describre how the grapns p={x} and y={x+2} are related
The graphs p={x} and y={x+2} represent two linear equations. The equation p={x} can be described as a straight line passing through all the points where the y-coordinate is equal to the x-coordinate. This means that for every value of x, the graph p={x} will have a point on the line where both the x and y values are the same.
On the other hand, the equation y={x+2} represents a straight line passing through all the points where the y-coordinate is equal to the x-coordinate increased by 2. This means that for every value of x, the graph y={x+2} will have a point on the line where the y value is 2 units greater than the x value.
In terms of their relationship, both graphs are parallel. The graph p={x} would intersect the graph y={x+2} at the point where the x-coordinate is equal to 0 and the y-coordinate is equal to 2. Other than this point, there are no other intersections or common points between the two graphs.