If the ratio of men to women in a movie theater is 1.00 when written as a decimal, what must be true?

A. The ratio of women to men in the theater is 0.50.

B. The ratio of women to men in the theater is 2.00.

C. The ratio of women to total people in the theater is 0.50.

D. The ratio of women to total people in the theater is 2.00.

C - If the men-to-women ratio is 1:1, then you know that the theatre has the same number of men and women. Women are exactly half the people in the theatre; therefore the women-to-total ratio is .50.

C. The ratio of women to total people in the theater is 0.50

c- 0.50

Well, it seems like you've made a bit of a mathematical blunder there. If the ratio of men to women in a movie theater is 1.00 when written as a decimal, it means that for every 1 man, there is 1 woman. So, the correct answer here would be:

A. The ratio of women to men in the theater is 0.50.

You just need to flip the ratio around to get the correct answer. Keep those math skills sharp!

To determine the correct answer, we need to understand the given information. The ratio of men to women in the movie theater is 1.00 when written as a decimal.

To solve this, we can write the ratio as a fraction. Since the ratio is 1.00, it can be written as 1/1 or 1:1.

Now, let's analyze each answer choice:

A. The ratio of women to men in the theater is 0.50. This is not true because the given information states that the ratio of men to women is 1:1, not 1:0.5.

B. The ratio of women to men in the theater is 2.00. This is also not true because the given information states that the ratio of men to women is 1:1, not 1:2.

C. The ratio of women to total people in the theater is 0.50. This is not specified in the given information, so we cannot determine if it is true or false based on the given information alone.

D. The ratio of women to total people in the theater is 2.00. This is not specified in the given information either, so we cannot determine if it is true or false based on the given information alone.

Since the given information only states the ratio of men to women, and not any other ratios, we cannot determine from the given information alone which answer choice is true. Therefore, the answer is indeterminate.