Make a table showing all the possible outcomes for spinning the pointer of a spinner with four equal-sized sections labeled 1–4 and another spinner with four equal-sized sections labeled A–D. Use this table to determine the probability that the two pointers will land on an odd number and the letter C. Give the probability as a percent, rounded to the nearest tenth of a percent.

Question

Make a table showing all the possible outcomes for spinning the pointer of a spinner with four equal-sized sections labeled 1–4 and another spinner with four equal-sized sections labeled A–D. Use this table to determine the probability that the two pointers will land on an odd number and the letter C. Give the probability as a percent, rounded to the nearest tenth of a percent.

P(odd number, C) =
%

Answer 1

| | 1 | 2 | 3 | 4 |

|-----|---|---|---|---|
| A | | | X | |
| B | | | X | |
| C | | | X | |
| D | | | X | |

There are a total of 16 possible outcomes. Out of these, 4 outcomes satisfy the condition of landing on an odd number and the letter C (3C, 3C, 1C, 1C).

P(odd number, C) = 4/16 = 0.25 = 25%