Respuesta :
Answer:
The probability of selecting at least one consonant when selecting 2 cards is 0.0954.
Step-by-step explanation:
There are 26 letters in the English alphabet series.
Of these 26 letters there are 5 vowels and 21 consonants.
The total number of ways to select 2 letters is:
[tex]N={26\choose 2}=\frac{26!}{2!\times24!} =325[/tex]
The number of ways to select at least one consonant is:
n (At least 1 consonant) = N - n (Two vowels)
[tex]=325-{5\choose 2}\\=325-[\frac{5!}{3!\times2!}]\\=325-10\\=315[/tex]
Compute the probability of selecting at least one consonant as follows:
[tex]P(At\ least\ 1\ consonant)=\frac{n(At\ least\ 1\ consonant)}{N} =\frac{315}{325}=0.0954[/tex]
Thus, the probability of selecting at least one consonant when selecting 2 cards is 0.0954.
Answer:
Step-by-step explanation:
There are 5 vowels in an alphabet and 21 consonants in an alphabet.
Case I: Both are the consonants:
Probability to choose 1 consonant = 21 /26
Now there are 25 cards remaining and 20 consonant
Probability to choose another consonant = 20/25
So, probability to choose 2 consonants
P' = [tex]\frac{21}{26}\times\frac{20}{25}[/tex]
P' = 0.646
Case I: one is consonant and other is vowel:
Probability to choose 1 consonant = 21 /26
Now there are 25 cards remaining.
Probability to choose another card which is a vowel = 5/25
So, probability to choose 2 consonants
P'' = [tex]\frac{21}{26}\times\frac{5}{25}[/tex]
P'' = 0.162
Total probability to choose at least one consonant
P = P' + P''
P =0.646 + 0.162
P = 0.808
