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(1 pt) If y=e5t is a solution to the differential equationd2ydt2−11dydt+ky=0,find the value of the constant k and the general solution to this equation.k= y= (Use constants A, B, etc., for any constants in your solution formula.)

Respuesta :

Answer:

[tex]y = A e^{5t} + B e^{6t}[/tex]

Step-by-step explanation:

given,

[tex]y = e^{5t}[/tex]

and equation

y" - 11 y' + k y = 0...............(1)

now,

[tex]y' = 5 e^{5t}[/tex]

[tex]y"= 25 e^{5t}[/tex]

Putting value in equation (1)

[tex]25 e^{5t} - 11(5 e^{5t}) + k e^{5t} = 0[/tex]

[tex]- 30 + k = 0[/tex]

k = 30

now, differential equation becomes

y" - 11 y' +30 y = 0

( D² - 11 D + 30) y = 0

writing Auxiliary equation'

m² - 11 m + 30 = 0

(m - 5)(m-6) = 0

m = 5,6

now,

[tex]y = A e^{5t} + B e^{6t}[/tex]

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