| The golden section in the inscribed square of an isosceles right triangle TQ Hung Forum Geometricorum 15, 91-92, 2015 | 11 | 2015 |
| Another synthetic proof of the butterfly theorem using the midline in triangle TQ Hung Forum Geometricorum 16, 345-346, 2016 | 6 | 2016 |
| On the automorphism groups of finite multitype models in Cn Van Thu Ninh, TLH Nguyen, QH Tran, H Kim JOURNAL OF GEOMETRIC ANALYSIS 29 (1), 428-450, 2019 | 5 | 2019 |
| On some extensions of Morley's trisector theorem N Dergiades, TQ Hung arXiv preprint arXiv:2005.08723, 2020 | 3 | 2020 |
| On the Automorphism Groups of Finite Multitype Models in VT Ninh, TLH Nguyen, QH Tran, H Kim The Journal of Geometric Analysis 29 (1), 428-450, 2019 | 3 | 2019 |
| Another Construction of the Golden Ratio in an Isosceles Triangle TQ Hung Forum Geometricorum 17, 287-288, 2017 | 3 | 2017 |
| Another simple construction of the golden section with equilateral triangles TQ Hung Forum Geometricorum 17, 47-48, 2017 | 3 | 2017 |
| A DIRECT TRIGONOMETRIC PROOF OF MORLEY'S THEOREM. TQ HUNG International Journal of Geometry 8 (2), 2019 | 2 | 2019 |
| A Construction of the Golden Ratio in an Arbitrary Triangle TQ Hung Forum Geometricorum 18, 239-244, 2018 | 2 | 2018 |
| A generalization of the Pythagorean theorem via Ptolemy’s theorem QH Tran Mathematics Magazine 96 (1), 57-59, 2023 | 1 | 2023 |
| 106.12 A new proof of the n-dimensional Pythagorean theorem TQ Hung The Mathematical Gazette 106 (565), 136-137, 2022 | 1 | 2022 |
| Concurrency, collinearity and other properties of a particular hexagon M De Villiers, TQ Hung Mathematics Competitions 35 (1), 82-91, 2022 | 1 | 2022 |
| Morley’s trisector Theorem for isosceles tetrahedron QH Tran Acta Mathematica Hungarica 165, 308-315, 2021 | 1 | 2021 |
| A family of weighted Erdös–Mordell inequality and applications QH Tran Journal of Geometry 112 (3), 33, 2021 | 1 | 2021 |
| Extending a Theorem of van Aubel to the Simplex TQ Hung Journal for Geometry and Graphics 25 (2), 253-263, 2021 | 1 | 2021 |
| Generalizations of Fagnano’s Problem TQ Hung, NTT Duong Journal for Geometry and Graphics 25 (1), 061-069, 2021 | 1 | 2021 |
| ANOTHER GENERALIZATION OF MUSSELMAN’S THEOREMS NM HA, TQ HUNG Global Journal of Advanced Research on Classical and Modem Geometries 9 (2 …, 2020 | 1 | 2020 |
| Some Constructions of the Golden Ratio in an Arbitrary Triangle QH Tran arXiv preprint arXiv:1904.02011, 2019 | 1 | 2019 |
| Simple proofs of Feuerbach’s theorem and Emelyanov’s theorem N Dergiades, TQ Hung Forum Geometricorum 18, 353-359, 2018 | 1 | 2018 |
| Feuerbach’s Theorem on right triangle with an extension TQ HUNG International Journal of Geometry 6 (2), 2017 | 1 | 2017 |
