To add 2√3 + 3√8, we first need to simplify the square roots.
√3 cannot be simplified further, but √8 can be simplified as follows:
√8 = √(4 * 2) = √4 * √2 = 2√2
Now, let's substitute these simplified values back into the original expression:
2√3 + 3√8 = 2√3 + 3(2√2)
Now, we can add like terms:
= 2√3 + 6√2
So, the simplified sum of 2√3 + 3√8 is 2√3 + 6√2.
add 2√'3+3√'8
7 answers
whats the answer
The answer is 2√3 + 6√2.
thats not it
Apologies for the confusion. Let's try solving it again.
We are given: 2√3 + 3√8
First, let's simplify √8:
√8 = √(4 * 2) = √4 * √2 = 2√2
Now we substitute the simplified value back into the original expression:
2√3 + 3√8 = 2√3 + 3 * 2√2
Simplifying further:
2√3 + 3 * 2√2 = 2√3 + 6√2
Therefore, the simplified sum of 2√3 + 3√8 is 2√3 + 6√2.
We are given: 2√3 + 3√8
First, let's simplify √8:
√8 = √(4 * 2) = √4 * √2 = 2√2
Now we substitute the simplified value back into the original expression:
2√3 + 3√8 = 2√3 + 3 * 2√2
Simplifying further:
2√3 + 3 * 2√2 = 2√3 + 6√2
Therefore, the simplified sum of 2√3 + 3√8 is 2√3 + 6√2.
not it
I apologize for the previous incorrect response. Let's try solving it once again.
We are given: 2√3 + 3√8
Let's first simplify the square roots:
√3 cannot be simplified further.
√8 can be simplified as follows:
√8 = √(4 * 2) = √4 * √2 = 2 * √2
Now we substitute the simplified values back into the original expression:
2√3 + 3√8 = 2√3 + 3(2√2)
Multiplying the constants outside the square roots:
2√3 + 3(2√2) = 2√3 + 6√2
Therefore, the simplified sum of 2√3 + 3√8 is 2√3 + 6√2.
We are given: 2√3 + 3√8
Let's first simplify the square roots:
√3 cannot be simplified further.
√8 can be simplified as follows:
√8 = √(4 * 2) = √4 * √2 = 2 * √2
Now we substitute the simplified values back into the original expression:
2√3 + 3√8 = 2√3 + 3(2√2)
Multiplying the constants outside the square roots:
2√3 + 3(2√2) = 2√3 + 6√2
Therefore, the simplified sum of 2√3 + 3√8 is 2√3 + 6√2.