If log (x + y)/2 = (log x + log y)/2, prove that x = y. - Mathematics

प्रश्न

If `log (x + y)/2 = (log x + log y)/2`, prove that x = y.

सिद्धांत

उत्तर

Given: `log((x + y)/2) = (log x + log y)/2`, with x > 0, y > 0 log is defined.

To Prove: x = y

Proof [Step-wise]:

1. Start from the given equality:

`log((x + y)/2) = (log x + log y)/2`

2. Use log properties on the right-hand side:

`(log x + log y)/2`

= `(1/2) log (xy)`

= `log ((xy)^(1/2))`

= `log (sqrt(xy))`

3. So we have `log ((x + y)/2) = log (sqrt(xy))`.

4. The logarithm for any base a with a > 0, a ≠ 1 is one-to-one on 0, ∞.

Hence, equal logs imply equal arguments `(x + y)/2 = sqrt(xy)`.

5. Multiply by 2:

`x + y = 2sqrt(xy)`

6. Square both sides:

(x + y)² = 4xy

⇒ x² + 2xy + y² = 4xy

⇒ x² – 2xy + y² = 0

⇒ (x – y)² = 0

7. Therefore x – y = 0. so x = y.

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Q 15.Q 14.Q 16.

पाठ 7: Logarithms - Exercise 7B [पृष्ठ १४७]

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नूतन Mathematics [English] Class 9 ICSE

पाठ 7 Logarithms
Exercise 7B | Q 15. | पृष्ठ १४७

If log (x + y)/2 = (log x + log y)/2, prove that x = y. - Mathematics

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If log (x + y)/2 = (log x + log y)/2, prove that x = y. - Mathematics

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