Let ABC be a triangle with vertices `A -=(6,,2sqrt3+1))),B-=(4,2)and C-=(8,2)`. Let R be the region consisting of all those points P inside `DeltaABC` which satisfyd`(P, BC) >= max{d(P,AB);d(P,AC)}`, where d(P, L) denotes the distance of the point from the line L, then

Let ABC be a triangle with vertices A-=(6,2sqrt(3)+1)) ) B-=(4,2) and C-=(8,2). Let R be the region consisting of all those points P inside Delta ABC which satisfyd (P,BC)>=max{d(P,AB);d(P,AC)}, where d(P,L) denotes the distance of the point from the line L,then

Let O(0, 0), A(2,0) and B(1,(1)/(sqrt(3))) be the vertices of a triangle. Let R be the region consisting of all those points P inside Delta OAB satisfying. d(P,OA) lr min {d(P,OB), d(P,AB)} , where d denotes the distance from the point P to the corresponding line. Let M be peak of region R. The perimeter of region R is equal to

Let O(0,0),A(2,0),a n dB(1 1/(sqrt(3))) be the vertices of a triangle. Let R be the region consisting of all those points P inside O A B which satisfy d(P , O A)lt=min[d(p ,O B),d(P ,A B)] , where d denotes the distance from the point to the corresponding line. Sketch the region R and find its area.

Let O(0,0),A(2,0),a n dB(1, 1/(sqrt(3))) be the vertices of a triangle. Let R be the region consisting of all those points P inside O A B which satisfy d(P , O A)lt=min[d(P, O B),d(P,A B)] , where d denotes the distance from the point to the corresponding line. Sketch the region R and find its area.

Let O(0,0),A(2,0),a n dB(1 1/(sqrt(3))) be the vertices of a triangle. Let R be the region consisting of all those points P inside O A B which satisfy d(P , O A)lt=min[d(p ,O B),d(P ,A B)] , where d denotes the distance from the point to the corresponding line. Sketch the region R and find its area.

Let O(0,0),A(2,0),a n dB(1 1/(sqrt(3))) be the vertices of a triangle. Let R be the region consisting of all those points P inside O A B which satisfy d(P , O A)lt=min[d(p ,O B),d(P ,A B)] , where d denotes the distance from the point to the corresponding line. Sketch the region R and find its area.

Let O(0.0),A(6,0) and B(3,sqrt3) be the vertices of triangle OAB. Let R those points P inside triangle OAB which satisfy d(P, OA) minimum (d(P,OB),d(P,AB) where d(P, OA), d(P, OB) and d(P, AB) represent the distance of P from the sides OA, OB and AFB respectively. If the area of region R is 9 (a -sqrtb) where a and b are coprime, then find the value of (a+ b)

A(3, 4),B(0,0) and c(3,0) are vertices of DeltaABC. If 'P' is the point inside the DeltaABC, such that d(P, BC)le min. {d(P, AB), d (P, AC)}. Then the maximum of d (P, BC) is.(where d(P, BC) represent distance between P and BC).

A(3, 4),B(0,0) and c(3,0) are vertices of DeltaABC. If 'P' is the point inside the DeltaABC , such that d(P, BC)le min. {d(P, AB), d (P, AC)} . Then the maximum of d (P, BC) is.(where d(P, BC) represent distance between P and BC) .