Yes
True, ABC is congruent to PQR by the transitive property.
The transitive property is if angle A is congruent to angle B and angle B is congruent to angle C, then angle A is congruent to angle C.
If A is congruent to B and B is congruent to C then A is congruent to C.
false
Congruence is basically the same as equality, just in a different form. Reflexive Property of Congruence: AB =~ AB Symmetric Property of Congruence: angle P =~ angle Q, then angle Q =~ angle P Transitive Property of Congruence: If A =~ B and B =~ C, then A =~ C
transitive property of congruence
Transitive PropertyThat's called the transitive property.
substitution property transitive property subtraction property addition property
No, it does not.
Transitive Property of Similarity
True, ABC is congruent to PQR by the transitive property.
The transitive property of motion states that if object A is moving with respect to object B, and object B is moving with respect to object C, then object A is also moving with respect to object C. This property can be used to describe the motion of objects in a reference frame.
The transitive property is if angle A is congruent to angle B and angle B is congruent to angle C, then angle A is congruent to angle C.
by the transitive property
it can't
The transitive property holds for similar figures.
transitive