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Question
Simplify:
`(9^(3n) xx 3^(n + 1))/(27^(n + 1) xx 81^n)`
Simplify
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Solution
Given,
`(9^(3n) xx 3^(n + 1))/(27^(n + 1) xx 81^n)`
We need to simplify the given terms.
Thus, `(9^(3n) xx 3^(n + 1))/(27^(n + 1) xx 81^n)`
= `((3^2)^(3n) xx 3^(n + 1))/((3^3)^(n + 1) xx (3^4)^n)`
= `((3)^(6n) xx 3^(n + 1))/((3)^(3n + 3) xx (3)^(4n)` ...[∴ (an)m = anm]
= `((3)^(6n + n + 1))/((3)^(3n + 3 + 4n))` ...[∴ an × am = an + m]
= `(3)^(6n + n + 1 - 3n - 3 - 4n)`
= `(3)^(7n + 1 - 7n - 3)`
= `(3)^-2`
= `1/3^2`
= 1/9`
Hence, the required is `1/9`.
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Chapter 6: Indices - EXERCISE 6 [Page 67]
