In Fig 7.23, `AB=AC and AD` is the bisector of ? `BAC.` (i) State three pairs of equal parts in triangles `ADB and ADC.` (ii) Is `DeltaADB [-=~?] DeltaADC` ? Given reasons. (iii) Is `angleB=angleC` ? Given reasons

In fig 7.13, AD=CD and AB=CB. (i) state the three pairs of equal in Delta ABD and DeltaCBD. (iii) Is DeltaABD [-=~?] DeltaCBD ? Why or why not ? (iii) Does BD bisect ? ABC ? Given reasons

In the adjoining figure, DeltaABC is an isosceles triangles in which AB=AC and AD is a median. Prove that : (i) DeltaADB~=DeltaADC (ii) angleBAD=angleCAD

In Fig 7.31, DA _|_ AB, CB _|_ AB and AC = BD . State the three pairs of equal parts in Delta ABC and Delta DAB . Which of the following statements is meaningful? (i) Delta ABC [\_cong?] Delta BAD (ii) Delta ABC [\_cong?] ABD

ABC is an isosceles triangle with AB=AC and D is a point on ABC BC such that AD_|_BC (see figure ). To prove that angleBAD =angleCAD a student proceeded as follows In Delta ABD and Delta ACD ,we have AB=AC " " [" Given"] angleB=angleC " "[because AB=AC ] and " "angleADB= angleADC Therefore " " DeltaABD cong Delta ACD " " ["by AAS congruence rule"] So , " "angleBAD =angleCAD " " [by CPCT] What is the defect in the above argument ?

In the adjoining figure, DeltaABC is an isosceles triangles in which AB=AC and AD is the bisector of angleA . Prove that : (i) DeltaADB~=DeltaADC (ii) angleB=angleC (iii) BD=DC (iv) ADbotBC

In figure, A B|| D C\ a n d\ A B=D Cdot (i)Is DeltaA C D~=DeltaC A B ? (ii)State the three pairs of matching parts used to answer (iii) Which angle is equal to /_C A D\ ? (iv) Does it follow from (iii) that A D || B C ?

In the given figure if angleB= 90^(@) and BD is perpendicular to AC then prove that: (i) triangleADB~triangleBDC (ii) triangleADB~triangleABC (iii) triangleBDC ~ triangleABC (iv) BD^(2)= AD xx DC (v) AB^(2)= AD xx AC (vi) BC^(2)= CD xx AC (vii) AB^(2)+BC^(2)= AC^(2)

In Fig.39, A O=O B and /_A=/_B . (i) Is DeltaA O C~=DeltaB O D ? (ii) State the matching pair you have used, which is not given in the question. (iii) Is it true to say that /_A C O=/_B D O ?

DeltaA B C and DeltaD B C are two isosceles triangles on the same base BC and vertices A and D are on the same side of BC (see Fig. 7.39). If AD is extended to intersect BC at P, show that (i) \ DeltaA B D~=DeltaA C D (ii) DeltaA B P~=DeltaACP (iii) AP bisects ∠ A as well as ∠ D (iv) AP is the perpendicular bisector of BC

In the given figure, ABCDE is a pentagone inscribed in a circle such that AC is a diameter and side BC//AE. If angleBAC =50^(@) , find giving reasons : (i) angleACB (ii) angleEDC (iii) angleBEC Hence prove that BE is also a diameter.