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Question
Simplify:
`(32a^-10)^(1/5) (343a^12)^(1/3)`
Simplify
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Solution
Given,
`(32a^-10)^(1/5) (343a^12)^(1/3)`
We have to simplify the given expression.
Thus, `(32a^-10)^(1/5) (343a^12)^(1/3)`
⇒ `(32)^(1/5) xx (a^-10)^(1/5) xx (343)^(1/3) xx (a^12)^(1/3)` ...[∴ (a × b)n = an × bn]
⇒ `(2^5)^(1/5) xx (a^-10)^(1/5) xx (7^3)^(1/3) xx (a^12)^(1/3)`
⇒ `(2)^(5 xx 1/5) xx (a)^(-10 xx 1/5) xx (7)^(3 xx 1/3) xx (a)^(12 xx 1/3)` ...[∴ (an)m = anm]
⇒ 2 × a–2 × 7 × a4
⇒ 14 × a–2 + 4 ...[∴ an × am = an + m]
⇒ 14a2
Hence, `(32a^-10)^(1/5) (343a^12)^(1/3) = 14a^2`.
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Chapter 6: Indices - EXERCISE 6 [Page 66]
