Hacmi Anlamlandırma ve Ölçme
Bu kitapla öğrencilerimizin hacmi anlamlandırmasını kolaylaştırmak, nasıl ölçüleceğini öğretmek ve sonrasında bilgilerini pekiştirmelerini sağlamak amaçlanmıştır.
Table of Contents
- Kapak
- KAPAK
- İçindekiler
- İçindekiler
- Hacime Giriş Yapalım
- Hacime Giriş Yapalım
- Dikdörtgenler prizmasının hacim formülünü elde edelim.
- Birimküp
- Volume: Intuitive Introduction
- Volume of rectangular prisms
- Öğrendiklerimizi pekiştirelim
- Öğrendiklerimizi Pekiştirelim
KAPAK
Hazırlayan: Dilek Aytekin[br] Ders Adı: Matematik [br]Sınıf Seviyesi: 6.sınıf[br] Öğrenme Alanı: Geometri[br] Alt Öğrenme Alanı: Geometrik Cisimler[br] Kazanım:[br] M.6.3.4.1. Dikdörtgenler prizmasının içine boşluk kalmayacak biçimde yerleştirilen birimküp sayısının o cismin hacmi olduğunu anlar, verilen cismin hacmini birimküpleri sayarak hesaplar.[br] a) Öğrencilerin hacmi ölçmeye yönelik stratejiler geliştirmesine fırsat verilir. Örneğin birimküpler sayılırken oluşan tabakalarda kaçar tane birimküp olduğuna ve toplam kaç tabaka bulunduğuna dikkat çekilir. [br] b) Hacmi anlamlandırmaya yönelik çalışmalara yer verilir. Hacmin, herhangi bir cismin boşlukta kapladığı yer olduğu vurgulanır. [br][br] Bu kitapla öğrencilerimizin hacmi anlamlandırmasını kolaylaştırmak, nasıl ölçüleceğini öğretmek ve sonrasında bilgilerini pekiştirmelerini sağlamak amaçlanmıştır. [br] Öğrencilerimize faydalı olabilmek dileğiyle...
İçindekiler
1.Kısım: Hacime giriş yapalım.[br] 2.Kısım: Dikdörtgenler prizmasının hacim formülünü elde edelim. [br]3.Kısım: Öğrendiklerimizi pekiştirelim
Hacime Giriş Yapalım
Ders başlangıcında sorulacak sorular [br]1.) Çocuklar hacim deyince aklınıza neler geliyor?[br] 2.) Sizce her maddenin hacmi var mıdır?[br] 3.) Hacmi sizce nasıl bulabiliriz? [br]4.) Dikdörtgenler prizmasını hatırlıyor musunuz? Kaç köşesi, ayrıtı ve yüzü vardı?
Birimküp
Öğrendiklerimizi Pekiştirelim
Dikdörtgenler prizması şeklindeki bir hediye kutusunun tabanının kısa kenarı 5 birim, uzun kenarı 7 birim, yüksekliği ise 10 birimdir. Bu hediye kutusunun hacmi kaç birimküptür?
Kare prizma şeklindeki bir hediye kutusunun yüksekliği 8 birimküp, hacmi ise 288 birimküptür. Bu hediye kutusunun tabanının bir kenar uzunluğu kaç birimküptür?
[img]data:image/png;base64,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[/img][br]Yukarıdaki kare prizmanın hacminin dikdörtgenler prizmasının hacmine oranı kaçtır?