Answer:
70 students are ONLY IN CHORUS.
Step-by-step explanation:
Total number of students taking either or both of the activities = 250
⇒n (B∪ C) = 250
Number of students taking band = n (B) = 180
So, the number of students taking Chorus = n (C)
Number of students taking both Band and Chorus = n (B ∪ C) = 60
Now, as we know n (B∪ C) = n (B ) + n (C) - n (B ∩ C)
⇒Here, 250 = 180 + n(C) - 60
or, n ( C) = 250 - 120 = 130
Hence, number of students taking Chorus = 130 = n (C)
Now, to find Students taking ONLY CHORUS:
Total Number of students in Chorus - Students In both Chorus and Band
or n ( C - B) = n (C) - n (B ∩ C)
= 130 - 60
= 70 , or n ( C - B) = 70
Hence, 70 students are ONLY IN CHORUS.