A function satisfies with . Then is equal to:
- A
- B
- C
- D
A function satisfies with . Then is equal to:
Correct answer:A
Standard Method
Given: and .
Find: .
Rewrite the differential equation in linear form:
Using and , we get
This is a linear differential equation with integrating factor
Multiplying throughout by ,
Hence,
Integrating,
Now use the initial condition :
So,
At , the solution concludes that and marks Option A as correct. Therefore, the correct option is A.
Working Shown on the solution
Given: with .
Find: .
The solution rewrites the equation and states the integrating-factor approach. It concludes:
Therefore, the correct answer is , which corresponds to Option A.
Note: The extracted solution steps on the page are internally inconsistent in places, but both displayed approaches explicitly conclude Option A and .
Using incorrectly. The identity is , not . A wrong identity changes the differential equation entirely. Always simplify trigonometric terms first using standard identities.
Treating the equation as directly separable. The equation is first-order linear in after rearrangement. If you separate terms prematurely, the algebra becomes invalid. First rewrite it in the form .
Choosing the integrating factor with the wrong sign. After writing , the integrating factor is based on . Missing the negative sign gives the wrong integrating factor and wrong final expression.
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