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![](https://rs.olm.vn/images/avt/0.png?1311)
mình giải bên 24 rồi nhé, đths thì bạn tự vẽ
1, đths y = 2x + b đi qua M(-1;1) <=> -2 + b = 1 <=> b = 3
2b, Hoành độ giao điểm thỏa mãn phương trình
2x - 1 = -x + 2 <=> 3x = 3 <=> x = 1
=> y = 2 - 1 = 1
Vậy y = 2x - 1 cắt y = -x +2 tại A(1;1)
![](https://rs.olm.vn/images/avt/0.png?1311)
a) Để đồ thị hàm số \(y=ax^2\) đi qua điểm A(4;4) thì
Thay x=4 và y=4 vào hàm số \(y=ax^2\), ta được:
\(a\cdot4^2=4\)
\(\Leftrightarrow a\cdot16=4\)
hay \(a=\dfrac{1}{4}\)
a, - Thay tọa độ điểm A vào hàm số ta được : \(4^2.a=4\)
\(\Rightarrow a=\dfrac{1}{4}\)
b, Thay a vào hàm số ta được : \(y=\dfrac{1}{4}x^2\)
- Ta có đồ thì của hai hàm số :
c, - Xét phương trình hoành độ giao điểm :\(\dfrac{1}{4}x^2=-\dfrac{1}{2}x\)
\(\Leftrightarrow x^2+2x=0\)
\(\Leftrightarrow\left[{}\begin{matrix}x=0\\x=-2\end{matrix}\right.\)
Vậy hai hàm số trên cắt nhau tại hai điểm : \(\left(0;0\right);\left(-2;1\right)\)
![](https://rs.olm.vn/images/avt/0.png?1311)
Phương trình hoành độ giao điểm:
\(-x+5=2x-2\Leftrightarrow x=\dfrac{7}{3}\Rightarrow y=\dfrac{8}{3}\Rightarrow\left(\dfrac{7}{3};\dfrac{8}{3}\right)\)
\(a,\) Hàm số: \(y=-x+5\)
Lấy: \(\left\{{}\begin{matrix}x=1\Rightarrow y=4\\x=2\Rightarrow y=3\end{matrix}\right.\)
Hàm số: \(y=2x-2\)
\(\left\{{}\begin{matrix}x=2\Rightarrow y=2\\x=3\Rightarrow y=4\end{matrix}\right.\)
\(b,\left\{{}\begin{matrix}y=-x+5\left(d\right)\\y=2x-2\left(d'\right)\end{matrix}\right.\)
Phương trình hoành độ giao điểm của \(\left(d\right)\) và \(\left(d'\right)\) là:
\(-x+5=2x-2\)
\(\Leftrightarrow-3x=-7\)
\(\Leftrightarrow x=\dfrac{7}{3}\)
Thay \(x=\dfrac{7}{3}\) vào \(\left(d\right)y=-x+5\) ta được:
\(y=-\dfrac{7}{3}+5\)
\(\Leftrightarrow y=\dfrac{8}{3}\)
Vậy tọa độ giao điểm của hai đường thẳng là \(B\left(\dfrac{7}{3};\dfrac{8}{3}\right)\)
![](https://rs.olm.vn/images/avt/0.png?1311)
2. PT hoành độ giao điểm: \(3x=x+2\Leftrightarrow2x=2\Leftrightarrow x=1\Leftrightarrow y=3\Leftrightarrow A\left(1;3\right)\)
Vậy \(A\left(1;3\right)\) là giao 2 đths
Bài 1.
Vì đths đi qua $M(-1;1)$ nên:
$y_M=2x_M+b$
$\Leftrightarrow 1=2.(-1)+b$
$\Leftrightarrow b=3$
Vậy đths có pt $y=2x+3$.
Hình vẽ:
Bài 2.
a. Hình vẽ:
Đường màu xanh là $y=2x-1$
Đường màu đỏ là $y=-x+2$
![](data:image/png;base64,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)
b.
PT hoành độ giao điểm:
$y=2x-1=-x+2$
$\Leftrightarrow x=1$
$y=2x-1=2.1-1=1$
Vậy tọa độ giao điểm của 2 đồ thị là $(1;1)$