** Which expression demonstrates the distributive property applied to the expression 4(x + y)?

Question

asked Apr 26, 2024 86.2k views

1 Answer

CubanGuy · Answer 1 · 2024-05-01T03:42:23+0000

The correct answer is option B) 4x + 4y.

Let's break down the solution step by step:

**Step 1: Original Expression**

The given expression is
$4(x + y)$ .

**Step 2: Apply Distributive Property**

Apply the distributive property, which states that
$$a \cdot (b + c) = a \cdot b + a \cdot c$.$

$4(x + y) = 4 \cdot x + 4 \cdot y$

**Step 3: Simplify**

Multiply 4 by both
$x$ and
$y$ to get
$$4x + 4y$.$

**Step 4: Evaluate Options**

Evaluate the provided options:

- Option A)
$4x + y$ is not correct because it fails to distribute 4 to both $x$ and $y$.

- Option B)
$4x + 4y$ is the correct expression after applying the distributive property.

- Option C)
$4(y + x)$ rearranges the order but maintains the correct distribution.

- Option D)
$4 \cdot (y \cdot x)$ multiplies 4 by the product of
$y$ and
$x$ but does not distribute 4 to both $x$ and $y$.

**Conclusion:**

The correct expression demonstrating the distributive property is
$$4x + 4y$,$ so the answer is option B).

The question probable maybe:

Which expression demonstrates the distributive property applied to the expression 4(x + y) ?
A) 4x + y
B) 4x + 4y
C) 4(y + x)
D) 4* (y * x)