7√99 simplify
To simplify 7√99, we can simplify the square root of 99 first. The prime factorization of 99 is 3 * 3 * 11. Since √(3 * 3 * 11) = √(9 * 11), we can simplify it to 3√11.
Therefore, 7√99 simplifies to 7(3√11) = 21√11.
To simplify 7√99, we can start by finding the prime factorization of 99.
Prime factorization of 99:
99 = 3 * 3 * 11
Now, we can simplify the square root of 99:
√99 = √(3 * 3 * 11) = 3√11
Finally, we can multiply 7 and 3√11 to get the simplified form:
7√99 = 7 * 3√11 = 21√11
Therefore, 7√99 simplifies to 21√11.
To simplify √99, we first need to find the prime factors of 99.
99 = 3 * 3 * 11
Since there is no perfect square factor in 99, we can't simplify the square root entirely.
So, the simplified form of √99 is: √(3 * 3 * 11)
With the help of the square root property, we can separate the square roots of the factors:
√99 = √(3 * 3 * 11)
Using the property √(ab) = √a * √b, we can simplify it further:
√99 = √(3 * 3 * 11) = √3 * √3 * √11
Since √3 * √3 is simply 3 (the square root of 3 times itself), we have:
√99 = 3√11
Therefore, the simplified form of √99 is 3√11.