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# Solution - Find the equation of the locus of the point of intersection of two tangents drawn to the hyperbola x^2/7-y^2/5=1 such that the sum of the cubes of their slopes is 8. - Conics - Locus of Points from Which Two Tangents Are Mutually Perpendicular

ConceptConics Locus of Points from Which Two Tangents Are Mutually Perpendicular

#### Question

Find the equation of the locus of the point of intersection of two tangents drawn to the hyperbola x^2/7-y^2/5=1 such that the sum of the cubes of their slopes is 8.

#### Solution

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#### APPEARS IN

2012-2013 (March)
Question 3.2.1 | 4 marks
Solution for question: Find the equation of the locus of the point of intersection of two tangents drawn to the hyperbola x^2/7-y^2/5=1 such that the sum of the cubes of their slopes is 8. concept: Conics - Locus of Points from Which Two Tangents Are Mutually Perpendicular. For the courses HSC Arts, HSC Science (Computer Science), HSC Science (Electronics), HSC Science (General)
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