Let be the solution of the differential equation:
Then is equal to:
- A
- B
- C
- D
Let be the solution of the differential equation:
Then is equal to:
Correct answer:B
Standard Method
Given:
Find:
Use the substitution
so that
Substitute into the differential equation:
which gives
Since , divide by :
Hence
Separate the variables:
Integrating,
so
Therefore,
Now apply the initial condition . Then
So
which gives
Hence
At ,
Using the identity
with , we get
Therefore, , so the correct option is B.
Why the direct rearrangement fails
A tempting but incorrect step is to divide the original equation by and conclude
This is wrong because the equation is
so dividing by gives
not .
The quantity appears inside the sine function, so the natural substitution is
That converts the equation into a separable differential equation in and , which leads directly to the required expression for .
Dividing by incorrectly. From
you must get
not . Keep the sine factor in the denominator.
Not recognizing the homogeneous form. Because the trigonometric term contains , the correct substitution is . Treating it as a linear or directly separable equation in and leads to an incorrect integral.
Differentiating incorrectly. The product rule gives
If the extra term is missed, the transformed differential equation becomes wrong.
Using the wrong trigonometric identity at the end. From
you must use
Do not replace directly by .
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