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Use the Principle of Mathematical Induction (PMI) to prove the following for all natural numbers n. 1+2+3+...+n= n(n+1) 2

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. Use the Principle of Mathematical Induction (PMI) to prove the following for all natural numbers n. • P(1) is 3 P(n) 3+ 11 +19++ (8n — 5) = 4n² — n (neN) Pin) true because 4(1)²_1=3 ✓ ころ is true for some neN. 3 +11 +19+ - • -+ (8n −5)]=4n²_n_P(n) •Assume P(n) Need to prove Pin+1) [3+11+19+---+ (8n - 5] + [8(n+1)-5] pon+1) =4[n+1]²_[n+i] Proof of pintl): 3+1+19+...+ (8n_5)+(8n+3) = 4n²_n +8n-3 =4n²+7n-3 Note: 4[n+1]-[n+1] =4[n²+²n +i]-[n+i] 3 =4n² +8n++-n-1 =4n²+7+3 This proves P(n+l). • PMI implies (EN) P(n) is true. A