To divide \( 95\sqrt{3}\sqrt{5} \), we first need to simplify the expression \( \sqrt{3}\sqrt{5} \).
Using the property of square roots that states \( \sqrt{a}\sqrt{b} = \sqrt{a \cdot b} \), we have:
\[ \sqrt{3}\sqrt{5} = \sqrt{15} \]
Now, substituting back into the original expression:
\[ 95\sqrt{3}\sqrt{5} = 95\sqrt{15} \]
Since you asked to "divide," it looks like you want it divided by something. If you meant to simply simplify \( 95\sqrt{15} \) without a divisor, then this is already in its simplest form.
However, if you intended to divide \( 95\sqrt{3}\sqrt{5} \) by another number (say, by 1, or by itself), please provide the divisor.
For now, the exact answer is:
\[ 95\sqrt{15} \]
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