Math, asked by nandini00001, 10 months ago

help me to solve this ​

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Answered by Anonymous
0

Answer:

hey mate

Step-by-step explanation:

Take a look at the following types of work shifts, common hours, and examples of jobs that use these shifts.

First shift. ...

Second shift. ...

Third shift. ...

Fixed shift. ...

Rotating shift. ...

Split shift. ...

On-call shift. ...

Weekday or weekend shift.n.

Answered by Anonymous
4

{\bold{\huge{\underline{\textbf{\red{Answer}}}}}}

{\bold{Ques. : to \: find \: \frac{dy}{dx}}}

{\bold{\purple{3y=xe^{5y}}}}

differentiating both side with respect to x

{3 \frac{dy}{dx}=xe^{5y} × \frac{dy}{dx} + e^{5y}}

{3 \frac{dy}{dx}-xe^{5y} × \frac{dy}{dx}    = e^{5y}}

{(3- xe^{5y}) \frac{dy}{dx}= e^{5y}}

{\bold{\green{\boxed{\frac{dy}{dx}= \frac{e^{5y}}{3-xe^{5y}}}}}}

{\bold{\purple{xy+y^2 + x^3= 7}}}

differentiating both side with respect to x

{y×1+x  \frac{dy}{dx} }+ 2y \frac{dy}{dx} + 3x^2 = 0

{y + 3x^2 = (-x-2y) \frac{dy}{dx}}

{\bold{\green{\boxed{\frac{dy}{dx}= \frac{y+ 3x^2}{-x-2y}}}}}

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