Namecard Rewards Event - August 24th - 30th
Comments
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whaaaaat????!!![GM]Castiel wrote: »To expand upon [GM]ql_la's post, here is an example of what must be done.
For Example:
If I were going after the Combat Axe - Rose and the correct order was Mutant Helix, CF Splatter, Hazard, Blue, Back to School 1; then I would have to purchase those namecards one at a time in that order to win it.
Steps:
1) Purchase Mutant Helix
2) Purchase CF Splatter
3) Purchase Hazard
4) Purchase Blue NameTag
5) Purchase Back to School 1
Upon purchasing Back to School 1 I would immediately be eligible for the prize.
*NOTE: This is just an example! This order IS NOT the order for the Combat Axe-Rose*
The sequence will always finish with the Back to School 1 Namecard. So only purchase that one last.
hi
i dont understand any thing spetially from this misguided example and that for
1- Mutant Helix is not gp or zp name card in list
2- Hazard is not gp or zp name card in list
3- the list in example is compined between zp and gp
so i choose from 6 for each prize or from 12 for each prize or 14 when we count in step 1&2 above
i couldn't found the statistic for guessing the right sequence i think it more than 1\120
any way this method may worst than spinning in black market but for axe may worth but for other rewards not worth -
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{1,2,3,4} {1,2,3,6} {1,2,4,3} {1,2,4,6}{1,2,6,3} {1,2,6,4} {1,3,2,4}{1,3,2,6} {1,3,4,2} {1,3,4,6} {1,3,6,2} {1,3,6,4} {1,4,2,3} {1,4,2,6} {1,4,3,2} {1,4,3,6} {1,4,6,2} {1,4,6,3} {1,6,2,3} {1,6,2,4} {1,6,3,2} {1,6,3,4} {1,6,4,2} {1,6,4,3} {2,1,3,4} {2,1,3,6} {2,1,4,3} {2,1,4,6} {2,1,6,3} {2,1,6,4} {2,3,1,4} {2,3,1,6} {2,3,4,1} {2,3,4,6} {2,3,6,1} {2,3,6,4} {2,4,1,3} {2,4,1,6} {2,4,3,1} {2,4,3,6} {2,4,6,1} {2,4,6,3} {2,6,1,3} {2,6,1,4} {2,6,3,1} {2,6,3,4} {2,6,4,1} {2,6,4,3} {3,1,2,4} {3,1,2,6} {3,1,4,2} {3,1,4,6} {3,1,6,2} {3,1,6,4} {3,2,1,4} {3,2,1,6} {3,2,4,1} {3,2,4,6} {3,2,6,1} {3,2,6,4} {3,4,1,2} {3,4,1,6} {3,4,2,1} {3,4,2,6} {3,4,6,1} {3,4,6,2} {3,6,1,2} {3,6,1,4} {3,6,2,1} {3,6,2,4} {3,6,4,1} {3,6,4,2} {4,1,2,3} {4,1,2,6} {4,1,3,2} {4,1,3,6} {4,1,6,2} {4,1,6,3} {4,2,1,3} {4,2,1,6} {4,2,3,1} {4,2,3,6} {4,2,6,1} {4,2,6,3} {4,3,1,2} {4,3,1,6} {4,3,2,1} {4,3,2,6} {4,3,6,1} {4,3,6,2} {4,6,1,2} {4,6,1,3} {4,6,2,1} {4,6,2,3} {4,6,3,1} {4,6,3,2} {6,1,2,3} {6,1,2,4} {6,1,3,2} {6,1,3,4} {6,1,4,2} {6,1,4,3} {6,2,1,3} {6,2,1,4} {6,2,3,1} {6,2,3,4} {6,2,4,1} {6,2,4,3} {6,3,1,2} {6,3,1,4} {6,3,2,1} {6,3,2,4} {6,3,4,1} {6,3,4,2} {6,4,1,2} {6,4,1,3}{6,4,2,1} {6,4,2,3} {6,4,3,1} {6,4,3,2}24+120+720 = 844 time you will have to buy a name card.
Each one costs 600zp for 7 days. 600 x 844 = 506,400 zp you will have to spend to GAURENTEE a rose axe
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Also NOTE*** back to school name card is different than the summer name card and you will have to buy 844 of those. Each costs 4200 gp for 7 days. Sooooo 4200 x 844 = 3,544,800 GP
You will have to spend that much GP as well.
Are you actually going to go through this? Lol. Madness.
Ur dumb
Soo guys, lets use logic, in order to validate each 4 sequence of name cards you need to use the back to school name card.
That means that every combination has the name card 5 (its the fifth name card acc. to theyr order) at the end and it can not have the fifth card in the first 4.
This means that here you have the correct combinations
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You are right! The guy make huge mathematical error. It is choosing 4 cards out of 6 with the order of the cards important that is 6 P 4 = 360About the calculation I felt like u made a mistake, you are supposed to choose 4 name cards out the list of 6, assuming non-repeating. Not just a permutation from list of 4, of 5, of 6. -
try them all and let me know in the comments below the result{1,2,3,4} {1,2,3,6} {1,2,4,3} {1,2,4,6}{1,2,6,3} {1,2,6,4} {1,3,2,4}{1,3,2,6} {1,3,4,2} {1,3,4,6} {1,3,6,2} {1,3,6,4} {1,4,2,3} {1,4,2,6} {1,4,3,2} {1,4,3,6} {1,4,6,2} {1,4,6,3} {1,6,2,3} {1,6,2,4} {1,6,3,2} {1,6,3,4} {1,6,4,2} {1,6,4,3} {2,1,3,4} {2,1,3,6} {2,1,4,3} {2,1,4,6} {2,1,6,3} {2,1,6,4} {2,3,1,4} {2,3,1,6} {2,3,4,1} {2,3,4,6} {2,3,6,1} {2,3,6,4} {2,4,1,3} {2,4,1,6} {2,4,3,1} {2,4,3,6} {2,4,6,1} {2,4,6,3} {2,6,1,3} {2,6,1,4} {2,6,3,1} {2,6,3,4} {2,6,4,1} {2,6,4,3} {3,1,2,4} {3,1,2,6} {3,1,4,2} {3,1,4,6} {3,1,6,2} {3,1,6,4} {3,2,1,4} {3,2,1,6} {3,2,4,1} {3,2,4,6} {3,2,6,1} {3,2,6,4} {3,4,1,2} {3,4,1,6} {3,4,2,1} {3,4,2,6} {3,4,6,1} {3,4,6,2} {3,6,1,2} {3,6,1,4} {3,6,2,1} {3,6,2,4} {3,6,4,1} {3,6,4,2} {4,1,2,3} {4,1,2,6} {4,1,3,2} {4,1,3,6} {4,1,6,2} {4,1,6,3} {4,2,1,3} {4,2,1,6} {4,2,3,1} {4,2,3,6} {4,2,6,1} {4,2,6,3} {4,3,1,2} {4,3,1,6} {4,3,2,1} {4,3,2,6} {4,3,6,1} {4,3,6,2} {4,6,1,2} {4,6,1,3} {4,6,2,1} {4,6,2,3} {4,6,3,1} {4,6,3,2} {6,1,2,3} {6,1,2,4} {6,1,3,2} {6,1,3,4} {6,1,4,2} {6,1,4,3} {6,2,1,3} {6,2,1,4} {6,2,3,1} {6,2,3,4} {6,2,4,1} {6,2,4,3} {6,3,1,2} {6,3,1,4} {6,3,2,1} {6,3,2,4} {6,3,4,1} {6,3,4,2} {6,4,1,2} {6,4,1,3}{6,4,2,1} {6,4,2,3} {6,4,3,1} {6,4,3,2}
Soo guys, lets use logic, in order to validate each 4 sequence of name cards you need to use the back to school name card.
That means that every combination has the name card 5 (its the fifth name card acc. to theyr order) at the end and it can not have the fifth card in the first 4.
This means that here you have the correct combinations
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0112447
1,2,3,4} {1,2,3,6} {1,2,4,3} {1,2,4,6}{1,2,6,3} {1,2,6,4} {1,3,2,4}{1,3,2,6} {1,3,4,2} {1,3,4,6} {1,3,6,2} {1,3,6,4} {1,4,2,3} {1,4,2,6} {1,4,3,2} {1,4,3,6} {1,4,6,2} {1,4,6,3} {1,6,2,3} {1,6,2,4} {1,6,3,2} {1,6,3,4} {1,6,4,2} {1,6,4,3} {2,1,3,4} {2,1,3,6} {2,1,4,3} {2,1,4,6} {2,1,6,3} {2,1,6,4} {2,3,1,4} {2,3,1,6} {2,3,4,1} {2,3,4,6} {2,3,6,1} {2,3,6,4} {2,4,1,3} {2,4,1,6} {2,4,3,1} {2,4,3,6} {2,4,6,1} {2,4,6,3} {2,6,1,3} {2,6,1,4} {2,6,3,1} {2,6,3,4} {2,6,4,1} {2,6,4,3} {3,1,2,4} {3,1,2,6} {3,1,4,2} {3,1,4,6} {3,1,6,2} {3,1,6,4} {3,2,1,4} {3,2,1,6} {3,2,4,1} {3,2,4,6} {3,2,6,1} {3,2,6,4} {3,4,1,2} {3,4,1,6} {3,4,2,1} {3,4,2,6} {3,4,6,1} {3,4,6,2} {3,6,1,2} {3,6,1,4} {3,6,2,1} {3,6,2,4} {3,6,4,1} {3,6,4,2} {4,1,2,3} {4,1,2,6} {4,1,3,2} {4,1,3,6} {4,1,6,2} {4,1,6,3} {4,2,1,3} {4,2,1,6} {4,2,3,1} {4,2,3,6} {4,2,6,1} {4,2,6,3} {4,3,1,2} {4,3,1,6} {4,3,2,1} {4,3,2,6} {4,3,6,1} {4,3,6,2} {4,6,1,2} {4,6,1,3} {4,6,2,1} {4,6,2,3} {4,6,3,1} {4,6,3,2} {6,1,2,3} {6,1,2,4} {6,1,3,2} {6,1,3,4} {6,1,4,2} {6,1,4,3} {6,2,1,3} {6,2,1,4} {6,2,3,1} {6,2,3,4} {6,2,4,1} {6,2,4,3} {6,3,1,2} {6,3,1,4} {6,3,2,1} {6,3,2,4} {6,3,4,1} {6,3,4,2} {6,4,1,2} {6,4,1,3}{6,4,2,1} {6,4,2,3} {6,4,3,1} {6,4,3,2} -
1,2,3,4} {1,2,3,6} {1,2,4,3} {1,2,4,6}{1,2,6,3} {1,2,6,4} {1,3,2,4}{1,3,2,6} {1,3,4,2
1,2,3,4} {1,2,3,6} {1,2,4,3} {1,2,4,6}{1,2,6,3} {1,2,6,4} {1,3,2,4}{1,3,2,6} {1,3,4,2} {1,3,4,6} {1,3,6,2} {1,3,6,4} {1,4,2,3} {1,4,2,6} {1,4,3,2} {1,4,3,6} {1,4,6,2} {1,4,6,3} {1,6,2,3} {1,6,2,4} {1,6,3,2} {1,6,3,4} {1,6,4,2} {1,6,4,3} {2,1,3,4} {2,1,3,6} {2,1,4,3} {2,1,4,6} {2,1,6,3} {2,1,6,4} {2,3,1,4} {2,3,1,6} {2,3,4,1} {2,3,4,6} {2,3,6,1} {2,3,6,4} {2,4,1,3} {2,4,1,6} {2,4,3,1} {2,4,3,6} {2,4,6,1} {2,4,6,3} {2,6,1,3} {2,6,1,4} {2,6,3,1} {2,6,3,4} {2,6,4,1} {2,6,4,3} {3,1,2,4} {3,1,2,6} {3,1,4,2} {3,1,4,6} {3,1,6,2} {3,1,6,4} {3,2,1,4} {3,2,1,6} {3,2,4,1} {3,2,4,6} {3,2,6,1} {3,2,6,4} {3,4,1,2} {3,4,1,6} {3,4,2,1} {3,4,2,6} {3,4,6,1} {3,4,6,2} {3,6,1,2} {3,6,1,4} {3,6,2,1} {3,6,2,4} {3,6,4,1} {3,6,4,2} {4,1,2,3} {4,1,2,6} {4,1,3,2} {4,1,3,6} {4,1,6,2} {4,1,6,3} {4,2,1,3} {4,2,1,6} {4,2,3,1} {4,2,3,6} {4,2,6,1} {4,2,6,3} {4,3,1,2} {4,3,1,6} {4,3,2,1} {4,3,2,6} {4,3,6,1} {4,3,6,2} {4,6,1,2} {4,6,1,3} {4,6,2,1} {4,6,2,3} {4,6,3,1} {4,6,3,2} {6,1,2,3} {6,1,2,4} {6,1,3,2} {6,1,3,4} {6,1,4,2} {6,1,4,3} {6,2,1,3} {6,2,1,4} {6,2,3,1} {6,2,3,4} {6,2,4,1} {6,2,4,3} {6,3,1,2} {6,3,1,4} {6,3,2,1} {6,3,2,4} {6,3,4,1} {6,3,4,2} {6,4,1,2} {6,4,1,3}{6,4,2,1} {6,4,2,3} {6,4,3,1} {6,4,3,2} -
This event is way to hard to understand for the average 13yo egy. Be prepared for allot of "me no understnd" posts.
And wow.....danah, are you spending 550k zp for an axe? Its your choice what the hell you do with your money but how can you afford blowing so much money for things like this? Just curious and amazed. -
Can't understand what Baecan is calculating from.
This is a non-repetition permutation so you need to use the formula 6!/(6-2)! (or 6P4) which gives 360 orders for choosing arrays of namecards.
Since each order consists of 4 ZP namecards (600 ZP) and a single GP namecard (4200 GP) from ZP sequence.
This gives:
360*4*600=864000 ZP and 360*4200 = 1512000 GP
Thus, to get a guaranteed combat axe (or brass crates) by purchasing every orders, you need to spend a total of 864000ZP + 1512000 GP (which is absurd)
Each order from GP sequence has 5 GP namecards (4200 GP).
This gives:
360*5*4200= 7560000 GP
Thus, to get a guaranteed M93R crates (or Golden desert eagle) by purchasing every orders, you need to spend a total of 7560000 GP.
Guess I am passing this event. -
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hello sir[GM]Castiel wrote: »To expand upon [GM]ql_la's post, here is an example of what must be done.
For Example:
If I were going after the Combat Axe - Rose and the correct order was Mutant Helix, CF Splatter, Hazard, Blue, Back to School 1; then I would have to purchase those namecards one at a time in that order to win it.
Steps:
1) Purchase Mutant Helix
2) Purchase CF Splatter
3) Purchase Hazard
4) Purchase Blue NameTag
5) Purchase Back to School 1
Upon purchasing Back to School 1 I would immediately be eligible for the prize.
*NOTE: This is just an example! This order IS NOT the order for the Combat Axe-Rose*
The sequence will always finish with the Back to School 1 Namecard. So only purchase that one last.
I can't understand this event
I have already read it 6 times but nothing
Also , im going for gp namecard.
What should I do to win?
Please help me
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Yeah you're right. People open hundreds of crates for the weapon they want.
Fine, tell me how much people spend on crates until they finally win their weapon?
But most people dont start with 500 crates, they buy like 50, then win nothing, buy 50 or 100more, win nothing but feel like they are close to winning so buy 50more and so on. So they end up spending way more money than they initialy wanted to spend.
But Im just curious how you can spend thousends of euro's/dollars on, practicly, worthless virtual items while knowing you will lose everything when this game goes offline. Is it just pocket change for you?
Again, Im not criticizing Im just wondering. -
Yeah you're right. People open hundreds of crates for the weapon they want.
But most people dont start with 500 crates, they buy like 50, then win nothing, buy 50 or 100more, win nothing but feel like they are close to winning so buy 50more and so on. So they end up spending way more money than they initialy wanted to spend.
But Im just curious how you can spend thousends of euro's/dollars on, practicly, worthless virtual items while knowing you will lose everything when this game goes offline. Is it just pocket change for you?
Again, Im not criticizing Im just wondering.
Ask for her social security. I mean.. might as well?
You can just say its her money and she wants to use it on a game. -
Lol Nope
Only trying to get those desperate to buy things no player would ever buy, for some cheap prize...
The GP one isn't worth in the slightest, the Golden Deagle can be saved up for 100 coupons, takes a while to obtain free but its perm so worth.
Why bother spending more than what 30 Crates of M93R to actually get them, would rather buy the crates straight up.
The Zp one couldn't be more upsetting, paying a lot more than a crate to get a little chance at getting a combo correct... for a re-skin... cmon who cares for that 2nd zp prize... xD
Waste of money from both sides tbh... -
To have a 100% chance of getting the axe you need to buy 4 NameCards 360 times. EZPZ :rolleyes::eek:
Ooooo
No you dont
The post says at least 4 name cards. It can be a combination of 5 and 6.
That puts the grand total to an astronomical number for $$$
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