Prove by mathematical induction: \forall n\geq1,\ 1^{3}+2^{3}+3^{3}+\cdots+n^{3}=\frac{

amanf

amanf

Answered question

2021-08-12

Prove by mathematical induction: n1, 13+23+33++n3=n2(n+1)24

Answer & Explanation

cheekabooy

cheekabooy

Skilled2021-08-13Added 83 answers

Step 1
n1, 13+23+33++n3=n2(n+1)24
We prove by induction method
Base case: n=1
LHS=13=1
RHS=12(1+1)24=224=44=1
Step 2
Inductive hypothesis: Assume that the result is true for some n=m
13+23+33++m3=m2(m+1)24
We prove result for n=m+1
i.e. 13+23++m3+(m+1)3=(m+1)2(m+2)24
Consider 13+23+33++m3+(m+1)3=(13+23++m3)+(m+1)3
=m2(m+1)24+(m+1)3
=(m+1)24{m2+4(m+1)}
=(m+1)24(m2+4m+4)
=(m+1)2(m+2)24
Hence the given formula hilds for all n1
13+23++n3=n2(n+1)24, n1

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