If two distinct non-zero real variables π₯ and π¦ are such that (π₯ + π¦) isβ¦
2024
If two distinct non-zero real variables π₯ and π¦ are such that (π₯ + π¦) is proportional to (π₯ β π¦) then the value ofΒ \(\frac{x}{y}\)
- A.
depends on π₯π¦
- B.
depends only on π₯ and not on π¦
- C.
depends only on π¦ and not on π₯
- D.
is a constant
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Correct answer: D
Let x+y be proportional to xβy, so there exists a constant k such that x+y = k(xβy).
Rearrange and collect like terms:
x + y = kx β ky
Bring x-terms to one side: x(1 β k) = βy(1 + k)
Divide both sides by y(1 β k) (noting 1 β k β 0):
x/y = β(1 + k)/(1 β k)
Thus for the given proportionality constant k the ratio x/y is a fixed number, so x/y is a constant. Note k cannot equal 1 because that would make the denominator zero; k = β1 would give x = 0, which is excluded since x is non-zero.
Example: if k = 2 then x/y = β(1+2)/(1β2) = β3/β1 = 3, illustrating that once the proportionality constant is fixed the ratio is fixed.
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