ms b/website/mathematics/calculus/source/derivative_identities.ms
index 4f91fce..bc566ab 100644
--- a/website/mathematics/calculus/source/derivative_identities.ms
+++ b/website/mathematics/calculus/source/derivative_identities.ms
@@ -111,7 +111,7 @@ derivative definition. Here, we will discuss the power rule, or $x sup n$ for an
integer $n$.
.PP
-If we just plug it into the general form form directly:
+If we just plug it into the general form directly:
.EQ
f'(x) = {{(x + h)} sup {n} - {x} sup {n}} over h
.EN