SINIF:6.SINIF[br]KONU:Alan Ölçme[br]M.6.3.2.2. Paralelkenarın alan bağıntısını oluşturur, ilgili problemleri çözer.
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[/img][br]Yukarıdaki görselde paralelkenar şeklindeki havuzda A,B,C yüzücüleri yüzmektedir. Üç yüzücünün de karşıya geçebilecekleri en kısa mesafeler hakkında ne düşünüyorsunuz? Verilen görsele bakarak geçebilecekleri en kısa mesafeler nasıl oluşturulmuş olabilir , bu konu hakkında fikirleriniz nelerdir? Tartışınız.
Aşağıda verilen Geogrebra etkinliğini dikkatlice inceleyiniz.[br]
Bu paralelkenarda yüksekliğin hareketini inceleyiniz. Durduğu her noktadaki yükseklikle ilgili benzerlik ve farklılıklar var mıdır? Düşüncelerinizi kendi cümlelerinizle aşağıdaki kutucuğa yazınız.
Yukarıdaki paralelkenarın yüksekliğinin sağa doğru hareketiyle oluşan şeklin ismi nedir? Oluşan şeklin alanı ve alan bağıntısıyla ilgili düşüncelerinizi yazınız.
Aşağıda verilen Geogebra etkinliği yardımıyla paralelkenarın alan bağıntısını tanımlayalım.
Bir paralelkenarın alanı, bir kenar uzunluğu ile o kenara ait yükseklik çarpılarak bulunur.[br]A(ABCD)= a.h
Aşağıda verilen Geogebra etkinliğini aşamalarına dikkat ederek yapınız.[br]
1.[icon]/images/ggb/toolbar/mode_complexnumber.png[/icon]Sekmesi yardımıyla önceden öğrendiğimiz dikdörtgen oluşturacak şekilde 4 tane nokta koyalım.[br]2.Herhangi doğrusal iki noktayı en az birer birim hareket ettirelim.[br]3.[icon]/images/ggb/toolbar/mode_join.png[/icon] Sekmesi yardımıyla koyduğumuz doğrusal noktaları birleştirerek şekli tamamlayalım[br]4.[icon]/images/ggb/toolbar/mode_orthogonal.png[/icon]Sekmesi yardımıyla seçtiğimiz bir köşeden karşı kenara bir dik doğru çizelim.[br]
Geogebra etkinliğinde oluşan şekli özellik ve alan bakımından inceleyiniz.
5. DEĞERLENDİRME (EVALUATE)
Paralkenarın alanını bulmak için tabanla yüksekliği çarpıp ikiye böleriz.
Paralelkenarda paralel iki kenarın yükseklikleri birbirine eşittir.
[img]data:image/png;base64,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[/img][br]Çevresi 44 cm olan KLMN paralelkenarının alanı kaç cm²'dir?[br]
Alanı 64 cm² olan bir paralelkenarın bir kenarı 16 cm ise yüksekliği kaç cm'dir?