Statement - I , `A(0,0),B(1,0)andC(0,2)` are three vertices of the triangle ABC. The equation of external bisector of `angleBAC` is y=-x
Statement - II : `B(1,0)andC(0,2)` are lying on the same side of the line y=-x

A(2, 3, 1), B(-2, 2, 0) and C(0, 1, -1) are the vertices of the triangle ABC. Show that the triangle ABC is right -angled.

The equation of the bisector of the acute angle between the lines 2x-y+4=0 and x-2y=1 is

x+8y-22=0, 5x+2y-34=0, 2x-3y+13=0 are the three sides of a triangle. The area of the triangle is

A(0,0),B(4,2)andC(6,0) are the vertices of the triangle ABC . BD is an altitude of triangle ABC . A line passes through D and parallel with AB meets BC at E . Then the product of the area (in sq. units ) of DeltaABCandDeltaBDE will be -

Statement 1:If the point (2a-5,a^2) is on the same side of the line x+y-3=0 as that of the origin, then a in (2,4) Statement 2: The points (x_1, y_1)a n d(x_2, y_2) lie on the same or opposite sides of the line a x+b y+c=0, as a x_1+b y_1+c and a x_2+b y_2+c have the same or opposite signs. (a) Both the statements are true, and Statement-1 is the correct explanation of Statement 2. (b)Both the statements are true, and Statement-1 is not the correct explanation of Statement 2. (c) Statement 1 is true and Statement 2 is false. (d) Statement 1 is false and Statement 2 is true.

A(0,sqrt(2))andB(2sqrt(2),0) are two vertices of a triangle ABC and AB=BC . If the equation of the side BC be x=2sqrt(2) , then the area of triangle ABC is (in sq . Units )-

In triangle A B C , the equation of the right bisectors of the sides A B and A C are x+y=0 and y-x=0 , respectively. If A-=(5,7) , then find the equation of side B Cdot

x + 8y - 22 = 0 , 5 x + 2y - 34 = 0 , 2x - 3y + 13 = 0 are three sides of a triangle. The area of the triangle is