In the given figure A, B, C and D are collinear points. If AC = 3 cm, BD = 4 cm andBC = 2 cm, then AD is

In the given figure, ∆ABC has points D and F in AC andpoint E in BC such that DE ∥ AB and EF ∥ BD. If CF = 4 cmand AC = 9 cm, what is the length of DC?

D and E are points on the sides AB and AC respectively of a . If AB = 10.8 cm, AD = 6.3 cm, AC = 9.6cm, and EC = 4 cm. Determine whether or not.[2]△ABCDE∥BC

In the figure, ABC is a right  and right angle at B. AD & CE arethe two medians drawn from A and C respectively. If AC = 5 cmand AD  3 5 cm.2 Then the length of CE will be(A) 4 5 cm (B) 2 5 cm(C) 3 5 cm2 (D) 6 5 cm

Consider TUV in the figure below.The perpendicular bisectors of its sides are AD, BD, and CD. They meet at a single point D.(In other words, D is the circumcenter of TUV.)Suppose =CD54, =UV148, and =UD90.Find BV, VD, and TC.Note that the figure is not drawn to scale.

Question No 48.In right ΔABC, where ∠C is the right angle, point D lies on side AB, and point E lies on side BC such that AC = CD, DE = EB, and the ratio AC : DE = 4 : 3. What is the ratio AD : DB?