Understanding Triangle Congruence through Rigid Transformations

They must have the same area.

Their corresponding sides must have the same length.

Their corresponding angles must be equal.

They must have the same perimeter.

A transformation that only changes the angles of a shape

A transformation that preserves the shape and size of a figure

A transformation that changes the size of a shape

A transformation that only changes the position of a shape

Translating the triangle so that one vertex coincides with the corresponding vertex of the other triangle

Scaling the triangle to match the size of the other triangle

Reflecting the triangle over a line

Rotating the triangle around its centroid

Reflection

Rotation

Translation

Scaling

By drawing a straight line from the first point

By measuring the distance from the first point and drawing an arc

By calculating the midpoint of the base

By using a protractor to measure angles

Protractor

Set square

Ruler

Compass

Rotate the triangle again

Translate the triangle further

Reflect the triangle over the line connecting the other two points

Scale the triangle to adjust the size

The point rotates around the bisector

The point coincides with its mirror image

The point remains unchanged

The point moves to a new location

It divides the triangle into two equal parts

It ensures that the third point is equidistant from the other two points

It helps in finding the centroid of the triangle

It helps in calculating the area of the triangle

Rotate the triangle

Translate the triangle

Reflect the triangle over the perpendicular bisector

Scale the triangle