Question

Write a letter to a pre-algebra student explaining why algebra problems involve letters. Give at least two examples of expressions involving letters, and explain what the letters used in the examples stand for.

Answer 1

Remember how you used to use the little boxes in elementary school? \[1+[~~ ]=4\] Well, letters are a lot like those little boxes, only more organized. Can you imagine writing \[6^x t* p+2=x+9*8\] with those little boxes? You'd have to make up all different forms of the box in order for the student to be able to find what [ ] equals. So, now that you're starting to learn about algebra, you need to use letters to help you organize these more complex equations.

Answer 2

I think I just peed my pants.

Answer 3

I already did

Answer 4

Did it feel good?

Answer 5

nice and warm

Answer 6

Look sharp ^.^

Answer 7

Shut it, you're like 12 e.e

Answer 8

Jesse, I'm 9. FFS get it right :/

Answer 9

Gah, I always forget. Cut me some slack bruh.

Answer 10

**Looks Around** Jesus... let's not do this here... I told you I was going to play child support omg...

Answer 11

Im about 2000% done

Answer 12

2,000% done= 2,000% cliche

Answer 13

Sweg af. But to answer this question, say you have .7 on you and your local police officer is trying to cop for $10. Let's also say your mom gave you $x for lunch (that you never used) and you're planning on using that money for a hooker that charges $30 for a full package.
Let's create an equation:

10+x=$30

Answer 14

LMAO

Answer 15

Wait, but what about bus fair? The equation needs to be\[10+x=30+y\]

Answer 16

True. Stoners don't drive.

Answer 17

You also forgot the cost of bail from jail after you laced that weed with spice. You're also going to have to figure the probability of picking the jail cell lock before calculating bail in.

Answer 18

Well, looks like we'd have to convert to Hilbert space. So using the probability of picking jail lock, we can apply the principle of uncertainty and then find the partial derivative of f(x,y). Then we can go ahead and model a contour plot using the function variable of current pocket balance and analyze deltax.

Answer 19

What does all this have to do with the question

Answer 20

By talking about stoners bail jail and stuff

Answer 21

pellet... looks like we'd have to calculate the probability of certainty @ several Cartesian coordinates.

Answer 22

Well, we can just use the partial of the original probability and apply that over the original derivative

Answer 23

From all this I think I can actually generate a plausible equation... I'm actually going to try this xD

Answer 24

Assuming the jail cell was picked (without factoring probability)

\[\frac{ \partial f}{ \partial y }(x,y)=\frac{ \Delta f(x)-\Delta x }{ \Delta y + x0 }\]

Answer 25

Prime*

Answer 26

Wait that doesn't sound right because we didn't find the limit of the original

Answer 27

Yes so...
if it was
\(\Large\frac{ \partial f}{ \partial y }(x,y)=\frac{ \Delta f(x)-\Delta x }{ \Delta y + x0 }\)
Then it had to go out as:
\[\Large \frac{ \Delta \infty \eta \int\limits_{4}^{x} }{ \sum_{d}^{f} }\pm \subseteq \frac{ \prod_{2}^{4} }{ x \rightarrow \lim_{23 \rightarrow 87} }\]
Assuming that the bus was ridden and the jailbait was wide open allowing a passage way throught the openings...
But if there were no openings how would he subsequently get the bus ticket without paying if he had no money... Im stumped :/

Answer 28

or am i wrong happy?

Answer 29

What the flutter. Delta, Infinite, nth term and then a false attempt of incomplete integration of no function. Die in a bush Cam.

Answer 30

LOOOOOL

Answer 31

What you did was basically doing this: sdifhqeuiwtnjgkrquthejwri xD

Answer 32

XD

Answer 33

i got a medal too XD