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Question

The sum of squares of the length of the perpendiculars drawn from the points (0,1) and (0,1) to any tangent to a curve y=f(x) is 2 units. Then the number of roots of f(x)=0 is

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Solution

Equation of tangent to the curve y=f(x) at (x,y) is
Yy=dydx(Xx)
The length of the perpendicular from (0,1) to the tangent is,
D1=∣ ∣1+xyy1+(y)2∣ ∣
where y=dydx
The length of the perpendicular from (0,1) to the tangent is,
D2=∣ ∣1+xyy1+(y)2∣ ∣

Given, D21+D22=2
2+2x2y2+2y24xyy=2(1+y2)x2y2+y22xyy=y2(dydx)2(x21)2xy(dydx)+y2=0dydx=2xy±4y22(x21)=xy±yx21dyy=(x±1)dxx21

Case 1: Taking positive sign
dyy=dxx1
y=eC1(x1)
Case 2: Taking negative sign
dyy=dxx+1
y=eC2(x+1)
So, f(x)=0 will have two roots i.e., x=1,1

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