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Question
If a = bx, b = cy and c = az prove that xyz = 1.
Theorem
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Solution
Given:
a = bx
b = cy
c = az
To Prove: xyz = 1
Proof (Stepwise):
1. From the given, substitute (b) in terms of (c) and (y) in the first equation:
a = bx
a = (cy)x
a = c(xy)
2. From the third equation, we have
c = az
3. Substitute (c = az) into the expression for (a):
a = c(xy)
a = az(xy)
4. Divide both sides by (a) assuming (a ≠ 0):
1 = z(xy)
5. Since multiplication is associative and commutative,
1 = xyz
We have proved that xyz = 1.
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