(a) In the figure (1) given below, prove that (i) CF> AF (ii) DC>DF.
(b) In the figure (2) given below, AB = AC.
Prove that AB > CD.
(c) In the figure (3) given below, AC = CD. Prove that BC < CD.
Solution:
More Solutions:
- Then the length of PQ is
- The two triangles are
- Two sides of a triangle are of lenghts 5 cm and 1.5 cm.
- If a, b, c are the lengths of the sides of a trianlge
- In ∆PQR, if ∠R> ∠Q, then
- If triangle ABC is obtuse angled and ∠C.
- Then the length of the third side is
- Give reasons for your answer.
- AP= BQ = CR and ∠PQR = 90°. Prove that
- Prove that ∠ADB = ∠BCA.