Answer:
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Explanation:
To simplify the expression I/17(5r - 3)(13x + 4)9, we can follow the order of operations (PEMDAS/BODMAS) and simplify each part step by step.
Step 1: Simplify the expression within the parentheses (5r - 3)(13x + 4):
Multiply the terms using the distributive property:
(5r - 3)(13x + 4) = 65rx + 20r - 39x - 12
Step 2: Simplify the expression I/17(65rx + 20r - 39x - 12)9:
Multiply the terms using the distributive property:
I/17(65rx + 20r - 39x - 12)9 = (I * 65rx)/17 + (I * 20r)/17 - (I * 39x)/17 - (I * 12)/17
Step 3: Simplify further if there are any common factors that can be canceled out.
For example, if I and 17 have a common factor, they can be canceled out to simplify the expression even further.
However, since there are no other common factors among the terms in the expression, we cannot simplify it any further.
Therefore, the simplified expression is:
(I * 65rx)/17 + (I * 20r)/17 - (I * 39x)/17 - (I * 12)/17