Câu 8 : hình thoi ABCD có đọ dài đường chéo AC là 4 3/4 dm; độ dài đường chéo BD ngắn hơn AC là 7/12 dm. Tính diện tích hình thoi đó
Câu 9 : tính bằng cách thuận tiện nhất
a. 2/9 + 1/5 + 7/9 + 4/5 = .............................................................................................
b. 1/12 + 3/16 + 5/12 =...................................................................................................
Câu 1:
![](data:image/png;base64,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)
Câu 2:
b) 1/12 + 3/16 + 5/12 + 5/16
=(1/12 + 5/12) + (3/16 + 5/16)
=1/2 + 1/2
=2/2
=1
a) 1/2 + 3/16 + 5/12 + 5/16
=5/12 + (1/2 + 3/16 + 5/16)
= 5/12 + 1
= 15/12
(Đúng tick, sai bảo)
. 2/9 + 1/5 + 7/9 + 4/5 = ............................................................................................. mà
hình như sai đề