if 3/4 is multiplied by itself , will the product be greater than 3/4? explain
The product will be less than 3/4 because we're taking just a fraction of 3/4.
Do the multiplication.
To determine whether the product of multiplying 3/4 by itself is greater than 3/4, we can perform the calculation.
When we multiply a fraction by itself, we multiply the numerator (the number on top) with itself and the denominator (the number on the bottom) with itself.
In this case, when we multiply 3/4 by itself, we get:
(3/4) * (3/4) = (3 * 3) / (4 * 4) = 9/16.
Now let's compare this product, 9/16, to the original fraction, 3/4.
To compare two fractions, we can cross-multiply and check which numerator is greater. In this case, cross-multiplying gives us:
3 * 16 = 48, and 4 * 9 = 36.
Since 48 is greater than 36, we can conclude that the product of 3/4 multiplied by itself, which is 9/16, is greater than 3/4.
To find out if multiplying 3/4 by itself (squaring it) will result in a product greater than 3/4, we need to perform the calculation.
1. Start with the fraction 3/4.
2. To square a fraction, multiply the numerator (top number) by itself and the denominator (bottom number) by itself.
- (3/4) * (3/4) = (3 * 3) / (4 * 4) = 9/16.
The resulting fraction is 9/16. Therefore, when you square 3/4, the product (9/16) is actually smaller than the original fraction (3/4).
Hence, multiplying 3/4 by itself does not result in a product greater than 3/4.