Math, asked by subramaniang05, 1 month ago

7.A pack of playing cards consists of 52 cards. From a pack of playing cards, a card is drawn. a. What is the probability of getting an Ace of Hearts?
b. What is the probability of drawing a red Queen?
c. What is the probability of drawing a King from any suit?​

Answers

Answered by Ayansh3049X
3

Answer:

Hint: There are 52 cards in a deck. The probability of finding a card can be calculated by dividing the number of cards of the given type by the total number of cards.

Complete step-by-step answer:

Total number of cards (T) = 52

(i) a black king:

In a deck of cards, there are two black kings, one of spade and one of clubs.

Probability of finding a black king =225=113

(ii) either a black card or a king:

Total black cards = 13 x 2 = 26

Total kings other than black cards = 2

Probability =2×2652=2852=713

(iii) a jack, a queen or a king:

Total jacks = 4

Total queens = 4

Total kings = 4

Probability =4+4+452=1252=313

(iv) neither an ace nor a king:

The required cards are all cards other than kings and aces.

⇒(T)−(number of kings+number of aces)

Number of kings = 4

Number of aces = 4

Probability =(T)−(4+4)52=52−852=4452=1113

(v) a spade or an ace

Number of cards of spades = 13

Aces other than spades = 4 – 1 = 3

Probability =313

(vi) neither a red card nor a queen

Required cards are all cards other than red cards and queens.

Red cards = 13 x 2 = 26

Queens other than those included in red cards = 4 – 2 = 2

Therefore, probability =T−(26+2)52

=52−2852=2452=613

(vii) other than an ace

Required cards are all cards other than ace.

⇒T−(number of aces)

Number of aces = 4

Probability =T−452=52−452=4852=1213

(viii) a ten

Number of tens = 4

Probability =452=113

(ix) a spade

Number of spades = 13

Probability =1352=14

(x) a black card

Number of black cards = number of spades + number of clubs

= 13 + 13 = 26

Probability =2652=12

(xi) the seven of clubs

There are only one seven clubs in one deck of cards.

Probability =152

(xii) a jack

Number of jacks = 4

Probability =452=113

(xiii) the ace of spades

There is only one ace of spades in a deck of cards.

Probability =152

(xiv) a queen

Number of queens = 4

Probability =452=113

(xv) a heart

Number of hearts = 13

Probability =1352=14

(xvi) a red card

Number of red cards = number of hearts + number of diamonds

= 13 + 13 =26

Probability =2652

(xvii) neither a king nor a queen

The required cards are all cards except kings and queens.

⇒T−(number of kings + number of queens)⇒T−(4+4)

Probability =52−852=4452=1113

Note: (1) Make sure to not count a card twice like in part (ii) or (v).

(2) Ace is not a face card. Many students make that mistake.

(3) This is the distribution of a deck of playing cards:

In a pack or deck of 52 playing cards, they are divided into 4 suits of 13 cards each; i.e. spades, hearts, diamonds and clubs. Cards of spades and clubs are black cards. Cards of hearts and diamonds are red cards. The cards in each suit are ace, king, queen, jack or knaves, 10, 9, 8, 7, 6, 5, 4, 3 and 2.

Step-by-step explanation:

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