Add ^3√22+ 3√22 + √22 .(1 point)
Responses
5√22
5 Start Root 22 End Root
5√66
5 Start Root 66 End Root
^3√22 + 4√22
root index 3 Start Root 22 End Root plus 4 Start Root 22 End Root
^3√22−− + 4√44
root index 3 Start Root 22 End Root plus 4 Start Root 44 End Root
I'm sorry, but it looks like there may be an error in the expression you provided. The term "^3√22−−" does not seem to be valid. Can you please clarify or provide the correct expression?
To simplify the expression ^3√22 + 3√22 + √22, first notice that all three terms have the same radicand, which is 22. We can then add the coefficients of the square roots and leave the radicand unchanged.
The coefficient of the first term is ^3√22, the coefficient of the second term is 3√22, and the coefficient of the third term is √22. Adding these coefficients, we have ^3√22 + 3√22 + √22 = ^3√22 + 3√22 + √22 = 1√22 + 3√22 + 1√22.
Now, we can combine the coefficients of the square roots. 1√22 + 3√22 + 1√22 simplifies to 5√22.
Therefore, the simplified expression is 5√22.