The slope of the tangent at any point (, ) on a curve is , . If , then a value of is:
- A
- B
- C
- D
The slope of the tangent at any point (, ) on a curve is , . If , then a value of is:
Correct answer:A
Standard Method
Given:
Find: A value of .
Use the substitution , so
Substituting into the differential equation,
which simplifies to
Separation and Evaluation
Rearranging,
Hence,
Integrating both sides,
So,
which gives
Back-substitution and Final Value
Now substitute back :
Therefore,
Using and ,
So the curve satisfies
At ,
Therefore, a value of is . The correct option is A.
Taking the substitution as instead of . This changes the derivative relation and leads to a different separable equation. Use the homogeneous-form substitution consistent with the ratio .
Forgetting that when . Writing only ignores the product rule and makes the differential equation incorrect.
Making an error while integrating . The derivative of is , so the integral becomes , not .
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