Respuesta :
The GCF Greatest Common Factor, are the largest factors of the terms
of the polynomial, which can be found from by evaluating the polynomial.
Response:
The true statements are;
- GCF of 80, 32 and 48: 16
- GCF of bā“, bĀ², and bā“: bĀ²
- GCF of cĀ³, and c: c
How are the GCF of a polynomial found?
The given polynomial is; 80Ā·bā“ - 32Ā·bĀ²Ā·cĀ³ + 48Ā·bā“Ā·c
The GCF of 80, 32 and 48 = 16
The GCF of bā“, bĀ², and bā“: bĀ²
The GCF of cĀ³, and c: c
GCF of the polynomial: 16Ā·bĀ²
Rewrite as a product of the GCF: 16Ā·bĀ²Ā·(5Ā·bĀ² - 2Ā·cĀ·(cĀ² + 3Ā·bĀ²))
Therefore;
The statements which are true are;
- GCF of 80, 32 and 48: 16
- GCF of bā“, bĀ², and bā“: bĀ²
- GCF of cĀ³, and c: c
Learn more about GCF here:
https://brainly.com/question/363238
