Question

Write the degree of the given polynomials (t3+4)(t3+9)

Answer 1

Answer:

degree 2

Step-by-step explanation:

t3 × t3 will give us 9t^2 which jas 2 as the index notation therefore it is a degree 2 polynomial

Answer 2

Question :

Write the degree of the given polynomial (t^3+4)(t^3+9)

Answer :

The degree of the given polynomial is 6.

Given :

The polynomial (t^3+4)(t^3+9)

To find :

The degree of the polynomial

Solution :

We need to simplify the polynomial first,

(t^3+4)(t^3+9)

= (t^3 × t^3 + t^3 × 9 + t^3 × 4 + 4 × 9)

= ( t^6 + 9t^3 + 4t^3 + 36 )

= t^6 + 13 t^3 + 36

Degree of a polynomial is the greatest/highest power of a variable in a polynomial equation .

The greatest power of the variable t in the polynomial t^6 + 13 t^3 + 36 is 6.

Hence, the degree of the given polynomial is 6.

#SPJ2

3