Question:
Solution of $\frac{dy}{dx}+y\,\sec\,x=\tan\,x $ is
Solution of $\frac{dy}{dx}+y\,\sec\,x=\tan\,x $ is
Updated On: Jul 7, 2022
- $y = \sec x + \tan x - x + C $
- $y\, (\sec x + \tan x) = \sec x + \tan x - x + C$
- $y\, (\sec x + \tan x) = \sec x + \tan x + x + C $
- none of these
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The Correct Option is B
Solution and Explanation
$\frac{dy}{dx}+y\,sec\,x = tan\,x$.
$P= sec \,x, Q = tan \,x$
$e^{\int Pdx} = e^{log\left(sec\,x+tan\,x\right)}= sec\,x+tan\,x$
$\therefore$ Sol. is
$y \left(sec\,x+tan\,x\right) = \int \left(sec\,x+tan\,x+tan^{2}\,x\right)dx$
$= \int sec\,x\,tan\,xdx+\int sec^{2}\,xdx-\int dx$
$= sec\,x+tan\,x-x+C$
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Concepts Used:
General Solutions to Differential Equations
A relation between involved variables, which satisfy the given differential equation is called its solution. The solution which contains as many arbitrary constants as the order of the differential equation is called the general solution and the solution free from arbitrary constants is called particular solution.
For example,
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