NVAEasyJEE 2023Applications of P&C

JEE Mathematics 2023 Question with Solution

Number of 44-digit numbers that are less than or equal to 28002800 and either divisible by 33 or by 1111, is equal to:

Answer

Correct answer:710

Step-by-step solution

Standard Method

Given: We need the number of 44-digit numbers from 10001000 to 27992799 that are divisible by 33 or 1111.

Find: The total count using the inclusion-exclusion principle.

Numbers divisible by 33 form an arithmetic progression from 10021002 to 27992799:

1002+(n1)×3=27991002 + (n - 1) \times 3 = 2799

So,

(n1)×3=1797(n - 1) \times 3 = 1797 n1=599n - 1 = 599 n=600n = 600

Hence, n(3)=600n(3) = 600.

For numbers divisible by 1111 between 10001000 and 27992799:

279911=254\left\lfloor \frac{2799}{11} \right\rfloor = 254 99911=90\left\lfloor \frac{999}{11} \right\rfloor = 90

Therefore,

n(11)=25490=164n(11) = 254 - 90 = 164

Numbers divisible by both 33 and 1111 are divisible by 3333:

279933=84\left\lfloor \frac{2799}{33} \right\rfloor = 84 99933=30\left\lfloor \frac{999}{33} \right\rfloor = 30

Therefore,

n(33)=8430=54n(33) = 84 - 30 = 54

Now apply inclusion-exclusion:

n(3)+n(11)n(33)n(3) + n(11) - n(33) 600+16454=710600 + 164 - 54 = 710

Therefore, the required number is 710710.

Step-by-step Count

Given: Count the 44-digit numbers less than or equal to 28002800 that are divisible by 33 or 1111.

Find: Total count.

Step 1: Find the number of 44-digit numbers divisible by 33. The range is from 10001000 to 27992799. The first such number is 10021002 and the last is 27992799.

1002+(n1)×3=27991002 + (n - 1) \times 3 = 2799 n=600n = 600

So, there are 600600 numbers divisible by 33.

Step 2: Find the number divisible by 1111.

279911=254\left\lfloor \frac{2799}{11} \right\rfloor = 254 99911=90\left\lfloor \frac{999}{11} \right\rfloor = 90 25490=164254 - 90 = 164

So, there are 164164 numbers divisible by 1111.

Step 3: Find the number divisible by both, that is, divisible by 3333.

279933=84\left\lfloor \frac{2799}{33} \right\rfloor = 84 99933=30\left\lfloor \frac{999}{33} \right\rfloor = 30 8430=5484 - 30 = 54

So, there are 5454 numbers divisible by 3333.

Step 4: Use inclusion-exclusion.

n(3)+n(11)n(33)=600+16454=710n(3) + n(11) - n(33) = 600 + 164 - 54 = 710

Therefore, the answer is 710710.

Common mistakes

  • Counting numbers divisible by 33 and numbers divisible by 1111 separately and then adding them directly. This double-counts numbers divisible by 3333. Use inclusion-exclusion and subtract n(33)n(33).

  • Using 28002800 as an included multiple limit instead of recognizing that the numbers are less than or equal to 28002800, so the actual upper bound for divisibility counting here is 27992799. Check whether 28002800 is divisible by the required numbers before counting.

  • Starting the count of 44-digit numbers from 999999 or 10001000 without identifying the first valid multiple. For divisibility by 33, the first valid term is 10021002, not 10001000.

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