Solve for n in each of the following equations: (a) n^ Pbase2=110

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asked Mar 13, 2022 191k views

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Chocolava · Answer 1 · 2022-03-19T03:13:44+0000

Answer:

n = 11

Explanation:

Given

^nP_2 = 110

Required

Solve for n

^nP_2 = 110

Start by applying permutation formula:

(n!)/((n-2)!) = 110

Expand the numerator

(n*(n-1) * (n-2)!)/((n-2)!) = 110

(n-2)! cancels out

n*(n-1) = 110

Expand

n^2 - n = 110

Subtract 110 from both sides

n^2 - n -110= 110-110

n^2 - n -110= 0

Expand:

n^2 - 11n +10n-110= 0

Factorize:

n(n-11) +10(n-11)= 0

(n+10)(n-11) = 0

This implies that:

$n + 10 = 0\ or\ n - 11 = 0$

$n = -10\ or\ n = 11$

But n can't be negative.

So:

n = 11

Solve for n in each of the following equations: (a) n^ Pbase2=110

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Solve for n in each of the following equations: (a) n^ Pbase2=110