= (4b^2 - 2)/3b + b/(b+2)
= (4b^2 - 2 + 3b^2(b+2))/(3b(b+2))
= (4b^2 - 2 + 3b^3 + 6b^2)/(3b(b+2))
= (10b^2 + 3b^3 - 2)/(3b(b+2))
Add.
4b-2/3b + b/b+2
5 answers
is the full answer really (10b^2 + 3b^3 - 2)/(3b(b+2))?
Apologies for the confusion in my previous response. Let's reevaluate the expression:
4b - 2/3b + b/(b+2)
To combine the terms, first find a common denominator:
= (4b(b+2) - 2(b+2) + 3b^2) / (3b(b+2))
= (4b^2 + 8b - 2b - 4 + 3b^2) / (3b(b+2))
= (7b^2 + 6b - 4) / (3b(b+2))
Thus, the simplified form of the expression is (7b^2 + 6b - 4) / (3b(b+2)).
4b - 2/3b + b/(b+2)
To combine the terms, first find a common denominator:
= (4b(b+2) - 2(b+2) + 3b^2) / (3b(b+2))
= (4b^2 + 8b - 2b - 4 + 3b^2) / (3b(b+2))
= (7b^2 + 6b - 4) / (3b(b+2))
Thus, the simplified form of the expression is (7b^2 + 6b - 4) / (3b(b+2)).
just to clarify, not saying you are wrong. but this is the correct answer now, yes?
Yes, the correct answer for the expression 4b - 2/3b + b/(b+2) is:
(7b^2 + 6b - 4) / (3b(b+2))
Thank you for asking for clarification.
(7b^2 + 6b - 4) / (3b(b+2))
Thank you for asking for clarification.