Answer:
The inequality can be given as:
[tex]20x+60\leq740[/tex]
where [tex]x[/tex] represents number of seats in each row of the main floor
Each row has 34 seats.
Step-by-step explanation:
Given:
The auditorium can hold at most 740 people.
The balcony holds a maximum of 60 people.
Total number of rows in the main floor = 20
Each row in main floor has same number of seats.
To write an equation to find how many seats there are in each row on the main floor
Solution:
Let the total number of seats in each row of the main floor be = [tex]x[/tex]
Using unitary method.
If each row has [tex]x[/tex] seats
Then, 20 rows will have a total of = [tex]20x[/tex] seats
Balcony can have a total of 60 people.
So, maximum number of people the auditorium can hold can be given as:
⇒ [tex]20x+60[/tex]
The auditorium holds at most 740 people
Thus, the inequality can be given as:
[tex]20x+60\leq740[/tex]
Solving for [tex]x[/tex] :
Subtracting both sides by 60.
[tex]20x+60-60\leq 740-60[/tex]
[tex]20x\leq 680[/tex]
Dividing both sides by 20.
[tex]\frac{20x}{20}\leq \frac{680}{20}[/tex]
[tex]x\leq 34[/tex]
This means each row can hold at most of 34 people.
Thus, each row must have = 34 seats
