%5E2.jpeg "(4a-7)^2")
Expanding (4a-7)^2
The expression (4a-7)^2 represents the square of the binomial (4a-7). To expand it, we can use the FOIL method or the square of a binomial formula.
Using the FOIL Method
FOIL stands for First, Outer, Inner, Last. It helps us remember the order in which to multiply the terms of the binomials:
- First: Multiply the first terms of each binomial: (4a) * (4a) = 16a²
- Outer: Multiply the outer terms of the binomials: (4a) * (-7) = -28a
- Inner: Multiply the inner terms of the binomials: (-7) * (4a) = -28a
- Last: Multiply the last terms of each binomial: (-7) * (-7) = 49
Now, add all the products: 16a² - 28a - 28a + 49
Combining like terms, we get the final expanded form: 16a² - 56a + 49
Using the Square of a Binomial Formula
The square of a binomial formula states: (a - b)² = a² - 2ab + b²
Applying this formula to our problem:
- a = 4a
- b = 7
Substitute these values into the formula: (4a)² - 2(4a)(7) + 7²
Simplifying the expression: 16a² - 56a + 49
Therefore, the expanded form of (4a-7)² is 16a² - 56a + 49, regardless of the method used.