Answer:
-5/3
Step-by-step explanation:
Correct. One way to verify that a function is a solution to a differential equation is to check that the function and its derivatives satisfy the differential equation. The differential equation in this problem involves both y
and y′′
.
y=e^−2x + ke^4x y′ =−2e^−2x + 4ke^4x y′′= 4e−2x+16ke^4x
Then y−y′′4=e^−2x+ke^4x−(4e−2x+16ke^4x)4=−3ke^4x
.
If −3ke4=5e4x
, then −3k=5⇒k=−53
.
Therefore, y=e−2x+ke4x
will be a solution to the differential equation if k=−5/3
.