In a classroom, there are 6 3rd-grade students and 10 6th-grade students. Express the ratio of 3rd graders to the entire number of students as a fraction.(1 point)
and it's not 3/8
To find the ratio of 3rd graders to the entire number of students, we need to add the number of 3rd graders and 6th graders and then express the number of 3rd graders as a fraction of the total number of students.
In this case, the total number of students is 6 (3rd graders) + 10 (6th graders) = 16.
Therefore, the ratio of 3rd graders to the entire number of students is 6/16.
To express the ratio of 3rd graders to the entire number of students as a fraction, you need to consider the number of 3rd graders and the total number of students in the classroom.
Given that there are 6 3rd-grade students and 10 6th-grade students, the total number of students in the classroom is 6 + 10 = 16.
To express the ratio of 3rd graders to the entire number of students, the fraction would be:
6/16
However, we can simplify this fraction by dividing both the numerator and denominator by their greatest common divisor, which is 2:
6/16 = (6 ÷ 2) / (16 ÷ 2) = 3/8
Therefore, the ratio of 3rd graders to the entire number of students can indeed be expressed as 3/8.
To express the ratio of 3rd graders to the entire number of students as a fraction, we need to determine the total number of students in the classroom.
Given that there are 6 3rd-grade students and 10 6th-grade students, we can add these two numbers together to find the total number of students:
6 (3rd-grade students) + 10 (6th-grade students) = 16 students
Now that we know there are 16 students in the classroom, we can express the ratio of 3rd graders to the total number of students as a fraction.
The fraction is calculated by dividing the number of 3rd graders by the total number of students:
6 (3rd-grade students) / 16 (total students) = 3/8
So, the ratio of 3rd graders to the entire number of students can be expressed as the fraction 3/8.