To express √35 in surd form, we need to simplify the square root as much as possible.
First, we can factor 35 into its prime factors:
35 = 5 × 7
Then, we can write √35 as:
√35 = √(5 × 7)
Using the property of square roots that √(ab) = √a × √b, we can simplify this expression as:
√35 = √5 × √7
So, the surd form of √35 is √5 × √7.