The number is = 10x+y
if reverse the digits, the number is: 10y+x
The sum of its digits is = x+y=5
I suggest this system of equations:
(10y+x)-(10x+y)=27 ⇒9y-9x=27
x+y=5
We can solve this system of equations by the equalization method
x=5-y
9y-9(5-y)=27
9y-45+9y=27
18y=27+45
18y=72
y=72/18
y=4
x=5-y
x=5-4=1
The number is: 10x+y=10(1)+4=14
Answer: the number is 14
Sum of the digits = 13
If 27 is added to the number, the digits are reversed
the required number
Let the digit at ten's place be x and digit at one's place be y.
⟶ The number = 10x + y.
Sum of the digits = 13
⟹ x + y = 13
⟹ x = 13 - y -- equation (1)
Also given that,
If 27 is added to the number, the digits are reversed.
Number formed by reversing the digits = 10y + x.
According to the above condition,
⟹ 10x + y + 27 = 10y + x
⟹ 27 = 10y + x - 10x - y
⟹ 27 = 9y - 9x
Substitute the value of x from equation (1).
⟹ 27 = 9y - 9(13 - y)
⟹ 27 = 9y - 117 + 9y
⟹ 27 + 117 = 18y
⟹ 144 = 18y
⟹ 144/18 = y
⟹ 8 = y
Substitute the value of y in equation (1).
⟹ x = 13 - 8
⟹ x = 5
Hence,
• The number = 10(5) + 8 = 50 + 8 = 58.
∴ The required two digit number is 58.
I hope it will help you.
Regards.
