Assertion (A): The degree of the differential | vedclass

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(D) Step $1$: Analyze the Assertion $(A)$. The given differential equation is $y'' + 2xy' + \log_e\left(\frac{dy}{dx}\right) = 0$.For a differential e

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$(A)$ is false but $(R)$ is true

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(D) Step $1$: Analyze the Assertion $(A)$. The given differential equation is $y'' + 2xy' + \log_e\left(\frac{dy}{dx}\right) = 0$.For a differential equation to have a defined degree,it must be a polynomial in its derivatives. The term $\log_e\left(\frac{dy}{dx}\right)$ makes the equation non-polynomial in terms of the derivative $\frac{dy}{dx}$. Therefore,the degree of this differential equation is not defined.Thus,the Assertion $(A)$ is false.Step $2$: Analyze the Reason $(R)$. The definition provided in the Reason states that the degree is the highest power of the highest order derivative after expressing the equation as a polynomial in differential coefficients. This is the standard mathematical definition of the degree of a differential equation.Thus,the Reason $(R)$ is true.Conclusion: Since $(A)$ is false and $(R)$ is true,the correct option is $(D)$.

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