Question

Show the photo of the answer.The sum of a number of two digits and of the number formed by reversing the digits is 110 and the difference of the digits is 6.Find the number
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Answer 1

Answer:

$\bf\huge\red{\mid{\overline{\underline{AnSwEr}}}\mid}$

Let the digit at unit place be 'x' and at tenth place be 'y'

∴The number will be ${\huge{\boxed{\orange{\mathscr{10y+x}}}}}$

Now It is Given that

10y+x+10x+y=110

or,11x+11y=110

${\huge{\boxed{\green{\mathscr{x+y=10-(1)}}}}}$

and also given

x-y=6------(2)

subtract (1) from (2)

x-y-x-y=-4

-2y=-4

${\huge{\boxed{\pink{\mathscr{y=2}}}}}$

Now put the value of 'y' in eq (1)

x+2=10

${\huge{\boxed{\pink{\mathscr{x=8}}}}}$

∴The number will be ${\huge{\boxed{\blue{\mathscr{→2×10+8=28}}}}}$

Answer 2

Answer:

$\sf \pink{\underline{\underline{\purple{Given :}}}}$

The sum of a number of two digits and of the number formed by reversing the digits is 110.

And also, the difference of the digits is 6.

$\sf \pink{\underline{\underline{\purple{To \: find :}}}}$

The numbers.

$\sf \pink{\underline{\underline{\purple{Solution :}}}}$

It is told that sum of two digital number and after the reversing the digits the resultant no. is 110.

Let's assume that the no. are x and y respectively.

As it is told that :

Difference between them is 6

Therefore :

$\bf \green{(x - y) = 6 ..........(i) }$

Thereafter,

Considering :

The number x as ones digit and y as a tens digit.

Hence, no. formed is :

$\red{ \leadsto \bf {(10y + x) }}$

After reversing the digits resultant no. will be :

$\red{ \leadsto \bf {(10x + y) }}$

Now,

$☯ \begin{gathered}\underline{\boldsymbol{According\: to \:the\: question :}}\\\end{gathered}$

$\bf \implies \: (10y + x) + (10x + y) = 110$

$\bf \implies 10x + x + 10y + y = 110$

$\bf \implies 11x + 11y = 110 \\ \sf \:\:\:\: (taking \: \: common)$

$\bf \implies 11(x + y) = 110$

$\bf \implies (x + y) = \frac{ \cancel{110}}{ \cancel{11}}$

$\bf \green{ \therefore (x + y) = 10........(ii) }$

Again,

Subtraction of both equations :

$\bf ( \cancel x - y) = 6 \\ \bf{ \underline{ - ( \cancel x + y) = - 10}}$

$\longmapsto\bf \cancel - 2y = \cancel- 4$

$\bf \longmapsto 2y = 4$

$\bf \longmapsto \ y = \frac{ \cancel 4}{ \cancel 2}$

$\bf \pink{ \longmapsto} \red{ \: y = 2}$

Substituting the value of y in the equation ......(i) as follows :

$\bf \longmapsto (x - y) = 6$

$\bf \longmapsto (x - 2) = 6$

$\bf \longmapsto x - 2 = 6$

$\bf \longmapsto x = 6 + 2$

$\bf{ \pink{ \longmapsto }} \: \: \red{x = 8}$

Thus,

x = 8 and y = 2

Therefore, the no. will be (10y + x)

➠ (10 × 8) + 2

➠ 80 + 2

➠ 82 ans.

or,

28 can be the answer.

$\bold \red \dag \bold{ \underline{ \boxed{ \red \odot \mid{ \bold {\bf{ \blue{Required \: answer : \green{ \sf 28 \: or \: 82 \gray\checkmark }}}}}}}} \bold \red \dag$

$\sf \pink{\underline{\underline{\purple{Verification :}}}}$

As it is told that their sum will 110.

i.e., the original no. + new no. = 110

Again,

$\bf \longmapsto 82 + 28 = 110$

$\bf \pink{\longmapsto} \red{ 110 = 110}$

THUS,

L. H. S. = R. H. S.

$\bold\red \dag{ \underline{ \boxed { \bf{\green {Hence}, \: \purple V \blue e \red r \pink i \gray f i \blue e \orange d }}}}\bold\red \dag$