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Question
Solve for x and y:
`x/a + y/b = a + b, x/(a^2) + y/(b^2) = 2`
Sum
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Solution
The given equations are
`x/a + y/b = a + b` ...(i)
`x/(a^2) + y/(b^2) = 2` ...(ii)
Multiplying (i) by b and (ii) by b2 and subtracting, we get
`(bx)/a - (b^2x)/(a^2) = ab + b^2 - 2b^2`
⇒ `(ab - b^2)/(a^2)x = ab - b^2`
⇒ `x = ((ab - b^2)a^2)/(ab - b^2) = a^2`
Now, substituting x = a2 in (i) we get
`(a^2)/a + y/b = a + b`
⇒ `y/b = a + b - a = b`
⇒ y = b2
Hence, x = a2 and y = b2.
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