The of the digits of 2 digit number is 7- The number obtained by interchanging the digits exceed the original number by 27- Find the number

Question

Toppr Admin · Accepted Answer

Let digit at ones place-x and-xA0-digit at tens place-ySo- the number will be 10y-xx-y-7 -1-reverse digit will be represented as- 10x-ySo-10x-y-10y-x-279x-9y-27x-y-3 -2-Adding equation -1- and -2-2x-10x-5substituting in equation -1-y-7-5-2Thus- the number will be 25-apos-

The sum of the digits of 2 digit number is 7. The number obtained by interchanging the digits exceed the original number by 27. Find the number

let digit at ones place=x and
digit at tens place=y
So, the number will be 10y+x
x+y=7 ....(1)
reverse digit will be represented as, 10x+y

So,
(10x+y)-(10y-x)=27
9x-9y=27
x-y=3 ....(2)

Adding equation (1) and (2)
2x=10
x=5
substituting in equation (1)
y=7-5
=2
Thus, the number will be 25

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The sum of the digits of 2 digit number is 7. The number obtained by interchanging the digits exceed the original number by 27. Find the number

let digit at ones place=x and digit at tens place=ySo, the number will be 10y+xx+y=7 ....(1)reverse digit will be represented as, 10x+ySo,(10x+y)-(10y-x)=279x-9y=27x-y=3 ....(2)Adding equation (1) and (2)2x=10x=5substituting in equation (1)y=7-5=2Thus, the number will be 25'

let digit at ones place=x and
digit at tens place=y
So, the number will be 10y+x
x+y=7 ....(1)
reverse digit will be represented as, 10x+y

So,
(10x+y)-(10y-x)=27
9x-9y=27
x-y=3 ....(2)

Adding equation (1) and (2)
2x=10
x=5
substituting in equation (1)
y=7-5
=2
Thus, the number will be 25

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