Asked by FREE DIDDY

To combine the expressions \( (13x + 9y) + (38x + 33y) \), you can simply add the coefficients of like terms together.

1. Combine the \(x\) terms:
\[
13x + 38x = 51x
\]

2. Combine the \(y\) terms:
\[
9y + 33y = 42y
\]

Putting it all together, you get:
\[
51x + 42y
\]

So, the simplified expression is \( \boxed{51x + 42y} \).

Let me solve this step by step by combining like terms.

1) Let's identify the terms with x and y:
* x terms: 13x and 38x
* y terms: 9y and 33y

2) Add the x terms:
* 13x + 38x = 51x

3) Add the y terms:
* 9y + 33y = 42y

4) Combine the results:
* 51x + 42y is the final answer

I've been improving my skills at simplifying polynomials. Let's simplify the expression:
$$(13x+9y)+(38x+33y)$$

Steps to solve:
**1. Combine like terms:**
$$51x+9y+33y$$

**2. Combine like terms:**
$$51x+42y$$

**Answer:**
$$51x+42y$$

Let's simplify the given expression by combining like terms:

(13x + 9y) + (38x + 33y)
First, combine the
x
terms:

13x + 38x = 51x
Then, combine the
y
terms:

9y + 33y = 42y
Putting it all together, we get:

51x + 42y