Question
Simplify 1327−−√ .(1 point)
Responses
This radical expression is already fully simplified.
This radical expression is already fully simplified.
393–√
39 start root 3 end root
163–√
Responses
This radical expression is already fully simplified.
This radical expression is already fully simplified.
393–√
39 start root 3 end root
163–√
Answers
GPT-4o mini
To simplify the expression \(\sqrt{1327}\), we first look for perfect squares that might divide 1327.
Upon checking, the factors of 1327 can be examined:
1. Find the prime factorization of 1327:
- 1327 is not divisible by 2, 3, 5, 7, 11, 13, etc.
- It turns out that 1327 is actually a prime number.
Since 1327 has no perfect square factors (other than 1), the square root, \(\sqrt{1327}\), cannot be simplified into a simpler radical form.
Thus, the statement "This radical expression is already fully simplified" is correct.
So, the answer is:
**This radical expression is already fully simplified.**
Upon checking, the factors of 1327 can be examined:
1. Find the prime factorization of 1327:
- 1327 is not divisible by 2, 3, 5, 7, 11, 13, etc.
- It turns out that 1327 is actually a prime number.
Since 1327 has no perfect square factors (other than 1), the square root, \(\sqrt{1327}\), cannot be simplified into a simpler radical form.
Thus, the statement "This radical expression is already fully simplified" is correct.
So, the answer is:
**This radical expression is already fully simplified.**
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GPT-4o mini
Let's take another look at \(\sqrt{1327}\).
1. As mentioned earlier, we should check the factors of 1327 to see if it has any perfect square factors.
2. Checking for divisibility by small primes:
- 1327 is not divisible by 2 (it's odd).
- The sum of the digits in 1327 (1 + 3 + 2 + 7 = 13) is not divisible by 3.
- It does not end with 0 or 5, so it is not divisible by 5.
- We check up to around the square root of 1327, which is approximately 36.4.
Upon confirming the calculations, it turns out:
- The prime factorization of 1327 is \(7 \times 191\) (both of which are prime numbers).
- Since neither 7 nor 191 is a perfect square, \(\sqrt{1327}\) does not simplify further.
Given this reevaluation, I can confidently say that \(\sqrt{1327}\) is indeed already in its simplest form.
So the answer remains:
**This radical expression is already fully simplified.**
1. As mentioned earlier, we should check the factors of 1327 to see if it has any perfect square factors.
2. Checking for divisibility by small primes:
- 1327 is not divisible by 2 (it's odd).
- The sum of the digits in 1327 (1 + 3 + 2 + 7 = 13) is not divisible by 3.
- It does not end with 0 or 5, so it is not divisible by 5.
- We check up to around the square root of 1327, which is approximately 36.4.
Upon confirming the calculations, it turns out:
- The prime factorization of 1327 is \(7 \times 191\) (both of which are prime numbers).
- Since neither 7 nor 191 is a perfect square, \(\sqrt{1327}\) does not simplify further.
Given this reevaluation, I can confidently say that \(\sqrt{1327}\) is indeed already in its simplest form.
So the answer remains:
**This radical expression is already fully simplified.**