Which is the simplified form of sqrt(50)?

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Study for the 8th Grade Mathematics Test. Prepare with multiple choice questions, each with hints and explanations. Get ready for your exam!

Multiple Choice

Which is the simplified form of sqrt(50)?

Explanation:
When simplifying a square root, you pull out any perfect square factors from under the radical. Here, 50 can be written as 25 × 2, and 25 is a perfect square. So the square root splits: sqrt(50) = sqrt(25) × sqrt(2) = 5 × sqrt(2) = 5√2. This is the simplest form because 2 has no square factors besides 1. Leaving it as √50 isn’t fully simplified. A form like 5√5 would come from rewriting 50 as 25×5, which doesn’t match the original radicand. And 10√2 would imply the radicand is 200, not 50, so it isn’t equivalent to sqrt(50).

When simplifying a square root, you pull out any perfect square factors from under the radical. Here, 50 can be written as 25 × 2, and 25 is a perfect square. So the square root splits: sqrt(50) = sqrt(25) × sqrt(2) = 5 × sqrt(2) = 5√2. This is the simplest form because 2 has no square factors besides 1.

Leaving it as √50 isn’t fully simplified. A form like 5√5 would come from rewriting 50 as 25×5, which doesn’t match the original radicand. And 10√2 would imply the radicand is 200, not 50, so it isn’t equivalent to sqrt(50).

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