Answer:
Step-by-step explanation:
given that two cards are drawn, without replacement, from a standard 52-card deck.
a) Both cards are red
Here there are 26 red cards and 52 total cards.
Probability = [tex]\frac{26C2}{52C2} \\=\frac{26*25}{52*51} \\=\frac{25}{102}[/tex]
b) Both cards are the same color
i.e. either both are red or both are black
Hence probability = twice of part a
= [tex]\frac{2*25}{102} \\=\frac{25}{51}[/tex]
c) The second card is a queen, given that the first card is an ace.
If first card is an ace remaining are 51 cards with 4 queens\
So prob = 4/51