If you choose 1 scoop of ice cream from 12 flavors and any 1 topping from a choice of 8, how many different ice-cream sundaes can you make?

96

Oh boy, let's do some math that's sweeter than ice cream! To find the number of different ice-cream sundaes you can make, you multiply the number of choices for each component. So, if you have 12 flavors and 8 toppings, you multiply 12 by 8, giving you 96 possible ice-cream sundaes. That's a whole lot of sweet variety! Just make sure you don't go into brain freeze territory trying them all. Enjoy!

To find the number of different ice-cream sundaes you can make, you need to multiply the number of choices for the ice cream flavor by the number of choices for the topping.

Number of choices for ice cream flavor: 12
Number of choices for topping: 8

Number of different ice-cream sundaes = Number of choices for ice cream flavor × Number of choices for topping

Number of different ice-cream sundaes = 12 × 8

Number of different ice-cream sundaes = 96

Therefore, you can make 96 different ice-cream sundaes.

To calculate the total number of different ice-cream sundaes you can make, you need to multiply the number of choices for each component.

Step 1: Determine the number of choices for the ice cream flavor.
You have 12 flavors to choose from, so there are 12 options.

Step 2: Determine the number of choices for the topping.
You have 8 toppings to choose from, so there are 8 options.

Step 3: Multiply the number of choices for each component.
To find the total number of different sundaes, multiply the number of choices for the ice cream flavor (12) by the number of choices for the topping (8):

12 flavors x 8 toppings = 96 different ice-cream sundaes

Therefore, you can make 96 different ice-cream sundaes using 1 scoop of ice cream from 12 flavors and any 1 topping from a choice of 8.

just multiply 12*8