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प्रश्न
Prove that: `(log x)^2 - (log y)^2 = log (x/y) · log (xy)`.
सिद्धांत
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उत्तर
Given:
x > 0, y > 0 and log denotes logarithm to the same base for both x and y so the laws of logs apply.
To Prove:
`(log x)^2 - (log y)^2 = log(x/y) xx log(xy)`
Proof [Step-wise]:
1. Start with the left-hand side:
(log x)2 – (log y)2.
2. Recognize this as a difference of squares and factor:
(log x – log y)(log x + log y)
3. Use logarithm laws:
`log x - log y = log (x/y)`
log x + log y = log (xy)
4. Substitute these into the factorization to obtain:
(log x – log y)(log x + log y)
= `log (x/y) xx log (xy)`
Therefore `(log x)^2 - (log y)^2 = log(x/y) xx log(xy)`, as required.
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