Which of these expressions is equivalent to [tex]$5.8 \div 1.15$[/tex]?

A. [tex]$0.58 \div 115$[/tex]

B. [tex]$5.8 \div 115$[/tex]

C. [tex]$58 \div 115$[/tex]

D. [tex]$580 \div 115$[/tex]

To solve the problem of figuring out which expression is equivalent to [tex]$5.8 \div 1.15$[/tex], we need to evaluate the division:

1. Calculate the value of [tex]$5.8 \div 1.15$[/tex], which gives us approximately [tex]$5.0435$[/tex].

2. Now let's evaluate each option to see which one is also approximately [tex]$5.0435$[/tex]:

- Option 1: [tex]$0.58 \div 115$[/tex] gives approximately [tex]$0.00504$[/tex].
- Option 2: [tex]$5.8 \div 115$[/tex] gives approximately [tex]$0.05043$[/tex].
- Option 3: [tex]$58 \div 115$[/tex] gives approximately [tex]$0.5043$[/tex].
- Option 4: [tex]$580 \div 115$[/tex] gives approximately [tex]$5.0435$[/tex].

3. Compare the results. The expression [tex]$580 \div 115$[/tex] is equivalent to [tex]$5.8 \div 1.15$[/tex] because they both result in approximately [tex]$5.0435$[/tex].

Therefore, the expression equivalent to [tex]$5.8 \div 1.15$[/tex] is [tex]$580 \div 115$[/tex].

Which of these expressions is equivalent to [tex]$5.8 \div 1.15$[/tex]?A. [tex]$0.58 \div 115$[/tex]B. [tex]$5.8 \div 115$[/tex]C. [tex]$58 \div 115$[/tex]D. [tex]$580 \div 115$[/tex]

Answer :

Other Questions

Which of these expressions is equivalent to [tex]$5.8 \div 1.15$[/tex]?

A. [tex]$0.58 \div 115$[/tex]

B. [tex]$5.8 \div 115$[/tex]

C. [tex]$58 \div 115$[/tex]

D. [tex]$580 \div 115$[/tex]