Consider the triangles with vertices , and , where . If the maximum and the minimum perimeters of such triangles are obtained at and respectively, then is equal to
JEE Mathematics 2023 Question with Solution
Answer
Correct answer:48
Step-by-step solution
Standard Method
Given: The vertices are , and with .
Find: The value of , where gives the maximum perimeter and gives the minimum perimeter.
First write the side lengths:
So the perimeter is
Differentiate with respect to :
For the minimum perimeter, set :
Squaring both sides,
Cross-multiplying,
This simplifies to
Solving,
Hence,
Since , the valid critical point is .
Now check the endpoints for the maximum perimeter:
Since , we get . Therefore the maximum perimeter occurs at .
Now compute:
Therefore, the required value is .
Endpoint and Critical Point Check
Given: The perimeter depends on the moving point on the line segment with .
Find: .
Since only point moves, write the perimeter as the sum of two variable distances and one constant distance:
The minimum must occur at an interior critical point, so solve to get the valid point . Thus .
For the maximum on a closed interval, it is enough to compare endpoint values. At and ,
Because , the larger perimeter occurs at . Hence .
So,
Therefore, the correct answer is .
Common mistakes
Taking the critical point along with is incorrect because the question restricts to the interval . Always discard values outside the allowed domain.
Finding the stationary point and assuming it gives the maximum is incorrect. For a function on a closed interval, the maximum can occur at an endpoint, so and must also be checked.
Comparing and carelessly can lead to error. The common terms and are the same, so the comparison reduces to checking whether or is larger.
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