Rewrite the expression as a product of identical factors to find the product for 100 3/2
. Submit your answer in simplified form.
Rewrite the expression as a product of identical factors to find the product for 100 3/2
Submit your answer in simplified form.
To rewrite the expression as a product of identical factors, we can write 100 3/2 as a mixed fraction:
100 3/2 = 100 + 3/2
Next, we need to convert the mixed fraction to an improper fraction:
100 + 3/2 = (100 * 2 + 3) / 2 = 203/2
Now, let's express 203/2 as a product of identical factors.
The factors of 203 are 7 and 29.
So, 203 can be written as 7 * 29.
And the denominator, 2, remains the same.
Therefore, the expression 100 3/2 can be written as:
100 3/2 = (7 * 29) / 2
Simplified, this becomes:
100 3/2 = 203/2
To rewrite the expression 100 3/2 as a product of identical factors, we can represent it as 100 multiplied by the fraction 3/2.
To rewrite the fraction 3/2 as a product of identical factors, we can express it as a fraction with the numerator and the denominator both raised to the power of 1, like this: (3^1)/(2^1).
Now, we can rewrite 100 multiplied by 3/2 as:
100 * (3^1)/(2^1)
To simplify this expression, we can perform the multiplication and exponentiation operations:
100 * (3/2) = 300/2 = 150
Therefore, the product of 100 3/2, in simplified form, is 150.
The expression 100 3/2 can be rewritten as 100 * (3/2).
To simplify this, we can divide 100 by 2 to get 50 and multiply it by 3 to get the final answer of 150.
Therefore, the product of 100 3/2 is 150.
The expression 100 3/2 can be written as (100)(3/2).
To simplify this expression further, we can multiply the whole numbers (100 and 3) and multiply the fractions (1/2).
(100)(3/2) = (100 * 3) * (1/2)
= 300 * (1/2)
= 150
Therefore, the product of 100 3/2 in simplified form is 150.