When parallel lines are cut by a transversal, several angles are formed that have specific relationships. Corresponding angles are equal, alternate interior angles are equal, and consecutive interior angles are supplementary (adding up to 180 degrees). These properties are fundamental in geometry and help in solving problems related to angle measures and relationships in parallel lines.
They are lines that cut through parallel lines
When parallel lines are cut through by a transversal line the alternate angles are equal
The shorter end of each parallel line breaks off and falls to the floor with a soft 'clink'.
They are parallel lines
The line that cuts a parallel line is called a TRANSVERSAL. When you have parallel lines and you want to show like corresponding, vertical, ect.... then the line that cut through the parallel lines is a TRANSVERSAL
When Two parallel lines are cut by the transversal, __________ angles are supplementary
They are lines that cut through parallel lines
When parallel lines are cut through by a transversal line the alternate angles are equal
Then the two lines cut through by transversal line are parallel to each other.
I think it is when there are 2 parallel lines, then the lines which cut both is called transversal.so, the angles which are between one side of the transversal and a parallel line must be called a transversal angles.
The shorter end of each parallel line breaks off and falls to the floor with a soft 'clink'.
If two parallel lines are intersected by a transversal, then the corresponding angles are congruent. This is the transversal postulate. So the answer is the lines would be parallel. This means that the statement is true.
They are parallel lines
Transversal lines cut through or touch parallel lines as for example support sleepers on a rail track or transversal supports on a gate
The line that cuts a parallel line is called a TRANSVERSAL. When you have parallel lines and you want to show like corresponding, vertical, ect.... then the line that cut through the parallel lines is a TRANSVERSAL
If two parallel lines are cut by a transversal, the sum of the measures of the interior angles on the same side of the transversal is 180 degrees. This is due to the properties of parallel lines and the angles formed by the transversal, which create corresponding and consecutive interior angles. Hence, these angles are supplementary.
When non-parallel lines are cut by a transversal, alternate interior angles are not necessarily equal. Instead, the relationship between these angles depends on the specific measures of the angles formed by the transversal and the non-parallel lines. Therefore, unlike the case with parallel lines, alternate interior angles do not have a consistent property of being congruent when the lines are not parallel.