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Question
If point P(x,y) is such that it moves on a hyperbola ∣∣√(x−3)2+(y−4)2−√x2+y2∣∣=k2+1, then the number of possible integral value(s) of k is
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Solution
In a plane, if A and B are two fixed point and a variable point P is moving such that |PA−PB|=k,k<AB, then it will represent a hyperbola having foci at A,B.
∴ Equation∣∣√(x−3)2+(y−4)2−√x2+y2∣∣=k2+1 represents a hyperbola,
if k2+1<AB where A=(3,4), and B=(0,0)
⇒k2<4
Thus, k can take 3 integral values namely −1,0,1.
∴ Equation∣∣√(x−3)2+(y−4)2−√x2+y2∣∣=k2+1 represents a hyperbola,
if k2+1<AB where A=(3,4), and B=(0,0)
⇒k2<4
Thus, k can take 3 integral values namely −1,0,1.
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