Saturday, November 16, 2024

Partial derivatives of a function of three variables

 The partial derivative of a function of three variables can be calculated the same way we calculate the partial derivatives of a function of two variables. To calculate the partial derivative with respect to x, we consider y and z constants then we calculate the derivative considering only x as a variable. In general to calculate the partial derivative to one variable, we calculate the derivative with respect the considered variable while we keep the other two variables constant.

Definition








Example


Solution

To  calculate the partial derivative with respect to x using the limit definition, let's start by using the formula                                                                                                                                              




Let's start by calculating f(x + h, y, z):                                                                                                         
Let's substitute f(x+h, y, z) and f(x,y,z) in the formula:                                                                                   


                                                                                                     


Practice                                                                                                                                                     


19 comments:

yashikawebdesigninghouse said...

Partial derivatives are so fascinating! They let us focus on one variable while treating others as constants—perfect for analyzing multivariable functions.
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muskan said...

This explanation about partial derivatives simplifies a complex topic so well! Great for anyone diving into calculus.
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Shinetowine said...

I love how this blog emphasizes treating other variables as constants—it really helps in visualizing partial derivatives.
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gautam said...

Using the limit definition for partial derivatives is such a fundamental approach. Thanks for sharing the formula!
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Bhanu said...

The clarity in the example and solution is impressive. Perfect for students learning this topic!
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Techno worlds said...

The process of substituting
𝑓
(
𝑥
+

,
𝑦
,
𝑧
)
f(x+h,y,z) and
𝑓
(
𝑥
,
𝑦
,
𝑧
)
f(x,y,z) is explained step by step—very beginner-friendly.
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abhay said...

Practice problems are always a great addition. Hands-on exercises cement the concept of partial derivatives.
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aman said...

This explanation reminds me how essential partial derivatives are in physics and engineering—especially for 3D problems.
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Sumit said...

Partial derivatives are like zooming in on a specific variable’s effect while ignoring the rest—so powerful!
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onlinepromotionhouse22@gmail.com said...

The connection between the formula and its application in solving is seamless. Great job!
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Tripti said...

Breaking down 𝑓(𝑥+ℎ,𝑦,𝑧)f(x+h,y,z) step by step makes the limit definition more approachable.
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SHUBHAM said...

This is a perfect refresher on how partial derivatives work with three variables.
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karishma said...

Limit definition for partial derivatives explained this clearly? Kudos to the writer!
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Web designing house said...

Partial derivatives help us understand how a function behaves in each direction. Amazing concept!
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Nishi8171 said...

Substitution in the formula is demonstrated so well! It demystifies the process.
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kajal said...

The blog balances theoretical definitions and practical examples perfectly.
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varshakush said...

I appreciate how this blog makes multivariable calculus feel less intimidating.
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prachi said...

For anyone struggling with partial derivatives, this is a must-read guide.
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Rahul said...

Keeping 𝑦y and 𝑧z constant while working with 𝑥x is such a logical approach.
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