Question

I AM ASKING AGAIN HELP GUYZ

Answer 1

Answer: Heya! ~

• 8f + 4g also 4(2f + g) and 4f + 4f+ 4g

Explanation:

Given: Expression 2(4f + 2g)

We have to choose an equivalent expression to the given expression 2(4f + 2g)

Consider the given expression 2(4f + 2g)

Apply Distributive property, a( b + c) =ab + ac

We have,

a = 2, b = 4f and c = 2g

2(4f + 2g) = 8f + 4g

Now, take 4 common from each term, we have,

8f + 4f = 4 (2f + g)

Now, We have,

a = 2, b = 4f and c = 2g

2(4f + 2g) = 8f + 4g

Now, take 4 common from each term, we have,

8f + 4f = 4 (2f + g)

Now, an equivalent expression to the given expression 2(4f + 2g) is 8f + 4g and 4 (2f + g)

- Keira

Answer 2

`\huge\boxed{\sf C, \ D \ and \ E}`

Explanation:

Given expression:

= 2(4f + 2g)

Distribute 2 to both terms.

= 8f + 4g

We can also split 8f into 4f and 4f.

= 4f + 4f + 4g

If we take 4 common

= 4(f + f + g)

= 4(2f + g)

`\rule[225]{225}{2}`