Answer:
To simplify the expression 2√(2u) - 7√(3v), we can combine like terms.
Since both terms have square roots, we can look for any common factors within the square roots. In this case, we can factor out the square root of 2 from the first term and the square root of 3 from the second term:
2√(2u) - 7√(3v) = 2√2 √u - 7√3 √v
Now, we can simplify further by combining the coefficients outside the square roots:
2√2 √u - 7√3 √v = 2√2u - 7√3v
Therefore, the simplified form of 2√(2u) - 7√(3v) is 2√2u - 7√3v.