+11912 The digits of a two-digit number differ by 3 . If the digits are interchanged and the resulting number is added to the original number, we get 143 . What can be he original number?
+118608 10(a+b) + (a+b) = 143
Rosala, you know that 10x+x=10x+1x=11x right!
This is because 10 lots of something plus one more lots of that same thing = 11 lots of it
Well in the first line the something is (a+b)
10 lots of (a+b) plus one more lot of (a+b) will equal 11 lots of (a+b)
10(a+b) + (a+b) = 143
10(a+b) + 1(a+b) = 143
(10+1)(a+b) = 143
11(a+b)
Will you be alright now. I assume that was the main problem. 
+26367 The digits of a two-digit number differ by 3 . If the digits are interchanged and the resulting number is added to the original number, we get 143 . What can be he original number ?
digit 1 = a
digit 2 = b
a - b = 3
Number 1 ab is a*10 + b
Number 2 ba is b*10 + a
Number 1 + Number 2 = (a*10 + b) + (b*10 + a) = 143
10(a+b) + (a+b) = 143
11(a+b) = 143
(a+b) = 143/11 = 13
I. a + b = 13
II. a - b = 3
----------------
I+II: 2a = 16 or a = 8
I-II: 2b = 10 or b = 5
The Number is 85 or 58
+11912 heureka , can u please explain this more nicely after this step!
10(a+b) + (a+b) = 143
i cant understand it now also!
+118608 10(a+b) + (a+b) = 143
Rosala, you know that 10x+x=10x+1x=11x right!
This is because 10 lots of something plus one more lots of that same thing = 11 lots of it
Well in the first line the something is (a+b)
10 lots of (a+b) plus one more lot of (a+b) will equal 11 lots of (a+b)
10(a+b) + (a+b) = 143
10(a+b) + 1(a+b) = 143
(10+1)(a+b) = 143
11(a+b)
Will you be alright now. I assume that was the main problem.
+11912 i think im getting into confusion more n more but lets forget this question as now exam is over!phew!
+118608 I've made it easier for you Rosala.
Now it is 10 lots of BLUE plus 1 lot of BLUE
Try again to work it out or I will be upset.
+11912 Melody i will work it out but can u just tell me how did we reach to that formula or equation becoz thats what im not getting!
+118608 I hadn't read the whole thing, I thought you were having problems with the bit that I did.
Yes I can see the set up really is tricky!
I did mine without thinking about Heureka's and it looks a bit different. (But it is really the same)
Anyway see if it makes sense. I have put numbers next to many of the lines so you can say which one you don't understand.
The digits of a two-digit number differ by 3 . If the digits are interchanged and the resulting number is added to the original number, we get 143 . What can be he original number ?
Heureka let the first digit be a and the second digit be b.
So the original number is 10a+b (1)
The digits are different by 3 That is |a-b|=3 I put the absolute signs in because I don't know which digit is the biggest one (2)
If the digits are interchanged then the new number is 10b+a (3)
When we add these 2 numbers the answer is 143 SO 10a+b+10b+a=143 (4)
11a+11b=143 (5)
Lets assume for the moment that a is the biggest digit so a-b=3
We have 2 equations that have to be solved simultaneously. (6)
a-b=3 (i) this can be rewritten as a=3+b (iii)
11a+11b=143 (ii) (7)
Sub (iii) into (ii)
11(3+b)+11b=143 (8)
33+11b+11b=143
33+22b=143
22b=110
b= 5 (9)
sub into (i)
a-5=3
a=8 (10)
So the original number may have been 85
Now if you can follow all this then you can see what happens if you let b be the big one. 
