Permutation: A college has 7 good badminton players.In how many ways can a team of 5 players be selected??

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asked Nov 16, 2023 59.6k views

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Erwin Bolwidt · Answer 1 · 2023-11-19T04:26:41+0000

Here one player cannot be repeated so repeating is not allowed.

Hence we use combination here

n=7
r=5

Total ways

$\\ \rm\hookrightarrow ^nC_r=(n!)/(r!(n-r)!)$

Put values

$\\ \rm\hookrightarrow ^7C_5$

$\\ \rm\hookrightarrow (7!)/(5!(7-5)!)$

$\\ \rm\hookrightarrow (7!)/(5!2!)$

$\\ \rm\hookrightarrow (7* 6* 5!)/(5!(2))$

$\\ \rm\hookrightarrow (7(6))/(2)$

$\\ \rm\hookrightarrow (42)/(2)$

$\\ \rm\hookrightarrow 21ways$

Chris Lamb · Answer 2 · 2023-11-20T19:24:48+0000

Formula for permutation is:

$\boxed{ \tt^(n) C_(r) = (n!)/(r!(n - r)!) }$

Calculation,

Plug in the values:

Required number of ways = ²C7

n = 7
r = 5

$\sf (7!)/(5!(7 - 5)!)$

$\sf \frac{7 * 6 * \cancel{5!}}{ \cancel{5! }* 2!}$

$\sf (7 * 6 )/( 2!)$

$\sf (42 )/( 2!)$

$\sf (42 )/( 2) = 21$

Thus, The players can be selected in 21 different ways!!~

Permutation: A college has 7 good badminton players.In how many ways can a team of 5 players be selected??

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Permutation: A college has 7 good badminton players.In how many ways can a team of 5 players be selected??