Leona was in a golf tournament last week. All of her four rounds of golf were within 2 strokes of par. If par was 72, wat are the maximum and minimum scores that Leona could have made in the golf tournament?
To determine the maximum and minimum scores that Leona could have made in the golf tournament, we need to consider that all four rounds were within 2 strokes of par.
Let's calculate the maximum score first. If Leona's rounds were all 2 strokes over par, the total score would be 72 (par) + 2 + 2 + 2 + 2 = 80.
Next, let's calculate the minimum score. If Leona's rounds were all 2 strokes under par, the total score would be 72 (par) - 2 - 2 - 2 - 2 = 64.
Therefore, the maximum score Leona could have made in the golf tournament is 80, and the minimum score is 64.
To find the maximum and minimum scores that Leona could have made in the golf tournament, we need to consider the scores for each round and analyze the scenario.
Given that all of Leona's four rounds were within 2 strokes of par (72), we can determine the maximum and minimum scores by considering the possibilities of each round.
Let's start with the maximum score.
To maximize the score, we assume that each round was 2 strokes above par. So, in each round, Leona scored 72 + 2 = 74.
Since she played four rounds, the maximum score she could have made in the golf tournament is 74 * 4 = 296.
Now let's move on to the minimum score.
To minimize the score, we assume that each round was 2 strokes below par. So, in each round, Leona scored 72 - 2 = 70.
Therefore, the minimum score she could have made in the golf tournament is 70 * 4 = 280.
In conclusion, the maximum score Leona could have made in the tournament is 296, and the minimum score is 280.