17-simplified.jpeg "(2-4n)17 Simplified")
Simplifying the Expression (2 - 4n)17
In mathematics, simplifying an expression means rewriting it in a simpler form without changing its value. We can simplify the expression (2 - 4n)17 using the distributive property.
The Distributive Property
The distributive property states that: a(b + c) = ab + ac
Applying this to our expression:
(2 - 4n)17 = 17(2 - 4n) = (17 * 2) + (17 * -4n)
Simplifying the Expression
Now, we can simply multiply the terms:
(17 * 2) + (17 * -4n) = 34 - 68n
Therefore, the simplified form of the expression (2 - 4n)17 is 34 - 68n.