Final answer:
The original expression \(\sqrt{\frac{5}{7}}\) is already in the simplest radical form. If the expression to simplify is \(\sqrt{\frac{5}{7}} \times \sqrt{\frac{7}{5}}\), it simplifies to 1, as the product of the radicals simplifies to the square root of 1.
Step-by-step explanation:
To simplify the expression \(\sqrt{\frac{5}{7}}\) and converting it into radical form, we follow a few mathematical rules for simplification and radicals. The original expression is already in radical form, as it represents the square root of 5/7. However, if there is a typo or misunderstanding and the goal is to simplify a different expression such as \(\sqrt{\frac{5}{7}} \times \sqrt{\frac{7}{5}}\), we can use the property of radicals that states the product of square roots is the square root of the product of the radicands (numbers under the radical symbol). Therefore, multiplying these together we have \(\sqrt{\frac{5}{7} \times \frac{7}{5}}\) which simplifies to \(\sqrt{1}\), because the numerators and denominators will cancel each other out. The square root of 1 is simply 1. So, the expression simplifies to the number 1.