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Find the value of n that satisfies 2(n+1)! + 6n! = 3(n+1), where $n! = n\cdot (n-1)\cdot (n-2) \cdots 2\cdot 1$.
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Find the value of n that satisfies 2(n+1)! + 6n! = 3(n+1), where $n! = n\cdot (n-1)\cdot (n-2) \cdots 2\cdot 1$.

User Hzrari
by
8.3k points

1 Answer

3 votes

Answer:


n = 5

Explanation:

Given


2(n+1)! + 6n! = 3(n+1)!

Required

Find n

Simplify (n + 1)!


2(n+1)*n! + 6n! = 3(n+1)*n!

Factorize


n![2(n+1) + 6] = 3(n+1)*n!

Divide both sides by n!


2(n+1) + 6 = 3(n+1)

Open brackets


2n + 2 + 6 = 3n + 3


2n + 8 = 3n + 3

Collect like terms


2n - 3n = 3 -8


-n =-5

Multiply both sides by -1


n = 5

User ElegyD
by
7.9k points
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