A Message

[Clemins]

easy

Nope! Try copy-pasting the morse code meabeab posted on page 1

[DonVelD]

age of 15 . . . or act like it.

Didn't you guys like, organize a bunch of posting on Misa's linkedin page calling him a pedo?

How would you describe this?

but you guys did it wdym

also youre being rly offtopic youre getting reported

[Dawidio123]

age of 15 . . . or act like it.

Didn't you guys like, organize a bunch of posting on Misa's linkedin page calling him a pedo?

How would you describe this?

but you guys did it wdym

also youre being rly offtopic youre getting reported

Didn't they also doxx mightysheep and tried to accuse people who literally were allied with him of doing it? Well that's not a surprise considering how many confirmed doxxers reside in WB

[DonVelD]

you're also being reported for being offtopic (im reporting myself as well)

[TheServant]

https://www.youtube.com/watch?v=Gh_mhcBpp-s

watch this before you bring your hate to this forum... noone doxed mightyshit we are not beta males

[DonVelD]

jesus fuck just solve the puzzle weirdos have this talk somewhere else

[TheServant]

jesus fuck just solve the puzzle weirdos have this talk somewhere else

i tried using chat gpt but didnt work

[Clemins]

Can you guys do this somewhere else plz ty

[noindyfikator]

@Clemins

easy

https://www.boxentriq.com/code-breaking/cryptogram

Code: Select all

To solve the equation given the values of \( n \) and \( k \):

\[ y = \frac{8k^8 - \cos(2k)}{\sin\left(\frac{1}{2}k\right)} \div (9e^n \times 5) \]

where \( n = 0 \) and \( k = 4.835 \), follow these steps:

First, substitute the given values for \( n \) and \( k \):

\[ y = \frac{8(4.835)^8 - \cos(2 \times 4.835)}{\sin\left(\frac{1}{2} \times 4.835\right)} \div (9e^0 \times 5) \]

Since \( e^0 = 1 \), the equation simplifies to:

\[ y = \frac{8(4.835)^8 - \cos(9.67)}{\sin(2.4175)} \div 45 \]

Now, let's calculate the components step by step.

1. Compute \( 8(4.835)^8 \):

\[ 8(4.835)^8 \approx 8 \times 1756012.521 \approx 14048100.168 \]

2. Compute \( \cos(9.67) \):

\[ \cos(9.67) \approx -0.927 \]

3. Compute \( \sin(2.4175) \):

\[ \sin(2.4175) \approx 0.6618 \]

Putting these values into the equation:

\[ y = \frac{14048100.168 - (-0.927)}{0.6618} \div 45 \]

\[ y = \frac{14048100.168 + 0.927}{0.6618} \div 45 \]

\[ y \approx \frac{14048101.095}{0.6618} \div 45 \]

\[ y \approx 21225807.397 \div 45 \]

\[ y \approx 471684.61 \]

Therefore, the value of \( y \) is approximately 471684.61.

[DonVelD]

wrong