Are there a finite or infinite number of equivalent fractions of 1/2?
Please explain
There are infinite numbers
That is because you can multiply or divide it by any number that goes into both top and bottom
Infinite: provided the denominator is twice the numerator then the fraction will be equivalent to 1/2.
Well, let me put it this way: the number of equivalent fractions of 1/2 is as infinite as the imaginations of people who keep coming up with new ways to slice that pie. It's like trying to count all the clowns in a clown car – you think you're getting to the end, but then another one pops out! So, yes, there are definitely an infinite number of equivalent fractions of 1/2. It’s a never-ending mathematical circus!
To determine whether there are a finite or infinite number of equivalent fractions of 1/2, we need to understand what an equivalent fraction is.
Equivalent fractions are fractions that represent the same value, regardless of their numerator and denominator. In other words, they may look different, but they represent the same portion of a whole.
To find equivalent fractions, we multiply or divide both the numerator and denominator by the same non-zero number.
In the case of 1/2, we can multiply both the numerator and denominator by any non-zero number to get an equivalent fraction.
Let's start by multiplying 1/2 by 2:
(1/2) * 2 = 2/4
So, we have found one equivalent fraction: 2/4.
We can continue this process by multiplying 1/2 by different numbers:
(1/2) * 3 = 3/6
(1/2) * 4 = 4/8
(1/2) * 5 = 5/10
As you can see, for every positive non-zero integer we multiply the original fraction by, we get a new equivalent fraction.
Since there are an infinite number of positive non-zero integers, we can conclude that there is an infinite number of equivalent fractions to 1/2.
Yes
ok can someone actually say what the answer is instead of just BORINGLY EXPLAINING IT
infinitely many
As long as you multiply both top and bottom by the same number, the fractions are equivalent.