Question

Which statement is true about the factorization of 30x2 + 40xy + 51y2?
The polynomial can be rewritten after factoring as 10(3x2 + 4xy + 5y2). The polynomial can be rewritten as the product of a trinomial and xy.
The greatest common factor of the polynomial is 51x2y2.
The greatest common factor of the terms is 1.

Answer 1

The statement is true about the factorization of 30x2 + 40xy + 51y2? is,

The polynomial can be rewritten after factoring as 10(3x2 + 4xy + 5y2).  

No, the polynomial cannot be rewritten after factoring as 10(3x2 + 4xy + 5y2)

Instead, the polynomial cannot be rewritten in the form of factors, as there are no common terms.

The polynomial can be rewritten as the product of a trinomial and xy.

The equation 30x2 + 40xy + 51y2 is a quadratic equation. The polynomial cannot be rewritten as the product of a trinomial and xy, as there are already 3 terms available. Trinomial means - an equation with 3 terms.

The greatest common factor of the polynomial is 51x2y2.

The greatest common factor of the polynomial  30x2 + 40xy + 51y2 cannot be other than 1 as there are no common terms available among 3.

The greatest common factor of the terms is 1.

Yes, as there are no common terms available, so the greatest common factor of the terms is 1.

Answer 2

Answer:

its D

Step-by-step explanation: