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![](https://rs.olm.vn/images/avt/0.png?1311)
Bài 3:
a: Thay x=3 vào y=-2x, ta được:
\(y=-2\cdot3=-6\)
b: Thay x=1,5 vào y=-2x, ta được:
\(y=-2\cdot1.5=-3< >3\)
Do đó: B(1,5;3) không thuộc đồ thị hàm số y=2x
![](https://rs.olm.vn/images/avt/0.png?1311)
b: Thay x=2 vào y=-3x, ta được:
\(y=-3\cdot2=-6< >y_A\)
Vậy: A không thuộc đồ thị hàm số y=-3x
c: Thay y=4 vào y=-3x, ta được:
-3x=4
hay y=-4/3
![](https://rs.olm.vn/images/avt/0.png?1311)
Lời giải:
Đồ thị màu xanh lá: $y=2x$
Đồ thị màu xanh biển: $y=-2x$
![](https://rs.olm.vn/images/avt/0.png?1311)
\(a,\) Thay \(x=3;y=4\Rightarrow\dfrac{4}{3}\cdot3=4\) (đúng)
Vậy \(A\left(3;4\right)\in y=\dfrac{4}{3}x\)
![](https://rs.olm.vn/images/avt/0.png?1311)
tội nghiệt bạn giữa cái bài từ hôm qua tới giờ mà chưa ai giải
![](https://rs.olm.vn/images/avt/0.png?1311)
Bài 1 :
Với x = 1 thì y = 4.1 = 4
Ta được \(A\left(1;4\right)\) thuộc đồ thị hàm số y = f(x) = 4x
Đường thẳng OA là đồ thị hàm số y = f(x) = 4x
a) Ta có : \(f\left(2\right)=4\cdot2=8\)
\(f\left(-2\right)=4\cdot\left(-2\right)=-8\)
\(f\left(4\right)=4\cdot4=16\)
\(f\left(0\right)=4\cdot0=0\)
b) +) y = -1 thì \(4x=-1\) => \(x=-\frac{1}{4}\)
+) y = 0 thì 4x = 0 => x = 0
+) y = 2,5 thì 4x = 2,5 => \(4x=\frac{5}{2}\)=> x = \(\frac{5}{8}\)
Bài 2 :
a) Vẽ tương tự như bài 1
b) Thay \(M\left(-2,6\right)\)vào đths y = -3x ta có :
y =(-3)(-2) = 6
=> Điểm M thuộc đths y = -3x
c) Thay tung độ của P là 5 vào đồ thị hàm số y = -3x ta có :
=> 5 = -3x => \(x=-\frac{5}{3}\)
Vậy tọa độ của điểm P là \(P\left(-\frac{5}{3};5\right)\)
![](https://rs.olm.vn/images/avt/0.png?1311)
Bài 9:
b: Điểm A thuộc đồ thị vì \(y_A=4=-2\cdot\left(-2\right)=-2\cdot x_A\)
Bài 10:
a: Thay x=1 và y=-3 vào (d), ta được:
\(a\cdot1=-3\)
hay a=-3
Lời giải:
a. Đồ thị $y=2x$ vẽ như sau:
![](data:image/png;base64,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)
b.
Ta thấy $-4\neq 2.2$ hay $y_A\neq 2x_A$ nên $A$ không thuộc đths đã cho
$-6=2(-3)$ hay $y_B\neq 2x_B$ nên $B$ thuộc đths đã cho