How to code a function of relative rates

2 Gen 2021
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Aggiornato 2 Gen 2021
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Hello, I have a function
d = sqrt(x^2+y^2)
then
d' = (x.x'+y.y')/sqrt(x^2+y^2)
I tried 2 ways:
1st I do :
syms f(x) f(y)
>> d = sqrt(f(x)^2+f(y)^2)
d =
(f(x)^2 + f(y)^2)^(1/2)
>> diff(d)
ans =
(f(x)*diff(f(x), x))/(f(x)^2 + f(y)^2)^(1/2)
2nd I do
>> diff(d,x,y)
ans =
-(f(x)*f(y)*diff(f(x), x)*diff(f(y), y))/(f(x)^2 + f(y)^2)^(3/2)
but both of the answer are not what I want .
Is there any code lead to the result
(f(x)*diff(f(x), x)+f(y)*diff(f(y), y))/(f(x)^2 + f(y)^2)^(1/2)
What function should i use ?
Thank you !!!

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Matt J
Matt J il 2 Gen 2021
Modificato: Matt J il 2 Gen 2021
but both of the answer are not what I want .
Is it supposed to be clear what answer you do want? The results you've presented seem correct to me.
abc def
abc def il 2 Gen 2021
Is there any code lead to the result
(f(x)*diff(f(x), x)+f(y)*diff(f(y), y))/(f(x)^2 + f(y)^2)^(1/2)

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 Risposta accettata

Walter Roberson
Walter Roberson il 2 Gen 2021
Ran in:

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Ran in:
syms x y f(t)
d = sqrt(f(x)^2+f(y)^2)
d = 
simplify(diff(d,x) + diff(d,y))
ans = 

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abc def
abc def il 2 Gen 2021
Modificato: abc def il 2 Gen 2021
if i have:
d'=(f(x)*diff(f(x), x)+f(y)*diff(f(y), y))/(f(x)^2 + f(y)^2)^(1/2)
d'=-7sqrt(2)
f(x) = f(y) = 4sqrt(2)
diff(f(x), x) = -8
then can i solve diff(f(y), y) ? Like this
in the image the final line y'=-6 , i type it wrong

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