If (1)/(1!9!)+(1)/(3!7!)+(1)/(5!5!)+(1)/...

If `(1)/(1!9!)+(1)/(3!7!)+(1)/(5!5!)+(1)/(7!3!)+(1)/(9!1!)=(2^n)/(10!)`, then `n=`

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The sum S= 1/(9!)+1/(3!7!)+1/(5!5!)+1/(7!3!)+1/(9!) is equal to

If 1/(1!xx11!)+1/(3!xx9!)+1/(5!xx7!)=2^n/n! Then m+ n=

If 1/(1!11!)+1/(3!9!)+1/(5!7!)=(2^n)/(m!) then the value of m + n is

By the principle of mathematical induction prove that the following statements are true for all natural numbers 'n' (a) (1)/(1.3)+(1)/(3.5)+(1)/(5.7)+......+(1)/((2n-1)(2n+1)) =(n)/(2n+1) (b) (1)/(1.4)+(1)/(4.7)+(1)/(7.10)+......+(1)/((3n-2)(3n+1)) =(n)/(3n+1)

Prove that by using the principle of mathematical induction for all n in N : (1)/(3.5)+ (1)/(5.7)+ (1)/(7.9)+ ....+(1)/((2n+1)(2n+3))= (n)/(3(2n+3))

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