What is 194 in radical form?
Answer (3)
The **radical **form of 194 = √2 x √97
To find the radical form of 194,
we need to factorize it into its** prime factors.**
So, let's start by dividing 194 by the smallest prime factor , which is 2,
⇒ 194 ÷ 2 = 97
We can see that 97 is a prime number,
so we can't divide it any further.
Therefore, the prime factorization of 194 is,
⇒ 194 = 2 x 97
Now, we can write the** radical form** of 194,
⇒√194 = √(2 x 97)
We can simplify this expression by breaking it down into the product of two separate** square **roots:
⇒ √(2 x 97) = √2 x √97
⇒The radical form of 194 is √2 x √97.
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194 in radical form is just √194. I don't believe any square roots go into it. Hope that helps. :)
The radical form of 194 is expressed as 2 × 97 . This is achieved through prime factorization of the original number. The prime factors are 2 and 97, both of which are prime numbers.
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