If satisfies the differential equation and then is equal to
- A
- B
- C
- D
If satisfies the differential equation and then is equal to
Correct answer:D
Standard Method
Given: with and .
Find: .
Separate the variables as shown in the solution:
Integrating both sides,
and the right-hand side is given as
Hence,
So,
which gives
Using ,
Now apply :
Therefore,
the solution then states the final result as and marks option D as correct. There is a discrepancy between the intermediate calculation and the stated final option. Using the solution, the correct option is D.
A common mistake is to ignore that the equation is separable and try to integrate both sides without first grouping all -terms with and all -terms with . This mixes variables incorrectly. First rewrite it in separated form before integrating.
While integrating , students may forget the factor of in the substitution . Since , the integral becomes , not just .
Another mistake is substituting the initial condition incorrectly at . Here and , so the equation becomes . Any error here changes the constant and the final result.
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