Question

Let E and F be two independent events. The probability that both E and F happen is $\dfrac{1}{12}$ and the probability that neither E nor F happens is $\dfrac{1}{2}$, then a value of $\dfrac{P\left( E \right)}{P\left( F \right)}$ is
(a) $\dfrac{5}{12}$
(b) $\dfrac{1}{3}$
(c) $\dfrac{3}{2}$
(d) $\dfrac{4}{3}$

Answer 1

Hint: Use the two given probabilities to make two equations. Then, using the formula $P\left( E\cup F \right)=P\left( E \right)+P\left( F \right)-P\left( E\cap F \right)$ and $P\left( E\cap F \right)=P\left( E \right)\cdot P\left( F \right)$, make two equations and solve them to find the values of $P\left( E \right)$ and $P\left( F \right)$.

“Complete step-by-step answer:”
We know the following facts:
1. The probability that two events A and B happen together is given as $P\left( A\cap B \right)$
2. The probability that at least one of the two events A and B happens is given as $P\left( A\cup B \right)$
3. The probability that an event E does not happen is given as $1-P\left( E \right)$, if $P\left( E \right)$ is the probability that the event A happens.
Applying the above facts to the statements given in the question:
Probability that E and F happen together is $\dfrac{1}{12}$, which can be written as $P\left( E\cap F \right)=\dfrac{1}{12}$
The second statement, probability that neither E nor F happen can be understood as the negation of the event that at least one of them happens.
The probability that at least one of E or F happens is given as $P\left( E\cup F \right)$.
Hence, the probability of neither E nor F happens is given as $1-P\left( E\cup F \right)=\dfrac{1}{2}$. Upon rearranging,
$\begin{aligned} & \Rightarrow P\left( E\cup F \right)=1-\dfrac{1}{2} \\\ & \Rightarrow P\left( E\cup F \right)=\dfrac{1}{2} \\\ \end{aligned}$
Thus, we have two results $P\left( E\cap F \right)=\dfrac{1}{12}$ and $P\left( E\cup F \right)=\dfrac{1}{2}$.
We know that $P\left( E\cup F \right)=P\left( E \right)+P\left( F \right)-P\left( E\cap F \right)$.
Substituting the value of $P\left( E\cup F \right)$ and $P\left( E\cap F \right)$ in the above formula, we get

& \dfrac{1}{2}=P\left( E \right)+P\left( F \right)-\dfrac{1}{12} \\\ & \Rightarrow P\left( E \right)+P\left( F \right)=\dfrac{1}{2}+\dfrac{1}{12} \\\ & \Rightarrow P\left( E \right)+P\left( F \right)=\dfrac{7}{12}\ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ldots \left( 1 \right) \\\ \end{aligned}$$ Also, since the events E and F are independent, $P\left( E\cap F \right)=P\left( E \right)\cdot P\left( F \right)$ Thus, $P\left( E \right)\cdot P\left( F \right)=\dfrac{1}{12}\ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ldots \left( 2 \right)$ To solve the equations (1) and (2) to find $P\left( E \right)$ and $P\left( F \right)$, we can use the relation $a-b=\sqrt{{{\left( a+b \right)}^{2}}-4ab}$ In this equation, $a=P\left( E \right)$ and $b=P\left( F \right)$ $$\mathop{\left( P\left( E \right)-P\left( F \right) \right)}^{2}={{\left( P\left( E \right)+P\left( F \right) \right)}^{2}}-4P\left( E \right)\cdot P\left( F \right)$$ Substituting values from equations (1) and (2), $$\begin{aligned} & \Rightarrow \mathop{\left( P\left( E \right)-P\left( F \right) \right)}^{2}={{\left( \dfrac{7}{12} \right)}^{2}}-4\left( \dfrac{1}{12} \right) \\\ & \Rightarrow \mathop{\left( P\left( E \right)-P\left( F \right) \right)}^{2}=\left( \dfrac{49}{144} \right)-\left( \dfrac{1}{3} \right) \\\ & \Rightarrow \mathop{\left( P\left( E \right)-P\left( F \right) \right)}^{2}=\dfrac{1}{144} \\\ & \Rightarrow P\left( E \right)-P\left( F \right)=\dfrac{1}{12}\ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ldots \left( 3 \right) \\\ \end{aligned}$$ Adding equations (1) and (3), $$2\cdot P\left( E \right)=\dfrac{8}{12}$$ $$\Rightarrow P\left( E \right)=\dfrac{4}{12}=\dfrac{1}{3}$$ Subtracting equation (3) from equation (1), we get $$2\cdot P\left( F \right)=\dfrac{6}{12}$$ $$\Rightarrow P\left( F \right)=\dfrac{3}{12}=\dfrac{1}{4}$$ Thus, the required value, $\dfrac{P\left( E \right)}{P\left( F \right)}=\dfrac{\dfrac{1}{3}}{\dfrac{1}{4}}=\dfrac{4}{3}$ Therefore, the correct answer is option (d). Note: The formula used here, $P\left( E\cap F \right)=P\left( E \right)\cdot P\left( F \right)$ is only valid if the two events E and F are independent of each other (given in the question). Otherwise this formula is not applicable, and then using this formula would result in an incorrect answer.