Math  /  Algebra

QuestionFactor the polynomial below. 64a3+2764 a^{3}+27

Studdy Solution

STEP 1

What is this asking? We need to rewrite this sum of cubes as a product of simpler expressions. Watch out! Don't forget to fully factor each term before applying the sum of cubes formula!

STEP 2

1. Recognize the Sum of Cubes
2. Apply the Formula
3. Simplify and Present the Result

STEP 3

Hey everyone!
Look closely at our expression: 64a3+2764a^3 + 27.
Notice anything special about the numbers \textbf{64} and \textbf{27}?
They're **perfect cubes**!
We can rewrite \textbf{64} as 434^3 and \textbf{27} as 333^3.
So, our expression becomes (4a)3+33(4a)^3 + 3^3.
This is a **sum of cubes**!

STEP 4

Remember the super helpful sum of cubes formula: x3+y3=(x+y)(x2xy+y2)x^3 + y^3 = (x+y)(x^2 - xy + y^2).
In our case, xx is **4a** and yy is **3**.

STEP 5

Let's **plug these values** into the formula: (4a)3+33=(4a+3)((4a)2(4a)3+32)(4a)^3 + 3^3 = (4a + 3)((4a)^2 - (4a) \cdot 3 + 3^2)

STEP 6

Now, let's **simplify** that second term. (4a)2(4a)^2 becomes 16a216a^2, (4a)3(4a) \cdot 3 is 12a12a, and 323^2 is 99.

STEP 7

Putting it all together, we get: (4a+3)(16a212a+9)(4a + 3)(16a^2 - 12a + 9) Look at that, perfectly factored!

STEP 8

The factored form of 64a3+2764a^3 + 27 is (4a+3)(16a212a+9)(4a + 3)(16a^2 - 12a + 9).

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