The concept of medians and their relation to midpoints

The concept of congruent triangles

The concept of parallel lines

The concept of angles in a triangle

By subtracting the coordinates and dividing by two

By adding the coordinates and multiplying by two

By averaging the x and y coordinates

By multiplying the coordinates and dividing by two

It is used to calculate the perimeter of a polygon

It helps in determining the angle between two lines

It is used to divide a line segment in a given ratio

It helps in finding the area of a triangle

The ratio of the perimeter to the area of a triangle

The ratio of the angles in a triangle

The ratio of the sides of a triangle

The division of a median into two segments

The order determines the angle between medians

The order affects the calculation of the centroid

The order is irrelevant in the formula

The order determines the length of the median

The coordinates of the centroid are the average of the x and y coordinates of the vertices

The coordinates of the centroid are the sum of the x and y coordinates of the vertices

The coordinates of the centroid are the product of the x and y coordinates of the vertices

The coordinates of the centroid are the difference of the x and y coordinates of the vertices

Medians are perpendicular to each other

Medians are equal in length

Medians are concurrent at the centroid

Medians are always parallel