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प्रश्न
Solve each of the following systems of equations by the method of cross-multiplication
ax + by = a2
bx + ay = b2
उत्तर
The system of the given equations may be written as
ax + by - a2 = 0
bx + ay - b2 = 0
Here,
`a_1 = a, b_1 = b, c_1 = -a^2`
`a_2 = b, b_2 = a, c_2 = -b^2`
By cross multiplication, we get
`=> x/(b xx (-b^2) - (-a^2) xx a) = (-y)/(a xx(-b^2) - (-a^2) xx b) = 1/(axxa - bxxb)`
`=> x/(-b^3 + a^3) = (-y)/(-ab^2 + a^2b) = 1/(a^2 - b^2)`
Now
`x/(-b^3 + a^3) = 1/(a^2 - b^2)`
`=> x = (a^3 - b^3)/(a^2 - b^2)`
`= ((a- b)(a^2 + ab + b^2))/((a- b)(a + b))`
`= (a^2 + ab + b^2)/(a + b)`
And
`(-y)/(-ab^2 + a^2b) = 1/(a^2 - b^2)`
`=> -y = (a^2b - ab^2)/(a^2 - b^2)`
`=> y = (ab^2 - a^2b)/(a^2 - b^2)`
`=> (ab(b -a))/((a-b)(a + b))`
`(-ab(a - b))/((a - b)(a + b))`
`= (-ab)/(a + b)`
Hence `x = (a^2 + ab + b^2)/(a + b), y = (-ab)/(a + b)` is the solution of the given system of the equations.
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