Question
If ∆ ABC and ∆ DBC are on the same base BC, AB = DC and AC= DB, then __________gives a congruence relationship.
Hint:
The S.S.S. criterion stands for the postulate of side-by-side congruence.
Statement: If all three sides of one triangle are equal to the three equal sides of another triangle, the two triangles are congruent according to the same criterion
The correct answer is: ![increment space A B C space approximately equal to space increment space D C B](data:image/png;base64,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)
Related Questions to study
If ∆ ABC ≅ ∆ PQR, then any ∠B correspond to
If ∆ ABC ≅ ∆ PQR, then any ∠B correspond to
The symbol of correspondence is
The double-sided arrow symbol is used to denote correspondence.
The symbol of correspondence is
The double-sided arrow symbol is used to denote correspondence.
In SAS congruency
In SAS congruence, triangles are congruent if any pair of corresponding sides and their included angles are equal in both triangles.
In SAS congruency
In SAS congruence, triangles are congruent if any pair of corresponding sides and their included angles are equal in both triangles.
In the given figure, if ,
then ___________.
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Description automatically generated](data:image/png;base64,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)
In the given figure, if ,
then ___________.
![A picture containing text, antenna
Description automatically 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)
Two sides and the included angle are congruent in __________ postulate.
SAS congruence is the term which is also known as Side Angle Side congruence. In this, triangles are congruent if any pair of corresponding sides and their included angles are equal in both triangles.
Two sides and the included angle are congruent in __________ postulate.
SAS congruence is the term which is also known as Side Angle Side congruence. In this, triangles are congruent if any pair of corresponding sides and their included angles are equal in both triangles.
Identify the postulate in the given figure.
![A picture containing antenna, gauge
Description automatically 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)
Identify the postulate in the given figure.
![A picture containing antenna, gauge
Description automatically 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)
If two angles and a non-included side of one triangle are congruent to two angles and the corresponding non-included side of a second triangle, then the two triangles are _________.
If two angles and a non-included side of one triangle are congruent to two angles and the corresponding non-included side of a second triangle, then the two triangles are _________.
Identify the type of postulate in the given diagram.
![Diagram
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)
Identify the type of postulate in the given diagram.
![Diagram
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)
In the given triangle ABC, AB = AC, then the angles are __________.
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)
In the given triangle ABC, AB = AC, then the angles are __________.
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)
If three sides of one triangle is congruent to another triangle, then they satisfy ___________ congruence.
If all three sides of one triangle are equal to the three equal sides of another triangle, the two triangles are congruent according to the same criterion.
If three sides of one triangle is congruent to another triangle, then they satisfy ___________ congruence.
If all three sides of one triangle are equal to the three equal sides of another triangle, the two triangles are congruent according to the same criterion.
If the hypotenuse and one leg of a right triangle are equal to another right triangle, then it is ________.
If the hypotenuse and one leg of a right triangle are equal to another right triangle, then it is ________.
If two angles and the included side of two triangles are equal, then it is __________ congruency.
ASA Congruence rule stands for Angle-Side-Angle. Under this rule, two triangles are said to be congruent if any two angles and the side included between them of one triangle are equal to the corresponding angles and the included side of the other triangle.
If two angles and the included side of two triangles are equal, then it is __________ congruency.
ASA Congruence rule stands for Angle-Side-Angle. Under this rule, two triangles are said to be congruent if any two angles and the side included between them of one triangle are equal to the corresponding angles and the included side of the other triangle.