n ice cream stand sells chocolate, vanilla, and strawberry ice cream as well as a choice of 22 toppings. How many choices are there for a single flavor of ice cream with one topping? How do I do this? is it 46 choices? Am I right?
ohhhhhhh 66 choices!!! Thanks!
No.
If you choose chocolate, you have 22 choices of toppings.
If you choose vanilla, you have 22 choices of toppings.
If you choose strawberry, you have 22 choices of toppings.
How many total choices is this?
The probability it will snow in the next two weeks is 1/12 for this week and 1/4 for next week. What is P(snow this week and next week)?
The answer is D
1/48
Hope I helped someone
Yes the right answer is 66
Right.
To determine the number of choices for a single flavor of ice cream with one topping, you need to multiply the number of options for the flavor of ice cream by the number of options for the topping.
In this case, there are 3 flavors of ice cream to choose from (chocolate, vanilla, and strawberry) and 22 toppings available.
To calculate the total number of choices, simply multiply the number of ice cream flavors by the number of toppings:
3 (flavors) * 22 (toppings) = 66.
Therefore, there are 66 different choices for a single flavor of ice cream with one topping. Therefore, your answer of 46 choices is incorrect.