Math, asked by rinkukhattri7364, 1 year ago

Product of digits of a 2-digit number is 24. if we add 45 to the number, the new number obtained is a number formed by interchange of the digits. what is the original number?

Answers

Answered by REDRAGON
1

let the number is x + 10y

according to question ,

xy = 24 ----(1)

 

again,

 

x + 10y +45 = y + 10x

 

x - y = 5 --------(2)

 

solve equations (1) and (2)

 

x - 24/x = 5

 

x² -5x -24 =0

 

x = { 5±√25+96)}/2

 

=(5±11)/2

 

= 8, - 3

 

but x ≠ -3

 

so, x = 8 put this equation (2)

y = 3

 

so, the number is 8 + 30 = 38


Alternate Method :

let the 2 digit no be 10X+Y.

XY=24.........1

10X+Y+45=10Y+X..........2

from 1

24/X=Y

substitute this value in eq 2

hence we get ,

10X+24/X+45=(10*24)÷X+X

(10X²+24+45X)÷X=(240+X²)÷X

10X²+45X+24=X²+240

now by shifting

9X²+45X-216=0

Dividing by 9

X²+5X-24=0

X²-3X+8X-24=0

X(X-3)+8(X-3)=0

hence

(X+8)(X-3)=0

therefore

X=-8 or X=3

digit cannot be negative

hence X=3

put this value in equation 1

Y*3=24

therefore Y=8

hence the number is 10*3+8=38

hence the number is 38

 

Hope This Helps :)

Answered by Anonymous
0
Hey :-

Mate :-

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Question :-

☆ Product of digits of a 2-digit number is 24. if we add 45 to the number, the new number obtained is a number formed by interchange of the digits. what is the original number?

Solution :-

☆ let the number is x + 10y
according to question ,
xy = 24 ----(1)

again,

x + 10y +45 = y + 10x

x - y = 5 --------(2)

solve equations (1) and (2)

x - 24/x = 5

x² -5x -24 =0

x = { 5±√25+96)}/2

=(5±11)/2

= 8, - 3

but x ≠ -3

so, x = 8 put this equation (2)
y = 3

so, the number is 8 + 30 = 38


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☆ ☆ ☆ Hop its helpful ☆ ☆ ☆

☆ Regards :- ♡♡《 Nitish kr singh 》♡♡
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