In mathematics, particularly in geometry, "vertically opposite" refers to pairs of angles that are formed when two lines intersect. These angles are opposite each other and are always equal in measure. For example, if two lines cross, the angles formed at the intersection can be categorized into pairs of vertically opposite angles, which share a common vertex but do not share a common side.
Adding is the opposite of subtracting
To answer a vertically opposite angle question, first identify the intersecting lines forming the angles in question. Vertically opposite angles are the angles that are opposite each other when two lines cross. Since vertically opposite angles are always equal, you can simply state that the angles are equal and provide their measures if known. If specific angle measures are given, set them equal to each other to solve for any unknowns.
180
It is the opposite of Expanding The Brackets
A real-life example of vertically opposite angles can be observed when two roads intersect at a traffic light. When a car approaches the intersection, the angles formed by the crossing roads at the intersection create pairs of vertically opposite angles. For instance, if one angle measures 60 degrees, the angle directly across from it will also measure 60 degrees, illustrating the concept of vertically opposite angles being equal.
Adding is the opposite of subtracting
vertically
The inverse operation is just the opposite operation, for example addition is the inverse of subtraction, and vice verso
Vertically opposite angles are the angles that are opposite each other when two lines cross. Vertical means they share the same vertex.
They are congruent.
Vertically opposite angles. (vert. opp.)
it means lowest common multiple. the opposite to it is hcf or highest common factor ^_^
To answer a vertically opposite angle question, first identify the intersecting lines forming the angles in question. Vertically opposite angles are the angles that are opposite each other when two lines cross. Since vertically opposite angles are always equal, you can simply state that the angles are equal and provide their measures if known. If specific angle measures are given, set them equal to each other to solve for any unknowns.
180
Vertically opposite.
Vertically Opposite Angles.
It is the opposite of Expanding The Brackets