SOLUTION: 2x^2-(4-x^) using the distributive property. multiplying expressions. I need help understanding how to get the correct solution.

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Question 212282This question is from textbook algebra 1
: 2x^2-(4-x^)
using the distributive property.
multiplying expressions.
I need help understanding how to get the correct solution. This question is from textbook algebra 1

Answer by rapaljer(4671) About Me  (Show Source):
You can put this solution on YOUR website!
I'm not sure you stated the problem correctly. At the end of the expression you have x^ but there is no power. I'm going to guess that this was supposed to be squared like this:

2x^2-(4-x^2)

Notice that the 2x^2 is to the LEFT of the subtraction sign that follows it, so it actually has nothing to do with the parentheses. It might help to place a 1 before the parentheses like this:

2x^2-1(4-x^2)
Now, you can write:
2x^2 - 4 + x^2 (If indeed that is what you meant to put there!)

Now, combine like terms:
2x^2 + 1x^2 -4
3x^2 - 4

R^2