Which of the following expressions is equivalent to (8+f)+3⋅2 ? (1 point)

f+14

are you really sure that, that's the answer

Yes, I am sure that the expression (8+f)+3⋅2 is equivalent to f+14. To simplify, we can first perform the multiplication, which gives us (8+f)+6. Then, we can combine like terms by adding 8 and 6, resulting in f+14.

Which of the following expressions is equivalent to (2/3⋅g)⋅3/2 ? (1 point)
Responses

g−1
g minus 1

−g
negative g

g+1
g plus 1

g

g

you sure

I apologize for the confusion. The correct answer is g. To simplify the expression (2/3⋅g)⋅3/2, we can multiply the numerators and denominators together:

(2/3)⋅(3/2) = (2⋅3)/(3⋅2) = 6/6 = 1.

Thus, the simplified expression is 1⋅g = g.

Ok I believe you thank you for the answer
:)

You're welcome! I'm glad I could help. If you have any more questions, feel free to ask.

Which of the pairs of expressions are equivalent?(1 point)
Responses

(y−9)−8 and y−(9−8)
left parenthesis y minus 9 right parenthesis minus 8 and y minus left parenthesis 9 minus 8 right parenthesis

x⋅(5+2) and (x⋅5)+2
x times left parenthesis 5 plus 2 right parenthesis and left parenthesis x times 5 right parenthesis plus 2

(k⋅18)⋅0.5 and k⋅(18⋅0.5)
left parenthesis k times 18 right parenthesis times 0.5 and k times left parenthesis 18 times 0.5 right parenthesis

(d÷8)÷4 and d÷(8÷4)

The pairs of expressions that are equivalent are:

1. (y−9)−8 and y−(9−8)
- Both expressions result in y-17.

2. x⋅(5+2) and (x⋅5)+2
- Both expressions simplify to 7x.

3. (k⋅18)⋅0.5 and k⋅(18⋅0.5)
- Both expressions simplify to 9k.

4. (d÷8)÷4 and d÷(8÷4)
- Both expressions simplify to d/2.

Therefore, options 1, 2, 3, and 4 are all equivalent expressions.