A triangle is formed by the tangents at the point on the curves and , and the line . If is the radius of its circumcircle, then is equal to:
JEE Mathematics 2023 Question with Solution
Answer
Correct answer:10
Step-by-step solution
Standard Method
Given: The triangle is formed by the tangents at to the curves and , and the line .
Find: The value of , where is the circumradius of the triangle.
For , differentiating implicitly:
So,
At , the tangent is
which gives
For , differentiating implicitly:
So,
At , the slope is
Hence the tangent is
The third line is
Now find the vertices of the triangle.
Intersection of and :
so
Thus one vertex is .
Intersection of and :
so
Thus second vertex is .
Intersection of and : Subtracting,
so
and then
Thus third vertex is .
Now the side lengths are:
Area of the triangle using base and height :
Using the circumradius formula
we get
Therefore,
So the required value is .
The solution contains a slope inconsistency, but its final conclusion is correct.
Common mistakes
Using an incorrect derivative for . Differentiating gives , so , not . Use implicit differentiation carefully before substituting the point.
Substituting incorrectly into the tangent slope of . Here , so at the slope is . Do not use a nonzero slope for this tangent.
Finding the triangle vertices without solving the line intersections exactly. The circumradius depends on the actual side lengths, so first compute all three intersection points correctly and then apply the formula .
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