Answer:
7257600
Step-by-step explanation:
Number of freshmen in the student council= 4
Number of sophomores in the student council= 5
Number of juniors in the student council= 6
Number of seniors in the student council= 7
Ways of choosing council members
⁴C₂×⁵C₂×⁶C₂×⁷C₂
[tex]^4C_2=\frac{4!}{(4-2)!2!}\\=\frac{24}{4}=6\\\\^5C_2=\frac{5!}{(5-2)!2!}\\=\frac{120}{12}=10\\\\^6C_2=\frac{6!}{(6-2)!2!}\\=\frac{720}{48}=15\\\\^7C_2=\frac{7!}{(7-2)!2!}\\=\frac{5040}{240}=21[/tex]
⁴C₂×⁵C₂×⁶C₂×⁷C₂=6×10×15×21=18900
Ways of lining up the four classes=4!=1×2×3×4=24
Ways of lining up members of each class=2⁴=2×2×2×2=16
Pictures are possible if each group of classmates stands together
⁴C₂×⁵C₂×⁶C₂×⁷C₂×4!×2⁴
=18900×24×16
=7257600
There are 453600 possible different pictures
The given parameters are:
Freshmen = 4
Sophomores = 5
Juniors = 6
Seniors = 7
Two council members are to be selected from each group.
So, the number of ways this can be done is:
n = ⁴C₂×⁵C₂×⁶C₂×⁷C₂
Apply combination formula, and evaluate the product
n = 18900
Each group are to stand together.
There are 4! ways to arrange the 4 groups.
So, the total number of pictures is:
Total = 4! * 18900
Evaluate the product
Total = 453600
Hence, there are 453600 possible different pictures
Read more about combination at:
https://brainly.com/question/11732255
