Page 442 - Handbook Of Integral Equations
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5 .For g(x)= n A k sin(λ k x), the equation has a solution of the form
◦
k=1
n n
y(x)= B k cos(λ k x)+ C k sin(λ k x),
k=1 k=1
where the constants B k and C k can be found by the method of undetermined coefficients.
k
6 .For g(x) = cos(λx) n A k x , the equation has a solution of the form
◦
k=0
n n
k k
y(x) = cos(λx) B k x + sin(λx) C k x ,
k=0 k=0
where the constants B k and C k can be found by the method of undetermined coefficients.
k
◦
7 .For g(x) = sin(λx) n A k x , the equation has a solution of the form
k=0
n n
k k
y(x) = cos(λx) B k x + sin(λx) C k x ,
k=0 k=0
where the constants B k and C k can be found by the method of undetermined coefficients.
8 .For g(x)= e µx n A k cos(λ k x), the equation has a solution of the form
◦
k=1
n n
y(x)= e µx B k cos(λ k x)+ e µx C k sin(λ k x),
k=1 k=1
where the constants B k and C k can be found by the method of undetermined coefficients.
◦
9 .For g(x)= e µx n A k sin(λ k x), the equation has a solution of the form
k=1
n n
y(x)= e µx B k cos(λ k x)+ e µx C k sin(λ k x),
k=1 k=1
where the constants B k and C k can be found by the method of undetermined coefficients.
◦
10 .For g(x) = cos(λx) n A k exp(µ k x), the equation has a solution of the form
k=1
n n
y(x) = cos(λx) B k exp(µ k x) + sin(λx) C k exp(µ k x),
k=1 k=1
where the constants B k and C k can be found by the method of undetermined coefficients.
11 .For g(x) = sin(λx) n A k exp(µ k x), the equation has a solution of the form
◦
k=1
n n
y(x) = cos(λx) B k exp(µ k x) + sin(λx) C k exp(µ k x),
k=1 k=1
where the constants B k and C k can be found by the method of undetermined coefficients.
© 1998 by CRC Press LLC
© 1998 by CRC Press LLC
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