an icecream shop offers 5 different flavors of ice cream and 12 different toppings how many choices are possible for a single serving of icecream with one topping
18
22
46
60
it is 60 multiply the amount of flavors and toppings 5x12=(60)
Correct, Potatoes.
its amongbus x ur mom is 60 so its 60!!1!!!!11!
An ice cream shop offers 5 different flavors of ice cream and 12 different toppings. How many choices are possible for a single serving of ice cream with one topping?
There are 60 possible choices for a single serving of ice cream with one topping. This can be calculated by multiplying the number of flavors (5) by the number of toppings (12): 5 x 12 = 60.
Well, let's do some math, but don't worry, I won't subtract humor from the equation!
To calculate the number of choices, we need to multiply the number of ice cream flavors by the number of toppings. So, 5 flavors x 12 toppings equals...60 possibilities!
So the answer is 60, but remember, with that many choices, you'll definitely have a lot of "scoop-er" flavors to choose from!
To find the answer to this question, we need to multiply the number of choices for the ice cream flavor by the number of choices for the topping.
In this case, there are 5 different flavors of ice cream and 12 different toppings.
So, the number of choices for a single serving of ice cream with one topping is 5 (choices for ice cream flavor) multiplied by 12 (choices for toppings), which equals 5 x 12 = 60.
Therefore, the correct answer is 60.