To explain the equation ( -14 + (3/2)b) - (1 + (8/2)b), we can break it down step by step.
First, inside the first parentheses, we have -14 + (3/2)b.
-14 is a constant term that is being subtracted.
(3/2)b represents a fraction multiplied by the variable b.
Adding these two terms together, we get -14 + (3/2)b.
Next, inside the second parentheses, we have 1 + (8/2)b.
1 is a constant term that is being added.
(8/2)b represents another fraction multiplied by the variable b.
Adding these two terms together, we get 1 + (8/2)b.
Finally, we subtract the entire expression inside the second parentheses from the expression inside the first parentheses.
This can be written as ( -14 + (3/2)b) - (1 + (8/2)b).
To simplify this further, we can distribute the negative sign into the second parentheses:
-14 + (3/2)b - 1 - (8/2)b.
Now, we can combine like terms:
-14 - 1 + (3/2)b - (8/2)b.
This simplifies to:
-15 - (5/2)b.
So, the equation ( -14 + (3/2)b) - (1 + (8/2)b) is equivalent to -15 - (5/2)b.
explain this equation
( \text{-}14 + \frac{3}{2} b) - ( 1 + \frac{8}{2} b)
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