Welche der dargestellten Strecken ist die zur Seite a zugehörige Höhe des Parallelogramms?[br][img width=415,height=193]https://lh7-us.googleusercontent.com/3bnhA5qXMbgfRK6w-3a4P-fomX-Y_mRre5dTZE6LIemqOkAMMIZJwOPgpqXKCDA0maeSBp8r_-LnwA0D2L24xX3emscVNIWtzCS6r4AwAdRhx9qyq4SxsYbMjnwrWdMxVlHWJ8EknOIgHk4dTYiVknI[/img]

Welche der dargestellten Strecken sind die zu den Seiten a und b zugehörigen Höhen?[br][br][img]data:image/png;base64,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[/img][br]

Toni und Sasha versuchen jeweils die Höhe h[sub]a[/sub] im folgenden besonderen Parallelogramm einzuzeichnen.[br][img width=234,height=202]https://lh7-us.googleusercontent.com/docsz/AD_4nXcpxApdOyLNQUkdf2v6FO6Ce-SuIu2b31rKc6Q_ENkj6eyBPWwOPLvBEDd89nBW_BFnBR3amIVPUURkFolFQ6VgBvxFdY6uz6r4mmgMLHsdtu3F41FhHsqAaXh_ZM3Ei_JgWWdka5gvk_3KtMkCysS_BkdY?key=GQOJl_MXEthVoUYXdEPAvw[/img][br]Tonis Konstruktion:[br][img width=236,height=203]https://lh7-us.googleusercontent.com/docsz/AD_4nXevkpmyFMwJPnbDlyt2o4r6YeD65suDul9uVshUydpOD2gMLS4ZOZ17V1qGtDtB65B5GNiHDSkc3Y2wl0Z4-OoodXt2pEY3b1sWyBWLFYt7TuJ9m9IUMlAcrjDpC7pVZorVm892cGGHJfX3Dz3ELMtXP-jx?key=GQOJl_MXEthVoUYXdEPAvw[/img][br]Sashas Konstruktion:[br][img width=238,height=205]https://lh7-us.googleusercontent.com/docsz/AD_4nXeK3KCg7oWy8TZMWHs_JGPf_5dx-nqv1KkGcVDfrY2WJ_7EjYsKEL8de_2vm__qLR8JGhzV-UisoA80yit_xge02dng9YleimV_E-OVsM8RPK9w9rtkWEINfGqIsiq_Fh_LT2Ui7k2Tr4ez1uHv_OZEK7XQ?key=GQOJl_MXEthVoUYXdEPAvw[/img][br]Begründe, ob Toni oder Sasha die Höhe h[sub]a[/sub] richtig im besonderen Parallelogramm konstruiert haben.

Konstruiere ein Parallelogramm mit folgenden Bestimmungsstücken: [br]a = 7 cm [br]b = 4 cm [br][math]\alpha[/math] = 45°[br]Zeichne dann die zugehörigen Höhen h[sub]a[/sub] und h[sub]b[/sub] auf die Seiten a und b ein und miss diese ab.

Konstruiere ein Rechteck mit folgenden Bestimmungsstücken:[br]a = 5 cm[br]b = 3 cm[br]Zeichne dann die zugehörigen Höhen h[sub]a[/sub] und h[sub]b[/sub] ein.

Betrachte das dargestellte Quadrat.[br]Gib die Länge der Höhe an.[br][img width=267,height=185]https://lh7-us.googleusercontent.com/wfS4zvYxCS4oWbA8tFemOvGHC1VoAuNOhI7v2sYTB0LiXRKVrP0nB3e3uQ70GVRw_JN17E3raMpBRA2wWKqFZas-sBbvBEvSLsuHpivPUB02Cq4nfyvLBHrL0aenSahH8eX2ACvQO8K-0h-6E89lpgM[/img]