Question
M6|L20 Combining Like Terms (Part 1)Sign out
Write an equivalent expression with the fewest possible terms.
First, write subtraction as adding the opposite.
5a+1b−2a+3b
= 5a + 1b +
+ 3b
You got it!
Next, rewrite the order of the addends. Your expression should show all of the a's grouped together and all of the b's grouped together.
5a+1b−2a+3b
5a
+
−2a
+
1b
+
3b
Great job!
Now, write an equivalent expression with the fewest possible terms.
5a+1b−2a+3b
= 5a + 1b + −2a + 3b
= 5a + −2a + 1b + 3b
=
Write an equivalent expression with the fewest possible terms.
First, write subtraction as adding the opposite.
5a+1b−2a+3b
= 5a + 1b +
+ 3b
You got it!
Next, rewrite the order of the addends. Your expression should show all of the a's grouped together and all of the b's grouped together.
5a+1b−2a+3b
5a
+
−2a
+
1b
+
3b
Great job!
Now, write an equivalent expression with the fewest possible terms.
5a+1b−2a+3b
= 5a + 1b + −2a + 3b
= 5a + −2a + 1b + 3b
=
Answers
GPT-4o mini
To combine like terms, we will group the \(a\) terms together and the \(b\) terms together.
Starting from:
\[
5a + (-2a) + 1b + 3b
\]
Now, we combine the \(a\) terms:
\[
5a - 2a = 3a
\]
And we combine the \(b\) terms:
\[
1b + 3b = 4b
\]
Putting it all together, the equivalent expression with the fewest possible terms is:
\[
3a + 4b
\]
Starting from:
\[
5a + (-2a) + 1b + 3b
\]
Now, we combine the \(a\) terms:
\[
5a - 2a = 3a
\]
And we combine the \(b\) terms:
\[
1b + 3b = 4b
\]
Putting it all together, the equivalent expression with the fewest possible terms is:
\[
3a + 4b
\]