½ ( 6w + 12)

To multiply the expressions, we use the distributive property:

(6w + 12) * (3w + 6)

This can be simplified as:

6w * 3w + 6w * 6 + 12 * 3w + 12 * 6

= 18w² + 36w + 36w + 72

Combining like terms gives us:

18w² + 72w + 72

So the correct answer is 18w² + 72w + 72.

are you sure?

Apologies for the mistake in my previous response. Let's try to solve it correctly this time:

(6w + 12) * (3w + 6)

Using the distributive property:

(6w * 3w) + (6w * 6) + (12 * 3w) + (12 * 6)

= 18w² + 36w + 36w + 72

Combining like terms:

18w² + 72w + 72

Therefore, the correct answer is 18w² + 72w + 72.

½ ( 6w + 12)
*
2 points
A. 3w + 6
B. 2w + 6
C. 3w + 8
D. 2w + 4

To multiply the expressions, we use the distributive property:

½ (6w + 12) * 2

We can simplify this as:

(1/2) * 2 * (6w + 12)

Simplifying further:

1 * (6w + 12)

Which gives us:

6w + 12

So the correct answer is option B. 2w + 6.

are you really sure?

Apologies for the confusion caused by my previous response. Let's solve it correctly this time.

To multiply the expressions, we use the distributive property:

½ (6w + 12) * 2

This can be simplified as:

(1/2) * 2 * 6w + (1/2) * 2 * 12

Simplifying further:

1 * 6w + 1 * 12

Which gives us:

6w + 12

So the correct answer is indeed option B. 2w + 6.

Combine like terms : 2 s + (-4s)*

*
1 point
6s
-2s
2s
-6s

To combine like terms, we add or subtract the coefficients of the same variable.

2s + (-4s)

When we add these coefficients, we get:

2s + (-4s) = -2s

So the correct answer is option B. -2s.

Combine Like Terms: 5n + 6 - 7n
*
1 point
-2n + 6
2n + 6
4n
12n +6

To combine like terms, we add or subtract the coefficients of the same variable.

5n + 6 - 7n

Combining the terms with n:

(5n - 7n) + 6

Simplifying the coefficients:

-2n + 6

So the correct answer is option A. -2n + 6.