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Derivatives
What are Derivatives
How to Differentiate
Power Rule
Exponentials/Logs
Trig Functions
Sum Rule
Product Rule
Quotient Rule
Chain Rule
Log Differentiation
More Derivatives
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2nd Derivative
Concavity
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Worksheets
Derivatives
Power Rule
Exponentials and Logs
Trigonometric Functions
Sum Rule
Product Rule
Quotient Rule
Chain Rule
All Types
Chain Rule Worksheet
The Chain Rule
Powers
$\frac{d}{dx}[(e^x+9)^{9}]$
(e^x+9)^{9}
(e^x+9)^(9)
=
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Logarithms
$\frac{d}{dx}[\ln{(x^9+5x^5)}]$
\ln{(x^9+5x^5)}
ln(x^9+5x^5)
=
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Trigonometry
$\frac{d}{dx}[\sin{(x^2+4x+2)}]$
\sin{(x^2+4x+2)}
sin(x^2+4x+2)
=
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Exponentials
$\frac{d}{dx}[e^{x^3+x^2-2x}]$
e^{x^3+x^2-2x}
e^(x^3+x^2-2x)
=
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Advanced
Double Chain
$\frac{d}{dx}[\ln{(\sec{(-4x^5+x^2)})}]$
\ln{(\sec{(-4x^5+x^2)})}
ln(sec(-4x^5+x^2))
=
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Product Rule
$\frac{d}{dx}[\cos{((3x^5-5x^3+x^2)\ln{(x)})}]$
\cos{((3x^5-5x^3+x^2)\ln{(x)})}
cos((3x^5-5x^3+x^2)ln(x))
=
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Quotient Rule
$\frac{d}{dx}[\cos{(\frac{(8x+1)}{\ln{(x)}})}]$
\cos{(\frac{(8x+1)}{\ln{(x)}})}
cos((8x+1)/ln(x))
=
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Lightning Round
Easy
$\frac{d}{dx}[(\ln(x))^{2}]$
(\ln(x))^{2}
(ln(x))^(2)
=
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Medium
$\frac{d}{dx}[\cot{(-3x^6-2x-3)}]$
\cot{(-3x^6-2x-3)}
cot(-3x^6-2x-3)
=
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Hard
$\frac{d}{dx}[\sin{(e^{-x^5-2x^3+4})}]$
\sin{(e^{-x^5-2x^3+4})}
sin(e^(-x^5-2x^3+4))
=
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Printable Worksheet
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Related content
Chain Rule Lesson
Product Rule Worksheet
Quotient Rule Worksheet
Chain Rule Video
Chain Rule Explained
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