" (a) Prove that ":^(n)P(r)=^(n-1)P(r)+r...

" (a) Prove that ":^(n)P_(r)=^(n-1)P_(r)+r^(n-1)P_(r-1)

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Prove ""^(n)P_(r)=""^(n-1)P_(r) +r. ""^(n-1)P_(r-1)

Prove that .^nP_r = ^(n-1)P_r + r^(n-1)P_(r-1)

Prove that .^(n-1)P_(r)+r.^(n-1)P_(r-1)=.^(n)P_(r)

11. Prove that nP_(r)=n(n-1)P_(r-1)

Prove that: ""^(n-1)P_r=(n-r)* ""^(n-1)P_(r-1)

Prove that : ^nP_r= "^(n-1)P_r+r ^(n-1)P_(r-1) , for all natural numbers n and r for which the symbols are defined.

Prove that ^(n-1) P_r+r .^(n-1) P_(r-1) = .^nP_r

Prove that .^(n-1)P_r+r.^(n-1)P_(r-1)=^nP_r .

Prove that ^nP_r= ^(n-1)P_r+r^(n-1)P_(r-1) (notation used are in their usual meaning).

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