What is the general solution of the differential equation? : # (d^2y)/dx^2-dy/dx-2y=4x^2 #
1 Answer
# y = Ae^(-x)+Be^(2x) -2x^2+2x-3#
Explanation:
There are two major steps to solving Second Order DE's of this form:
# (d^2y)/dx^2-dy/dx-2y=4x^2 #
1) Find the Complementary Function (CF)
This means find the general solution of the Homogeneous Equation
# (d^2y)/dx^2-dy/dx-2y=0 #
To do this we look at the Auxiliary Equation, which is the quadratic equation with the coefficients of the derivatives, i.e.
#m^2-m-2=0#
#(m-2)(m+1) = 0#
This has two distinct real solutions,
And so the solution to the DE is;
# y = Ae^(-x)+Be^(2x) # Where#A,B# are arbitrary constants
-+-+-+-+-+-+-+-+-+-+-+-+-+-+
Verification:
If
# y = Ae^(-x)+Be^(2x) # , then
# y' = -Ae^(-x)+2Be^(2x) #
# y'' = Ae^(-x)+4Be^(2x) # And so,
# y''-y'-2y = Ae^(-x)+4Be^(2x) -(-Ae^(-x)+2Be^(2x))-2(Ae^(-x)+Be^(2x)) = 0#
-+-+-+-+-+-+-+-+-+-+-+-+-+-+
2) Find a Particular Integral* (PI)
This means we need to find a specific solution (that is not already part of the solution to the Homogeneous Equation). As the RHS is a quadratic we try a solution of the quadratic form:
# y=ax^2+bx+c #
Where
If
# y'\ = 2ax+b #
# y'' = 2a #
If we substitute into the initial DE we get:
# \ \ 2a - (2ax+b) - 2(ax^2+bx+c)=4x^2 #
# :. 2a - 2ax-b - 2ax^2-2bx-2c = 4x^2 #
Equating Coefficients we have
#Coef(x^2) : -2a=4 \ \ \ \ \ \ \ \ => a=-2#
#Coef(x^1) : -2a-2b=0 => b=2#
#Coef(x^0) : 2a-b-2c=0 \ \ \ \ => c=-3 #
So we have found that a Particular Solution is:
# y = -2x^2+2x-3 #
3) General Solution (GS)
The General Solution to the DE is then:
GS = CF + PI
Hence The General Solution to the initial DE is
# y = Ae^(-x)+Be^(2x) -2x^2+2x-3#
