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Solved: Multinomial Experiments In Exercise, use the
Chapter 4, Problem 33EC(choose chapter or problem)
According to a theory in genetics, when tall and colorful plants are crossed with short and colorless plants, four types of plants will result: tall and colorful, tall and colorless, short and colorful, and short and colorless, with corresponding probabilities of \(\frac{9}{16},\frac{3}{16},\frac{3}{16}\) and \(\frac{1}{16}\). Ten plants are selected. Find the probability that 5 will be tall and colorful, 2 will be tall and colorless, 2 will be short and colorful, and 1 will be short and colorless.
Equation Transcription:
Text Transcription:
frac{9}{16},frac{3}{16},frac{3}{16}
frac{1}{16}
Questions & Answers
QUESTION:
According to a theory in genetics, when tall and colorful plants are crossed with short and colorless plants, four types of plants will result: tall and colorful, tall and colorless, short and colorful, and short and colorless, with corresponding probabilities of \(\frac{9}{16},\frac{3}{16},\frac{3}{16}\) and \(\frac{1}{16}\). Ten plants are selected. Find the probability that 5 will be tall and colorful, 2 will be tall and colorless, 2 will be short and colorful, and 1 will be short and colorless.
Equation Transcription:
Text Transcription:
frac{9}{16},frac{3}{16},frac{3}{16}
frac{1}{16}
ANSWER:
Solution :
Step 1 of 1:
Our goal is:
We need to find the probability that 5, 2, 2, 1.
Given 10 plants are selected.
So, n=10.