An Event With Probability 0 Is Said To Be: WHAT ARE SOME EXAMPLES WHICH HAVE EXACTLY ZERO PROBABILITY?

Introduction

What are some examples of an event with probability 0? In probability theory, it is possible to have an event with probability 0. This event is called impossible and it means that the event cannot happen at all.

An Event With Probability 0 Is Said To Be: WHAT ARE SOME EXAMPLES WHICH HAVE EXACTLY ZERO PROBABILITY?

AN EVENT WITH PROBABILITY 0 IS SAID TO BE IMPOSSIBLE

An event with probability 0 is an event that cannot occur. An example of such an impossible event is when you draw a card from a full pack of cards and it has the double of its value. The probability of this happening is zero, since there are only 52 cards in total and they each have one side face up.

SOME EXAMPLES WHICH HAVE EXACTLY ZERO PROBABILITY ARE:

The probability of drawing the double of its value from a full pack of cards is 0. The probability that two people have the same number of talents, when their total amount of talents is equal to another number, is also 0.

1. A CARD HAVING THE DOUBLE OF ITS VALUE IS DRAWN FROM A FULL PACK OF CARDS.

• A CARD HAVING THE DOUBLE OF ITS VALUE IS DRAWN FROM A FULL PACK OF CARDS
• THE NUMBER OF MATCHES BETWEEN TWO PEOPLE IN A LARGE CITY ARE COMPARED AND THERE IS EXACTLY ONE MATCH
• BILL GATES WINS A MILLION DOLLARS ON LOTTERY AND THEN DONATES IT ALL TO CHARITY
• YOU WIN THE LOTTERY TWICE IN YOUR LIFE

2. TWO PEOPLE HAVE THE SAME NUMBER OF TALENTS, WHEN THEIR TOTAL AMOUNT OF TALENTS IS EQUAL TO ANOTHER NUMBER.

Suppose you have two people, Alice and Bob. They each have a certain number of talents. One way this could happen is if they both have exactly zero talents; this would be a situation where there are no talents at all, so it’s not very interesting. But let’s suppose that one person has 1 talent and the other has 2 talents instead. Now if we add them together (1 + 2 = 3), we get 3! That means that 3 is divisible by every integer from 1 through 4; therefore, any number divisible by those integers will also be divisible by three (since it’s made up of multiples). So if we subtract 1 from our sum (1 – 1 = 0), then we get 0 – which means there are no numbers left in our equation! It seems like we may as well say “two people with equal amounts of talent” is impossible because there aren’t any numbers left over after adding them together… but wait! There actually is one more way that this can happen: If someone had exactly four times more than another person did–so 4 x 5 = 20)

3. A TRIANGLE, WHICH WOULD HAVE ITS SIDES EQUAL TO ITS ANGLES, POSITIVELY CANNOT BE MADE OUT OF CARDBOARD OR PAPER.

The triangle is the most basic of shapes, but it has some interesting properties. For example, a triangle has three sides and three angles (see Figure 1). The area of a triangle can be found by multiplying its base by its height (or altitude). If you have an equilateral triangle with side lengths of 1 unit and an altitude of 2 units, then its area will be 6 square units. The perimeter is simply the sum of all three sides in any given polygon; so if you had two identical triangles side-by-side with base lengths 1 unit each and altitudes 2 units each – their perimeters would be 4 + 4 = 8 units long!

The sum of all angles inside any closed shape must always add up to 360 degrees total – so if we take our previous example where each side length was increased by half again (to 2) while keeping everything else constant at 3 dimensions…this means that now instead having two right angles facing each other across from one another inside this new shape–we’ll now have four right angles facing each other within our original surface area!

4. A RECTANGLE, WHOSE AREA WOULD BE EQUAL TO ITS LENGTH AND WIDTH POSITIVELY CANNOT BE MADE OUT OF CARDBOARD OR PAPER.

• A rectangle, whose area would be equal to its length and width positively can not be made out of cardboard or paper.
• The sum of two numbers that are each greater than zero is not equal to the product of these two numbers (which is also positive).

5. SOMEONE COULD NOT HAVE MORE THAN ONE EYE, INSTEAD OF THESE EYES HE HAS ONLY ONE EYE IN HIS HEAD AS WELL AS ON THE TOPSIDE AND BOTTOMSIDE OF HIS HEAD (IN OTHER WORDS THERE MUST BE ONLY ONE EYE ON HIS HEAD).

This is an example of a zero probability event. It’s impossible for someone to have two eyes on the top and bottom of their head, let alone three or more eyes.

Conclusion

In this article, we have seen some examples of events with probability 0. I hope that now you are able to understand what an event with probability 0 is and how it can be used in real life.