Drag each expression to the correct location in the table. Not all expressions will be used.

Jess has dinner at a restaurant. The dinner bill is [tex]\( B \)[/tex] dollars. She pays a 21% tip.

Match the expressions to their correct meanings for Jess.
[tex]\[0.21 B \quad \frac{B}{0.21 B} \quad 2.1 B \quad B + 0.21 B \quad B\][/tex]

\begin{tabular}{|l|l|l|}
\hline
\begin{tabular}{c}
Jess's bill amount \\
without tip
\end{tabular} & Jess's tip amount & Jess's total amount \\
\hline
[tex]\( B \)[/tex] & [tex]\( 0.21 B \)[/tex] & [tex]\( B + 0.21 B \)[/tex] \\
\hline
\end{tabular}



Answer :

Alright, let's break down the given problem and match the provided expressions to their correct meanings based on the given scenario.

Jess’s bill amount without tip is simply the cost of the dinner, which is represented by [tex]\( B \)[/tex].

Jess’s tip amount is based on a percentage of the bill amount. Given the problem, she pays a 21% tip, which can be written as [tex]\( 0.21 \times B \)[/tex], or more simply presented as [tex]\( 0.21 B \)[/tex].

Jess’s total amount is the sum of the bill amount without the tip and the tip amount. Therefore, this total can be expressed as:
[tex]\[ B + 0.21 B \][/tex]

Now, let’s fill in the table with the correct expressions:

[tex]\[ \begin{tabular}{|l|l|l|} \hline \begin{tabular}{c} Jess's bill amount \\ without tip \end{tabular} & Jess's tip amount & Jess's total amount \\ \hline B & 0.21 B & B + 0.21 B \\ \hline \end{tabular} \][/tex]

Here are the assignments again for clarity:
- Jess's bill amount without tip: [tex]\( B \)[/tex]
- Jess's tip amount: [tex]\( 0.21 B \)[/tex]
- Jess's total amount: [tex]\( B + 0.21 B \)[/tex]

This structured alignment helps to visualize the breakdown of Jess's payment in a clear and organized manner.