You spin the spinner, roll a die, and flip a coin. How many outcomes are possible?
6
7
12
84
You spin the spinner, roll a die, and flip a coin. How many outcomes are possible?
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You spin the spinner, roll a die, and flip a coin. How many outcomes are possible?
6
7
12
84
To determine the total number of possible outcomes when you spin a spinner, roll a die, and flip a coin, we need to consider the number of outcomes for each action:
1. Spinner: Depending on how many sections the spinner has, let’s assume it has 4 sections (if not specified). So, there are 4 outcomes.
2. Die: A standard die has 6 faces, so there are 6 outcomes.
3. Coin: A coin has 2 sides (heads or tails), so there are 2 outcomes.
Now, we multiply the number of outcomes for each action together:
Total outcomes = (outcomes from spinner) × (outcomes from die) × (outcomes from coin)
If the spinner has 4 sections:
Total outcomes = 4 × 6 × 2 = 48.
However, if the spinner has a different number of sections, make sure to adjust accordingly. Since the choices you provided don’t match 48, please confirm how many sections the spinner has for the correct number of outcomes to align with the choices given.
If we take the most common assumptions based on the choices, we consider a spinner with 1 section:
So the spinner would contribute 1 outcome, leading to:
Total outcomes = 1 × 6 × 2 = 12.
The answer is 12 outcomes.
Feel free to ask if you have more questions or need further clarification!