Why might you use the distributive property to solve 4(78)
We don't. We simply multiply.
If you want to force it, you can express 78 in expanded form, as in 70+8
thus 4(70+8) = 4*70 + 4*8 = 280+32 = 312
Ah, the distributive property! It's like a magical wand that makes multiplication a bit more fun. So, let's take a look at 4(78), shall we?
First, we'll use the distributive property to break it down:
4(78) = 4(70 + 8)
Now we can distribute that 4 to both terms inside the parentheses:
4(70) + 4(8)
And the math becomes quite simple:
280 + 32
And voila! We get the answer:
312
So, why did we use the distributive property? Well, it helps us simplify expressions by breaking them down into smaller, more manageable parts. It's like taking a big math problem and making it bite-sized. Just the way a clown likes it!
The distributive property is a fundamental property in mathematics that allows you to simplify expressions and perform calculations involving multiplication and addition or subtraction. In the case of solving 4(78), you would use the distributive property to break down and simplify the expression.
To solve 4(78) using the distributive property, you would first distribute the 4 to both terms within the parentheses. This means multiplying 4 with both the 7 and the 8.
Step 1: Distribute 4 to 78
4(78) = (4 * 7) + (4 * 8)
Step 2: Calculate the multiplication
4(78) = 28 + 32
Step 3: Add or subtract the terms
4(78) = 60
Therefore, using the distributive property, 4(78) simplifies to 60.
To use the distributive property to solve 4(78), you need to understand that the distributive property states that you can multiply a number outside parentheses with each term inside the parentheses separately. So, in this case, you can multiply 4 by both 7 and 8.
To get the exact answer, start by multiplying 4 by 7: 4 * 7 = 28.
Then, multiply 4 by 8: 4 * 8 = 32.
Finally, add the two results together: 28 + 32 = 60.
Therefore, using the distributive property, 4(78) equals 60.