Certainly! Let's solve the expression step-by-step:
1. Identify and Correct the Expression:
It appears there's a typo or missing element in the expression [tex]$(2+)^2+(6+3)-4$[/tex]. Let's correct and assume the intended expression is [tex]$(2 + 4)^2 + (6 + 3) - 4$[/tex].
2. Calculate Inside the Parentheses:
- For [tex]$(2 + 4)^2$[/tex]:
- Add [tex]$2$[/tex] and [tex]$4$[/tex] to get [tex]$6$[/tex].
- Square the result: [tex]\(6^2 = 36\)[/tex].
- For [tex]$(6 + 3)$[/tex]:
- Add [tex]$6$[/tex] and [tex]$3$[/tex] to get [tex]$9$[/tex].
3. Aggregate the Results:
- Combine the results from the parentheses: [tex]$36$[/tex] (from [tex]$(2 + 4)^2$[/tex]) and [tex]$9$[/tex] (from [tex]$(6 + 3)$[/tex]).
4. Complete the Final Subtraction:
- Sum up [tex]$36$[/tex] and [tex]$9$[/tex] to get [tex]$45$[/tex].
- Subtract [tex]$4$[/tex] from [tex]$45$[/tex]: [tex]$45 - 4 = 41$[/tex].
So, breaking it down:
- [tex]$(2 + 4)^2 = 36$[/tex]
- [tex]$(6 + 3) = 9$[/tex]
- Summing these gives [tex]$36 + 9 = 45$[/tex]
- Finally, subtract [tex]$4$[/tex] yields [tex]$45 - 4 = 41$[/tex]
Therefore, the final result of the expression is:
[tex]$41$[/tex]
