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प्रश्न
Solve each of the following systems of equations by the method of cross-multiplication :
`a^2/x - b^2/y = 0`
`(a^2b)/x + (b^2a)/y = a + b, x , y != 0`
उत्तर
taking `1/x = u and 1/y = v` Then the given system of equations become
`a^2u - b^2v = 0`
`a^2bu + b^2av - (a + b) = 0`
Here
`a_1 = a^2, b_1 = -b^2, c_1 = 0`
`a_2 = a^2b, b_2 = b^2a, c_2 = -(a + b)`
By cross multiplication, we have
`=> u/(b^2(a + b)-0xxb^2a) = (-v)/(-a^2(a + b)-0xxa^2b) = 1/(a^3b^2 + a^2b^3)`
`=> u/(b^2(a + b)) = v/(a^2(a + b)) = 1/(a^2b^2(a + b))`
Now
`u/(b^2(a + b)) = 1/(a^2b^2(a + b))`
`=> u = (b^2(a + b))/(a^2b^2 (a + b))`
`=> u = 1/a^2
And
`v/(a^2(a + b)) = 1/(a^2b^2(a + b))`
`=> v = (a^2 (a + b))/(a^2b^2 (a + b))`
`=> v = 1/b^2`
Now
`x = 1/u = a^2`
And
`y = 1/v = b^2`
Hence `x = a^2, y = b^2` is the solution of the given system of equations
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