Add 2√8+3√8
To simplify 2√8 + 3√8, we can combine the terms with the same radical. In this case, both terms have a square root of 8.
2√8 + 3√8 = (2 + 3)√8 = 5√8
So, 2√8 + 3√8 simplifies to 5√8.
To simplify the expression 2√8 + 3√8, we can first combine the like terms. Both terms have a square root of 8, so we can add them together.
2√8 + 3√8 = (2 + 3)√8
Simplifying further,
(2 + 3)√8 = 5√8
Therefore, 2√8 + 3√8 simplifies to 5√8.
To add 2√8 and 3√8, we need to first simplify each term by finding the square root of 8. Then, we can combine like terms.
sqrt(8) can be simplified as follows:
The square root of 8 can be expressed as the square root of 4 times the square root of 2.
sqrt(8) = sqrt(4) * sqrt(2) = 2 * sqrt(2)
Now, we can substitute this back into the original expression:
2√8 + 3√8 = 2(2√2) + 3(2√2)
Next, we can distribute the coefficients:
= 4√2 + 6√2
Finally, we can combine like terms:
= (4 + 6)√2
So, the simplified answer is 10√2.