Respuesta :
Using distributive property 7(z-4) becomes 7z-28
Given :
the distributive property to simplify 7(z-4)
Distributive property is an algebraic property that is used to multiply a single term inside the parenthesis that has set of terms.
Distributive property [tex]a(b+c)=ab+ac[/tex]
'a' is distributed inside the parenthesis
Multiply 'a' with each term inside the parenthesis
7(z-4)
Here , we distribute 7. Multiply 7 inside the parenthesis
[tex]7(z-4)=7\cdot z= 7\cdot 4=7z-28[/tex]
Using distributive property 7(z-4) becomes 7z-28
Learn more : brainly.com/question/4077386
Answer:
[tex]\rm{7z-28[/tex]
Step-by-step explanation:
Hi there!
Let's clarify what the Distributive Property means.
It states that
a(b+c)=ab+ac (We take a number a, multiply it by b and c, and add the products)
Now, let's simplify:
7(z-4)
7z-28
Thus, 7z-28 is our final answer.
Hope it helps! Enjoy your day!
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