The number of ways a student can wear his 6 shirts, 4 pants, and 2 pairs of shoes.
By the fundamental principles of this topic,
number of ways = 6*4*2 = ....
6 x 4 x 2 = 48
Therefore, there are 48 possible outcomes.
To calculate the number of ways a student can wear his 6 shirts, 4 pants, and 2 pairs of shoes, we can use the principle of multiplication.
First, let's determine the number of choices for each item:
- The student has 6 shirts to choose from.
- The student has 4 pants to choose from.
- The student has 2 pairs of shoes, and each pair can be matched with any of the other pair.
Now, we multiply the number of choices for each item together:
Number of ways = Number of choices for shirts * Number of choices for pants * Number of choices for shoes
Number of ways = 6 * 4 * (2 * 2)
Simplifying the equation:
Number of ways = 6 * 4 * 4
Number of ways = 96
Therefore, the student can wear his shirts, pants, and shoes in 96 different ways.
To find the number of ways a student can wear his shirts, pants, and shoes, you can use the concept of permutations.
Permutations are used when the order or arrangement of the objects matters.
In this case, the student can choose one shirt out of six, one pair of pants out of four, and one pair of shoes out of two.
To find the total number of ways, you multiply the number of choices together.
So, the number of ways the student can wear his clothes would be:
6 (choices of shirts) * 4 (choices of pants) * 2 (choices of shoes)
= 48
Therefore, there are 48 different ways the student can wear his shirts, pants, and shoes.