Kết quả:
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Thời gian làm bài: 00:00:00
Câu 1
Trắc nghiệm
Số liền trước của số $ - 19$ là số
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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
Số lớn nhất có 4 chữ số khác nhau và chia hết cho 2 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
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| Đáp án đúng:
a
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| Đáp án đúng:
a
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| Đáp án đúng:
a
Câu 4
Trắc nghiệm
Có bao nhiêu điểm không hợp lí trong cột “email” của bảng dữ liệu:
Danh sách email của các bạn tổ 1 lớp 6D
![](https://cdn.vungoi.vn/vungoi/2021/0915/1631696283108_mceclip0.png)
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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 5
Trắc nghiệm
Điền vào chỗ trống
Các số có chữ số tận cùng là … thì chia hết cho 2 và chỉ những số đó mới chia hết cho 2.
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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 6
Trắc nghiệm
Cho biểu đồ cột kép sau:
![](https://cdn.vungoi.vn/vungoi/2021/0917/1631872780086_mceclip0.png)
Số con cá của tổ 3 và tổ 4 nuôi trong biểu đồ ở hình trên là
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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 7
Trắc nghiệm
Trong các số 3,5,8,9, số nào thuộc tập hợp \(A = \left\{ {x \in \mathbb{N}\left| {x \ge 8} \right.} \right\}\), số nào thuộc tập \(B = \left\{ {x \in \mathbb{N}\left| {x < 5} \right.} \right\}\)?
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| Đáp án đúng:
d
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d
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| Đáp án đúng:
d
Câu 8
Trắc nghiệm
Biểu đồ tranh dưới đây cho biết số ti vi (TV) bán được qua các năm của siêu thị điện máy A.
![](https://cdn.vungoi.vn/vungoi/2021/0917/1631862576664_mceclip0.png)
Năm nào siêu thị điện máy bán được nhiều TV nhất?
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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 9
Trắc nghiệm
Cho \(\overline {55a62} \) chia hết cho 3. Số thay thế cho \(a\) có thể là
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| Đáp án đúng:
c
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c
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| Đáp án đúng:
c
Câu 10
Trắc nghiệm
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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 11
Trắc nghiệm
Thứ tự thực hiện phép tính nào sau đây là đúng đối với biểu thức không có dấu ngoặc?
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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 12
Tự luận
Điền số thích hợp vào ô trống:
![](https://cdn.vungoi.vn/vungoi/1538032843272_avd.jpg)
Câu hỏi tự luận
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Câu 13
Trắc nghiệm
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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 14
Trắc nghiệm
Quan sát hình thang cân EFGH, góc H của hình thang đó bằng góc nào?
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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 15
Trắc nghiệm
Tìm \(x\) thỏa mãn \(165 - \left( {35:x + 3} \right).19 = 13\).
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| Đáp án đúng:
a
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a
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a
Câu 16
Trắc nghiệm
Nếu \(x \, \vdots \, 2\) và \(y \, \vdots \, 4\) thì tổng \(x + y\) chia hết cho
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| Đáp án đúng:
a
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a
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| Đáp án đúng:
a
Câu 17
Trắc nghiệm
Cho diện tích tứ giác (1) bằng \(20\,\,c{m^2}\), Diện tích tam giác (2) bằng \(16\,\,c{m^2}\), Khi đó diện tích của hình trên bằng:
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| Đáp án đúng:
d
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d
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| Đáp án đúng:
d
Câu 18
Trắc nghiệm
+) Tích ba số nguyên âm là một số nguyên ..(1)..
+) Tích hai số nguyên âm với một số nguyên dương là một số nguyên …(2)…
Từ thích hợp để điền vào hai chỗ chấm trên lần lượt là:
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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 19
Trắc nghiệm
Cho biểu đồ tranh số học sinh khối lớp 6 được điểm 10 môn Toán trong tuần như sau:
![](https://cdn.vungoi.vn/vungoi/2021/0916/1631788734209_mceclip0.png)
![](https://cdn.vungoi.vn/vungoi/2021/0916/1631788747472_mceclip0.png)
Số học sinh được điểm 10 môn Toán vào Thứ Tư là bao nhiêu?
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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 20
Trắc nghiệm
Cho hình bình hành ABCD có chiều cao hạ xuống cạnh CD là 5 cm, chiều dài CD là 15 cm, diện tích hình bình hành ABCD là:
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d
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d
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| Đáp án đúng:
d
Câu 21
Trắc nghiệm
Cho \(x - 236\) là số đối của số 0 thì x là:
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| Đáp án đúng:
d
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d
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| Đáp án đúng:
d
Câu 22
Trắc nghiệm
Cho \(a \vdots m\) và \(b \vdots m\) và \(c \vdots m\) với m là số tự nhiên khác 0. Các số a,b,c là số tự nhiên tùy ý.
Khẳng định nào sau đây chưa đúng?
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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 23
Trắc nghiệm
Số phần tử của tập hợp các số tự nhiên lẻ lớn hơn \(10\) nhỏ hơn \(50\) là
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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 24
Trắc nghiệm
Tìm số tự nhiên \(x\) biết \(\left( {x - 4} \right).1000 = 0\)
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| Đáp án đúng:
a
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a
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| Đáp án đúng:
a
Câu 25
Trắc nghiệm
Cho bảng giờ tàu HP1 Hà Nội – Hải Phòng tháng 10 năm 2020 như sau:
![](data:image/png;base64,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)
Quãng đường từ ga Gia Lâm đến ga Hải Dương; từ ga Hải Dương đến ga Hải phòng lần lượt là
Bạn đã chọn sai
| Đáp án đúng:
b
Bạn đã chọn đúng
| Đáp án đúng:
b
Bạn chưa làm câu này
| Đáp án đúng:
b
Câu 26
Trắc nghiệm
Bạn đã chọn sai
| Đáp án đúng:
b
Bạn đã chọn đúng
| Đáp án đúng:
b
Bạn chưa làm câu này
| Đáp án đúng:
b
Câu 27
Trắc nghiệm
Một trường tổ chức cho học sinh đi tham quan bằng ôtô. Nếu xếp \(35\) hay \(40\) học sinh lên một ô tô thì đều thấy thiếu mất \(5\) ghế ngồi. Tính số học sinh đi tam quan biết số lượng học sinh đó trong khoảng từ \(800\) đến \(900\) em.
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 28
Trắc nghiệm
Nhiệt kế chỉ bao nhiêu độ trong hình dưới đây?
![](data:image/png;base64,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)
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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 29
Trắc nghiệm
Viết tập hợp $M = $ $\left\{ {x \in Z| - 5 < x \le 3} \right\}$ dưới dạng liệt kê ta được
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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 30
Trắc nghiệm
Sắp xếp các số sau theo thứ tự tăng dần: \( - 2021;\,\,4;\,0;\, - 10;\, - 1\)
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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 31
Trắc nghiệm
Giá trị biểu thức \(A = 56 + x + \left( { - 99} \right) + \left( { - 56} \right) + \left( { - x} \right)\) là
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a
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a
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| Đáp án đúng:
a
Câu 32
Trắc nghiệm
Lớp 6C có số bạn thích các loại quả được biểu diễn bằng biểu đồ sau:
![](https://cdn.vungoi.vn/vungoi/2021/0917/1631869544926_mceclip0.png)
Nếu sĩ số lớp 6C giảm 2 bạn, 1 bạn thích Dưa hấu và 1 bạn thích đào thì biểu đồ trên trở thành
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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 33
Trắc nghiệm
Cho \( - 76 + x + 146 = x + ...\) Số cần điền vào chỗ trống là
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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 34
Trắc nghiệm
Một mảnh vườn hình vuông cạnh 20 m. Người ta làm một lối đi xung quanh vườn rộng 2 m thuộc đất của vườn. Phần đất còn lại dùng để trồng trọt. Tính diện tích trồng trọt của mảnh vườn.
![](https://cdn.vungoi.vn/vungoi/2021/0818/1629285205801_mceclip0.png)
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| Đáp án đúng:
c
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c
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| Đáp án đúng:
c
Câu 35
Trắc nghiệm
Hình dưới đây có tất cả bao nhiêu hình vuông?
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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 36
Trắc nghiệm
Để đánh số các trang của một quyển sách người ta phải dùng tất cả \(600\) chữ số. Hỏi quyển sách có bao nhiêu trang?
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d
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| Đáp án đúng:
d
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| Đáp án đúng:
d
Câu 37
Trắc nghiệm
Một miếng đất hình chữ nhật có chiều dài 64 m, chiều rộng 34 m. Người ta giảm chiều dài và tăng chiều rộng để miếng đất là hình vuông, biết phần diện tích giảm theo chiều dài là 272. Tìm phần diện tích tăng thêm theo chiều rộng.
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| Đáp án đúng:
c
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c
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| Đáp án đúng:
c
Câu 38
Trắc nghiệm
Tìm \(\overline {abcd} \), trong đó \(a,b,c,d\) là $4$ số tự nhiên liên tiếp tăng dần và \(\overline {abcd} \in B\left( 5 \right)\)
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a
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a
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a
Câu 39
Trắc nghiệm
Có bao nhiêu giá trị \(x\) thỏa mãn $\left( {x - 6} \right)\left( {{x^2} + 2} \right) = 0?$
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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