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Question

For a point P in the plane, let d1(p) be the distance of the point P from the lines xy=0 and x+y=0 respectively. The area of the region R consisting of all points P lying in the first quadrant of the plane and satisfying
2d1(P)+d2(P)4, is ___

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Solution

Let the point P be (x,y)
Then d1(P)=xy2 and d2(P)=x+y2
For P lying in first quadrant x>0,y>0.
Also 2d1(P)+d2(p)42xy2+x+y24If x>y, then 2xy+x+y24or 2x22If x<y, then2yx+x+y24 or 2y22
The required region is the shaded region in the figure given below.


Required area =(22)2(2)2=82=6 sq units.

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