Whoever is the guest make an account and message me.
<3 <3 <3
74 is the answer
Learn to use the calculator here. Just enter your number, then press this key " √x", followed by = key.
cuanto es 8-(2/3)+(4*5) y procedimiento porfa???
8-(2/3)+(4*5) =
8-(2/3)+20 =
71/3 + 20 =27 1/3
cuanto es 8-(2/3)+(4*5) y procedimiento porfa
here is ' hi may be ' in binary
01101000 01101001 00100000 01101101 01100001 01111001 00100000 01100010 01100101
Here is just 'hi' 01101000 01101001 00100000
10001010001010001010001=2^22 + 2^18 +2^16 + 2^12 + 2^10 + 2^6 + 2^4 + 2^0=4,527,185
Yay! Wrap posts are back! :D
Glad you are back melody!
no thanks we are good here :)
Hold on ill go look and ill turn on the wifi :D
thats easy you're moms bath room I can't seem to get good wi-fi here tho
This is very easy
Heaven
I have found that the answer is 21 and 1/12. But I can't figure out how to get there.
Just divide: 3.75 / 10=.3375 tablespoon of coffee to make 1 cup. Or just over 1/3.
There are 52C5 ways to draw 5 card. Only 4 of those are royal flushes.
So
Prob is 4/ 52C5
nCr(52,5) = 2598960
So it is 4/2598960
2598960/4 = 649740
So it is 1/649740
This is assuming you pick up 5 cards and they are 10, J, Q, K, A all of the same suite BUT the order they are picked up in is NOT relevant.
0.000234
That is called "Binary System" that computers use. Your number is the same as:4,527,185 in decimal system.
4 x 1/52 x 1/51 x 1/50 x 1/49 x 1/48 = 1:77,968,800 (?) if you do not get to 'draw' any additional cards
I just guessed....the susequent answer is correct .... SEE:
https://en.wikipedia.org/wiki/Poker_probability
\(x =( {-b \pm \sqrt{b^2-4ac} \over 2a})*y+z/a\)
Royal flush: Five highest cards of the same suit. Ace, King, Queen, Jack, Ten:
Number of possible 5-card hands: 4. Chance:52C5=2,598,960. Or 4 chances in 2,598,960=1 chance in 649,740.
Thanks melody, glad your back from holiday!😆😋
Oh, btw there's still leftovers from my cocoa chocolate cake (that cake is one of my favorites)
I can't seem to get good wi-fi here tho
