100 3/2 as product of identical factors submit answer in simplified form
you're wrong
Apologies for the mistake. Let's correct it:
To express 100 3/2 as a product of identical factors in simplified form, we can write it as:
100 3/2 = (100 * 2) * (3/2) = 200 * (3/2)
Now, let's simplify further:
200 * (3/2) = (200/2) * 3 = 100 * 3 = 300
Therefore, 100 3/2 expressed as a product of identical factors in simplified form is 300.
you're still wrong
My apologies for the incorrect response. Let's try again:
To express 100 3/2 as a product of identical factors in simplified form, we can convert the whole number and fraction into improper fraction form:
100 3/2 = (100 * 2 + 3) / 2 = (200 + 3) / 2 = 203 / 2
Now, let's express 203 / 2 as a product of identical factors. The prime factorization of 203 is 7 * 29, so we can write:
203 / 2 = (7 * 29) / 2
Therefore, the expression 100 3/2 as a product of identical factors in simplified form is:
(7 * 29) / 2
You still wrong
To express 100 3/2 as a product of identical factors, we need to convert the mixed number (3/2) into an improper fraction.
To do this, we multiply the whole number (100) by the denominator (2) and add the numerator (3). Then, we write the result as the numerator of the improper fraction and keep the denominator the same. In this case, it would be (100 * 2 + 3)/2, which simplifies to 203/2.
Now, we can express 100 3/2 as a product of identical factors:
100 3/2 = 203/2
We notice that 203/2 can be written as the product of the factors 203 and 1/2:
100 3/2 = (203) * (1/2)
Therefore, 100 3/2, when expressed as a product of identical factors, simplified, is:
100 3/2 = 203/2 = (203) * (1/2)
To express 100 3/2 as a product of identical factors in simplified form, we can write it as:
100 3/2 = (100 * 2) * (3/2) = 200 * (3/2)
Now, we can simplify by canceling out common factors:
200 * (3/2) = (2 * 100) * (3/2) = 2 * (100 * 3) * (1/2)
= (2 * 3) * (100 * 1)
= 6 * 100
Finally, the simplified form of the expression is:
100 3/2 = 6 * 100 = 600