we have
1) The line passes through
2) The slope is equal to
we know that
If a point lies on the graph of the line, then the point must satisfy the equation of the line
Step 1
Find the equation of the line
we know that
the equation of the line in point-slope form is equal to
we have
substitute in the equation
we will proceed to verify each of the points to determine the solution of the problem
If a point lies on the graph of the line, then the point must satisfy the equation of the line and the equation will be true for the point
Step 2
Point
Substitute the value of x and y in the equation of the line
-------> is true
therefore
the point
lies on the line
Step 3
Point
Substitute the value of x and y in the equation of the line
------> is false
therefore
the point
not lies on the line
Step 4
Point
Substitute the value of x and y in the equation of the line
------> is false
therefore
the point
not lies on the line
Step 5
Point
Substitute the value of x and y in the equation of the line
------> is True
therefore
the point
lies on the line
Step 6
Point
Substitute the value of x and y in the equation of the line
------> is True
therefore
the point
lies on the line
therefore
the answer is
Vera could use the points
the point
the point
the point
using a graphing tool
see the attached figure to better understand the problem