All the pronumerals I introduce represent integers
Looking at 2 and 3
so m=2(2b+1)+b = 4b+2+b = 5b+2
and so g=(5b+2)+a = 5b+2+2b+1 = 7b+3
Equation 3 becomes N=5(7b+3)+1 = 35b+16
So now we have only 2 Diophantine equations to solve simultaneously
You can try solving those 2.
They are actually a little easier than the two I just did. :)
Some of your questions are quite interesting unaza.
If you had made a positive impression here you would have at least a few more quality answers.
You have had some answers.
Some have been good ones.
You have not responded in any way.
I have even said this to you before... AND what was your response? NONE.
Well, you are consistent, I will give you that!
I saw another answerer chastize you as well. Your response. Nothing, just more questions.
You post a multitude of difficult questions. Probably all of your homework. This is not encouraged.
I like this particular question. Normally I would give your my thoughts or my solution.
But I am very reluctant to do so. Shame!
First I worked out what the inverse of 3 is mod 11
Let the inverse of 3 be x
so k=(2c+1)+c = 3c+1
x= 3(3c+1)+b = 9c+3+2c+1 = 11c+4 = 4 (mod11)
So the inverse of 3 mod 11 is 4 mod11
Now I went through the same procedure and got that the inverse of 5 mod11 was -2 mod11
( I have not checked my working)
(4+-2)mod 11 = 2 mod 11
NowI went through the whole procedure again and found that the inverse of 2 mod 11 is 6 mod 11
So I got a is equivalent to 6 (mod11)
I have not checked my working and maybe there is an easier way to do it.
there is a spanish forum.
You can jump into it yourself.
Go to the bottom of a page and you can see the language forum choices
Spanish is the third one ....es
You can hyperlink into it from there.
You have to re log in though.
the private messages are all in the same place I think.
Sometimes I get private messages sent from the other forums. At least I think I do.
I think only the English and German forums are really attended properly.
Last time I looked, which was some time ago, there were not really any answerers on the other forums.
I do not know why that happened.
Often when posts have a web address in them they are automatically hidden and a moderator may have to unhide it.
Maybe that is what happened.
I am constantly making posts visible, I do not remember if I had to with this one or not.
Are you a robot? Sometimes I wish I was one. I am sure they are much more efficient at many things :)