Two unique letters are chosen at random from the alphabet.

What is the approximate probability that the first letter chosen is A?

A. 0.0385
B. 0.0400
C. 0.0769
D. 0.0800

A - choosing letter A first

[tex]|\Omega|=P(26,2)=\dfrac{26!}{24!}=25\cdot26\\ |A|=1\cdot25=25\\\\ P(A)=\dfrac{25}{25\cdot26}=\dfrac{1}{26}\approx0.0385[/tex]

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AlonsoDehner AlonsoDehner · Answer 2 · 2019-03-10T13:46:48+01:00

AlonsoDehner AlonsoDehner

10-03-2019

Answer:

A 0.0385

Step-by-step explanation:

There are in total 26 letters in English alphabet

Two unique letters are chosen at random.

I letter can be taken from any one of the 26 hence

probability for I letter to be a out of 26 letters = 1/26

We can convert this into decimal as

Probability that the first letter chosen is A =0.0385

Option A is right answer.

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Two unique letters are chosen at random from the alphabet. What is the approximate probability that the first letter chosen is A? A. 0.0385 B. 0.0400 C. 0.0769 D. 0.0800

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Two unique letters are chosen at random from the alphabet.

What is the approximate probability that the first letter chosen is A?

A. 0.0385
B. 0.0400
C. 0.0769
D. 0.0800