Description:- Contents:- Contents # Preface 9| Introduction 13| 1. St. Lines| Triangles|Quadrilaterals 21-93| (a) St. Lines 21| (b) Parallel Lines 25| (c) Triangles 30| (d) Polygons 34| (e) Congruency of Triangles 37| (f) Practical geometry (I) 51| (g) Sides of Triangles 57| (h) Quadrilaterals 64| (i) More theorems-on triangles and quadrilaterals 70| (j) Practical geometry (II) 76| (k) Loci and theorems on Loci 81| (l) Miscellaneous exercise-(m&n) 88| 2. Areas| Proportionality and Pythagoras theorems 94-124| (a) Theorems on Areas 95| (b) Thale's theorem and Bisector theorem 100| (c) Proportionality theorems and Trigonometry 104| (d) Pythagoras theorems 112| (e) Practical geometry - (III) 119| (f) Miscellaneus Exercise (U) 121| 3. Circles and Tangents 125-178| (a) Preliminary theorems 127| (b) Circles and chords 129| PDF created with pdfFactory trial version www.pdffactory.com| (c) Circles and angles 137| (d) Tangency 145| (e) Angle between circles 154| (f) Practical geometry (IV) 154| (g) Miscellaneous exercise (G) 166| (h) Miscellaneous exercise (H) 172| 4. AdvancedTheorems 179-211| (a) Pythagoras theorems as applied to obtuse angled| and acute angled Ds. 179| (b) Intersecting chords and related theorems 185| (c) PracticalGeometry (V) and special examples on Ds| with angles 72°| 72°| 36°. 192| (d) 's Line and nine-point circle. 200| (e) Ptolemy's theorems and related theorems. 207| (f) Ceva's theorem and Morley's theorem 208| 5. Exercise (P) and (Q) 212-219| 6. Hints and Solutions to some Difficult Examples in| theBook. 220-312| About The Book:- This Book On Geometry Reminds Us That Come What May Mathematics Cannot Be Forgotten. Of Course Euclid With His Book 'The Elements' Is The Pioneer Of Geometry. No Less Important Are Contributions Due To Pythagoras And Ptolemy. This Book Contains Several Examples Both Difficult And Somewhat Easy And Their Solutions. Theorem No. 76| And Solution Of Isosceles Triangles With Vertical Angles 36 Degree May Strike Excitement In You.|Content:- Preface 9| Introduction 13| 1. St. Lines| Triangles|Quadrilaterals 21-93| (A) St. Lines 21| (B) Parallel Lines 25| (C) Triangles 30| (D) Polygons 34| (E) Congruency Of Triangles 37| (F) Practical Geometry (I) 51| (G) Sides Of Triangles 57| (H) Quadrilaterals 64| (I) More Theorems-On Triangles And Quadrilaterals 70| (J) Practical Geometry (Ii) 76| (K) Loci And Theorems On Loci 81| (L) Miscellaneous Exercise-(M&N) 88| 2. Areas| Proportionality And Pythagoras Theorems 94-124| (A) Theorems On Areas 95| (B) Thale'S Theorem And Bisector Theorem 100| (C) Proportionality Theorems And Trigonometry 104| (D) Pythagoras Theorems 112| (E) Practical Geometry - (Iii) 119| (F) Miscellaneus Exercise (U) 121| 3. Circles And Tangents 125-178| (A) Preliminary Theorems 127| (B) Circles And Chords 129| Pdf Created With Pdffactory Trial Version Www.Pdffactory.Com| (C) Circles And Angles 137| (D) Tangency 145| (E) Angle Between Circles 154| (F) Practical Geometry (Iv) 154| (G) Miscellaneous Exercise (G) 166| (H) Miscellaneous Exercise (H) 172| 4. Advancedtheorems 179-211| (A) Pythagoras Theorems As Applied To Obtuse Angled| And Acute Angled Ds. 179| (B) Intersecting Chords And Related Theorems 185| (C) Practicalgeometry (V) And Special Examples On Ds| With Angles 72°| 72°| 36°. 192| (D) 'S Line And Nine-Point Circle. 200| (E) Ptolemy'S Theorems And Related Theorems. 207| (F) Ceva'S Theorem And Morley'S Theorem 208| 5. Exercise (P) And (Q) 212-219| 6. Hints And Solutions To Some Difficult Examples In| Thebook. 220-312