Bo Is Buying A Board Game That Usually Costs $B$ Dollars. The Game Is On Sale, And The Price Has Been Reduced By 18 % 18 \% 18% .Which Of The Following Expressions Could Represent How Much Bo Pays For The Game?Choose 2 Answers:A.

**Bo is Buying a Board Game: A Math Problem** =====================================================

Understanding the Problem

Bo is buying a board game that usually costs $B$ dollars. The game is on sale, and the price has been reduced by $18 \%$. We need to find an expression that represents how much Bo pays for the game.

Step 1: Calculate the Discount

To calculate the discount, we need to find $18 \%$ of the original price $B$. This can be done by multiplying $B$ by $0.18$.

$$\text{Discount} = B \times 0.18$$

Step 2: Calculate the Sale Price

The sale price is the original price minus the discount. We can calculate the sale price by subtracting the discount from the original price $B$.

$$\text{Sale Price} = B - (B \times 0.18)$$

Simplifying the Expression

We can simplify the expression by distributing the negative sign to the terms inside the parentheses.

$$\text{Sale Price} = B - 0.18B$$

$$\text{Sale Price} = 0.82B$$

Conclusion

The expression that represents how much Bo pays for the game is $0.82B$. This means that Bo pays $82 \%$ of the original price $B$.

Q&A

Q: What is the original price of the board game?

A: The original price of the board game is $B$ dollars.

Q: What is the discount on the board game?

A: The discount on the board game is $18 \%$ of the original price $B$.

Q: What is the sale price of the board game?

A: The sale price of the board game is $0.82B$ dollars.

Q: What percentage of the original price does Bo pay?

A: Bo pays $82 \%$ of the original price $B$.

Q: Can we represent the sale price as a decimal?

A: Yes, we can represent the sale price as a decimal by multiplying the original price $B$ by $0.82$.

Q: Can we represent the sale price as a fraction?

A: Yes, we can represent the sale price as a fraction by multiplying the original price $B$ by $\frac{82}{100}$.

Q: Can we simplify the expression further?

A: Yes, we can simplify the expression further by dividing both the numerator and the denominator by their greatest common divisor, which is $2$.

$$\text{Sale Price} = \frac{41}{50}B$$

Q: What is the final answer?

A: The final answer is $0.82B$ or $\frac{41}{50}B$.

Final Answer

The final answer is $0.82B$ or $\frac{41}{50}B$.