Q47 | If e^x+e^y=e^(x+y), prove that dy/dx=-e^(y-x).

Visit to my Channel: / gravitycoachinginstitute Visit to my Channel Playlist: / gravitycoachinginstitute ----------------------------------------- Q47: If e^x+e^y=e^(x+y), prove that dy/dx=-e^(y-x). ----------------------------------------- Differentiation(IMPLICIT FUNCTION):- • Differentiation(Implicit Function) Differentiation(CHAIN RULE):- • Differentiation(Chain Rule) Differentiation of Inverse Functions by Substitution:- • Differentiation of Inverse Functions by Su... Differentiation of Logarithmic Function:- • Logarithmic Differentiation Differentiatiation of One Function w. r. t. Another Function:- • Differentiatiation of One Function w. r. t... Differentiation of Parametric Function:- • Differentiation of Parametric Function Second Order Derivatives:- • Second Order Derivatives ---------------------------------- #ImplicitFunctionGCI #implicit #implicitfunction #Derivatives #cbse #cbseboard #class12maths #12Differentiation #Differentiation #Calculus ---------------------------------- Thank you for watching this video Subscribe our channel for Latest Updates

Q47 | If e^x+e^y=e^(x+y), prove that dy/dx=-e^(y-x).

Class 12- Differentiation- If e^x + e^y = e^(x+y) prove that dy\dx+e^(y-x) = 0

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Q48 | If e^x+e^y=e^(x+y), prove that dy/dx=(e^x (e^y-1))/(e^y (e^x-1)).

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Q40 | If e^y (1+x)=1 prove that (d^2 y)/(dx^2)=(dy/dx)^2 | Second Order Derivatives

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#551 If x^y=e^x-y, then show that dy/dx=logx/(1+logx)² || SAQ || Differentiation

If z=f(x y) x=e^u+e^-v y=e^-u-v show Әz/Әu - Әz/Әv = xӘu/Әx - yӘu/Әy PARTIAL DIFFERENTIATION

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