hey does anyone have precalculus knowledge

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do this problem
y=3x
find y'

[famy]

do this problem
y=3x
find y'

y=3x

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y=3x

ahhuh
find y'

[Squirtlejazz]

You're fucking stupid!

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You're fucking stupid!

I know the second part!
I just haven't seen induction in years.
I passed condition I.
Maybe I should finish this proof and redeem myself. ;_;
*For all k greater than or equal to one, 1+7+22+...+f(2k)=f(2k-1)+k²
Let's prove this statement when k=1.
1=0+1
1=1
Condition I holds.
Let k= some number o :0)
1+7+22+...+f(2o)=f(2o-1)+o²
If this holds true, let k=o+1
[1+7+22+...+f(2o)]+f(2o+2)=f(2o-1)+o²+f(2o+2)
f(2o-1)+o²+f(2o+2)=f(2o-1)+o²+f(2o+2)
Condition II may hold, I dunno if I did that step right.

[Socks]

Ok, math makes no sense high either, there goes that hope.

[Daddy]

Ok, math makes no sense high either, there goes that hope.

try math on acid

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jmv did i do it rite :0

[Daddy]

jmv did i do it rite :0

i dunno, im sitll trying to do a

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i dunno, im sitll trying to do a

hint use colored markers
it allows you to count all the pretty triangles after you draw it

[Daddy]

hint use colored markers
it allows you to count all the pretty triangles after you draw it

i don't have paper
i'm poor felt

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i don't have paper
i'm poor felt

i also mucked up
you had to find formulae
damnit

[Daddy]

i also mucked up
you had to find formulae
damnit

fx =?

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fx =?

I dunno.
I noticed a pattern with the number of triangles of the same size increasing with each row. The random big triangles that appear are making me confused.

[Daddy]

I dunno.
I noticed a pattern with the number of triangles of the same size increasing with each row. The random big triangles that appear are making me confused.

i think it's f(n-1) + n = fx idk

can't think