Triangle congruence is a fundamental concept in geometry, allowing us to determine if two triangles are identical in shape and size based on limited information. The primary postulates include SSS (Side-Side-Side), where all three pairs of sides are equal; SAS (Side-Angle-Side), requiring two sides and the angle between them; ASA (Angle-Side-Angle), involving two angles and the side between them; and AAS (Angle-Angle-Side), where two angles and a non-included side are congruent. These criteria are essential for proofs and solving complex geometric problems without needing to measure every dimension.
رقم الاختبار984
الصفالصف التاسع المتقدم
المادةرياضيات
الفصلالفصل الثالث
السنة الدراسية2025/2026
عدد الأسئلة20
إجمالي النقاط20
تاريخ الإضافة2026-04-23
الزيارات10
المعلم أو الناشرMaya Dayoub
اختر إجابة واحدة لكل سؤال. عند الاختيار ستظهر النتيجة فورًا: الأخضر صحيح، والأحمر خطأ، وسيظهر تفسير الإجابة مباشرة إن كان متوفرًا. وبعد آخر سؤال ستظهر الدرجة النهائية تلقائيًا.
Question 1
Points: 1
Which triangle congruence postulate is shown?
Explanation
The diagram shows two pairs of congruent sides and the included angle, which satisfies the Side-Angle-Side (SAS) postulate.
Question 2
Points: 1
Which triangle congruence postulate is shown?
Explanation
The diagram shows three pairs of corresponding sides marked as congruent, satisfying the Side-Side-Side (SSS) postulate.
Question 3
Points: 1
Which triangle congruence proves triangle ABC congruent triangle XYZ?
Explanation
The markings indicate two sides and a non-included angle (SSA), which is not a valid triangle congruence postulate.
Question 4
Points: 1
Congruent by
Explanation
In addition to the two pairs of marked sides, the vertical angles are congruent, satisfying the Side-Angle-Side (SAS) criteria.
Question 5
Points: 1
Congruent by
Explanation
The diagram shows all three corresponding sides of the triangles are congruent.
Question 6
Points: 1
Congruent by
Explanation
The triangles share vertical angles and have another pair of congruent angles with a congruent side between them, satisfying ASA.
Question 7
Points: 1
Congruent by
Explanation
The two triangles share a common side and have two other pairs of sides marked congruent, satisfying SSS.
Question 8
Points: 1
Congruent by
Explanation
The information provided (two sides and a non-included angle) refers to SSA, which does not guarantee congruence.
Question 9
Points: 1
Are these triangles congruent? If so, state the rule which you used to determine congruence.
Explanation
Based on the markings, there is insufficient evidence to prove congruence under standard postulates.
Question 10
Points: 1
Are these triangles congruent? If so, state the rule which you used to determine congruence.
Explanation
The triangles have two pairs of congruent angles and a non-included side of 12m, satisfying the Angle-Angle-Side (AAS) theorem.
Question 11
Points: 1
What additional information is required to prove the 2 triangles are congruent by SAS
Explanation
According to the provided answer key, this choice is required for the intended congruence proof.
Question 12
Points: 1
What additional information is required to prove the 2 triangles are congruent by ASA
Explanation
With the marked side AB congruent to VB and the vertical angles at B, adding the congruence of angle A and angle V provides ASA.
Question 13
Points: 1
\(\Delta AEB \cong \Delta CED\) by...
Explanation
Based on the answer key, the triangles are congruent by the Angle-Side-Angle (ASA) postulate.
Question 14
Points: 1
Which triangle congruence theorem can be used to prove the triangles are congruent?
Explanation
The triangles have two pairs of congruent angles and the included side between them is also congruent.
Question 15
Points: 1
Which triangle congruence theorem can be used to prove the triangles are congruent?
Explanation
The triangles share a common side and have two pairs of congruent angles, where the side is non-included, satisfying AAS.
Question 16
Points: 1
Which triangle congruence theorem can be used to prove the triangles are congruent?
Explanation
The markings only indicate vertical angles and two sides in an SSA configuration, which is not enough information to prove congruence.
Question 17
Points: 1
Which triangle congruence theorem can be used to prove the triangles are congruent?
Explanation
Both triangles have angles of \(60^\circ\) and \(75^\circ\) with the included side of 5 cm being equal, satisfying ASA.
Question 18
Points: 1
Are these triangles congruent?
Explanation
The triangles have a pair of sides and two pairs of angles (one given and one vertical) that are congruent, matching AAS.
Question 19
Points: 1
Are these triangles congruent?
Explanation
The triangles have two pairs of congruent sides and congruent included angles, satisfying SAS.
Question 20
Points: 1
Are these triangles congruent?
Explanation
According to the analysis in the provided key, these triangles are not proven congruent.
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