Teile eines Winkels, Bezeichnungen und Gradmaß

Nimm ein Blatt Papier zur Hand. [br]Skizziere einen beliebigen Winkel [math]\alpha[/math]. [br]Beschrifte den Winkel. [br]Vergiss nicht den Winkelbogen einzuzeichnen.
Betrachte den dargestellten Winkel. [br]Welche der Bezeichnungen ist richtig? [br][img width=145,height=200]https://lh7-us.googleusercontent.com/docsz/AD_4nXf9yryRHyNtgR6J3YIWS0a9GLBEwYKfuj-7HrcWCNaRnJav_NXFMMEvQuNRRdzyGpDqn1Ya6nmJ6zA3N0K1mqzUy48U10E7N2sW590pWlqEvwc2WZ3oYyMlzvtQngFk-OIFhE5chLgYzV9cfI-B9WLeoKuO?key=tHFBO7g3MzTjtseYodR2BA[/img]
Betrachte den dargestellten Winkel. [br]Gib an, wie der dargestellte Winkel mithilfe der Schenkel richtig beschriftet wird. [br][br][img width=239,height=177]https://lh7-us.googleusercontent.com/_3vwirY_KwJwV51dEZPWwhZhwLnK30t07pGDnaZeD4meIFQEEa6dmyOl2B6DsKHTrn4w_YbfvnizA9ecFkUtKigNyGY6my1qjBM_S8qhfQMFr9ytzzbbL-pWyp8XP_1WkXDCvYp6V_jPi4YYs-nIJfI[/img]
Ergänze die Aussage. [br]Zwei normale Geraden schließen einen ________ Winkel miteinander ein.
Teste dein Winkel-Wissen. [br]Welche der Aussagen sind korrekt?

Winkel schätzen

Nimm ein Blatt Papier zur Hand.[br]Skizziere einen Winkel [math]\alpha[/math] = 35°. [br]Zeichne anschließend den Winkel [math]\alpha[/math] so genau wie möglich mit dem Geodreieck. [br]Vergleiche anschließend deine Skizze mit der exakten Zeichnung.
Wie groß ist der Winkel [math]\varepsilon[/math] ungefähr? [br] [br][img width=327,height=262]https://lh7-rt.googleusercontent.com/docsz/AD_4nXeFArxvetCHceb2HLV_2B2vSwdW0yh3ufzSGl4ozAytqdvhWyRk-MB7FuPgU9Sa1bZPJ_pFstZFWyHoFXCiCMFkcI6FL7E3Rme3U1GIp-LKT5_IpMxKBwbOhF22cm0q_BAyO7_ogTvf5HkqXGuQtPVvgkc?key=7ayey-hc_sySVReU7TMZsQ[/img]
Schätze die Größe des dargestellten Winkels [math]\beta[/math]. [br]Erkläre, wie du beim Schätzen vorgehen kannst. [br][img width=315,height=266]https://lh7-rt.googleusercontent.com/docsz/AD_4nXccwmtydrb2Q6RhNQx6vmnfK42eRobqOASQ7RpgsUUx-RH7J4Q-kG9mpoVEs7N2aCr5PZLKxjlfPfmw6UGFy_Z8u26-4HA8i2vm-qfp45_eFvbB1fB4ki9JRmIrefeXgLGicr-TNed2-hekFHZbPSAXvj4?key=7ayey-hc_sySVReU7TMZsQ[/img]

Winkel zeichnen

Zamir soll den Winkel [math]\alpha[/math] = 85° zeichnen. [br]Dabei ist Zamir ein Fehler unterlaufen. [br]Beschreibe, welcher Fehler Zamir unterlaufen ist. 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[/img]
Caro soll einen erhabenen Winkel [math]\alpha[/math] = 210° zeichnen. [br]Ermittle, wie groß der zu zeichnende Hilfswinkel [math]\alpha_1[/math] sein muss.
Pauli hat den erhabenen Winkel [math]\alpha[/math] = 250° wie in den beiden Abbildungen dargestellt gezeichnet.[br]Beschreibe wie Pauli vorgegangen ist.[br][img width=385,height=206.23345394975618]https://lh7-rt.googleusercontent.com/docsz/AD_4nXcT5xFKLjADak2JOZN-OCXTZyNV5a7zkNTpJ-Ja9r-fAAUCT2Udkk6f2qonqXguFo6KUyKXxz5N0Tkyy2WW5Py9cEzfGLydUSqifMZWRaXyWNxzJmeCnlFBzf2xmPy4YM7gIAlgLROGcRCSxo-viEMqr8Q?key=yisIXDqf8ZUTrKSF0cIhEQ[/img][img width=348,height=195.2175280280699]https://lh7-rt.googleusercontent.com/docsz/AD_4nXcC_VhKAyz9H_J4V7ekctG2LkkUEr0KPa_W6Ws1Pk7oTj_yBmdfoKP2bx4cc5QzscyJXlZK8rEpFu5LJ43cgjnDoWTfwc95bLdl0N7VDGEAbzYS8c2sA_CSVFrfMLwjFEPHvlSc0XT93vNTAs1rBaji_l4?key=yisIXDqf8ZUTrKSF0cIhEQ[/img]

Winkel-Welt

Information