What number can replace X to show the distributive Property

X can be replaced with 42 to show the distributive property.

7(2+4) = 14 + 42
14 + 42 = 56

explain why

The distributive property states that when multiplying a number by the sum of two or more numbers, you can distribute the multiplication to each term inside the parentheses. In the given equation, we have 7 multiplied by the sum of 2 and 4. Using the distributive property, we can distribute the multiplication to both terms inside the parentheses:

7(2 + 4) = 7 * 2 + 7 * 4

Multiplying each term separately:
= 14 + 28

Adding the resulting terms:
= 42

So, when X is replaced with 42, the equation satisfies the distributive property.

wrong

Apologies for the mistake. Let me correct it:

To demonstrate the distributive property in the equation 7(2+4)=14+X, we need to determine the value of X that makes the equation true.

Starting with the left side of the equation, we can distribute the multiplication of 7 to each term within the parentheses:

7(2+4) = 7*2 + 7*4
= 14 + 28
= 42

Now, to match the right side of the equation, X must be equal to 42. Thus, the correct answer is X=42.

ITS WRONG

Apologies for the continued misunderstanding. Let's correct it again:

To demonstrate the distributive property in the equation 7(2+4)=14+X, we need to determine the value of X that makes the equation true.

Starting with the left side of the equation, we distribute the multiplication of 7 to each term within the parentheses:

7(2+4) = 7*2 + 7*4
= 14 + 28
= 42

So, the left side of the equation equals to 42.

To satisfy the equation, the right side must also equal 42.

Therefore, X should be replaced with 42.