Kết quả:
0/40
Thời gian làm bài: 00:00:00
Câu 1
Trắc nghiệm
Đâu không phải vai trò của nấm trong tự nhiên là:
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| Đáp án đúng:
d
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d
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| Đáp án đúng:
d
Câu 2
Trắc nghiệm
Điền từ còn thiếu vào chỗ trống:
“Mọi vật có khối lượng đều …bằng một lực. Lực này gọi là …”
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| Đáp án đúng:
b
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b
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| Đáp án đúng:
b
Câu 3
Trắc nghiệm
Amip ăn não thường gây tử vong sau bao lâu?
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a
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a
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| Đáp án đúng:
a
Câu 4
Trắc nghiệm
Lực nào sau đây là lực tiếp xúc?
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d
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d
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d
Câu 5
Trắc nghiệm
Nấm dưới đây thuộc loại nấm nào
![See the source image](https://file.hstatic.net/1000272713/file/1569146483-62819cef98da7ac6f0b71f05e7ed0264_e0c7c1ed78c84b289d4c5f9373e7dcd7_grande.jpg)
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a
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a
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a
Câu 6
Trắc nghiệm
Hiện tượng nào sau đây là kết quả tác dụng của lực hút của Trái Đất?
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a
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a
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a
Câu 7
Trắc nghiệm
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a
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a
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a
Câu 8
Trắc nghiệm
Lực xuất hiện giữa hai vật khi chúng đặt gần nhau gọi là:
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c
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c
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c
Câu 9
Trắc nghiệm
Đâu là vai trò của đa dạng sinh học đối với con người
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| Đáp án đúng:
d
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d
Câu 10
Trắc nghiệm
Để thuận lợi trong việc xác định khối lượng của vật, các nhà sản xuất đã chế tạo ra những chiếc cân xách tay gọn nhẹ. Những chiếc cân này hoạt động dựa trên nguyên tắc nào?
![](https://cdn.vungoi.vn/vungoi/2021/0906/1630897955011_mceclip0.png)
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a
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a
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a
Câu 11
Trắc nghiệm
Loài Lưỡng cư sinh sản bằng cách nào và môi trường nào?
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a
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a
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a
Câu 12
Trắc nghiệm
Khi ta cầm bút để viết, lực nào giúp chiếc bút không trượt khỏi tay?
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| Đáp án đúng:
b
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b
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b
Câu 13
Trắc nghiệm
Sử dụng cụm từ thích hợp để điền vào chỗ trống cho đúng ý nghĩa vật lí:
.... là nguyên nhân làm thay đổi vận tốc của chuyển động.
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| Đáp án đúng:
d
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d
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d
Câu 14
Trắc nghiệm
Hãy chọn câu trả lời đúng. Muốn biểu diễn một véc tơ lực chúng ta cần phải biết các yếu tố:
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d
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d
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d
Câu 15
Trắc nghiệm
Điền từ còn thiếu vào chỗ trống:
“Khi vật A đẩy hoặc kéo vật B ta nói vật A … lên vật B.”
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a
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a
Câu 16
Trắc nghiệm
Trong lần sút phạt của Quang Hải tại trận chung kết U23 Châu Á 2018 giữa hai đội Việt Nam – Uzbekistan, lực đá của Quang Hải vào quả bóng làm quả bóng:
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b
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b
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b
Câu 17
Trắc nghiệm
Cây thông là cây hạt trần vì:
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| Đáp án đúng:
c
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c
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c
Câu 18
Trắc nghiệm
Chọn đáp án sai?
Trong các lực sau, lực nào là lực tiếp xúc?
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a
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a
Câu 19
Trắc nghiệm
Biện pháp nào sau đây không phải là bảo vệ đa dạng sinh học?
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| Đáp án đúng:
d
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d
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d
Câu 20
Trắc nghiệm
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a
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a
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a
Câu 21
Trắc nghiệm
Trên Thế giới đã phát hiện được khoảng:
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a
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a
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a
Câu 22
Trắc nghiệm
Đâu là đặc trưng của lực?
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d
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d
Câu 23
Trắc nghiệm
Nhóm động vật nào sau đây chỉ sống trong môi trường nước?
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| Đáp án đúng:
c
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c
Câu 24
Trắc nghiệm
Loại nấm nào được sử dụng làm men nở:
![](https://cdn.vungoi.vn/vungoi/2021/0730/1627620625778_mceclip0.png)
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| Đáp án đúng:
b
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b
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b
Câu 25
Trắc nghiệm
Tại sao ở hoang mạc rất ít thực vật sống
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d
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d
Câu 26
Trắc nghiệm
Để phân biệt các nhóm ngành động vật có xương sống, ta dựa chủ yếu vào đặc điểm nào?
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b
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b
Câu 27
Trắc nghiệm
Là học sinh em cần làm gì để bảo vệ đa dạng sinh học:
- Tuân theo các biện pháp và tuyên truyền các biện pháp này cho người thân, hàng xóm để bảo vệ sự đa dạng thực vật ở địa phương.
- Tham gia bảo vệ, chăm sóc và trồng cây xanh ở trường, địa phương.
- Không chặt phá bừa bãi cây xanh
- Không vứt rác bừa bãi, thường xuyên dọn dẹp sạch sẽ môi trường sống
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| Đáp án đúng:
d
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d
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d
Câu 28
Trắc nghiệm
Hình nào biểu diễn đúng lực trên hình vẽ, biết độ lớn của lực là 3 N.
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)
Bạn đã chọn sai
| Đáp án đúng:
a
Bạn đã chọn đúng
| Đáp án đúng:
a
Bạn chưa làm câu này
| Đáp án đúng:
a
Câu 29
Trắc nghiệm
Phát biểu nào sau đây không đúng?
Ném mạnh một quả bóng tennis vào mặt tường phẳng: Lực mà quả bóng tác dụng vào mặt tường
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| Đáp án đúng:
c
Bạn đã chọn đúng
| Đáp án đúng:
c
Bạn chưa làm câu này
| Đáp án đúng:
c
Câu 30
Trắc nghiệm
Bạn đã chọn sai
| Đáp án đúng:
a
Bạn đã chọn đúng
| Đáp án đúng:
a
Bạn chưa làm câu này
| Đáp án đúng:
a
Câu 31
Trắc nghiệm
Khi đang đi xe đạp, ta dùng tay bóp phanh. Lực nào đã trực tiếp làm cho xe dừng lại
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| Đáp án đúng:
b
Bạn đã chọn đúng
| Đáp án đúng:
b
Bạn chưa làm câu này
| Đáp án đúng:
b
Câu 32
Trắc nghiệm
Một ô tô có khối lượng là 5 tấn thì trọng lượng của ô tô đó là
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| Đáp án đúng:
d
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| Đáp án đúng:
d
Bạn chưa làm câu này
| Đáp án đúng:
d
Câu 33
Trắc nghiệm
Lần lượt treo vào một lò xo các vật có khối lượng \({m_1},{m_2},{m_3}\) thì lò xo dãn ra như hình vẽ. Hãy so sánh các khối lượng \({m_1},{m_2},{m_3}\).
![](data:image/png;base64,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)
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| Đáp án đúng:
d
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| Đáp án đúng:
d
Bạn chưa làm câu này
| Đáp án đúng:
d
Câu 34
Trắc nghiệm
Treo vật vào đầu một lực kế lò xo. Khi vật nằm cân bằng, số chỉ của lực kế là 2 N. Điều này có nghĩa
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| Đáp án đúng:
b
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| Đáp án đúng:
b
Bạn chưa làm câu này
| Đáp án đúng:
b
Câu 35
Trắc nghiệm
Tiến hành thí nghiệm gồm hai tờ giấy giống nhau.
+ Tờ 1: Vo tròn.
+ Tờ 2: Để phẳng
Sau đó, thả hai tờ giấy từ cùng một độ cao. Cho biết tờ giấy nào chạm đất trước? Tại sao?
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| Đáp án đúng:
c
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| Đáp án đúng:
c
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| Đáp án đúng:
c
Câu 36
Trắc nghiệm
Xe ô tô bị sa lầy. Máy vẫn nổ, bánh xe vẫn quay nhưng xe không dịch chuyển được. Tại sao? Phải làm thế nào để xe thoát khỏi vũng bùn?
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a
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a
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| Đáp án đúng:
a
Câu 37
Trắc nghiệm
Khi thả một quả bóng cao su từ trên cao, hiện tượng xảy ra trong các giai đoạn:
- Thả quả bóng cao su ra.
- Bóng đang rơi.
- Bóng chạm sàn nhà.
- Bóng nảy lên.
Trong các giai đoạn trên, giai đoạn nào lực tác dụng lên quả bóng là lực tiếp xúc và làm thay đổi chuyển động?
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| Đáp án đúng:
c
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| Đáp án đúng:
c
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| Đáp án đúng:
c
Câu 38
Trắc nghiệm
Tại sao cá voi lại được xếp vào lớp Thú
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| Đáp án đúng:
d
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| Đáp án đúng:
d
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| Đáp án đúng:
d
Câu 39
Trắc nghiệm
Treo thẳng đứng một lò xo, đầu dưới gắn với một quả cân 100g thì lò xo có độ dài là 11 cm, nếu thay bằng quả cân 200g thì lò xo có độ dài là 11,5 cm. Hỏi nếu treo quả cân 500 g thì lò xo có độ dài bằng bao nhiêu?
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| Đáp án đúng:
b
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| Đáp án đúng:
b
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| Đáp án đúng:
b
Câu 40
Trắc nghiệm
Biết rằng ở các vùng ven biển, mức độ sóng đánh vào bờ sẽ ảnh hưởng đến mức độ xói mòn của đất, sóng đánh càng mạnh thì mức độ xói mòn càng cao. Thực hiện đánh giá mức độ sóng đánh ở hai vùng A và B thu được kết quả như hình
Dựa vào hình, em hãy dự đoán mực độ xói mòn của đất ở vùng A và B
![](https://cdn.vungoi.vn/vungoi/2021/0819/1629370243054_mceclip0.png)
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| Đáp án đúng:
b
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| Đáp án đúng:
b
Bạn chưa làm câu này
| Đáp án đúng:
b