Math problems

Re: Math problems

Well I live in Texas so my Math classes are weird O.o
I'm considered "advanced" so in seventh grade I took Pre-Algebra. Eigth grade was Algebra I. Ninth grade was Geometry. Tenth grade was Algebra II. Now I'm about to be in Pre-Calculus. Then AP Calculus as a senior. If you aren't "advanced" then you take everything a year later than me (you finish off with Pre-Calculus as a senior). I don't know where "functions and relations" rank in my education system.

Re: Math problems

lol actually im takin calculus and vectors right now i finished that course a year ago



functions and relations is pre-calculus

Re: Math problems


Shame shame, dividing by zero.

Re: Math problems

The second statement, I've looked at it and it's interesting. There's also something on Wikipedia I've seen that says zero is equal to one.

Re: Math problems

0.99999999999 repeating = 1.

I win. Infinitesimals win. That ****ing dumbass 11th grade math 10th grader at my lunch table who insists I'm wrong about all of this loses.

Re: Math problems

Yup. This website may help for anyone who thinks otherwise. Nine different proofs on there.

Re: Math problems

We already figured that out but can any1 solve this?

Re: Math problems

umm... X = 2 dozen boxes of Pi

lol i could most likely solve it if i was in school, im pretty much shut down even though school started in 4 days

Re: Math problems

I'm a little rusty when it comes to trig identities but here goes:

(1/sin^2X) + (1/cos^2X) = (tan X + 1/tanX)^2

First I'd combine the first two terms:

(cos^2X+sin^2X)/(sin^2X*cos^2X) = (tan X + 1/tanX)^2

The numerator, cosX^2 + sin^2X, is equal to 1:

1/(sin^2X*cos^2X) = (tan X + 1/tanX)^2

This is the same as:

(1/(sinX*cosX))^2 = (tan X + 1/tanX)^2

So now we are basically trying to equate the things within the second-power-raise, so we aim to equate 1/(sinX*cosX) and tan X + 1/tanX.

Since tan = sin/cos and 1/tan or cot = cos/sin, we see that the right hand side is basically sin/cos + cos/sin, so we have two instances of each. Currently, the left hand side has half as many instances. Therefore we should try to prove this by simplifying the right-hand side:

tanX + 1/tanX
We then change tanX into tan^2X/tanX so we can combine like terms:
(1 + tan^2X)/tanX
And change our tangents into their sine and cosine equivalents:
(1 + (sinX/cosX)^2)/(sinX/cosX)
We then change the 1 into cos^2X/cos^2X so we can combine it as a like term later:
((cos^2X/cos^2X) + (sin^2X/cos^2X))/(sinX/cosX)
Combining terms:
(((cos^2X + sin^2X)/cos^2X))/(sinX/cosX)
cos^2X + sin^2X is equal to 1:
(1/cos^2X)/(sinX/cosX)
Then we simplify things a bit:
cosX/(sinX*cos^2X)
And finally drop the common cosX from the numerator and denominator:
1/(sinX*cosX)

Since we just proved 1/(sinX*cosX) = tanX + 1/tanX, we therefore prove:

(1/(sinX*cosX))^2 = (tan X + 1/tanX)^2

And since we showed that (1/sin^2X) + (1/cos^2X) = (1/(sinX*cosX))^2, we therefore prove:

(1/sin^2X) + (1/cos^2X) = (tan X + 1/tanX)^2

Edit: Oh yeah, QED

Re: Math problems

good job rubix you don't look that rusty too me
must have taken a while too get that all down

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For anyone too lazy to understand the (1/3) + (1/3) + (1/3) = 1 thing, I'll write an explanation that hopefully most can understand.

First, 1/3 = 0.333...

The "..." means that the sequence repeats infinitely, to the point where the last digit is a "3" and you cannot add a zero after that. It may sound weird, but trust me, that's the simplest explanation.

Now with simple algebra, we can understand more things.

0.333... = 1/3
0.999... = 1 (Multiply each side by 3)

But how can this be true? This is how:

Oh, and the space filter makes this a little hard to read. Sorry.

Let c = 0.999...

c = 0.999...
10c = 9.999... (Multiply each side by 10)
9c = 9.000... (Subtract 1c from each side)
c = 1.000... (Divide each side by 9)
c = 1 (Simplify)
0.999... = 1 (Substitution property of equality)

Yes, I stole this from Wikipedia.

And about the second problem, it just goes to show you that simplifying after every step is key . If you do that, you find out that you get 0=0 early on.