If a box contains 4 Red balls, 5 Green balls, 6 Blue balls. Find the probability of (a) Getting a green ball (b) Getting a blue ball (c) Non-red ball

Total Number of Balls: To find the total number of balls, add the red, green, and blue balls together. Total balls = 4 Red + 5 Green + 6 Blue = 15 balls.Probability of Getting Green Ball: For (a) Getting a green ball, the probability is the number of green balls divided by the total number of balls. So, it's 5/15.Probability of Getting Blue Ball: Simplify 5/15 to 1/3 for the probability of getting a green ball.Probability of Getting Non-Red Ball: For (b) Getting a blue ball, the probability is the number of blue balls divided by the total number of balls. So, it's 6/15.Simplify 6/15 to 2/5 for the probability of getting a blue ball.For (c) Non-red ball, first find the total number of non-red balls. Non-red balls = Green + Blue = 5 + 6 = 11 balls.The probability of getting a non-red ball is the number of non-red balls divided by the total number of balls. So, it's 11/15.

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If a box contains $4$ Red balls, $5$ Green balls, $6$ Blue balls. Find the probability of $\newline$ (a) Getting a green ball $\newline$ (b) Getting a blue ball $\newline$ (c) Non-red ball

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Math Problems

Algebra 2

Independence and conditional probability

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Q. If a box contains

4

Red balls,

5

Green balls,

6

Blue balls. Find the probability of

\newline

(a) Getting a green ball

\newline

(b) Getting a blue ball

\newline

Total Number of Balls: To find the total number of balls, add the red, green, and blue balls together. Total balls = $4$ Red + $5$ Green + $6$ Blue = $15$ balls.
Probability of Getting Green Ball: For (a) Getting a green ball, the probability is the number of green balls divided by the total number of balls. So, it's $\frac{5}{15}.$
Probability of Getting Blue Ball: Simplify $\frac{5}{15}$ to $\frac{1}{3}$ for the probability of getting a green ball.
Probability of Getting Non-Red Ball: For (b) Getting a blue ball, the probability is the number of blue balls divided by the total number of balls. So, it's $\frac{6}{15}.$
Probability of Getting Non-Red Ball: For (b) Getting a blue ball, the probability is the number of blue balls divided by the total number of balls. So, it's $\frac{6}{15}$ .Simplify $\frac{6}{15}$ to $\frac{2}{5}$ for the probability of getting a blue ball.
Probability of Getting Non-Red Ball: For (b) Getting a blue ball, the probability is the number of blue balls divided by the total number of balls. So, it's $\frac{6}{15}$ . Simplify $\frac{6}{15}$ to $\frac{2}{5}$ for the probability of getting a blue ball. For (c) Non-red ball, first find the total number of non-red balls. Non-red balls = Green + Blue = $5 + 6 = 11$ balls.
Probability of Getting Non-Red Ball: For (b) Getting a blue ball, the probability is the number of blue balls divided by the total number of balls. So, it's $\frac{6}{15}$ .Simplify $\frac{6}{15}$ to $\frac{2}{5}$ for the probability of getting a blue ball.For (c) Non-red ball, first find the total number of non-red balls. Non-red balls = Green + Blue = $5 + 6 = 11$ balls.The probability of getting a non-red ball is the number of non-red balls divided by the total number of balls. So, it's $\frac{11}{15}$ .