Whitney is writing a thank-you note to a friend. She has 6 kinds of cards and 10 kinds of envelopes that fit the cards. How many different ways can the thank-you note look?
ways
There are 60 possible combinations of cards and envelopes (6 x 10 = 60). For each card, there are 10 options for envelopes. Therefore, the total number of different ways the thank-you note can look is 60.
To determine the number of different ways the thank-you note can look, we need to find the total number of combinations that can be formed by choosing one card from the 6 available cards and one envelope from the 10 available envelopes.
To calculate this, we can use the multiplication principle, which states that if there are x ways to do one thing and y ways to do another, then there are x * y ways to do both things.
So, the number of ways the thank-you note can look is given by multiplying the number of card choices with the number of envelope choices:
Number of ways = Number of card choices * Number of envelope choices
Number of card choices = 6
Number of envelope choices = 10
Number of ways = 6 * 10 = 60
Therefore, there are 60 different ways the thank-you note can look.