# For each of the d

It is given that This is equation in the form of (where, p = secx and Q = tanx)

Now, I.F. = Thus, the solution of the given differential equation is given by the relation:

y(I.F.) =    y(secx + tanx) = secx + tanx – x+ C

Therefore, the required general solution of the given differential equation is

y(secx + tanx) = secx + tanx – x+ C.

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