%E2%8B%853%2B(2n%2B2)%E2%8B%854.jpeg "(3n+6)⋅3+(2n+2)⋅4")
Simplifying the Expression (3n+6)⋅3+(2n+2)⋅4
This article aims to guide you through simplifying the algebraic expression (3n+6)⋅3+(2n+2)⋅4. We will utilize the distributive property and combine like terms to achieve a simplified form.
Applying the Distributive Property
The distributive property states that for any numbers a, b, and c:
- a(b+c) = ab + ac
We will apply this property to both parts of our expression:
- (3n+6)⋅3 = 3n⋅3 + 6⋅3 = 9n + 18
- (2n+2)⋅4 = 2n⋅4 + 2⋅4 = 8n + 8
Combining Like Terms
Now we have:
(3n+6)⋅3+(2n+2)⋅4 = 9n + 18 + 8n + 8
We can combine the terms with 'n' and the constant terms:
= (9n + 8n) + (18 + 8)
= 17n + 26
Final Simplified Form
Therefore, the simplified form of the expression (3n+6)⋅3+(2n+2)⋅4 is 17n + 26.