Math, asked by lalitsengar10, 1 year ago

f n is a positive integer, let s(n) denote the integer obtained by removing the last digit of n and placing it in front. For example, s(731) = 173. What is the smallest positive integer n ending in 6 satisfying s(n) = 4n?. Please do not add white space around the answer


rgarg0426pedcte: ans

Answers

Answered by abhi178
1
Very good question , thanks !!

Can we assume n = 10k + 6 , because according to question number is ending in 6.
so, S(n) = 6.10^a + k , where a and k are positive integers.

according to question,
S(n) = 4n = 4(10k + 6) = 40k + 24
\implies S(n)=40k+24=6.10^a+k
\implies39k+24=6.10^a
\implies3(13k+8)=3.2.10^a
\implies13k+8=2.10^a......(iii)
means, if 2.10^a is divided by 13 , getting reminder = 8.
now ,we can write it as 2.10^a=8(mod\:13)
\implies10^a=4(mod\:13).....(i)

[ note :- for understanding , a basic logic is that if we assume 190 is a random number and now 190 is divided by 13 , then remainder = 8
now half of 190 = 95 is divided by 13 then remainder = 4 , so 10^a=4(mod\:13) ]

now we see,
if 1 is divided by 13 , getting remainder = 1
so, we can write 1 Ξ 1 (mod 13)
10 is divided by 13 , getting reminder = -3
so, 10 Ξ -3

similarly, 100 Ξ 9 Ξ -4
1000 Ξ 12 Ξ -1
so, we get, 100 × 1000 Ξ (-4) × (-1) Ξ 4
hence, 100000 = 4(mod 13)

e.g., 10^5=4(mod\:13)......(ii)

compare eqs. (i) and (ii),
so, a = 5
now, k=\frac{2.10^5-8}{13}=15384 [ from equation (iii)]

hence, n = 10k + 6
n = 10 × 15384 + 6
n = 153840 + 6 = 153846

hence, S(153846) = 615384

rishilaugh: great answer
rishilaugh: great thanks
Answered by myrakincsem
0

hi,

The answer to the above question is as follows;

Let n=10a+6, and a has d digits.

S(n)=4n

⟹6×10d+a=4n=4(10a+6)

⟹ 6×10d−24=39a

⟹ 2×10d−8=13a

2×10d≡8(mod13)

10d≡4(mod13),(2,13)=1

105≡4(mod13)

and 5 is the minimum number to fulfill this.

a=2×105−813=15384

where as n=15384×10+6=153846

I hope you are satisfied.

Thank you.

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