In quadrilateral ACBD, `A C\ =\ A D`and AB bisects `/_A`(see Fig. 7.16). Show that `DeltaA B C~=DeltaA B D`

ABCD is a quadrilateral in which and /_D A B\ =/_C B A (see Fig. 7.17). Prove that (i) DeltaA B D~=DeltaB A C (ii) B D\ =\ A C (iii) /_A B D\ =/_B A C

ABC is a triangle in which altitudes BE and CF to sides AC and AB are equal (see Fig. 7.32). Show that (i) DeltaA B E~=DeltaA C F (ii) A B\ =\ A C , i.e., ABC is an isosceles triangle.

In quadrilateral ACBD,AC=AD and AB bisects /_A. Show that ABC~=ABD .What can you say about BC and BD?

In quadrilateral ACBD,AC=AD and AB bisects angle A.Show that /_ABC~=/_ABD

In right triangle ABC, right-angled at C, M is the mid-point of hypotenuse AB. C is joined to M and produced to a point D such that D M\ =\ C M . Point D is joined to point B (see Fig. 7.23). Show that: (i) DeltaA M C~=DeltaB M D (ii) /_DBC is a right angle (iii) Δ DBC ≅ Δ ACB (iv) CM =1/2 AB

l and m are two parallel lines intersected by another pair of parallel lines p and q (see Fig. 7.19). Show that DeltaA B C~=DeltaC D A .

Two sides AB and BC and median AM of one triangle ABC are respectively equal to side PQ and QR and median PN of DeltaA B C~=DeltaP Q R (see Fig. 7.40). Show that: (i) DeltaA B M~=DeltaP Q N (ii) DeltaA B C~=DeltaP Q R

Line-segment AB is parallel to another line-segment CD. O is the mid-point of AD (see Fig. 7.15). Show that (i) DeltaA O B~=DeltaD O C (ii) O is also the mid-point of BC

In Figure altitudes AD and CE of DABC intersect each other at the point P. Show that:(i) DeltaA E P~ DeltaC D P (ii) DeltaA B D ~DeltaC B E (iii) DeltaA E P~ DeltaA D B (iv) DeltaP D C ~DeltaB E C

ABC is a right triangle right angled at A. BCED, ACFG and ABMN are squares on the sides BC, CA and AB respectively. Line segment A X_|_D E meets BC at Y. Show that: (i) DeltaM B C~=DeltaA B D (ii) a r" "(B Y X D)" "=" "2" "