Find the following. Assume a and b can represent any real number
440�ã(a+b)440
Is the answer a[b]
To find the expression 440(a+b)440, we need to apply the distributive property. This property states that multiplying a number by a sum is the same as multiplying the number separately by each term in the sum and then adding the results.
So, let's distribute 440 to both terms in the parentheses:
440(a+b) = 440 * a + 440 * b
Multiplying 440 by a gives us 440a, and multiplying 440 by b gives us 440b. Therefore, the expression simplifies to:
440a + 440b
So, the answer to the expression 440(a+b)440 is indeed a[b], which can be written as 440a + 440b.