M22-16

Hi,
216 is the total number where all digits are different..
707 has 7 at two places, so 707 has not been taken as a part of these 216 numbers..

Hi guys, I understand the solution above but have trouble seeing what I did wrong - can you please help?

If the first digit is 7: 2nd slot can be anything from #2 to #9 with the exception of 7, so that's 9-2+1-1=7; 3rd slot can be anything from #1 to #9 with the exception of #7 and the digit in the 2nd slot, so that's 9-1+1-2=7; so the total number of digit combinations is 7*7 = 49 numbers

If the first digit is 8: 2nd slot can be anything from #0 to #9 with the exception of 9, so that's 9-0+1-1=9; 3rd slot can be anything from #0 to #9 with the exception of #8 and the digit in the 2nd slot, so that's 9-0+1-2=8; so the total number of digit combinations is 9*8 = 72 numbers

If the first digit is 9: the combination is the same as if the first digit is 8. So, 72.

Together there are 49 + 2*72 = 193 combinations ...

What did I do wrong? Thank you!!

Bunuel,

I solved the question in the below way. Please correct me if wrong.

Per the question, we have 3 options(7,8,9) for the first digit.

1) 188 = 64 ----- 7 is the first digit here

2) 198 = 72 ------ 8 is the first digit here

3) 198 = 72 ------- 9 is the first digit here

So total is 64+72+72 = 208.
However, in the first case we have to remove one number to account for 710. So answer is 207.

I also approached the question in the above way.

Bunuel, can you please explain?

Try to explain :

- You did the correct calculation for 8 and 9 hundred digit.
- Anyway, you miscalculated for the 7 hundred digit : don't forget the 0 number in the ten and unit digit. That's why, the number of digits possible is 1*8*7, not 1*7*7. After this, you must add manually the number from 710-719 (which is 7 different number).

Hope it helps.

Bunuel or All,

Why is 3*9*8 used to determine the amount of numbers that are from 700-799 and with three different integers?

(3 options for the first digit): 7, 8, or 9.

(9 options for the second digit): all digits except the one digit we used above.

(8 options for the third digit): all digits except the two digits we used above.

Check Constructing Numbers, Codes and Passwords Questions in our Special Questions Directory.

Hope it helps.

Great explanation in the original solution!!! There are usually many ways to solve a problem.

Can we do this question as follows?

(1*8*8+1*9*8+1*9*8)-1. Basically taking each set of numbers separately and then subtracting 1 i.e. 710

I remember this kind of an approach from a question I did previously

Regards,

Yes, that is also a correct approach.

Bunuel

I approached this question in the following way:

710-799

1 choice for 1st digit : 7
7 choices for 2nd digit : 2,3 5,6, 8,9,0
8 choices for 3rd digit : (10- 2)

total = 1*7*8= 56

800-899
1 choice for 1st digit : 8
9 choices for 2nd digit : 10-1 =9
8 choices for 3rd digit : (10- 2=8)

total = 1*9*8= 72

900-999
1 choice for 1st digit : 8
9 choices for 2nd digit : 10-1 =9
8 choices for 3rd digit : (10- 2=8)

total = 1*9*8= 72

Total 72*2 + 56= 200

I seem to have missed few of them ?
Please help

Thanks

You are missing numbers between 710 and 720: 712, 713, 714, 715, 716, 718, 719.

I think this is a high-quality question and I agree with explanation.

I have edited the question and the solution by adding more details to enhance its clarity. I hope it is now easier to understand.

From 700-799:
We have one possibility at hundreds place(7), 9 possibilities at tens place (0,1,2,3,4,5,6,,8,9)& 8 possibilities for units place.
=1x9x8=72

From 800-899:
We have one possibility at hundreds place(8), 9 possibilities at tens place (0,1,2,3,4,5,6,7,,9)& 8 possibilities for units place.
=1x9x8=72

From 900-999:
We have one possibility at hundreds place (9), 9 possibilities at tens place (0,1,2,3,4,5,6,7,8,)& 8 possibilities for units place.
=1x9x8=72

There some 9 numbers which don't have repeating digits between 700-710 (inclu)
701,702,703,704,705,706,708,709,710

Total= (3x72)-9= 207

I think this is a high-quality question and I agree with explanation.