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The first- and second-year enrollment values for a technical school are shown in the table below: Enrollment at a Technical School Year (x) First Year f(x) Second Year s(x) 2009 785 756 2010 740 785 2011 690 710 2012 732 732 2013 781 755 Which of the following statements is true based on the data in the table? The solution to f(x) = s(x) is x = 2012. The solution to f(x) = s(x) is x = 732. The solution to f(x) = s(x) is x = 2011. The solution to f(x) = s(x) is x = 710.

Respuesta :

Edufirst

Answer:

  • The solution to f(x) = s(x) is x = 2012.

Explanation:

Rewrite the table and the choices for better understanding:

Enrollment at a Technical School

Year (x)       First Year f(x)      Second Year s(x)

2009                  785                        756

2010                   740                        785

2011                    690                        710

2012                   732                         732

2013                   781                          755

Which of the following statements is true based on the data in the table?

  • The solution to f(x) = s(x) is x = 2012.
  • The solution to f(x) = s(x) is x = 732.
  • The solution to f(x) = s(x) is x = 2011.
  • The solution to f(x) = s(x) is x = 710.

Solution

The question requires to find which of the options represents the solution to f(x) = s(x).

That means that you must find the year (value of x) for which the two functions, the enrollment the first year, f(x), and the enrollment the second year s(x), are equal.

The table shows that the values of f(x) and s(x) are equal to 732 (students enrolled) in the year 2012, x = 2012.

Thus, the correct choice is the third one:

  • The solution to f(x) = s(x) is x = 2012.
qwerty7571

Answer:

2012

732 is not the answer

2012 is the year they are the same

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