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Find the largest rational number r for which 5r ≤ 33.

2 Answers

2 votes

Answer:

33/5 or 6.6

Explanation:

Well the most 5r can be is 33, since it has the underline under it, so it's less than or equal to.

So set 5r equal to 33

5r = 33

Divide both sides by 33

r = 33/5

You can leave it in this form or convert it to a decimal which is 6.6

User MethodMan
by
7.9k points
3 votes


\huge\text{Hey there!}


\huge\textbf{Equation: }


\mathsf{5r \leq 33}


\huge\textbf{Simplifying it:}


\mathsf{5r \leq 33}


\huge\textbf{Divide \boxed{5} to both sides:}


\mathsf{(5r)/(5)\leq (33)/(5)}


\huge\textbf{Simplify it:}


\mathsf{r \leq (33)/(5)}


\mathsf{r \leq 6 (3)/(5)}


\mathsf{r \leq 6.60}


\huge\textbf{Therefore, your answer should be:}


\huge\boxed{\mathsf{r \leq (33)/(5)}}


\huge\text{Good luck on your assignment \& enjoy your day!}

~
\frak{Amphitrite1040:)}


\large\textsf{The graph will be labeled down below for you :)}\downarrow

Find the largest rational number r for which 5r ≤ 33.-example-1
User Tim Kist
by
8.2k points

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