Vẽ đồ thị các hàm số sau trên cùng một hệ trục tọa độ:
a) y = 2x
b) y = -2x
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\(a,\) Bn tự vẽ
\(b,\) PT hoành độ giao điểm của 2 đths là
\(\dfrac{1}{2}x=6-2x\Leftrightarrow\dfrac{5}{2}x=6\Leftrightarrow x=\dfrac{12}{5}\Leftrightarrow y=\dfrac{6}{5}\\ \Leftrightarrow B\left(\dfrac{12}{5};\dfrac{6}{5}\right)\)
*Vẽ đồ thị của hàm số y = x
Cho x = 0 thì y = 0
Cho x = 1 thì y = 1
Đồ thị hàm số y = x là đường thẳng đi qua gốc tọa độ O(0; 0) và điểm (1; 1)
*Vẽ đồ thị hàm số y = 2x
Cho x = 0 thì y = 0
Cho x = 1 thì y = 2
Đồ thị hàm số y = 2x là đường thẳng đi qua gốc tọa độ O(0; 0) và điểm (1;2)
*Vẽ đồ thị của hàm số y = -x + 3
Cho x = 0 thì y = 3. Ta có điểm (0; 3)
Cho y = 0 thì x = 3. Ta có điểm (3; 0)
Đồ thị hàm số y = -x + 3 là đường thẳng đi qua hai điểm (0; 3) và (3; 0)
Lời giải:
![](data:image/png;base64,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)
Đồ thị màu xanh lá: $y=2x$
Đồ thị màu xanh biển: $y=-2x$