Question
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 _________.
- Equal
- Not equal
- Congruent
- Adjacent
The correct answer is: Congruent
As two angles and one side are congruent, then by ASA theorem, both the triangles are congruent to each other.
Related Questions to study
Identify the type of postulate in the given diagram.
![Diagram
Description automatically generated](data:image/png;base64,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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.
Identify the congruence in the given figure.
![A picture containing wire, line
Description automatically generated](data:image/png;base64,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)
Identify the congruence in the given figure.
![A picture containing wire, line
Description automatically generated](data:image/png;base64,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)
Identify the type of congruence in the given figure.
![A picture containing antenna
Description automatically generated](data:image/png;base64,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)
Identify the type of congruence in the given figure.
![A picture containing antenna
Description automatically generated](data:image/png;base64,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)
Identify the type of congruence in the given figure.
![Diagram
Description automatically generated](data:image/png;base64,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)
Identify the type of congruence in the given figure.
![Diagram
Description automatically generated](data:image/png;base64,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)
Identify the type of congruence in the given figure.
![A picture containing antenna
Description automatically generated](data:image/png;base64,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)
Identify the type of congruence in the given figure.
![A picture containing antenna
Description automatically generated](data:image/png;base64,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)
Identify the type of congruence in the given figure.
![Chart, shape
Description automatically 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)
Identify the type of congruence in the given figure.
![Chart, shape
Description automatically 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)
In the given figure, if
. Then the triangle’s congruence satisfies under __________.
![Shape, polygon
Description automatically generated](data:image/png;base64,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)
In the given figure, if
. Then the triangle’s congruence satisfies under __________.
![Shape, polygon
Description automatically 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)
In the given figure, the congruent sides are ________________.
![Diagram
Description automatically 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)
In the given figure, the congruent sides are ________________.
![Diagram
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)
ASA = __________.
If any two angles and the side included between the angles of one triangle are equivalent to the corresponding two angles and side included between the angles of the second triangle, then the two triangles are said to be congruent by ASA rule
ASA = __________.
If any two angles and the side included between the angles of one triangle are equivalent to the corresponding two angles and side included between the angles of the second triangle, then the two triangles are said to be congruent by ASA rule