Question

Simplify {(5)^3-(2+3)/(10)

Answer 1

Is this it? Or is the 10 only under 2 + 3?
\( \dfrac{ (5)^3-(2+3)}{10} \)

Answer 2

You have an open bracket, but you didn't close it, so it's hard to understand what you meant.

Answer 3

only under 2+3

Answer 4

Ok. I'll try again.

This?

\(5^3- \dfrac{2+3}{10}\)

Answer 5

If so, start by cubing the 5.
What is 5^3 = ?

Answer 6

\[5^{3}- (2+3)/10 \] this is what i see

Answer 7

75

Answer 8

\[5^3-\frac{2+3}{10}=125-\frac{1}{2}=\frac{249}{2} \]

Answer 9

\(5^5 = 5 \times 5 \times 5 = 125\)

\(5^3- \dfrac{2+3}{10}\)

\(= 125 - \dfrac{2+3}{10}\)

Now we work on the numerator of the fraction: 2 + 3

\(= 125 - \dfrac{5}{10}\)

\(=125 - 0.5\)

Finally, we subtract:

\(= 124.5\)

Answer 10

the answers are A.12 B.123 and C.7/10 i have the answer i just wanted to see you my teacher got it the answer is A @mathstudent55

Answer 11

@robtobey

Answer 12

->{ (5)^3-(2+3)/(10)
The closing brace is missing. Where is it to be placed?

Answer 13

@AlanaLeigh14
Notice that the problem we solved does not have any of the answers you listed as choices.
Maybe the problem is like this:

\(5^3- \dfrac{10}{2 + 3} = 125 - \dfrac{10}{5} = 125 - 2 = 123\)