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107.23 Location of the inarc circle and its point of contact with the circumcircle
Published online by Cambridge University Press: 03 July 2023
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- © The Authors, 2023. Published by Cambridge University Press on behalf of The Mathematical Association
References
Lukarevski, M., An inequality arising from the inarc centres of a triangle, Math. Gaz. 103 (November 2019) pp. 538–541. doi: 10.1017/mag.2019.125CrossRefGoogle Scholar
Lukarevski, M., Proximity of the incentre to the inarc centres, Math. Gaz. 105 (March 2021) pp. 142–147. doi: 10.1017/mag.2021.26CrossRefGoogle Scholar
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