To solve the expression \( \frac{100}{4}(2+3) \), let's break it down step by step:

1. **Parentheses first**:  
   \( 2+3 = 5 \).

2. **Division next**:  
   \( \frac{100}{4} = 25 \).

3. **Multiply**:  
   \( 25 \times 5 = 125 \).

Thus, the value of \( \frac{100}{4}(2+3) \) is **125**.

Would you like more details or have any questions?

Here are 5 related questions:
1. How would the result change if the denominator were different, like \( \frac{100}{5}(2+3) \)?
2. What if the expression had an exponent, like \( \frac{100}{4}(2+3)^2 \)?
3. How does order of operations (PEMDAS) affect solving expressions like this?
4. Can you apply the distributive property to this expression? Why or why not?
5. What happens if you add a negative number inside the parentheses, like \( \frac{100}{4}(2+(-3)) \)?

**Tip**: Always handle parentheses first when solving complex expressions to avoid errors!

Learn how to solve the arithmetic expression 100/4(2+3) step by step using the order of operations (PEMDAS). This example demonstrates key mathematical concepts like division, multiplication, and parentheses. Ideal for students in Grades 6-8.

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