Answer:
-15
Step-by-step explanation:
We proceed as follows;
In this question, we want to fill in the blank so that we can have the resulting expression expressed as the product of two different linear expressions.
Now, what to do here is that, when we factor the first two expressions, we need the same kind of expression to be present in the second bracket.
Thus, we have;
2a(b-3) + 5b + _
Now, putting -15 will give us the same expression in the first bracket and this gives us the following;
2a(b-3) + 5b-15
2a(b-3) + 5(b-3)
So we can have ; (2a+5)(b-3)
Hence the constant used is -15
Answer:
lokókà
haha
Step-by-step explanation:
góbôńìkásó
Answer:
14
Step-by-step explanation:
5 - ( - 9 ) = 5 + 9 = 14
The double negative becomes positive.
-Chetan K
-x on both sides to get
x=15
The range of the function 8x + y = -3 at the domain {−3, 1, 2, 4} is {21, -11, -19, -35}
<h3>How to determine the range of the function?</h3>
From the question, we have the following equation that can be used in our computation:
8x + y = -3
Start by making the variable y the subject of the formula
So, we have
y = -8x - 3
Using the domain = {−3, 1, 2, 4} the values in the range are calculated as follows
y = -8 x -3 - 3 = 21
y = -8 x 1 - 3 = -11
y = -8 x 2 - 3 = -19
y = -8 x 4 - 3 = -35
When these values are combined, we have the notation to be:
{21, -11, -19, -35}
So, the range is {21, -11, -19, -35}
Read more about range at
brainly.com/question/29238637
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<u>Complete question</u>
What is the answer to this question? 8x+y=-3
domain = {−3, 1, 2, 4}
Write the range of y using set notation.