Let C be a curve which is the locus of t...

Let `C` be a curve which is the locus of the point of intersection of lines `x=2+m` and `m y=4-mdot` A circle `s-=(x-2)^2+(y+1)^2=25` intersects the curve `C` at four points: `P ,Q ,R ,a n dS` . If `O` is center of the curve `C ,` then `O P^2+O P^2+O R^2+O S^2` is 50 (b) 100 (c) 25 (d) `(25)/2`

100

25/5

Text Solution

Verified by Experts

The correct Answer is:

`x-2=m`
`y+1=(4)/(m)`
`therefore" "(x-2)(y+1)=4`
`"or "XY=4`
where `X=x-2,Y=y+1`
`S-=(x-2)^(2)+(y+1)^(2)`
= 25 ltBrgt `"or X^(2)+Y^(2)=25`

Curve C and circle S both are concentric. Therefore,
`OP^(2)+OQ^(2)+OR^(2)+OS^(2)=4r^(2)` ltBrgt `=4xx25=100`

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