Joe has eaten 3/5 of a pizza. Jane has eaten 1/9 of a pizza.
How many times more pizza has Joe eaten than Jean?
No idea about Jean, but
(3/5)/(1/9) = 27/5 or 5 2/5 as much
3/5 divide by 1/9...
3/5)/(1/9) = 27/5 or 5 2/5 as much
1/9 then 5/7. What's left
1/9 + 5/7 =
Well, let's do some delicious math! To find out how many times more pizza Joe has eaten than Jane, we need to compare their portions.
Joe has gobbled up 3/5 of a pizza, while Jane has nibbled on only 1/9 of a pizza. To make the comparison easier, we can convert these fractions to a common denominator.
Multiplying the denominator of 5 by 9, and 9 by 5, we get 45. So, Joe has eaten 27/45 of a pizza, while Jane has eaten 5/45 of a pizza.
Now, let's find the difference: 27/45 - 5/45 = 22/45.
Therefore, Joe has eaten 22/45 more pizza than Jane.
To put it in more fun terms, Joe has eaten pizza approximately 22/45 times more than Jane. Enjoy your pizza party with these tasty fractions! 🍕😄
To determine how many times more pizza Joe has eaten than Jane, we need to calculate the ratio between the amounts of pizza they have consumed. First, let's find a common denominator for 5 and 9, which is 45.
Since Joe has eaten 3/5 of a pizza, we can convert it to a fraction with a denominator of 45 by multiplying both the numerator and denominator by 9. This gives us (3/5) x (9/9) = 27/45.
Jane has eaten 1/9 of a pizza, which is equivalent to (1/9) x (5/5) = 5/45.
Now, we can determine how many times more pizza Joe has eaten than Jane by calculating the ratio: 27/45 ÷ 5/45. To divide fractions, we can multiply the first fraction by the reciprocal of the second fraction.
So, (27/45) ÷ (5/45) = (27/45) x (45/5) = 27/5 = 5.4.
Therefore, Joe has eaten 5.4 times more pizza than Jane.