Show that x(t)=sum_(n=0)^(oo) ((-1)^n (t/2)^(2n))/((n!)^2) is the solution of x ** x=int_0^t x(u)x(t−u)du=sin t

kasibug1v

kasibug1v

Answered question

2022-09-06

Prove that some function is the solution of some equation
Show that
x ( t ) = n = 0 ( 1 ) n ( t / 2 ) 2 n ( n ! ) 2
is the solution of
x x = 0 t x ( u ) x ( t u ) d u = sin t

Answer & Explanation

Jordan Owen

Jordan Owen

Beginner2022-09-07Added 7 answers

L t λ { 0 t x ( u ) x ( t u )   d u } = L t λ { sin t }
( X ( λ ) ) 2 = 1 λ 2 + 1
X ( λ ) = ± 1 λ 2 + 1
x ( t ) = L λ t 1 { ± 1 λ 2 + 1 } = L λ t 1 { ± 1 λ 1 + 1 λ 2 } = L λ t 1 { ± 1 λ n = 0 ( 1 ) n ( 2 n ) ! 4 n ( n ! ) 2 λ 2 n } = L λ t 1 { ± n = 0 ( 1 ) n ( 2 n ) ! 4 n ( n ! ) 2 λ 2 n + 1 } = ± n = 0 ( 1 ) n t 2 n 4 n ( n ! ) 2
x ( t ) = n = 0 ( 1 ) n t 2 n 4 n ( n ! ) 2 is one of the solutions.

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