In a `Delta ABC` the bisector of angles `B and C` lie along the lines `x = y and y = 0`. If A is `(1, 2)`, then `sqrt10d(A,BC)` where d (A, BC)represents distance of point A from side BC

Construct a Delta ABC with angle B = 50^(@), angle C = 60^(@) , and sides BC = 7.5 cm.

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) .

ABC is an equilateral triangle whose centroid is origin and base BC is along the line 11x +60y = 122 . Then

In a triangle ABC,vertex angles A,B,C and side BC are given .The area of triangle ABC is

In a triangle ABC, the internal angle bisector of /_ABC meets AC at K. If BC = 2, CK = 1 and BK =(3sqrt2)/2 , then find the length of side AB.

Construct a triangle ABC which angle ABC=75^(@), AB=5" cm"and BC =6.4" cm" . Draw perpendicular bisector of side BC and also the bisector of angle ACB. If these bisector intersect each other at point P, prove that P is equidistant from B and C, and also from AC and BC.

In a triangle, ABC, the equation of the perpendicular bisector of AC is 3x - 2y + 8 = 0 . If the coordinates of the points A and B are (1, -1) & (3, 1) respectively, then the equation of the line BC & the centre of the circum-circle of the triangle ABC will be

The bisectors of the angles B and C of a triangle A B C , meet the opposite sides in D and E respectively. If DE||BC , prove that the triangle is isosceles.

The vertices B, C of a triangle ABC lie on the lines 4y=3x and y=0 respectively and the side BC passes through thepoint P(0, 5) . If ABOC is a rhombus, where O is the origin and the point P is inside the rhombus, then find the coordinates of A'.

In a Delta ABC the equation of the side BC is 2x-y =3 and its circumcentre and orthocentre are (2,4) and (1,2) respectively . Circumradius of Delta ABC is