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Question

For points P=(x1,y1) and Q=(x2,y2) of the co-ordinate plane, a new distance d(P,Q) is defined by d(P,Q)=|x1x2|+|y1y2|. Let O=(0,0) and A=(3,2). Prove that the set of points in the first quadrant which are equidistant (with respect to the new distance) from O and A consinsts of the union of a line segment of finite length and an infinite ray. Sketch this set in a labelled diagram.

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Solution

Let P=(h,k) be a general point in the first quadrant such that d(P,A)=d(P,O)|h3|+|k2|=|h|+|k|=h+k..(1)[h and k are + ve, pt (h,k) being in I quadrant.]


If h<3,k<2 then (h,k) lies in region I.If h>3,k<2,(h,k) lies in region II.If h>3,k>2,(h,k) lies in region III.If h<3,k>2,(h,k) lies in region IV.In region I, eq. (1)3h+2k=h+kh+k=52In region II, eq. (1) becomesh3+2k=h+kk=12 ;not possible.In region III, eq. (1) becomesh3+k2=h+k5=0 ;not possible.In region IV, eq. (1) becomes3h+k2=h+kh=1/2
Hence required set consists of line segment x+y=5/2 of finite length as shown in the first region and the ray x=1/2 in the fourth region.


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