Final answer:
The expression 7√3 - 4√6 + √48 - √54 simplifies to 11√3 - 7√6 after factoring and combining like terms, corresponding to option B.
Step-by-step explanation:
To simplify the given expression, we identify and combine like terms, specifically terms that involve the same radical component. Let's break it down step-by-step:
- The given expression is 7√3 - 4√6 + √48 - √54.
- We simplify √48 and √54 by factoring them into square roots of perfect squares and other integers: √48 = √(16×3) = 4√3 and √54 = √(9×6) = 3√6.
- Substitute the simplified terms back into the expression: 7√3 - 4√6 + 4√3 - 3√6.
- Combine like terms: (7√3 + 4√3) - (4√6 + 3√6) = 11√3 - 7√6.
This gives us the final simplified form of the original expression: 11√3 - 7√6, which corresponds to option B.