The distributive law from algebra states...

The distributive law from algebra states that for all real numbers c,a1 and a2,we have `c(a_1+a_2)=c a_1+c a_2` Use this law and mathematical induction to prove that,for all natural numbers,`ngeq2`,if `c,a_1,a_2,....,`an are any real numbers,then `c(a_1+a_2+.....+a_n)=c a_1+c a_2+....+c a_n`

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The distributive law from algebra states that for all real numbers c,a1 and a2,we have `c(a_1+a_2)=c a_1+c a_2` Use this law and mathematical induction to prove that,for all natural numbers,`ngeq2`,if `c,a_1,a_2,....,`an are any real numbers,then `c(a_1+a_2+.....+a_n)=c a_1+c a_2+....+c a_n`

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