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Question
Find the value of x in the following:
log (x + 4) + log (x – 4) = 4 log 2 + log 3
Sum
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Solution
Given: log (x + 4) + log (x – 4) = 4 log 2 + log 3
Step-wise calculation:
1. Use log a + log b = log (ab):
log [(x + 4)(x – 4)] = 4 log 2 + log 3
2. Combine the right-hand logs:
4 log 2 + log 3
= log (24) + log 3
= log (16) + log 3
= log (16 × 3)
= log 48
3. Therefore
log [(x + 4)(x – 4)] = log 48
⇒ (x + 4)(x – 4) = 48
4. Expand:
x2 – 16 = 48
⇒ x2 = 64
⇒ x = ±8
5. Domain check:
Arguments of logs require x + 4 > 0 and x – 4 > 0.
So x > 4.
This excludes x = –8.
⇒ x = 8
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Chapter 7: Logarithms - Exercise 7B [Page 146]
