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प्रश्न
Calculate:
`8^(2/3)/(root(3)(2 xx 4^-5)`
बेरीज
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उत्तर
Given,
`8^(2/3)/(root(3)(2 xx 4^-5)`
We need to simplify the given terms.
Thus, `8^(2/3)/(root(3)(2 xx 4^-5)`
⇒ `(2^3)^(2/3)/((2 xx 4^(-5 xx 1/3))` ...`[∴ root(n)(a) = a^(1/n)]`
⇒ `(2)^(3 xx 2/3)/((2^(1/3) xx 4^(-5 xx 1/3))` ...[∴ (an)m = anm, an × bn = (ab)n]
⇒ `(2)^2/((2^(1/3) xx 4^(-5/3))`
⇒ `(2)^2/(2^(1/3) xx (2^2)^(- 5/3)`
⇒ `(2)^2/(2^(1/3) xx (2)^(2 xx (-5)/3)`
⇒ `(2)^2/(2^(1/3) xx (2)^((-10)/3)` ...[∴ (an)m = anm]
⇒ `(2)^2/2^((1/3 - 10/3))` ...[∴ an × am = an + m]
⇒ `(2)^2/2^((-9)/3) = (2)^2/2^-3`
⇒ (2)2 × 23 ...`[∴ a^n = 1/a^-n]`
⇒ 25 = 32 ...[∴ an × am = an + m]
Hence, the required is 32.
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