When line PQ bisects angle APQ, it divides the angle into two equal parts, meaning the measure of angle APQ is split into two angles of equal measure. Geometrically, this results in the two angles formed (let's call them ∠APQ and ∠PQR) being congruent. Visually, if you were to draw a line from point P to point Q, it would create two angles on either side of line PQ that are identical in size. This property is fundamental in various geometric constructions and proofs.
a line
a line or straight angle
A line that makes a right angle
A straight line passing through the point at which the angle is located.
A straight horizontal line intersected by a straight vertical line.
a line
a line or straight angle
A line that makes a right angle
Climbing at an angle, like the side of a mountain.
A straight line passing through the point at which the angle is located.
Like __/ or \__. (in between a straight line and a right angle (perpendicular lines)
A straight horizontal line intersected by a straight vertical line.
It's a reflex angle and nearly looks like but not quite a straight line
A straight line of 180 degrees
A 45-degree angle looks like half of a 90-degree angle. It looks exactly like one straight line with one horizontal line of the bottom, similar to half a square.
Like a right angle with a line joining the 2 ends.
Bigger than 90 (a right angle), less than 180 (a straight line).