If I go into an ice cream parlor, and I have the choice of having one of 10 different flavors , with one of 5 different toppings and one of 3 different types of cones, How many times can I come back to this place and get a different ice cream cone combination?

You can come back to this place and get a different ice cream cone combination 750 times. This is because there are 10 x 5 x 3 = 150 different combinations.

To calculate the number of different ice cream cone combinations, you need to multiply the number of choices for each category: flavors, toppings, and cones.

In this scenario, you have 10 different flavors, 5 different toppings, and 3 different types of cones. To find the total number of combinations, multiply these numbers together.

10 flavors x 5 toppings x 3 cones = 150 possible combinations.

Therefore, you can come back to the ice cream parlor and get a different ice cream cone combination 150 times.

To calculate the number of different ice cream cone combinations you can have, you need to multiply the number of choices for each category:

Number of flavors: 10
Number of toppings: 5
Number of types of cones: 3

To find the total number of combinations, multiply these numbers together:

10 flavors x 5 toppings x 3 types of cones = 150 different ice cream cone combinations

Therefore, you can come back to this place and get a different ice cream cone combination 150 times.