Answer:
[tex]2(\frac{3}{4}x+7)+(-3)(\frac{1}{2}x+(-5))[/tex]
[tex]2(\frac{3}{4}x)+2(7)+(-3)(\frac{1}{2}x)+(-3)(-5)[/tex]
Step-by-step explanation:
The original expression given in the text is
[tex]2(\frac{3}{4}x+7)-3(\frac{1}{2}x-5)[/tex] (1)
And we want to check to what other expressions is equivalent. First of all, we solve it by writing explicitely each term:
[tex]\frac{3}{2}x+14-\frac{3}{2}x+15[/tex] (2)
Let's verify each of the other expressions separately. For the first one:
[tex]2(\frac{3}{4}x+7)+(-3)(\frac{1}{2}x+(-5))[/tex]
We see that this is equivalent to expression (1), since the first half is identical, while in the second one, the combination "+-" can be simply written as "-", so we get
[tex]2(\frac{3}{4}x+7)-3(\frac{1}{2}x-5)[/tex]
Which is equivalent to (1).
For the 2nd one:
[tex]2(\frac{3}{4}x)+2(7)+3(\frac{1}{2}x)+3(-5)[/tex]
This is not equivalent. In fact, here we have applied the distributive property to each term: however, the 3rd and 4th term are not correct, because the (3) must be negative (-3), as in the original expression.
If we write it explicitely in fact, we get
[tex]\frac{3}{2}x+14+\frac{3}{2}x-15[/tex]
Which is different from (2).
For the 3rd one:
[tex]2(\frac{3}{4}x)+2(7)+(-3)(\frac{1}{2}x)+(-3)(-5)[/tex]
This one is equivalent. In fact, here we have applied the distributive property correctly. By solvign each term we get:
[tex]\frac{3}{2}x+14-\frac{3}{2}x+15[/tex]
