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There are 12 face cards in a standard deck of 52 cards. How many ways can you arrange a standard deck of 52 cards such that the first card is a face card?
Select one of the options below as your answer:
A. 12P1
B. 12C1
C. 12P1 × 51P51
D. 12C1 × 51P51
E. 12C1 × 51C51

Respuesta :

Answer:

Option C is correct  that is 12P1 × 51P51

Step-by-step explanation:

We have been given 52 cards and 12 face cards

Since, we have to arrange  face cards so that the first card is a face card being arrangement we will use permutation which is 12P1

And now we have to arrange 52 cards according to this information we will use permutation  51P51

Hence, option C is correct  that is 12P1 × 51P51

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The total number of combinations is given by: C = 12*(51!).

The correct option is D.

In how many ways can you arrange the deck?

We need to count the number of options for each position in the deck.

The first card must be a face card, and there are 12 face cards, so we have 12 options.

For the next card, we have no restriction, so it can be any of the remaining 51 cards.

For the third card, again we have no restriction, so it has 50 options.

And so on.

If we multiply the numbers of options, we will see that there are:

C = 12*(51!) Combinations

Where:

51! = 51*50*...*3*2*1

C = 12C1*51P51

If you want to learn more about combinations:

https://brainly.com/question/11732255

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