Answer :
Step-by-step explanation:
Hey! It's great to hear from you. If I understand correctly, you want to calculate the division of (a+b)+c. To calculate this, we would first evaluate the expression inside the parentheses, which is (a+b), and then divide the result by c. Could you please provide the values of a, b, and c so that I can help you with the calculation? Feel free to share more details or ask any other questions you might have.
Step-by-step explanation:
Let's break down the expression "(a+b)+c" and understand how to simplify or evaluate it step-by-step.
Expression: (a+b) + c
This expression consists of addition operations. To solve it, we follow the standard rules of arithmetic.
Perform the Addition Inside the Parentheses:
First, evaluate the expression inside the parentheses "(a+b)".
(+)
(a+b) simply represents the sum of
a and
b. This is a basic addition operation.
Add the Result of (a+b) to
c:
Once you have calculated
(+)
(a+b), the next step is to add
c to this result.
Example:
Let's use an example to illustrate:
If a=3, b=4, and c=2,
Calculate
((a+b):
((a+b)=3+4=7
Add
c to the result:
(a+b)+c=7+2=9
Therefore,
(a+b)+c=9 when
a=3,
b=4, and
c=2.
Explanation:
Parentheses: The parentheses "(a+b)" indicate that we first perform the addition of
a and b.
Addition with c: Once we have the result from
(a+b), we then add to that result.
Conclusion:
The expression "(a+b) + c" is straightforward in terms of evaluation. It involves performing two sequential addition operations: first adding c to the result. This type of expression is common in mathematics and represents a basic application of addition. If you have specific values for a,b and c, you can substitute them into the expression to find the numerical result.
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