Answer:
See explanation
Step-by-step explanation:
A 3rd degree binomial with a constant term of 8
A binomial expression is an expression which has only terms such as: x² + 5
The degree of a polynomial is the term with the highest exponent on its variable.
Example: the expression above x² + 5
The exponent of variable, x is 2
So, it is a 2nd degree polynomial
We also have 1st degree polynomial where the highest exponent on the variable is 1
3rd degree polynomial where the highest exponent on the variable is 3
A 3rd degree binomial with a constant term of 8
1. There must be a variable, let say x
2. The highest exponent on the variable must be 3
3. There must be a constant 8
4. The expression must have two terms only
It could be x² + 8 where the coefficient of x is 1
2x² + 8
3x² + 8
It could take any form as long as the highest exponent on the variable is 3 and there are just two terms
