question\nexpress in simplest radical form.\n\\sqrt{48}

question\nexpress in simplest radical form.\n\\sqrt{48}
Answer
Answer:
$4\sqrt{3}$
Explanation:
Step1: Factor the radicand
Factor 48 into a product of a perfect square and another number: $48 = 16\times3$, where 16 is a perfect square.
Step2: Apply the square - root property
Using the property $\sqrt{ab}=\sqrt{a}\times\sqrt{b}$ (for $a\geq0,b\geq0$), we have $\sqrt{48}=\sqrt{16\times3}=\sqrt{16}\times\sqrt{3}$. Since $\sqrt{16} = 4$, then $\sqrt{48}=4\sqrt{3}$.