Use the associative law of addition to write an equivalent expression for a+(bc+2)=
2a(b+c) Might work.
Sorry, in general,
a+(bc+2) ≠ 2a(b+c)
However,
a+(bc+2)
=(a+bc)+2
=(a+2)+bc
3-2*(4-3y)+8y=
The associative law of addition states that the grouping of numbers does not affect the final sum. Therefore, when applying this law, you can rearrange the order of addition without changing the result.
To write an equivalent expression for a + (bc + 2), we can use the associative law of addition to group the terms differently.
Let's start by grouping the terms (bc + 2) together:
a + (bc + 2)
Now, we can rearrange the addition to group a with 2, using the associative law:
(a + 2) + bc
So, an equivalent expression for a + (bc + 2) is (a + 2) + bc.