Answer
Verified
463.2k+ views
Hint: In this question, first of all choose 1 novel from each category and then multiply them to get the total numbers of different choices of three books available to her. We will be using the formula for selecting the books as \[^{n}{{C}_{r}}=\dfrac{n!}{r!\left( n-r \right)!}.\] We will substitute n=50 and r=1 for selecting 1 book from 50 action adventure novels. Similarly, we will do it for romance and historical novels. Then, to get the final answer, we will multiply the obtained results.
Complete step-by-step answer:
In this question, we are given a school library that has 50 action adventure novels, 15 romances, and 10 historical novels. Julie wants to take one of each type for her sick cousin to read. So, we have to find the total number of choices of three books available to her.
We are given that Julie wants to take one book of each type. So, let us first find the ways of selecting one book of each type. We know that the number of ways of selecting r out of n things is given by \[^{n}{{C}_{r}}=\dfrac{n!}{r!\left( n-r \right)!}.\]
So, we have a total of 50 action adventure novels. So, the number of ways of selection of 1 out of these is given by.
\[N\left( A \right)={{\text{ }}^{50}}{{C}_{1}}=\dfrac{50!}{49!1!}\]
\[\Rightarrow N\left( A \right)=\dfrac{50\times 49!}{49!}\]
\[\Rightarrow N\left( A \right)=50\text{ ways}......\left( i \right)\]
Also, we have a total of 15 romantic novels. So, the number of ways of selecting 1 out of these is given by,
\[N\left( R \right)={{\text{ }}^{15}}{{C}_{1}}=\dfrac{15!}{1!14!}\]
\[\Rightarrow N\left( R \right)=\dfrac{15\times 14!}{14!}\]
\[\Rightarrow N\left( R \right)=15\text{ ways}......\left( ii \right)\]
Also, we have a total of 10 historical novels. So, the number of ways of selecting 1 out of these is given by,
\[N\left( H \right)={{\text{ }}^{10}}{{C}_{1}}=\dfrac{10!}{1!9!}\]
\[\Rightarrow N\left( H \right)=\dfrac{10\times 9!}{9!}\]
\[\Rightarrow N\left( H \right)=10\text{ ways}......\left( iii \right)\]
Now, we know that according to the multiplication principle of combination, the total number of ways of occurrence of independent events is given by the multiplication of their individual number of ways.
Now, we know that choosing an adventure novel, a romance novel and historical novel is not dependent on each other or independent of each other. So, by using the multiplication principle, we get,
\[\text{Total ways of selecting one novel of each type }N\left( T \right)=N\left( A \right).N\left( R \right).N\left( H \right)\]
By substituting the values of N(A), N(R) and N(H) from equations (i), (ii) and (iii) respectively, we get,
\[N\left( T \right)=50\times 15\times 10=7500\text{ ways}\]
Hence, Julie has a total of 7500 choices of three books available to her.
Note: In this question, many students make this mistake of first finding the total number of novels that 50 (adventure novels) + 15 (romance novels) + 10 (historical novels) = 75 novels and then choosing 3 out of 75 by using \[^{75}{{C}_{3}}\] which is wrong because we have to select 1 novel of each type but by using \[^{75}{{C}_{3}},\] we can ensure that each one of the 3 novels is of a different type.
Complete step-by-step answer:
In this question, we are given a school library that has 50 action adventure novels, 15 romances, and 10 historical novels. Julie wants to take one of each type for her sick cousin to read. So, we have to find the total number of choices of three books available to her.
We are given that Julie wants to take one book of each type. So, let us first find the ways of selecting one book of each type. We know that the number of ways of selecting r out of n things is given by \[^{n}{{C}_{r}}=\dfrac{n!}{r!\left( n-r \right)!}.\]
So, we have a total of 50 action adventure novels. So, the number of ways of selection of 1 out of these is given by.
\[N\left( A \right)={{\text{ }}^{50}}{{C}_{1}}=\dfrac{50!}{49!1!}\]
\[\Rightarrow N\left( A \right)=\dfrac{50\times 49!}{49!}\]
\[\Rightarrow N\left( A \right)=50\text{ ways}......\left( i \right)\]
Also, we have a total of 15 romantic novels. So, the number of ways of selecting 1 out of these is given by,
\[N\left( R \right)={{\text{ }}^{15}}{{C}_{1}}=\dfrac{15!}{1!14!}\]
\[\Rightarrow N\left( R \right)=\dfrac{15\times 14!}{14!}\]
\[\Rightarrow N\left( R \right)=15\text{ ways}......\left( ii \right)\]
Also, we have a total of 10 historical novels. So, the number of ways of selecting 1 out of these is given by,
\[N\left( H \right)={{\text{ }}^{10}}{{C}_{1}}=\dfrac{10!}{1!9!}\]
\[\Rightarrow N\left( H \right)=\dfrac{10\times 9!}{9!}\]
\[\Rightarrow N\left( H \right)=10\text{ ways}......\left( iii \right)\]
Now, we know that according to the multiplication principle of combination, the total number of ways of occurrence of independent events is given by the multiplication of their individual number of ways.
Now, we know that choosing an adventure novel, a romance novel and historical novel is not dependent on each other or independent of each other. So, by using the multiplication principle, we get,
\[\text{Total ways of selecting one novel of each type }N\left( T \right)=N\left( A \right).N\left( R \right).N\left( H \right)\]
By substituting the values of N(A), N(R) and N(H) from equations (i), (ii) and (iii) respectively, we get,
\[N\left( T \right)=50\times 15\times 10=7500\text{ ways}\]
Hence, Julie has a total of 7500 choices of three books available to her.
Note: In this question, many students make this mistake of first finding the total number of novels that 50 (adventure novels) + 15 (romance novels) + 10 (historical novels) = 75 novels and then choosing 3 out of 75 by using \[^{75}{{C}_{3}}\] which is wrong because we have to select 1 novel of each type but by using \[^{75}{{C}_{3}},\] we can ensure that each one of the 3 novels is of a different type.
Recently Updated Pages
Who among the following was the religious guru of class 7 social science CBSE
what is the correct chronological order of the following class 10 social science CBSE
Which of the following was not the actual cause for class 10 social science CBSE
Which of the following statements is not correct A class 10 social science CBSE
Which of the following leaders was not present in the class 10 social science CBSE
Garampani Sanctuary is located at A Diphu Assam B Gangtok class 10 social science CBSE
Trending doubts
Write the difference between order and molecularity class 11 maths CBSE
A rainbow has circular shape because A The earth is class 11 physics CBSE
Which are the Top 10 Largest Countries of the World?
Fill the blanks with the suitable prepositions 1 The class 9 english CBSE
How do you graph the function fx 4x class 9 maths CBSE
Give 10 examples for herbs , shrubs , climbers , creepers
What are noble gases Why are they also called inert class 11 chemistry CBSE
The Equation xxx + 2 is Satisfied when x is Equal to Class 10 Maths
Differentiate between calcination and roasting class 11 chemistry CBSE