1. State which pairs of triangles in Fig. 6.34 are similar. Write the similarity criterion used
by you for answering the question and also write the pairs of similar triangles in the symbolic form.
2. In Fig., ∆ODC ~ ∆OBA, ∠BOC = 125° and ∠CDO = 70°. Find ∠DOC, ∠DCO and ∠OAB.
3. Diagonals AC and BD of a trapezium ABCD with AB || DC intersect each other at the point O.
Using a similarity criterion for two triangles, show that
${OA}/{OC}={OB}/{OD}$
4. In Fig., ${QR}/{QS}={QT}/{PR}$ and ∠1 = ∠2. Show that ∆PQS ~ ∆TQR.
5. S and T are points on sides PR and QR of ∆ PQR such that ∠ P = ∠ RTS. Show that ∆RPQ ~ ∆RTS.
6. In Fig., if ∆ ABE ≅ ∆ ACD, show that ∆ADE ~ ∆ABC.
7. In Fig., altitudes AD and CE of ∆ABC intersect each other at the point P.
Show that:
(i) ∆AEP ~ ∆CDP
(ii) ∆ABD ~ ∆CBE
(iii) ∆AEP ~ ∆ADB
(iv) ∆PDC ~ ∆BEC
8. E is a point on the side AD produced of a parallelogram ABCD and BE intersects CD at F.
Show that ∆ABE ~ ∆CFB.
9. In Fig., ABC and AMP are two right triangles, right angled at B and M respectively.
Prove that:
(i) ∆ABC ~ ∆AMP
(ii) ${CA}/{PA}={BC}/{MP}$
10. CD and GH are respectively the bisectors of ∠ACB and ∠EGF such that D and H lie on sides AB
and FE of ∆ABC and ∆EFG respectively. If ∆ABC ~ ∆FEG, show that:
(i) ${CD}/{GH}={AC}/{FG}$
(ii) ∆DCB ~ ∆HGE
(iii) ∆DCA ~ ∆HGF
11. In Fig. , E is a point on side CB produced of an isosceles triangle ABC with AB = AC.
If AD ⊥BC and EF ⊥AC, prove that ∆ABD ~ ∆ECF.
12. Sides AB and BC and median AD of a triangle ABC are respectively proportional to sides PQ and QR and
median PM of ∆PQR (see Fig. 6.41). Show that ∆ABC ~ ∆PQR.
13. D is a point on the side BC of a triangle ABC such that ∠ADC = ∠BAC. Show that CA2 = CB.CD.
14. Sides AB and AC and median AD of a triangle ABC are respectively proportional to sides PQ and
PR and median PM of another triangle PQR. Show that ∆ABC ~ ∆PQR.
15. A vertical pole of length 6 m casts a shadow 4 m long on the ground and at the same time a tower casts
a shadow 28 m long. Find the height of the tower.
16. If AD and PM are medians of triangles ABC and PQR, respectively where ∆ABC ~ ∆PQR,
prove that ${AB}/{PQ}={AD}/{PM}$.
