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प्रश्न
A two-digit number is 3 more than 4 times the sum of its digits. If 8 is added to the number, the digits are reversed. Find the number.
उत्तर
Let the digits at units and tens place of the given number be x and y respectively. Thus, the number is ` 10y + x`.
The number is 3 more than 4 times the sum of the two digits. Thus, we have
` 10 y + x = 4(x +y)+ 3`
` ⇒ 10 y + x = 4x + 4y + 3`
` ⇒ 4x + 4y -10y -x =-3`
` ⇒ 3x - 6y = -3`
` ⇒ 3 ( x - 2 y)= -3`
` ⇒ x - 2y = -3/3`
` ⇒ x - 2y = -1`
After interchanging the digits, the number becomes `10 x + y.`.
If 18 is added to the number, the digits are reversed. Thus, we have
` ( 10 y + x )+ 18 = 10x + y`
` ⇒ 10x + y -10y -x =18`
` ⇒ 9x -9y = 18`
` ⇒ 9( x - y)=18`
` ⇒ x -y = 18 /9`
` ⇒ x - y =2`
So, we have the systems of equations
` x - 2y =-1`
` x - y =2`
Here x and y are unknowns. We have to solve the above systems of equations for xand y.
Subtracting the first equation from the second, we have
` ( x - y)-(x - 2y )=2 -(-1)`
` ⇒ x - y -x + 2y =3`
` ⇒ y = 3`
Substituting the value of y in the first equation, we have
` x - 2xx3 =-1`
`⇒ x - 6 = -1 `
` ⇒ x = -1+6`
` ⇒ x = 5`
Hence, the number is ` 10 xx3 + 5 = 35`
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संबंधित प्रश्न
One says, "Give me a hundred, friend! I shall then become twice as rich as you". The other replies, “If you give me ten, I shall be six times as rich as you”. Tell me what is the amount of their (respective) capital? [From the Bijaganita of Bhaskara II)
[Hint: x + 100 = 2 (y − 100), y + 10 = 6(x − 10)]
In a ΔABC, ∠C = 3 ∠B = 2 (∠A + ∠B). Find the three angles.
Solve the following pair of linear equations
ax + by = c
bx + ay = 1 + c
Find the values of following determinant.
`|(7/3,5/3), (3/2, 1/2)|`
The sum of digits of a two number is 15. The number obtained by reversing the order of digits of the given number exceeds the given number by 9. Find the given number.
A two-digit number is 4 times the sum of its digits. If 18 is added to the number, the digits are reversed. Find the number.
A two-digit number is such that the product of its digits is 20. If 9 is added to the number, the digits interchange their places. Find the number.
The numerator of a fraction is 4 less than the denominator. If the numerator is decreased by 2 and denominator is increased by 1, then the denominator is eight times the numerator. Find the fraction.
Let the numerator and denominator of the fraction be x and y respectively. Then the fraction is `x/y`
If the numerator is multiplied by 2 and the denominator is reduced by 5, the fraction becomes `6/5`. Thus, we have
`(2x)/(y-5)=6/5`
`⇒ 10x=6(y-5)`
`⇒ 10x=6y-30`
`⇒ 10x-6y+30 =0`
`⇒ 2(5x-3y+15)=0`
`⇒ 5x - 3y+15=0`
If the denominator is doubled and the numerator is increased by 8, the fraction becomes `2/5`. Thus, we have
`(x+8)/(2y)=2/5`
`⇒ 5(x+8)=4y`
`⇒ 5x+40=4y`
`⇒ 5x-4y+40=0`
So, we have two equations
`5x-3y+15=0`
`5x-4y+40=0`
Here x and y are unknowns. We have to solve the above equations for x and y.
By using cross-multiplication, we have
`x/((-3)xx40-(-4)xx15)=-y/(5xx40-5xx15)=1/(5xx(-4)-5xx(-3))`
`⇒ x/(-120+60)=(-y)/(200-75)=1/(-20+15)`
`⇒x/(-60)=-y/125``=1/-5`
`⇒ x= 60/5,y=125/5`
`⇒ x=12,y=25`
Hence, the fraction is `12/25`
Ten years ago, a father was twelve times as old as his son and ten years hence, he will be twice as old as his son will be then. Find their present ages.
