(2%2B2n)-in-standard-form.jpeg "(5n-5)(2+2n) In Standard Form")
Expanding and Simplifying (5n-5)(2+2n)
This article will demonstrate how to expand and simplify the expression (5n-5)(2+2n) into standard form.
Understanding Standard Form
Standard form for a polynomial refers to writing it in descending order of powers of the variable, with each term separated by a plus or minus sign. For example, a quadratic expression in standard form would look like ax² + bx + c.
Expanding the Expression
To expand the given expression, we can use the FOIL method, which stands for:
- First: Multiply the first terms of each binomial.
- Outer: Multiply the outer terms of the binomials.
- Inner: Multiply the inner terms of the binomials.
- Last: Multiply the last terms of each binomial.
Applying this to our expression:
- First: (5n) * (2) = 10n
- Outer: (5n) * (2n) = 10n²
- Inner: (-5) * (2) = -10
- Last: (-5) * (2n) = -10n
Now we have: 10n + 10n² - 10 - 10n
Simplifying the Expression
To simplify, we combine like terms:
10n² + (10n - 10n) - 10
This results in: 10n² - 10
The Final Answer
Therefore, the expression (5n-5)(2+2n) in standard form is 10n² - 10.