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Re: M0110
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21 May 2018, 09:25
Bunuel wrote: Official Solution:
How many times will the digit 7 be written when listing the integers from 1 to 1000?
A. 110 B. 111 C. 271 D. 300 E. 304
Many approaches are possible. For example: Approach #1: Consider numbers from 0 to 999 written as follows: 1. 000 2. 001 3. 002 4. 003 ... 1000. 999 We have 1000 numbers. We used 3 digits per number, hence used total of \(3*1000=3000\) digits. Now, why should ANY digit have preferences over another? We used each of 10 digits equal # of times, thus we used each digit (including 7) \(\frac{3000}{10}=300\) times.
Answer: D Hello BunuelCould you kindly explain why did you consider the interval 0 to 999, when the question was about the interval from 1 to 1000? I understood the ''no favorites'' approach, and i think its a really clever way of solving it. But the interval change got me confused. Thank you,



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Re: M0110
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21 May 2018, 21:28
vitorcbarbieri wrote: Bunuel wrote: Official Solution:
How many times will the digit 7 be written when listing the integers from 1 to 1000?
A. 110 B. 111 C. 271 D. 300 E. 304
Many approaches are possible. For example: Approach #1: Consider numbers from 0 to 999 written as follows: 1. 000 2. 001 3. 002 4. 003 ... 1000. 999 We have 1000 numbers. We used 3 digits per number, hence used total of \(3*1000=3000\) digits. Now, why should ANY digit have preferences over another? We used each of 10 digits equal # of times, thus we used each digit (including 7) \(\frac{3000}{10}=300\) times.
Answer: D Hello BunuelCould you kindly explain why did you consider the interval 0 to 999, when the question was about the interval from 1 to 1000? I understood the ''no favorites'' approach, and i think its a really clever way of solving it. But the interval change got me confused. Thank you, Since neither 0 not 1000 has 7 in it, then excluding/including these values into the range won't change the answer.
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Re: M0110
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03 May 2019, 22:15
Bunuel chetan2uThe answer will be 300 for all the digits except 0 and 1, right? For 0, the answer will be 303 (Considering 3 zeroes in 1000) and for 1, the answer will be 301 (Considering one 1 in 1000). Let me know if my understanding is correct?
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Re: M0110
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03 May 2019, 23:38
SpiritualYoda wrote: Bunuel chetan2uThe answer will be 300 for all the digits except 0 and 1, right? For 0, the answer will be 303 (Considering 3 zeroes in 1000) and for 1, the answer will be 301 (Considering one 1 in 1000). Let me know if my understanding is correct? Hi.. if we write all as 000 to 999, we will have 3000 digits as 3(number of digits in each number )*1000(total numbers)=3000.. In these 3000, all 10 digits will be 3000/10=300.. But we do not have 0s in single digit and two digits.. so 000,as we do not have 0, so 3 0s missing 00a.. from 1 to 9, they are not written as 001,002...009, so 2*9=18 x 0s missing 0ab.....from 10 to 99, they are not written as 010,011...099, so 1*90=90 x 0s missing Total 3+18+90=111 number of 0s are less.. Thus, from 1 to 999, we have 300 of all 9 digits  1 to 9, while we have 300111=189 of 0s. Add 1000, digit 0 is used 189+3=192 times digit 1 is used 300+1=301 times digits 2 to 9, 300 times each
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Re: M0110
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29 May 2019, 16:25
Hey Bunuel, what is meant by "In 10 hundreds 7" in approach 3? I'm having a hard time understanding this.



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Re: M0110
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11 Sep 2019, 11:09
Bunuel wrote: Official Solution:
How many times will the digit 7 be written when listing the integers from 1 to 1000?
A. 110 B. 111 C. 271 D. 300 E. 304
Many approaches are possible. For example: Approach #1: Consider numbers from 0 to 999 written as follows: 1. 000 2. 001 3. 002 4. 003 ... 1000. 999 We have 1000 numbers. We used 3 digits per number, hence used total of \(3*1000=3000\) digits. Now, why should ANY digit have preferences over another? We used each of 10 digits equal # of times, thus we used each digit (including 7) \(\frac{3000}{10}=300\) times. Approach #2: There are several ways to count the number of times 7 appears between 7 and 997. One way is to consider the number of 7's in single, double, and triple digit numbers separately. Onedigit numbers: 7 is the only onedigit number. Twodigit numbers: 7 could be the tens digit or the units digit. Case 1: 7 is the tens digit. There are 10 ways to place 7 as the tens digit of a twodigit number. Case 2: There are 9 ways to place the units digit. Thus, for twodigit numbers we have: \(10+9=19\) numbers that contain a 7. Threedigit numbers: Use the knowledge from the previous two scenarios: each hundred numbers will contain one 7 in numbers such as 107 or 507 and also 19 other sevens in numbers such as 271 or 237. Thus a total of 20 sevens per each hundred and 200 sevens for 1000. Since we have 700's within the range, that adds another 100 times that a seven will be written for a total of 300 times. Approach #3: In the range 0100: 7 as units digit  10 times (7, 17, 27, ..., 97); 7 as tens digit  10 time (71, 72, 73, ..., 79); So in first one hundred numbers 7 is written \(10+10=20\) times. In 10 hundreds 7 as units or tens digit will be written \(10*20=200\) times. Plus 100 times when 7 is written as hundreds digit (700, 701, 702, ..., 799). Total \(200+100=300\).
Answer: D Hi Bunuel, In approach # 1, i didn't quite understand why did we use 3 digit numbers. Can you please explain? Apologies if it's a silly question.



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Re: M0110
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17 Sep 2019, 05:54
swatjazz wrote: Bunuel wrote: Official Solution:
How many times will the digit 7 be written when listing the integers from 1 to 1000?
A. 110 B. 111 C. 271 D. 300 E. 304
Many approaches are possible. For example: Approach #1: Consider numbers from 0 to 999 written as follows: 1. 000 2. 001 3. 002 4. 003 ... 1000. 999 We have 1000 numbers. We used 3 digits per number, hence used total of \(3*1000=3000\) digits. Now, why should ANY digit have preferences over another? We used each of 10 digits equal # of times, thus we used each digit (including 7) \(\frac{3000}{10}=300\) times. Approach #2: There are several ways to count the number of times 7 appears between 7 and 997. One way is to consider the number of 7's in single, double, and triple digit numbers separately. Onedigit numbers: 7 is the only onedigit number. Twodigit numbers: 7 could be the tens digit or the units digit. Case 1: 7 is the tens digit. There are 10 ways to place 7 as the tens digit of a twodigit number. Case 2: There are 9 ways to place the units digit. Thus, for twodigit numbers we have: \(10+9=19\) numbers that contain a 7. Threedigit numbers: Use the knowledge from the previous two scenarios: each hundred numbers will contain one 7 in numbers such as 107 or 507 and also 19 other sevens in numbers such as 271 or 237. Thus a total of 20 sevens per each hundred and 200 sevens for 1000. Since we have 700's within the range, that adds another 100 times that a seven will be written for a total of 300 times. Approach #3: In the range 0100: 7 as units digit  10 times (7, 17, 27, ..., 97); 7 as tens digit  10 time (71, 72, 73, ..., 79); So in first one hundred numbers 7 is written \(10+10=20\) times. In 10 hundreds 7 as units or tens digit will be written \(10*20=200\) times. Plus 100 times when 7 is written as hundreds digit (700, 701, 702, ..., 799). Total \(200+100=300\).
Answer: D Hi Bunuel, In approach # 1, i didn't quite understand why did we use 3 digit numbers. Can you please explain? Apologies if it's a silly question. Not a silly question at all. Let me try to elaborate: this approach worked because when we write the numbers from 0 to 999 in the form XXX each digit take the values from 0 to 9 which provides that in the end all digits are used equal # of times. For the range 100 to 999 it won't be so. We can solve for this range in the following way: XX7  7 in the units place  first digit can take 9 values (from 1 to 9) and second digit can take 10 values (from 0 to 9) > total numbers with 7 in the units place: 9*10=90; X7X  7 in the tens place  first digit can take 9 values (from 1 to 9) and third digit can take 10 values (from 0 to 9) > total numbers with 7 in the tens place: 9*10=90; 7XX  7 in the hundreds place  second digit can take 10 values (from 0 to 9) and third digit can take 10 values (from 0 to 9) > total numbers with 7 in the hundreds place: 10*10=100. TOTAL: 90+90+100=280. Hope it helps.
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Bunuel I solved with this approach. Please correct me if I am wrong.we can not use thousands digit as 7, because of 7XXX > 1000 So we have only 3 places i.e Units, Tens, Hundreds place, where we can put 7 as a digit. Also we have total 10 digits (09) to choose from. Now, in the no 0XXX, 1) If 7 is at units place i.e 0XX7Tens digit can be any one of the 10 available digits (09) Hence Tens place can be placed in 10 different ways. Similarly, Hundreds place in 10 different ways So, the no. 0XX7 can be formed using 10*10 = 100 different ways (2) Exactly as mentioned in (1), the no. 0X7X can be formed using 100 different ways. (3) And hence the no. 07XX in 100 different ways. So total No. of times the 7 was appeared between 0 to 1000 is (1)+(2)+(3) i.e. 100+100+100= 300







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