expand
9(4c+5)
Expanding 9(4c+5) means distributing the 9 to both terms inside the parentheses.
To do this, we multiply 9 by each term inside the parentheses:
9 * 4c = 36c
9 * 5 = 45
Therefore, the expansion of 9(4c+5) is 36c + 45.
To expand the expression 9(4c+5), we need to distribute the 9 to both terms inside the parentheses.
So, 9 * 4c equals 36c, and 9 * 5 equals 45.
Therefore, the expanded expression is 36c + 45.
To expand the expression 9(4c+5), you need to apply the distributive property. This property states that when you multiply a number by a sum of two or more terms, you need to multiply the number by each term and then add the products.
In this case, you will multiply 9 by both 4c and 5. Following the distributive property, here's how you expand the expression:
9(4c + 5) = 9 * 4c + 9 * 5
Multiplying each part separately:
9 * 4c = 36c
9 * 5 = 45
So, the expanded form of 9(4c+5) is:
36c + 45