1.

Determine the order and degree of the following differential equation:\(\cfrac{dy}{dx} =\cfrac{2\, sin\,x+3}{\frac{dy}{dx}}\)dy/dx = (2 sin x + 3)/(dy/dx)

Answer»

The given D.E. is \(\cfrac{dy}{dx} =\cfrac{2\, sin\,x+3}{\frac{dy}{dx}}\)
\(\therefore \) \(\left(\cfrac{dy}{dx}\right)^2\)= 2 sin x + 3

This D.E. has highest order derivative dy/dx with power 2.

∴ the given D.E. is of order 1 and degree 2.



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