What are the odds of drawing a 5 from these cards?

1,2,3,4,5

I do not understand how to solve this.

Thanks

there are 5 choices, but only 1 is a success.

So, that means there are 4 wrong choices.

The odds are 4:1 against, or 1:4 in favor.

The probability of a 5 is 1/5.

odds are the ratio of success:failure

So, the answer will be 1:4?

Is that the answer that Steve gave you?

Well, my friend, let me be your jolly guide to card probabilities! In this case, we have a total of 5 cards, numbered from 1 to 5. So, to determine the odds of drawing a 5, we need to find out how many favorable outcomes there are.

Since there is only one card with a number 5 on it, that means we have 1 favorable outcome out of a total of 5 possible outcomes.

Therefore, the odds of drawing a 5 from those cards are 1 out of 5, which can also be expressed as 1/5 or 20%. So, grab those cards and see if you can summon that sneaky 5 from your magical deck! Good luck, my friend!

To calculate the odds of drawing a specific card from a set of cards, you need to know the number of favorable outcomes (the number of cards you want to draw) and the total number of possible outcomes (the total number of cards in the set).

In this case, you want to know the odds of drawing a 5 from the set of cards: 1, 2, 3, 4, and 5. Let's break down the process step by step:

Step 1: Determine the number of favorable outcomes:
Since you only want to draw one specific card, the number of favorable outcomes is 1. Because there is only one card with a value of 5.

Step 2: Determine the total number of possible outcomes:
In this case, there are five cards in total: 1, 2, 3, 4, and 5. So, the total number of possible outcomes is 5.

Step 3: Calculate the odds:
To calculate the odds, use the formula: odds = favorable outcomes / total outcomes.

In this case, the number of favorable outcomes is 1 and the total number of possible outcomes is 5. So, the odds of drawing a 5 from these cards are 1/5 or 1 in 5.

Therefore, the odds of drawing a 5 from the given set of cards are 1 in 5.

So what is the answer?