Question # 16
Revisit
In a pack of chocolates, 15 dark chocolates and 10 milk chocolates are mixed together. The chocolates
are picked up on a random basis. What is the probability that 1 milk chocolate and 2 dark chocolates
are selected?
Answers
THE PROBALITY OF ÷
1. ONE MILK CHOCOLATE = 1 / 25 ✔
2. TWO DARK CHOCOLATES = 2 / 25 ✔
HOPE MY ANSWER WILL BE HELPFUL DEAR ☺✌
The probability of getting milk chocolate will be 10/25.
The probability of getting dark chocolate will be 15/25.
GIVEN: a pack of chocolates, 15 dark chocolates, and 10 milk chocolates are mixed. The chocolates are picked up on a random basis.
TO FIND The probability of getting milk chocolate and The probability of getting dark chocolate.
SOLUTION:
As we are given in the question,
Number of milk chocolate in the box = 10
Number of dark chocolates in the box = 15
Also,
Total number of chocolates in the box = 10+15
Total number of chocolates in the box = 25
Therefore,
Probability of getting a milk chocolate
= Number of milk chocolate in the box/Total number of chocolates in the box
= 10/15
Similarly,
Probability of getting a dark chocolate
= Number of dark chocolates in the box/Total number of chocolates in the box
= 15/10
Therefore,
The probability of getting milk chocolate will be 10/25.
The probability of getting dark chocolate will be 15/25.
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