Answer:
The option " The sum has degree of 6 , but the difference has a degree of 7 " is correct.
Step-by-step explanation:
Given that the sum and difference of the polynomials 
and 
<h3>Now sum the given polynomials :</h3>
Therefore 
In the simplified <u>sum of the polynomials</u> 
we have <u>the degree is 6</u>
<h3>Now difference the polynomials </h3>
Therefore 
In the simplified <u>difference of polynomials</u> 
we have <u>the degree is 7</u>
Therefore the option " The sum has degree of 6 , but the difference has a degree of 7 " is correct
The correct answer is 11/30
In order to simplify this expression, we need to multiply the numeric values together and the variables together.
So we have:
Therefore the correct option is the third one.
The y answers would be 11, 8, 5, 2, -1.
To find these parts of the table, we simply put the x value in for x and solve for y. The first two are done for you below.
WHEN x = -2
y = -3x + 5
y = -3(-2) + 5
y = 6 + 5
y = 11
WHEN x = -1
y = -3x + 5
y = -3(-1) + 5
y = 3 + 5
y = 8
Answer:
A=6
Step-by-step explanation:
