Use error propagation methods to derive the expression shown below for the uncertainty in 3. 2 2 2 2π AC ²² (²) ² √ (7)² + () ² 43 = 5³ Δζ Hint: Chain rule multiple times. Calculus is your friend. Follow the process and it is very easy! Derive the partial derivative with respect to T, and then you can deduce the partial derivative with respect to C (i.e. you can just give the answer, don't repeat yourself).

Elements Of Electromagnetics
7th Edition
ISBN:9780190698614
Author:Sadiku, Matthew N. O.
Publisher:Sadiku, Matthew N. O.
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Question
3.
Use error propagation methods to derive the expression shown below for the uncertainty in 3.
2π
2
AT
2
²³ (2²7)² (+)² + (0)²
Δζ = =
very
Hint: Chain rule multiple times. Calculus is your friend. Follow the process and it is
easy!
Derive the partial derivative with respect to T, and then you can deduce the partial
derivative with respect to C (i.e. you can just give the answer, don't repeat yourself).
Transcribed Image Text:3. Use error propagation methods to derive the expression shown below for the uncertainty in 3. 2π 2 AT 2 ²³ (2²7)² (+)² + (0)² Δζ = = very Hint: Chain rule multiple times. Calculus is your friend. Follow the process and it is easy! Derive the partial derivative with respect to T, and then you can deduce the partial derivative with respect to C (i.e. you can just give the answer, don't repeat yourself).
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