Jacob mixes the letters J, K, L, J, K, M, N and P thoroughly. Without looking, Terry draws one letter. Expressed as a fraction, decimal, and percentage, what is the probability that K will not be the letter, Terry selects.
A. 1/4, 0.25, 25%
B. 3/4, 0.75, 75%
C. 4/3, 1.33%, 13.3%
D. 5/8, 0.625, 62.5%
There are a total of 8 letters, so the probability of Terry drawing any letter is $\frac{1}{8}$.
To find the probability that Terry does not draw a K, we need to count the number of letters that are not K. There are a total of 8 letters, and 2 of them are K's, so there are 6 letters that are not K's.
Therefore, the probability of Terry not drawing a K is $\frac{6}{8} = \frac{3}{4} = 0.75 = 75\%$.
The answer is $\boxed{\textbf{(B) }3/4,\ 0.75,\ 75\%}$.