Respuesta :
Answer:
Company will hire 3 Engineers of Level 1 and 10 Engineers of level 2.
Step-by-step explanation:
Let the number of engineers for level 1 be x.
Let the number of engineers for level 2 be y.
Given:
Total Number of engineers company can hire = 13
Now Total number of engineers are equal to sum of number of engineers for level 1 and number of engineers for level 2.
Hence Framing in the equation form we get;
[tex]x+y=13 \ \ \ \ equation\ 1[/tex]
Also Given:
Salary of level 1 engineers = $45,000
Salary of level 2 engineers = $65,000
Total Budget of Company = $785,000
But Total Budget of Company depends upon the sum of Salary of level 1 engineers multiplied with number of level 1 engineers and Salary of level 2 engineers multiplied with number of level 2 engineers.
Hence equation can be framed as;
[tex]45000x+65000y = 785000[/tex]
Dividing by 5000 on both side we get;
[tex]\frac{45000x}{5000}+\frac{65000y}{5000}=\frac{785000}{5000}\\\\9x+13y=157 \ \ \ \ equation\ 2[/tex]
Now Multiplying equation 1 by 9 we get;
[tex]9(x+y)=13\times9\\9x+9y= 117 \ \ \ \ equation\ 3[/tex]
Now Subtracting equation 3 from equation 2 we get;
[tex](9x+13y)-(9x-9y)=157-117\\\\9x+13y-9x-9y=40\\\\4y=40\\\\y=\frac{40}{4} =10[/tex]
Now Substituting the value of y in equation 1 we get
[tex]x+y=13\\x+10=13\\x=13-10\\x=3[/tex]
Hence Company will hire 3 Engineers of Level 1 and 10 Engineers of level 2.
