QUESTION IMAGE
Question
simplify.
- \\(sqrt4{80} + 4sqrt4{405}\\)
Step1: Simplify $\sqrt[4]{80}$
Factor 80: $80 = 16\times5 = 2^4\times5$. So, $\sqrt[4]{80}=\sqrt[4]{2^4\times5}=2\sqrt[4]{5}$. Then $-\sqrt[4]{80}=-2\sqrt[4]{5}$.
Step2: Simplify $4\sqrt[4]{405}$
Factor 405: $405 = 81\times5 = 3^4\times5$. So, $\sqrt[4]{405}=\sqrt[4]{3^4\times5}=3\sqrt[4]{5}$. Then $4\sqrt[4]{405}=4\times3\sqrt[4]{5}=12\sqrt[4]{5}$.
Step3: Combine the terms
Now, substitute the simplified forms back into the original expression: $-\sqrt[4]{80}+4\sqrt[4]{405}=-2\sqrt[4]{5}+12\sqrt[4]{5}$. Combine like terms: $(-2 + 12)\sqrt[4]{5}=10\sqrt[4]{5}$.
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$10\sqrt[4]{5}$