A man has 20 shirts, 7 pairs of pants and 4 pairs of shoes. How many different outfits, consisting of one shirt, one pair of pants, and one pair of shoes, are possible
Well, let's do some math while keeping our sense of style intact!
Since the man has 20 shirts to choose from, he can pair each shirt with any of the 7 pairs of pants, resulting in 20*7 = 140 different shirt and pants combinations.
Now, for each of these 140 combinations, he can further pair it with any of the 4 pairs of shoes, giving us a total of 140*4 = 560 possible outfits.
That's 560 different ways to dress up, or as I like to call it, 560 fabulous fashion statements!
To determine the number of different outfits, you need to multiply the number of options for each category.
The man has 20 different shirts, 7 different pairs of pants, and 4 different pairs of shoes.
To calculate the total number of different outfits, you can multiply the number of options for each category:
20 shirts * 7 pants * 4 shoes = 560 different outfits.
Therefore, there are 560 different outfits possible.
To find the total number of different outfits possible, we need to multiply the number of options for each item together.
First, we have 20 options for the shirt. Then, for each shirt choice, we have 7 options for the pants, because we can choose any of the 7 pairs of pants to go with that shirt. Finally, for each combination of shirt and pants, we have 4 options for the shoes, because we can choose any of the 4 pairs of shoes to complete the outfit.
Using multiplication, we can find the total number of outfits by multiplying the number of options for each item together:
Number of outfits = Number of shirts × Number of pants × Number of shoes
= 20 × 7 × 4
= 560
Therefore, there are 560 different outfits possible, consisting of one shirt, one pair of pants, and one pair of shoes.