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Question
Show that the product of lengths of perpendicular segments drawn from the foci to any tangent to the hyperbola `x^2/25 + y^2/16 = 1` is equal to 16.
Solution
Equation of the hyperbola is `x^2/25 + y^2/16 = 1`
Here, a2 = 25, b2 = 16
∴ a = 5, b = 4
∴ e = `sqrt(a^2 + b^2)/a = sqrt41/5`
∴ ae = `5(sqrt41/5) = sqrt41`
∴ Foci are S(ae, 0) ≡ S(`sqrt41` , 0) and
and S'(−ae, 0) ≡ S'(− `sqrt41` , 0)
Equation of tangent to the hyperbola with slope m is
y = mx + `sqrt(a^2m^2 − b^2)`
∴ y = mx + `sqrt(25m^2 - 16) = 0` ....(i)
p1 = length of perpendicular segment from the focus S(`sqrt41` , 0) to the tangent (i)
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