Carey has 30 CDs and wants to take pick out 5 to put into her CD player. How many different combinations of CDs can she pick out? C(30, 5) C(25, 5) 30!

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asked Jan 20, 2017 140k views

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Ashique Bava · Answer 1 · 2017-01-21T18:58:58+0000

Answer:

A. C(30, 5)

Explanation:

We have been given that Carey has 30 CDs and wants to take pick out 5 to put into her CD player. We are asked to find the number of different combinations of CDs can she pick out.

We will use combinations to solve our given problem.

$_(r)^(n)\textrm{C}=(n!)/(r!(n-r)!)$ , where,

$n=\text{Total number of items}$ ,

$r=\text{Number of items being chosen at a time}$

Upon substituting our given values in above formula we will get,

$_(5)^(30)\textrm{C}=(30!)/(5!(30-5)!)$

$_(5)^(30)\textrm{C}=(30!)/(5!(25)!)$

$_(5)^(30)\textrm{C}=(30*29*28*27*26*25!)/(5*4*3*2*1*25!)$

$_(5)^(30)\textrm{C}=29*7*27*26$

$_(5)^(30)\textrm{C}=142506$

Therefore, Carey can pick 5 CDs from 30 CDs in
$_(5)^(30)\textrm{C}=142506$ ways and option A is the correct choice.

Doug Fir · Answer 2 · 2017-01-25T12:11:09+0000

The correct answer is C(30,5)

That's because you have to know factorials and apply the formulas to find out that:
30! / [5!(30 - 5!)]
30! / (5! * 25!), which means that there are 142506 combinations, or C(30,5)

Carey has 30 CDs and wants to take pick out 5 to put into her CD player. How many different combinations of CDs can she pick out? C(30, 5) C(25, 5) 30!

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