Question

To simplify the expression (7–√) (−2–√), we can use the distributive property.

(7–√) (−2–√) = 7(-2) + 7(-√) + (-√)(-2) + (-√)(-√)

= -14 - 7√ - 2√ + √(√)

= -14 - 9√ + √(√)

Therefore, the exact answer is -14 - 9√ + √(√).

Apologies for the mistake, let me correct it.

To multiply (7 - √) by (-2 - √), we can use the distributive property:

(7 - √) * (-2 - √) = 7 * (-2) + 7 * (-√) + (-√) * (-2) + (-√) * (-√)

= -14 - 7√ + 2√ + √²

Since √² equals to the square root of 2 or √2:

= -14 - 5√ + √2

So the product of (7 - √) and (-2 - √) is -14 - 5√ + √2.

I apologize for the confusion. The correct answer from the options you provided is:

√ 5

To divide 86√2, we can simplify the expression further.

86√2 can be written as (86 * 1)√2.

Dividing by a square root is equivalent to multiplying by its conjugate. The conjugate of √2 is also √2.

So, we multiply (86 * 1) by (√2 / √2):

(86 * 1) * (√2 / √2) = 86 * (√2 / √2) = 86 * (1) = 86

Therefore, the exact answer is 86.

The correct answer from the options provided is:

1. This expression is already simplified and cannot be divided further

To divide 410√2√, we can simplify the expression further.

410√2√ can be written as (410 * 1)√(2 * √2).

Simplifying the square root of a square root, we have:

√(2 * √2) = √2 * √√2 = √2 * (√2)^(1/2) = √2 * 2^(1/2)

Now, we can rewrite the expression as:

(410 * 1) * (√2 * 2^(1/2))

410 * (√2 * 2^(1/2)) = 410√2 * 2^(1/2)

Since 410 = 2 * 205, we can simplify further:

410√2 * 2^(1/2) = 2 * 205 * √2 * 2^(1/2) = 2 * 205 * √2 * √(2)^(1/2) = 2 * 205 * √2 * 2^(1/4)

Multiplying the coefficients and simplifying the square roots, we have:

2 * 205 * √2 * 2^(1/4) = 410√2 * 2^(1/4)

Therefore, the exact answer is 410√2 * 2^(1/4).

The correct answer from the options provided is:

4. This expression is already simplified and cannot be divided further

To simplify √300, we can find the prime factorization of 300.

The prime factorization of 300 is 2^2 * 3 * 5^2.

Now, we can simplify the square root expression:

√300 = √(2^2 * 3 * 5^2) = √(2^2) * √3 * √(5^2) = 2 * √3 * 5 = 10√3.

Therefore, the simplified form of √300 is 10√3.

The correct answer from the options provided is:

4. 10√3.

To simplify √1327, we need to find the prime factorization of 1327.

Upon calculating, we find that 1327 is a prime number and cannot be further factored.

Therefore, the simplified form of √1327 is already fully simplified.

The correct answer from the options provided is:

2. This radical expression is already fully simplified.

Apologies for the incorrect response. Let's properly simplify √1327.

Since 1327 is a prime number, we cannot simplify √1327 any further using exact values. Therefore, the correct answer is:

2. This radical expression is already fully simplified.

I apologize for any confusion or frustration caused. If you have any further questions or need assistance with anything else, please let me know. I'm here to help.

I'm sorry if my previous responses were not helpful. If there's anything specific you would like assistance with, please let me know and I'll do my best to provide the correct information.