in a freshman high school class of 80 students, 22 students take consumer education, 20 students take…

in a freshman high school class of 80 students, 22 students take consumer education, 20 students take french, and 4 students take both. which equation can be used to find the probability, p, that a randomly selected student from this class takes consumer education, french, or both?\n$p = \\frac{11}{40}+\\frac{1}{4}+\\frac{1}{20}$\n$p = \\frac{11}{40}+\\frac{1}{4}-\\frac{1}{10}$\n$p = \\frac{11}{40}+\\frac{1}{4}$\n$p = \\frac{11}{40}+\\frac{1}{4}-\\frac{1}{20}$
Answer
Explanation:
Step1: Calculate probability of taking Consumer Education
The probability of taking Consumer Education, $P(C)$, is $\frac{22}{80}=\frac{11}{40}$ since there are 22 students taking it out of 80 total students.
Step2: Calculate probability of taking French
The probability of taking French, $P(F)$, is $\frac{20}{80}=\frac{1}{4}$ as there are 20 students taking French out of 80.
Step3: Calculate probability of taking both
The probability of taking both, $P(C\cap F)$, is $\frac{4}{80}=\frac{1}{20}$ because 4 students take both out of 80.
Step4: Use the addition - rule of probability
The probability of taking Consumer Education, French, or both is given by the formula $P(C\cup F)=P(C)+P(F)-P(C\cap F)$. Substituting the values we found: $P=\frac{11}{40}+\frac{1}{4}-\frac{1}{20}$.
Answer:
$P = \frac{11}{40}+\frac{1}{4}-\frac{1}{20}$