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### Course: 7th grade (Eureka Math/EngageNY) > Unit 3

Lesson 1: Topic A: Use properties of operations to generate equivalent expressions- Intro to combining like terms
- Combining like terms with negative coefficients & distribution
- Combining like terms with negative coefficients
- Combining like terms with negative coefficients
- Combining like terms with negative coefficients & distribution
- Combining like terms with rational coefficients
- Combining like terms with rational coefficients
- The distributive property with variables
- Factoring with the distributive property
- Distributive property with variables (negative numbers)
- Equivalent expressions: negative numbers & distribution
- Equivalent expressions: negative numbers & distribution
- Interpreting linear expressions: flowers
- Interpreting linear expressions: diamonds
- Interpreting linear expressions

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# Interpreting linear expressions: flowers

Let's practice matching expressions to their meaning in this example of interpreting linear expressions. Created by Sal Khan.

## Want to join the conversation?

- why don't the videos match what the questions are talking about in the actual practice lesson?(12 votes)
- This video uses the actual practice lesson. The format looks different because it is the old format that KA had until a couple of years ago. But the problems do come from the exercise set.(3 votes)

- This video is so confusing that I feel brain dead like Kaminari...somone explain this more simple to me so I don't fry my brain with electric from my headphones because they are dead...(10 votes)
- Thanks for advice. And at least someone understood my joke...I'm just trying to lighten up the mood with comedy from My Hero Academia..And I was trying to be funny, I like making jokes like that.(5 votes)

- this isnt helping at all(4 votes)
- Well, it makes sense. Variables also have several unknowns. But it's one of each. 2V + V

V in this case is equal to 1. So the solution is 3V.

And remember the video before. The variable means 1V. V can be anything.(0 votes)

- im confused i dont understand anything(2 votes)
- Can someone explain this, please?(2 votes)
- hello and how are you today on this fiiiine evnin?(0 votes)

- watched this and the pony video about a hundred times and i still dont understand it! this is my last skill before im done with 7th grade math and im so confused! :((1 vote)
- What is a linear expression?\(2 votes)
- "It is made up of two expressions set equal to each other. A linear equation is special because: It has one or two variables. No variable in a linear equation is raised to a power greater than 1 or used as the denominator of a fraction."

For more information and reference go here:

http://eduplace.com/math/mathsteps/7/d/index.html(0 votes)

- how do you do interpreting linear expression?(0 votes)
- i dont get anything tho :((0 votes)
- How do you interpret algebraic expressions in terms of their context?(1 vote)
- You have to ask the "Why?". In the video the bouquets were made up of four tulips and three violets. The different expressions then changed the different bouquet expressions to be used in a different way, such as
`3(4T + 3V)`

. In that case it took the equation for the bouquet`4T + 3V`

and multiplied it by three for three bouquets. You need to think the "Why?" Doing that will show you the meaning, like "Why did they multiply it by 3?" and that's because they wanted three bouquets, which gives you the answer. Hope that helps! ^_^(0 votes)

## Video transcript

Martin likes to
make flower bouquets that each have 3
violets and 4 tulips. If the price of a violet is V
and the price of a tulip is T, match the expressions
to their meanings. So let's see-- the price
of 1 of Martin's bouquets. So one of Martin's bouquets
has 3 violets and 4 tulips. So the 3 violets are
going to cost 3 times the price of the
violet, which is V. So that's the cost of
the violets, 3V. And then the 4 tulips
are going to cost 4 times the price of a tulip. So that's 4T. So it's 3V plus 4T. So it's not this one. Let's see. This one right over
here, this is 4T plus 3V. So this is the price of 4
tulips, 4 times the price of a tulip, plus 3 times
the price of a violet. The price of 3 of
Martin's bouquets, so it's essentially going
to be 3 times this quantity right over here. This is the price of 1 bouquet. We want 3 of them. So it's going to be 3 times
the quantity 4T plus 3V. And let's see. If I were to actually multiply
this out, 3 times 4T is 12T, and then plus 3 times 3V is 9V. So this is the same
thing if I were to distribute the
3-- is 12T plus 9V. Well, that's this
right over here. These two are
equivalent expressions. And let's see. Are any of these other
things equivalent? No, this says 3
times 3T plus 4V. So I'm going to put this
in the not used bucket. And then I have--
let's see-- 3V plus 2T. I'm going to put it in
the not used bucket. And let's see. This has 2V plus 4T plus V.
So if I were to simplify this, if I were to combine the V
terms-- if I have two V's and I add another V, that's
three V's plus 4T. So this is actually the
same thing as the price of 1 of Martin's bouquets. So you could view this
as the price of 2 violets plus the price of 4 tulips
plus another violet. So it's really the price
of 3 violets and 4 tulips. So let's check our answer. We got it right.