The area of a triangle is 5 square units. Two of its vertices are (2, 1) and (3, -2) and the third vertex lies on y = x + 3, the third vertex is
(72, 132)
Given, area of triangle = 5 sq. units.
Let the third vertex be (x,y).
Area of a triangle formed by (x1,y1), (x2,y2) & (x3,y3)=12|x1(y2−y3)+x2(y3−y1)+x3(y1−y2)|
5=12|2(−2−y)+3(y−1)+3x|5=12|−4−2y+3y−3+3x|
3x+y−7=10 or 3x+y−7=−10
⇒3x+y=17 or 3x+y=−3
Also given that the third vertex lies on y=x+3. It means that the point of intersection of both the lines is the vertex.
Let us now solve y=x+3⇒x−y=−3 −−−(1) and 3x+y=17 −−−(2).
Multiplying (1) by 3, ⇒3x−3y=−9 −−−(3)
(2)−(3)⇒ 3x+y= 17−3x∓3y=∓9––––––––––––––––– 4y=26 y=132.
Substituting this value of y in (1).
x=y−3=132+3=72
∴x=72 and y=132
Now, to solve 3x−3y=−9−−−(3) and 3x+y=−3−−−(4)
(4)−(3)⇒ 3x+y =−3−3x∓3y=∓9––––––––––––––––– 4y=6 y=32.
Substituting this value of y in (1).
x=y−3=32−3=−32
∴x=−32 and y=32.
Vertex are (72,132) & (−32,32)