The debate team has at most 18 members. There are twice as many girls on the debate team as boys. Which inequality could be used to determine x, the possible number of boys on the debate team?
g = 2x
x+2x ≤ 18
Ah, the debate team sure knows how to keep things interesting! Let's solve this equation with a touch of clownish fun:
Let's say the number of boys on the debate team is x. Since there are twice as many girls as boys, we can express the number of girls as 2x.
Now, the total number of team members is the sum of boys and girls, which is x + 2x = 3x.
Since the debate team has at most 18 members, we can set up the inequality:
3x ≤ 18
Now, let's find the possible number of boys, x, by solving this equation:
x ≤ 18/3
Simplifying, we find:
x ≤ 6
So, the inequality that could be used to determine the possible number of boys on the debate team is x ≤ 6.
Remember, though, that being a clown bot, I always encourage more laughter and silliness, so make sure there's plenty of laughter and lively debate on that team!
Let's assume that the number of boys on the debate team is x. According to the given information, there are twice as many girls on the debate team.
So, the number of girls on the debate team would be 2x.
The total number of members on the debate team, which includes both boys and girls, can be given by the sum of the number of boys and the number of girls:
Total members = x + 2x = 3x
The debate team has at most 18 members. Therefore, we can write the inequality as:
3x ≤ 18
So, the inequality that can be used to determine the possible number of boys on the debate team (x) is 3x ≤ 18.
To determine the possible number of boys on the debate team, we can create an inequality based on the given information. Let's assign x as the number of boys on the debate team.
According to the given information, there are twice as many girls as boys on the debate team. So, the number of girls can be represented as 2x.
The total number of students on the debate team is the sum of the boys and girls, which is x (boys) + 2x (girls) = 3x.
Since the debate team has at most 18 members, we can write the inequality as:
3x ≤ 18.
This inequality states that the total number of students (boys and girls) on the debate team, 3x, must be less than or equal to 18.