1.The solution of the differential equation dydx=x−y+32(x−y)+5\frac{dy}{dx} = \frac{x-y+3}{2(x-y)+5}dxdy=2(x−y)+5x−y+3 isa.2(x−y)+log(x−y)=x+c2(x - y) + \log(x - y) = x + c2(x−y)+log(x−y)=x+cb.2(x−y)−log(x−y+2)=x+c2(x - y) - \log(x - y + 2) = x + c2(x−y)−log(x−y+2)=x+cc.2(x−y)+log(x−y+2)=x+c2(x - y) + \log(x - y + 2) = x + c2(x−y)+log(x−y+2)=x+cd.None of the aboveLogin to continueOnly logged in users canattempt or see the solution.