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The tangent to the rectangular hyperbola xy = c² at a point P cuts the x-axis at T and the y-axis at T'. The normal at P cuts the x-axis at N and the y-axis at N'. Let the areas of triangles PNT and PN'T' be D and D'. Find 1/D + 1/D'.
- equal to a constant independent of P (depends only on c)
- depends on the parameter t of P
- equal to 1 regardless of c
- equal to 2 regardless of c
Correct answer: depends on the parameter t of P
Solution
Working out the intercepts and areas shows 1/D + 1/D' retains dependence on the parameter t of P, so it is not a universal constant.
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