Test: Congruence Criteria- SAS And ASA - Class 9 MCQ

8 cm is the answer because DC = EB = 8 cm.

The side BC is congruent to side EF.

2 rectangles having same area may differ in their lengths. So they will not be congruent

In △PQR and △SRQ,

► PQ = SR(Given)
► QR = QR(Common)
► PR = SQ(Given)

By SSS property:
△PQR≅△SRQ
Therefore, ∠PQS =∠PRS

Corresponding sides in congruent triangles are equal.

So AC = PR ,AB = PQ ,BC = QR

Theorem: Angles opposite to equal sides of an isosceles triangle are equal.

The correct option is Option A.

All equilateral triangles have the same angles by the congruence rule (SSS)

So, TTS <—> PQR

In quadrilateral ADBC we have:
► AC = AD
and AB being the bisector of ∠A.

Now, in ΔABC and ΔABD:
► AC = AD     [Given]
► AB = AB     [Common]
► ∠CAB = ∠DAB [∴ AB bisects ∠CAD]

∴ Using SAS criteria, we have
ΔABC ≌ ΔABD.

∴ Corresponding parts of congruent triangles (c.p.c.t) are equal.
∴ BC = BD

Given: △ABC, AB=AC, BD⊥AC and CE⊥AB
Area of triangle = 1/2 × base × height
Area of △ABC = 1/2 × ​AB × CE = 1/2 × ​BD × AC
CE = BD (Since, AB=AC)

As AB = AC so angle ACB = angle(ABC) as angles opposite to equal sides r equal.

In triangle PBC and Triangle QCB we see that:
i) PB = QC (given)
ii) angle(PBC) = (angle)QCB (proved earliar)
iii) BC = BC (common)

So, triangle PBC is congruent to triangle QCB by SAS axiom of congruency.

In Δ PSR and ΔPQR

► PR = PR
► ∠ 1 = ∠ 2 
► ∠ 3 = ∠ 4

Δ PSR ≅ Δ PQR  [ASA]

► PS = PQ   [CPCT]
► QR = RS  [CPCT]

The correct option is Option A

In triangle ABD and FEC:
► AB = FE ( given )
► ∠FEC = ∠ABD ( 90degree)
► BC = DE
CD is common part coming in both triangles.
► BC + CD = CD + DE
► BD = CE
Therefore, triangle ABD is congruent to triangle FEC by SAS rule of congruence.

In geometry, two figures or objects are congruent if they have the same shape and size, or if one has the same shape and size as the mirror image of the other.

The least number of acute angles that a triangle can have is 2.

As we cannot have more than one right angle or obtuse angle, we have only two or three acute angles in a triangle.

Further, if one angle is acute, sum of other two angles is more than 90⁰ and we cannot have two right angles or obtuse angles.