Add root(22, 3) + 3sqrt(22) + sqrt(22) (1 point)

To simplify the expression, let's calculate each term separately:

First term: root(22, 3) = the cube root of 22.
Second term: 3sqrt(22) = 3 multiplied by the square root of 22.
Third term: sqrt(22) = the square root of 22.

Now let's combine the terms:
root(22, 3) + 3sqrt(22) + sqrt(22) = the cube root of 22 + 3 times the square root of 22 + the square root of 22.

We can see that the terms 3sqrt(22) and sqrt(22) are both multiplying the square root of 22, so we can add them together to make 4sqrt(22):
root(22, 3) + 3sqrt(22) + sqrt(22) = the cube root of 22 + 4 times the square root of 22.

Therefore, the simplified expression is root(22, 3) + 3sqrt(22) + sqrt(22) = root(22, 3) + 4sqrt(22).