Answer-
Probability that withdrawn card is a club or a jack is [tex]\dfrac{4}{13}[/tex]
Solution-
Let us assume that,
S = number of ways one card can be drawn
|S| = 52
A = event that the withdrawn card is club
|A| = 13
B = event that the withdrawn card is jack
|B| = 4
Hence,
[tex]P(A)=\dfrac{|A|}{|S|}=\dfrac{13}{52}\\\\P(B)=\dfrac{|B|}{|S|}=\dfrac{4}{52}[/tex]
Probability that withdrawn card is a club or a jack is,
[tex]P(A\ \cup\ B)=P(A)+P(B)+P(A\ \cap\ B)[/tex]
As there is only one jack with suit as club, so
[tex]P(A\ \cap\ B)=\dfrac{|A\ \cap\ B|}{|S|}=\dfrac{1}{52}[/tex]
Putting this,
[tex]P(A\ \cup\ B)=\dfrac{13}{52}+\dfrac{4}{52}-\dfrac{1}{52}=\dfrac{13+4-1}{52}=\dfrac{16}{52}=\dfrac{4}{13}[/tex]
