The sum of the digits of a two digit number is 7. If we interchange the digits then original number become 27 more than new number. Find the original number.
Answers
Answer:
Suppose the two digit original number is 10x+y.
(x is at tens place so multiple by 10 and y is at unit place so left as is, you may multiply it by 1 to get a clear picture but 1y is represented as y only)
The sum of digits of original number is 7 →x+y = 7 —equation(1)
If 27 is added to original number its digits are interchanged .So, 10x + y +27 =10y+ x → 9x +27 = 9y → 9(x+3) = 9(y) → x+3 = y — equation(2)
Substituting value of y from equation (2) in equation (1)
x + x+3 = 7
2x + 3 = 7
2x =4
x= 2
Substituting x= 2 in equation (2)
y= 5
So original number is 10 (2) + 5 i.e. 20 +5 → 25.
In order to check the answer.. 25 is original number and 52 is the number formed by interchanging the digits.
Answer:
Let the number corresponding to tenth place is x and the number corresponding to unit place is y. So the original number can be written as
10x + y also it is given that
x + y = 7. ..(i)
The number obtained by interchanging the digit can be written as 10y + x. We are given that:
10y + x - 10x -y =27
=> 9y - 9x = 27
=> y -x = 3 ...(ii)
solving eq (i) and (ii) by elimination method
we get,
y = 5 and x =2
∴ So the number is 25.
Test: reversing the number we get 52 and 52 is 27 more than 25. Hence the answer.
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