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प्रश्न
Find the value of n, where n is an integer and `2^(n - 5) xx 6^(2n - 4) = 1/(12^4 xx 2)`.
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उत्तर
We have, `2^(n - 5) xx 6^(2n - 4) = 1/(12^4 xx 2)`
⇒ `2^n/2^5 xx 6^(2n)/6^4 = 1/(12^4 xx 2)` ...`[∵ a^(m - n) = a^m/a^n]`
⇒ `(2^n xx 6^(2n))/(2^5 xx 6^4) = 1/((2 xx 6)^4 xx 2)` ...[∵ 12 = 6 × 2]
⇒ `2^n × (6^2)^n = (2^5 xx 6^4)/(2^4 xx 6^4 xx 2)` ...[By cross-multiplication] [∵ amn = (am)n and (a × b)m = am × bm]
⇒ `2^n xx 36^n = (2^5 xx 6^4)/(2^5 xx 6^4)` ...[∵ am × an = am + n]
⇒ 2n × 36n = 1
⇒ (2 × 36)n = 1 ...[∵ am × bm = (ab)m]
⇒ (72)n = (72)0 ...[∵ a0 = 1]
∴ n = 0 ...[∵ If am = an ⇒ m = n]
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