[math]\left(x,y\right)\rightharpoondown\left(x-2,y-3\right)[/math]

[math]\left(x,y\right)\rightharpoondown\left(2x,3y\right)[/math]

[math]\left(x,y\right)\rightharpoondown\left(3x,3y\right)[/math]

[math]\left(x,y\right)\rightharpoondown\left(2-x,y\right)[/math]

[img]data:image/png;base64,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[/img][br][size=150][br][math]x=0[/math] doğrusu üzerinden  [math]ABC[/math] üçgenini yansıt.Bu yeni üçgene [math]A'B'C'[/math] deyin. Sonra yansıtılmış [math]A'B'C'[/math] üçgenini [math]y=0[/math] doğrusuna göre yansıtın.Bu yeni elde edilen üçgene [math]A''B''C''[/math] deyin.[/size][br][br]Hangi dönüşüm [math]ABC[/math] den [math]A''B''C''[/math] yü verir?

[size=150] [math]ABC[/math] üçgenini [math]y=2[/math] doğrusuna göre yansıt.[br] [math]\left(0,0\right)[/math] dan [math]\left(3,2\right)[/math][/size] ye yönlendirilmiş olan vektör ile döndür.[br][br]Son görüntüdeki köşelerin koordinatları nelerdir?

Suyun yoğunluğu cm[sup]3 [/sup]başına 1 gramdır. Yoğunluğu suyun yoğunluğundan daha[br]az olan bir nesne suda yüzer, ve yoğunluğu suyun yoğunluğundan fazlaysa batar.[br]0.4 m yarıçaplı, 5 m yükseklikli ve 1950 kg olan bir silindirik kütük, batar[br]mı, yüzer mi? Yorumlayarak açıklayın

[size=150]Birbiri ile uyumlu bu 3 kare piramit 3 m uzunluğunda bir[br]küpe monte edilebilir. Her bir piramidin hacmi nedir? [/size][br][img]data:image/png;base64,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[/img]

 [math]AA'[/math] uzunluğunun [math]AD[/math] uzunluğuna oranı nedir? Nedeninizi açıklayarak gösterin.