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- Question 7 and 8 Exercise 6.2
- _2=5$ ways $E_3$ occurs in $m_3=5$ ways Thus by fundamental principle of counting the total number of... 2=4$ ways $E_3$ occurs in $m_3=3$ ways. Thus by fundamental principle of 'counting the total number o... ts not vowel can be arrange are $=3$ ! Hence, by fundamental principle of counting the total number of
- Question 3 and 4 Exercise 6.2
- awar, Pakistan. =====Question 3(i)===== Prove by Fundamental principle of counting $^n P_r=n(^{n-1} P_... P_r\end{align} =====Question 3(ii)===== Prove by Fundamental principle of counting $^n P_r=^{n-1} P_r+
- Question 11 Exercise 6.2
- 2$ occurs in $m_2=5$. Hence the total numbers by fundamental principle of counting greater than $10$ a... it digit:Event $E_3$ occurs in $m_3=4$. Hence by fundamental principle of counting numbers greater tha
- Question 5 and 6 Exercise 6.2
- Ten Thousand: $E_4$ occurs in $m_4=1$. Thus by fundamental principle of counting the total number of
- Question 9 Exercise 6.3
- at four women to be selected are ${ }^6 C_4$. By fundamental principle of counting the total number of
- Question 7 & 8 Review Exercise 6
- _4$ occurs with $m_4=4$ different ways. Thus by fundamental principle of multiplication, the total
- Question 9 & 10 Review Exercise 6
- of ways that $2$ men can sit are: $2 !$ Thus by fundamental principle of counting the total number of