Respuesta :
Option B
Probability of drawing yellow marble followed by a red marble is [tex]\frac{32}{301}[/tex]
Solution:
Given that a bag containing 12 yellow marbles, 16 red marbles, and 15 green marbles
So total number of marbles = 12 + 16 + 15 = 43
To find: probability of drawing yellow marble followed by a red marble if the first marble is not replaced
The probability of an event is given as:
[tex]probability =\frac{\text { number of favorable outcomes }}{\text { total number of possible outcomes }}$[/tex]
probability of drawing yellow marble followed by a red marble if the first marble is not replaced:
First we pick up yellow marble.
Number of favorable outcomes = 12 yellow marbles
Total number of possible outcomes = 43 marbles
[tex]\text{ probability} = \frac{12}{43}[/tex]
Now we have to pick red marble
But first marble is not replaced
So we have 43 - 1 = 42 number of possible outcomes
Favorable outcomes = 16 red marbles
[tex]\text{ probability} = \frac{16}{42}[/tex]
So probability of drawing yellow marble followed by a red marble is:
[tex]\text[ probability } = \frac{12}{43} \times \frac{16}{42} = \frac{32}{301}[/tex]
Thus probability of drawing yellow marble followed by a red marble is [tex]\frac{32}{301}[/tex]
