221. Tìm các số nguyên x,y biết:
a)(x-1).(y+2)=7
b)x(y-3)=-12
c)(x-3)(y-3)=9
Giải chi tiết giúp mình nha
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221. Tìm các số nguyên x,y biết:
a)(x-1).(y+2)=7
b)x(y-3)=-12
c)(x-3)(y-3)=9
Giải chi tiết giúp mình nha
\(a,=\left(x+y\right)\left(y+z\right)\\ b,=x\left(x^2+2x+1\right)=x\left(x+1\right)^2\\ c,=\left(x-y\right)\left(x+y\right)+\left(x-y\right)=\left(x+y+1\right)\left(x-y\right)\\ d,= \left(2x-5\right)\left(2x+5\right)\\ e,=\left(4y-3\right)\left(4y+3\right)\)
a: x/2=-5/y
=>xy=-10
=>\(\left(x,y\right)\in\left\{\left(1;-10\right);\left(-10;1\right);\left(-1;10\right);\left(10;-1\right);\left(2;-5\right);\left(-5;2\right);\left(-2;5\right);\left(5;-2\right)\right\}\)
b: =>xy=12
mà x>y>0
nên \(\left(x,y\right)\in\left\{\left(12;1\right);\left(6;2\right);\left(4;3\right)\right\}\)
c: =>(x-1)(y+1)=3
=>\(\left(x-1;y+1\right)\in\left\{\left(1;3\right);\left(3;1\right);\left(-1;-3\right);\left(-3;-1\right)\right\}\)
=>\(\left(x,y\right)\in\left\{\left(2;2\right);\left(4;0\right);\left(0;-4\right);\left(-2;-2\right)\right\}\)
d: =>y(x+2)=5
=>\(\left(x+2;y\right)\in\left\{\left(1;5\right);\left(5;1\right);\left(-1;-5\right);\left(-5;-1\right)\right\}\)
=>\(\left(x,y\right)\in\left\{\left(-1;5\right);\left(3;1\right);\left(-3;-5\right);\left(-7;-1\right)\right\}\)
a)(x+1)(y-2)=3
x+1;y-2 thuộc Ư(3){1;-1;3;-3}
ta có bảng sau :
x-1 | 1 | -1 | 3 | -3 |
x | 2 | 0 | 4 | -2 |
y-2 | 1 | -1 | 3 | -3 |
y | 3 | 1 | 5 | -1 |
vậy cặp x;y thuộc {(2;3);(0;1);(4;5);(-2;-1)}
a) Ta có bảng sau:
x | -1 | -7 | 7 | 1 |
y+1 | 7 | 1 | -1 | -7 |
y | 6 | 0 | -2 | -8 |
b) Ta có bảng sau:
x-3 | 1 | -3 | -1 | 3 |
y+2 | -3 | 1 | 3 | -1 |
x | 4 | 0 | 2 | 6 |
y | -5 | -1 | 1 | -3 |
\(\dfrac{x}{-3}=\dfrac{y}{5}\)⇒\(\dfrac{x}{-6}=\dfrac{y}{10}\)
\(\dfrac{y}{2}=\dfrac{z}{7}\)⇒\(\dfrac{y}{10}=\dfrac{z}{35}\)
⇒\(\dfrac{x}{-6}=\dfrac{y}{10}=\dfrac{z}{35}\)
⇒\(\dfrac{2x}{-12}=\dfrac{3y}{30}=\dfrac{z}{35}\)
Áp dụng tính chất dãy tỉ số bằng nhau, ta có:
\(\dfrac{2x}{-12}=\dfrac{3y}{30}=\dfrac{z}{35}=\dfrac{2x-3y+z}{-12-30+35}=\dfrac{42}{-7}=-6\)
⇒\(\left\{{}\begin{matrix}x=-6.-6=36\\y=-6.10=-60\\z=-6.35=-210\end{matrix}\right.\)
\(a,\dfrac{x}{-3}=\dfrac{y}{5}\Rightarrow\dfrac{x}{-6}=\dfrac{y}{10};\dfrac{y}{2}=\dfrac{z}{7}\Rightarrow\dfrac{y}{10}=\dfrac{z}{35}\\ \Rightarrow\dfrac{x}{-6}=\dfrac{y}{10}=\dfrac{z}{35}\)
Áp dụng t/c dtsbn:
\(\dfrac{x}{-6}=\dfrac{y}{10}=\dfrac{z}{35}=\dfrac{2x}{-12}=\dfrac{3y}{30}=\dfrac{2x-3y+z}{-12-30+35}=\dfrac{42}{-7}=-6\\ \Rightarrow\left\{{}\begin{matrix}x=36\\y=-60\\z=-210\end{matrix}\right.\)
\(b,6x=4y=z\Rightarrow\dfrac{6x}{12}=\dfrac{4y}{12}=\dfrac{z}{12}\Rightarrow\dfrac{x}{2}=\dfrac{y}{3}=\dfrac{z}{12}\)
Áp dụng t/c dtsbn:
\(\dfrac{x}{2}=\dfrac{y}{3}=\dfrac{z}{12}=\dfrac{2x}{4}=\dfrac{3y}{9}=\dfrac{2x-3y+z}{4-9+12}=\dfrac{42}{7}=6\\ \Rightarrow\left\{{}\begin{matrix}x=12\\y=18\\z=72\end{matrix}\right.\)
\(c,x=-2y\Rightarrow\dfrac{x}{-2}=y\Rightarrow\dfrac{x}{-4}=\dfrac{y}{2}\\ 7y=2z\Rightarrow\dfrac{y}{2}=\dfrac{z}{7}\\ \Rightarrow\dfrac{x}{-4}=\dfrac{y}{2}=\dfrac{z}{7}\)
Áp dụng t/c dtsbn:
\(\dfrac{x}{-4}=\dfrac{y}{2}=\dfrac{z}{7}=\dfrac{2x}{-8}=\dfrac{3y}{6}=\dfrac{2x-3y+z}{-8+6+7}=\dfrac{42}{5}\\ \Rightarrow\left\{{}\begin{matrix}x=-\dfrac{168}{5}\\y=\dfrac{84}{5}\\z=\dfrac{294}{5}\end{matrix}\right.\)
`A)2/3=x/60`
`=>40/60=x/60`
`=>x=40`
`B)-1/2=y/18`
`=>-9/18=y/18`
`=>y=-9`
`C)3/x=y/35=-36/84`
Mà `-36/84=(-3 xx 12)/(7 xx 12)=-3/7`
`=>3/x=-3/7`
`=>x=-7`
`y/35=-3/7=-15/35`
`=>y=-15`
`D)7/x=y/27=-42/54`
Mà `-42/54=(-7 xx 6)/(9 xx 6)=-7/9`
`=>7/x=-7/9`
`=>x=-9`
`y/27=-7/9=-21/27`
`=>y=-21`
câu này p là trạng thái cô lập chứ
a: \(\Leftrightarrow\left(x-1,y+2\right)\in\left\{\left(1;7\right);\left(7;1\right);\left(-1;-7\right);\left(-7;-1\right)\right\}\)
hay \(\left(x,y\right)\in\left\{\left(2;5\right);\left(8;-1\right);\left(0;-9\right);\left(-6;-3\right)\right\}\)
b:![](data:image/png;base64,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)