[img]data:image/png;base64,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[/img]

[size=150][size=200][color=#980000][b]Διχοτόμος γωνίας[/b][/color] ονομάζεται η [u]ημιευθεία [/u]που έχει αρχή την κορυφή της γωνίας και τη χωρίζει σε [b][u]δύο ίσες γωνίες[/u][/b].[/size][/size]

[size=150][size=100][size=200]Οι προσκείμενες [/size][size=200]στη βάση γωνίες ισοσκελούς είναι [color=#ff0000]ΙΣΕΣ[/color][/size][/size][/size]