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Course: 6th grade > Unit 6
Lesson 7: Evaluating expressions word problems- Evaluating expressions with variables: temperature
- Evaluating expressions with variables word problems
- Evaluating expressions with variables word problems
- Evaluating expressions with variables: cubes
- Evaluating expressions with variables: exponents
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Evaluating expressions with variables word problems
Learn to evaluate expressions in word problems to gain new information.
Reflection question
Let's try a practice problem!
Challenge problem
Extra challenge
Explain to a family member, friend, or classmate why the cost of six roses is not double the cost of three roses.
Want to join the conversation?
- This extra challenge has frozen the two brain cells I had to rub together, and fried them at the same time, which I did not know was possible. There's simply not enough information to make an informed, rational decision. I mean, who's writing these challenges? 10 out of 10 for style... I think it has something to do with overhead costs and distance to travel, but I just can't sort it out with any clarity.(71 votes)
- The expression 2 + 5r for the total cost of r roses means $5 per rose plus a constant $2 fee for the entire purchase. If the number of roses is doubled (for example, 6 roses instead of 3 roses), only the cost of the roses without the fee is doubled, but the $2 fee is not doubled to $4. So doubling the number of roses comes $2 short of doubling the total cost.
Algebraically, the total cost of 2r roses is 2 + 5(2r) = 2 + 10r dollars.
However, twice the total cost of r roses would be 2(2 + 5r) = 2(2) + 2(5r) = 4 + 10r dollars.
So once again, we see that doubling the number of roses comes $2 short of doubling the total cost.
Have a blessed, wonderful day!(79 votes)
- how do you find the value of the muffins and cakes? it doesn't give enough info?(15 votes)
- It gives all the info you need.
We have the expression:
2m+10c
Where m are muffins and c are cakes.
the question is : How much money does the dessert store make from selling three muffins and four cakes?
So m = 3 and c = 4
Now just plug muffins and cakes into the expression 2m+10c
2(3) + 10(4) or 2*3+10*4, both are the same thing
Now do the multiplication first and it becomes:
6 + 40
= 46
$46 dollars for 3 muffins and 4 cakes(27 votes)
- the extra challenge is making me loose my brain cells(18 votes)
- i almost lost them but i assumed the 2 has to do something with it(2 votes)
- What does it mean mathematically if you "plug something in"?(6 votes)
- It's called "substitution". You replace one item with another of equal value.(13 votes)
- Cam has 32 dollars. How many roses can he afford to buy?
Assume that he wants to buy as many roses as he can. The answer is he can buy 6 roses for $32 but I do not understand why that is the answer.(5 votes)- If he buys 6 roses, the cost (from the formula in the problem) is 2 + 5r = 2 + 5(6) = 32.(13 votes)
- I literally don't understand anything why is the first answer 10 and not 53 that makes no sense if I were to multiply 5 by ten that would be 50 and if I add 3 that would be 53 this makes no sense what so ever(6 votes)
- 1st Question: What is Sal finding when he uses t=10?
The problem tells you "t" is the number of tickets. And, it tells you that the expression calculates the cost of tickets. So, if Sal is using t=10, he is find the cost of 10 tickets. The question didn't ask you to find the cost. It asked you what the end result would represent.
Also, the last option (the number of tickets that you can buy for $53) assumes that you know the cost and you don't know the number of tickets. The tickets is the given value.
Hope this helps.(12 votes)
- can you explain 100+20(51/4)(6 votes)
- 100+20(5 1/4)
Follow order of operations rules - PEMDAS:
You must multiply 1st.
-- Change 5 1/4 into an improper fraction = 21/4
-- Multiply: 20 (21/4) = 20/1 * 21/4 = 5 (21) = 105
Your expression is now: 100+105
Add the 2 numbers and you'll have your answer.(7 votes)
- I have no idea how to do this. Can someone explain what he did in the video?(6 votes)
- I do not understand the second one the problem(6 votes)
- I can't explain the extra challenge. I just used the formula that they said to use.(4 votes)