For what value of k, if any, will

annlanw09y

annlanw09y

Answered question

2022-03-24

For what value of k, if any, will y=ke2x+4cos(3x) be a solution to the differential equation y+9y=26e2x

Answer & Explanation

Cason Singleton

Cason Singleton

Beginner2022-03-25Added 13 answers

The solutions to the differential equation are those that satisfies the equation.
Given: A second order linear differential equation,
y+9y=26e2x
y=ke2x+4cos(3x) is a solution to the above differential equation. Hence, it will satisfy it
y=2ke2x12sin(3x)
y=4ke2x36cos(3x)
y+9y=26e2x
4ke2x36cos(3x)+9(ke2x+4cos(3x))=26e2x
13ke2x=26e2x
Compare both sides we get
13k=26
k=2
Answer: the value of k is 2

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