In an art classroom, 8 students can sit around 1 table, and 48 students can sit around 6 tables. What is the relationship between the number of students to tables in fraction form? Write the proportion in fraction form without reducing it to the lowest terms.(1 point
The relationship between the number of students to tables can be expressed as a proportion.
When there are 8 students sitting around 1 table, the proportion is 8/1.
When there are 48 students sitting around 6 tables, the proportion is 48/6.
Therefore, the relationship between the number of students to tables is 8/1 = 48/6.
To find the relationship between the number of students to tables in fraction form, we can set up a proportion.
Let "s" represent the number of students and "t" represent the number of tables.
According to the information given, in an art classroom, 8 students can sit around 1 table, and 48 students can sit around 6 tables.
So, we can write the proportion as:
8 students / 1 table = 48 students / 6 tables
Now, we can express this proportion in fraction form without reducing it to the lowest terms:
(8/1) = (48/6)
To determine the relationship between the number of students and tables in fraction form, we need to examine the given information.
In an art classroom, 8 students can sit around 1 table. This means that the ratio of students to tables is 8:1.
Similarly, we are told that 48 students can sit around 6 tables. Therefore, the ratio of students to tables is 48:6.
To express these ratios in fraction form, we can write:
Ratio 1: 8/1
Ratio 2: 48/6
To create a proportion, we set these two ratios equal to each other and write it as a fraction:
8/1 = 48/6
Thus, the relationship between the number of students and tables in fraction form without reducing it to the lowest terms is 8/1 = 48/6.