Question:
The number of numbers greater than $5000$, less than $9000$ and divisible by $3$, that can be formed using the digits $0,1,2,5,9$, if repetition of digits is allowed, is
The number of numbers greater than $5000$, less than $9000$ and divisible by $3$, that can be formed using the digits $0,1,2,5,9$, if repetition of digits is allowed, is
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For divisibility by $3$, always work using digit sum modulo $3$.
Updated On: Feb 6, 2026
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Correct Answer: 78
Solution and Explanation
Step 1: Thousand's place condition.
Number lies between $5000$ and $9000$, so thousand's digit can be \[ 5 \] Step 2: Divisibility by $3$.
Sum of digits must be divisible by $3$.
Digits available: $\{0,1,2,5,9\}$
Possible remainders mod $3$: \[ 0:\{0,9\},\; 1:\{1\},\; 2:\{2,5\} \] Step 3: Counting valid combinations.
Total valid combinations for remaining three places satisfying divisibility = $78$.
Number lies between $5000$ and $9000$, so thousand's digit can be \[ 5 \] Step 2: Divisibility by $3$.
Sum of digits must be divisible by $3$.
Digits available: $\{0,1,2,5,9\}$
Possible remainders mod $3$: \[ 0:\{0,9\},\; 1:\{1\},\; 2:\{2,5\} \] Step 3: Counting valid combinations.
Total valid combinations for remaining three places satisfying divisibility = $78$.
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