Bài 2. Cho biết \(x\) và \(y\) là hai đại lượng tỉ lệ nghịch và \(x_1\) và \(x_2\) là hai giá trị bất kì của \(x\); \(y_1\) và \(y_2\) là hai giá trị bất kì của \(y\).
a) Tính \(y_1\),\(y_2\) biết: \(2y_1+3y_2=-26\), \(x_1=3\); \(x_2\)\(=2\)
b)...
Đọc tiếp
Bài 2. Cho biết \(x\) và \(y\) là hai đại lượng tỉ lệ nghịch và \(x_1\) và \(x_2\) là hai giá trị bất kì của \(x\); \(y_1\) và \(y_2\) là hai giá trị bất kì của \(y\).
a) Tính \(y_1\),\(y_2\) biết: \(2y_1+3y_2=-26\), \(x_1=3\); \(x_2\)\(=2\)
b) Tính \(x_1,y_2\) biết \(3x_1-2y_2=-32\), \(x_2=-4;t=y_1=-10\)
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hai giá trị bất kì của x; format('truetype')%3Bfont-weight%3Anormal%3Bfont-style%3Anormal%3B%7D%3C%2Fstyle%3E%3C%2Fdefs%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2216%22%20font-style%3D%22italic%22%20text-anchor%3D%22middle%22%20x%3D%224.5%22%20y%3D%2216%22%3Ey%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2212%22%20text-anchor%3D%22middle%22%20x%3D%2212.5%22%20y%3D%2221%22%3E1%3C%2Ftext%3E%3Ctext%20font-family%3D%22math1f7177163c833dff4b38fc8d287%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2218.5%22%20y%3D%2216%22%3E%2C%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2216%22%20font-style%3D%22italic%22%20text-anchor%3D%22middle%22%20x%3D%2229.5%22%20y%3D%2216%22%3Ey%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2212%22%20text-anchor%3D%22middle%22%20x%3D%2237.5%22%20y%3D%2221%22%3E2%3C%2Ftext%3E%3C%2Fsvg%3E)
là hai giá trị tương ứng của yformat('truetype')%3Bfont-weight%3Anormal%3Bfont-style%3Anormal%3B%7D%3C%2Fstyle%3E%3C%2Fdefs%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2216%22%20font-style%3D%22italic%22%20text-anchor%3D%22middle%22%20x%3D%224.5%22%20y%3D%2216%22%3Ex%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2212%22%20text-anchor%3D%22middle%22%20x%3D%2212.5%22%20y%3D%2221%22%3E1%3C%2Ftext%3E%3Ctext%20font-family%3D%22math1dd165a6c6b5bc8158c57065d13%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2218.5%22%20y%3D%2216%22%3E.%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2216%22%20font-style%3D%22italic%22%20text-anchor%3D%22middle%22%20x%3D%2225.5%22%20y%3D%2216%22%3Ey%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2212%22%20text-anchor%3D%22middle%22%20x%3D%2233.5%22%20y%3D%2221%22%3E1%3C%2Ftext%3E%3Ctext%20font-family%3D%22math1dd165a6c6b5bc8158c57065d13%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2245.5%22%20y%3D%2216%22%3E%3D%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2258.5%22%20y%3D%2216%22%3E3%3C%2Ftext%3E%3C%2Fsvg%3E)
và format('truetype')%3Bfont-weight%3Anormal%3Bfont-style%3Anormal%3B%7D%3C%2Fstyle%3E%3C%2Fdefs%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2216%22%20font-style%3D%22italic%22%20text-anchor%3D%22middle%22%20x%3D%224.5%22%20y%3D%2216%22%3Ex%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2212%22%20text-anchor%3D%22middle%22%20x%3D%2212.5%22%20y%3D%2221%22%3E2%3C%2Ftext%3E%3Ctext%20font-family%3D%22math143f4d31b04031e49f5eb18baba%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2224.5%22%20y%3D%2216%22%3E%3D%3C%2Ftext%3E%3Ctext%20font-family%3D%22math143f4d31b04031e49f5eb18baba%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2240.5%22%20y%3D%2216%22%3E%26%23x2212%3B%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2257.5%22%20y%3D%2216%22%3E27%3C%2Ftext%3E%3C%2Fsvg%3E)
. Tính 
format('truetype')%3Bfont-weight%3Anormal%3Bfont-style%3Anormal%3B%7D%3C%2Fstyle%3E%3C%2Fdefs%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2216%22%20font-style%3D%22italic%22%20text-anchor%3D%22middle%22%20x%3D%224.5%22%20y%3D%2216%22%3Ex%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2212%22%20text-anchor%3D%22middle%22%20x%3D%2212.5%22%20y%3D%2221%22%3E1%3C%2Ftext%3E%3Ctext%20font-family%3D%22math105a7d1208567dca4d9dcfa18a3%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2224.5%22%20y%3D%2216%22%3E%3D%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2237.5%22%20y%3D%2216%22%3E1%3C%2Ftext%3E%3Ctext%20font-family%3D%22math105a7d1208567dca4d9dcfa18a3%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2244.5%22%20y%3D%2216%22%3E%3B%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2216%22%20font-style%3D%22italic%22%20text-anchor%3D%22middle%22%20x%3D%2255.5%22%20y%3D%2216%22%3Ex%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2212%22%20text-anchor%3D%22middle%22%20x%3D%2263.5%22%20y%3D%2221%22%3E2%3C%2Ftext%3E%3Ctext%20font-family%3D%22math105a7d1208567dca4d9dcfa18a3%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2275.5%22%20y%3D%2216%22%3E%3D%3C%2Ftext%3E%3Ctext%20font-family%3D%22math105a7d1208567dca4d9dcfa18a3%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2291.5%22%20y%3D%2216%22%3E%26%23x2212%3B%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%22108.5%22%20y%3D%2216%22%3E15%3C%2Ftext%3E%3C%2Fsvg%3E)
và format('truetype')%3Bfont-weight%3Anormal%3Bfont-style%3Anormal%3B%7D%3C%2Fstyle%3E%3C%2Fdefs%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2216%22%20font-style%3D%22italic%22%20text-anchor%3D%22middle%22%20x%3D%224.5%22%20y%3D%2216%22%3Ey%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2212%22%20text-anchor%3D%22middle%22%20x%3D%2212.5%22%20y%3D%2221%22%3E1%3C%2Ftext%3E%3Ctext%20font-family%3D%22math1819bfc9e6df1a8bf12affe7fd8%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2223.5%22%20y%3D%2216%22%3E%2B%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2216%22%20font-style%3D%22italic%22%20text-anchor%3D%22middle%22%20x%3D%2235.5%22%20y%3D%2216%22%3Ey%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2212%22%20text-anchor%3D%22middle%22%20x%3D%2243.5%22%20y%3D%2221%22%3E2%3C%2Ftext%3E%3Ctext%20font-family%3D%22math1819bfc9e6df1a8bf12affe7fd8%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2255.5%22%20y%3D%2216%22%3E%3D%3C%2Ftext%3E%3Ctext%20font-family%3D%22math1819bfc9e6df1a8bf12affe7fd8%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2271.5%22%20y%3D%2216%22%3E%26%23x2212%3B%3C%2Ftext%3E%3Ctext%20font-family%3D%22Arial%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2288.5%22%20y%3D%2216%22%3E11%3C%2Ftext%3E%3C%2Fsvg%3E)
. Tính
a: x,y là hai đại lượng tỉ lệ nghịch
=>\(x_1\cdot y_1=x_2\cdot y_2\)
=>\(\dfrac{y_1}{x_2}=\dfrac{y_2}{x_1}\)
=>\(\dfrac{y_1}{2}=\dfrac{y_2}{3}\)
mà \(2y_1+3y_2=-26\)
nên Áp dụng tính chất của dãy tỉ số bằng nhau, ta được:
\(\dfrac{y_1}{2}=\dfrac{y_2}{3}=\dfrac{2y_1+3y_2}{2\cdot2+3\cdot3}=\dfrac{-26}{13}=-2\)
=>\(y_1=-2\cdot2=-4;y_2=-2\cdot3=-6\)
b: \(x_1\cdot y_1=x_2\cdot y_2\)
=>\(-10\cdot x_1=-4\cdot y_2\)
=>\(5x_1=2y_2\)
=>\(\dfrac{x_1}{2}=\dfrac{y_2}{5}\)
mà \(3x_1-2y_2=-32\)
nên Áp dụng tính chất của dãy tỉ số bằng nhau, ta được:
\(\dfrac{x_1}{2}=\dfrac{y_2}{5}=\dfrac{3x_1-2y_2}{3\cdot2-2\cdot5}=\dfrac{-32}{6-10}=\dfrac{-32}{-4}=8\)
=>\(x_1=8\cdot2=16;y_2=5\cdot8=40\)