Option A: [tex](9,-1)[/tex] is the third vertex
Option B: [tex](6,1)[/tex] is the third vertex.
Explanation:
The two vertices of the right triangle are [tex](9,1)[/tex] and [tex](6,-1)[/tex]
The third vertex of the right triangle can be determined by plotting the points in the graph.
Option A: [tex](9,-1)[/tex]
By plotting the points [tex](9,1)[/tex], [tex](6,-1)[/tex] and the third vertex [tex](9,-1)[/tex] in the graph, the the hypotenuse of the triangle passes through the vertices [tex](9,1)[/tex] and [tex](6,-1)[/tex]
The legs of the triangle passes through the vertices [tex](9,1)[/tex], [tex](9,-1)[/tex] and [tex](6,-1)[/tex], [tex](9,-1)[/tex]
Hence, the third vertex [tex](9,-1)[/tex] forms a right triangle.
Therefore, Option A is the correct answer.
Option B: [tex](6,1)[/tex]
By plotting the points [tex](9,1)[/tex], [tex](6,-1)[/tex] and the third vertex [tex](6,1)[/tex] in the graph, the hypotenuse of the triangle passes through the vertices [tex](9,1)[/tex] and [tex](6,-1)[/tex]
The legs of the triangle passes through the vertices [tex](9,1)[/tex], [tex](6,1)[/tex] and [tex](6,1)[/tex] , [tex](6,-1)[/tex]
Hence, the third vertex [tex](6,1)[/tex] forms a right triangle.
Therefore, Option B is the correct answer.
Option C: [tex](1,-1)[/tex]
By plotting the points [tex](9,1)[/tex], [tex](6,-1)[/tex] and the third vertex [tex](1,-1)[/tex] in the graph, we can see that the three vertices does not make a right angled triangle.
Hence, the third vertex [tex](1,-1)[/tex] does not form a right triangle.
Therefore, Option C is not the correct answer.
Option D: [tex](6,9)[/tex]
By plotting the points [tex](9,1)[/tex], [tex](6,-1)[/tex] and the third vertex [tex](6,9)[/tex] in the graph, we can see that the three vertices does not make a right angled triangle.
Hence, the third vertex [tex](6,9)[/tex] does not form a right triangle.
Therefore, Option D is not the correct answer.
