GIVEN:
You draw one card from a 52-card deck. Then the card is replaced in the deck and the deck is shuffled, and you draw again.
Required;
Find the probability of drawing a nine the first time and a diamond the
second time.
Step-by-step solution;
To solve this math problem, we take note of the following;
A standard 52-card deck contains,
Each of the suits (that is, hearts, diamonds, clubs and spades) has a 9 card each which means there are four 9s in the entire 52-card deck.
Hence, the probabilty of drawing a 9 is given as follows;
![\begin{gathered} Probability\text{ }of\text{ }[event]=\frac{number\text{ }of\text{ }required\text{ }outcomes\text{ }}{number\text{ }of\text{ }all\text{ }possible\text{ }outcomes} \\ \\ Probability\text{ }[9]=(4)/(52) \\ \\ Probability\text{ }[9]=(1)/(13) \end{gathered}](https://img.qammunity.org/2023/formulas/mathematics/college/sxzg1114ae5vvqz9f9l0i2fy14p8r7c95m.png)
Note that the card is replaced before the commencement of the next experiment.
This means for the second draw, we have a complete 52-card deck.
Therefore, for the probability of drawing a diamond, note that we have 13 diamonds in all. Hence,
![\begin{gathered} Probability\text{ }[diamond]=(13)/(52) \\ \\ Probability\text{ }[diamond]=(1)/(4) \end{gathered}](https://img.qammunity.org/2023/formulas/mathematics/college/owvdzwc78ijiu87dkb0zrbz3u250gyzure.png)
The probability of event A and event B is the product of probabilities. This means;
![Probability\text{ }of\text{ }A\text{ }and\text{ }Probability\text{ }of\text{ }B=P[A]\text{ }*\text{ }P[B]](https://img.qammunity.org/2023/formulas/mathematics/college/qx57qd0fqktyvu727qm45ggppvk5r4czrq.png)
Therefore, the probability of drawing a nine the first time and a diamond the second time is given as;
![\begin{gathered} P[9]\text{ }and\text{ }P[diamond]=(1)/(13)*(1)/(4) \\ \\ P[9]\text{ }and\text{ }P[diamond]=(1)/(52) \end{gathered}](https://img.qammunity.org/2023/formulas/mathematics/college/e45s8b37bttogrpp8ntf2x8j2u8frp37ql.png)
ANSWER:
