Respuesta :
Answer:
Percentage of students who tried both questions = [tex]8\%[/tex]
Percentage of students who tried at least one question = [tex]96\%[/tex]
Step-by-step explanation:
Given: 25 students take a midterm psychology exam, 15 answered the first of two bonus questions, 11 answered the second bonus question, and 1 didn't bother with either one.
To find: percentage of students who tried both questions and percentage of students who tried at least one question
Solution:
Let A denotes students who answered the first of two bonus questions and B denotes students who answered the second bonus question.
Let U denotes the universal set denoting students who take a midterm psychology exam.
[tex]n(A)=15\,,\,n(B)=11\,,\,n(U)=25[/tex]
[tex]n\left ( A'\cap B' \right )=1[/tex]
[tex]n\left ( A'\cap B' \right )=n\left ( A\cup B \right )'\\=n(U)-n\left ( A\cup B \right )\\\Rightarrow 1=25-n\left ( A\cup B \right )\\n\left ( A\cup B \right )=25-1=24[/tex]
[tex]n\left ( A\cup B \right )=n(A)+n(B)-n\left ( A\cap B \right )\\24=15+11-n\left ( A\cap B \right )\\n\left ( A\cap B \right )=15+11-24=2[/tex]
Percentage of students who tried both questions = [tex]\frac{2}{25}\times 100=8\%[/tex]
Percentage of students who tried at least one question = [tex]\frac{24}{25}\times 100=96\%[/tex]
