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How many 4-digit positive integers are there in which all 4 digits are 30 Sep 2016, 06:28
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C
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How many 4-digit positive integers are there in which all 4 digits are even?

A. 625
B. 600
C. 500
D. 400
E. 256
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C
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How many 4-digit positive integers are there in which all 4 digits are 30 Sep 2016, 07:03
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Positive integers - 2,4,6,8,0

Let the integers of a four digit positive number be ABCD

A can take four values (2,4,6,8)
B can take five values (0,2,4,6,8)
C can take five values (0,2,4,6,8)
D can take five values (0,2,4,6,8)

The total is 5*5*5*4

The answer according to me is 500
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How many 4-digit positive integers are there in which all 4 digits are 10 Dec 2021, 15:38
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Bunuel
How many 4-digit positive integers are there in which all 4 digits are even?

A. 625
B. 600
C. 500
D. 400
E. 256
Show more

Take the task of creating the 4-digit numbers and break it into stages.

Stage 1: Select an even digit for the thousands digit.
Since 0 cannot be the first digit of a 4-digit number, this digit can be 2, 4, 6 or 8
So, we can complete stage 1 in 4 ways

Stage 2: Select an even digit for the hundreds digit.
This digit can be 0, 2, 4, 6, or 8
We can complete stage 2 in 5 ways

Stage 3: Select an even digit for the tens digit.
We can complete stage 3 in 5 ways

Stage 4: Select an even digit for the units digit.
We can complete stage 3 in 5 ways

By the Fundamental Counting Principle (FCP), we can complete all 4 stages (and thus a 4-digit) in (4)(5)(5)(5) ways (= 500 ways)

Answer: C

Note: the FCP can be used to solve the MAJORITY of counting questions on the GMAT. So, be sure to learn it.

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How many 4-digit positive integers are there in which all 4 digits are 30 Sep 2016, 09:44
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Bunuel
How many 4-digit positive integers are there in which all 4 digits are even?

A. 625
B. 600
C. 500
D. 400
E. 256
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The 4 - digit integer should be comprised of the following digits:
2, 4 ,6, 8, 0

For it to be a 4 digits integer, the first digit cannot be zero.
Hence the following scenarios are possible

1st digit: (2,4,6,8)
2nd digit: (0,2,4,6,8)
3rd digit: (0,2,4,6,8)
4th digit: (0,2,4,6,8)

Total numbers possible = 4*5*5*5 = 500
Correct Option: C
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How many 4-digit positive integers are there in which all 4 digits are 30 Sep 2016, 09:50
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E. 256

In the first place ( thousand place), i can choose 4 numbers : 2, 4, 6, 8 ( recall 0 is neither positive nor negative although O is even integer , don't confuse even with positive integer )
2nd place ( hundred place) can also be filled up by 4 number : 2, 4, 6, 8 and same logic applies to 3rd ( 10th ) and 4th( unit) . so number of ways is 4*4*4*4= 256 ways .

Important concepts : if a task has two steps , step 1 can be done in n ways and step 2 can be done in m ways , then number of easy the task can be done is n*m ways . Same concept applies in above question.
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How many 4-digit positive integers are there in which all 4 digits are 30 Sep 2016, 13:46
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We need to find: # of 4-digit positive integers, all 4-digits are even

Digits can be : 0,2,4,6,8 (0 is an even number)
4 digit integer = "_ _ _ _"

first place (Thousands place ) can be filled with 4 even integers : 2,4,6,8 (Why not 0?? --> then the number will be a 3 digit number)
second place (Hundreds Place) can be filled with 5 even integers : 0,2,4,6,8 (there is no restriction on repetition of digits)
third place (Tens Place) can be filled with 5 even integers : 0,2,4,6,8
fourth place (Unit Place) can be filled with 5 even integers : 0,2,4,6,8

Hence total # : 4*5*5*5
=500

Hence C
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How many 4-digit positive integers are there in which all 4 digits are 30 Sep 2016, 14:16
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4 options for digit 1 (2,4,6,8), 5 options for digits 2,3,&4 (2,4,6,8,0)

4*5*5*5=500
C
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How many 4-digit positive integers are there in which all 4 digits are 01 Mar 2017, 02:09
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Even digits: 0,2,4,6,8
The thousands place can be filled in 4 ways
The hundreds place can be filled in 5 ways
The tens place can be filled in 5 ways
The ones place can be filled in 5 ways
Therefore total number of numbers = 4*5*5*5 = 500. Option C
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How many 4-digit positive integers are there in which all 4 digits are 06 Mar 2018, 23:23
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Bunuel
How many 4-digit positive integers are there in which all 4 digits are even?

A. 625
B. 600
C. 500
D. 400
E. 256
Show more

Even Digits: 0,2,4,6,8 (Five digits total)

A 4-digit positive integer starts out the thousandths place. In the thousandths place, the digit cannot be 0, because this makes the number a three digit, rather than four digit.
Therefore, in the thousandths place, there is 4 possible options.
in the hundreds place, we have 5 possible options; the same goes for the tens and singles.
This information translates into this: 4x5x5x5 = 500

(C)

Hope this helps
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How many 4-digit positive integers are there in which all 4 digits are 08 Jul 2018, 02:25
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sajib2126
E. 256

In the first place ( thousand place), i can choose 4 numbers : 2, 4, 6, 8 ( recall 0 is neither positive nor negative although O is even integer , don't confuse even with positive integer )
2nd place ( hundred place) can also be filled up by 4 number : 2, 4, 6, 8 and same logic applies to 3rd ( 10th ) and 4th( unit) . so number of ways is 4*4*4*4= 256 ways .

Important concepts : if a task has two steps , step 1 can be done in n ways and step 2 can be done in m ways , then number of easy the task can be done is n*m ways . Same concept applies in above question.
Show more


Can anyone refer to this excellent point highlited?
zero is neither a negative or a positive number!
How come the answer considers 0 as positive?
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How many 4-digit positive integers are there in which all 4 digits are 01 Aug 2019, 06:36
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MoriyaHa because if you think about it, the numbers start from 2,000 anyway (which will be a positive number). 0 is an even number and not a positive number. if you say 0 is a positive even integer, then technically you would include 0000 is as part of the 4 digit integers.
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How many 4-digit positive integers are there in which all 4 digits are 22 Apr 2021, 10:50
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Bunuel
How many 4-digit positive integers are there in which all 4 digits are even?

A. 625
B. 600
C. 500
D. 400
E. 256
Show more
Solution:

The even digits are 0, 2, 4, 6, and 8. However, since the first digit (or the thousands place digit) can’t be 0, there are 4 choices for the thousands digit, while the other three places (hundreds, tens, and units) have 5 choices each. Therefore, the total number of 4-digit numbers with all even digits is 4 x 5 x 5 x 5 = 500.

Answer: C
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How many 4-digit positive integers are there in which all 4 digits are 02 May 2021, 22:10
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Bunuel
How many 4-digit positive integers are there in which all 4 digits are even?

A. 625
B. 600
C. 500
D. 400
E. 256
Show more

If you have trouble finding a formula, you can analyze blocks of 1000 numbers (and quickly recognize a pattern):

0001 - 0999: There are no numbers in this section since they are all 3-digit integers, not 4-digit integers
1000 - 1999: There are no numbers in this section since the thousands digit (1) is always odd; therefore, it is not possible that all digits are even
2000 - 2999: Let's dig a bit deeper here:
The thousands digit is always 2: so 1 possibility
The hundreds, tens, and units digit can be 0, 2, 4, 6, 8: so each digit has 5 possibilities
1 * 5 * 5 * 5 = 125
3000 - 3999: same as 1000 - 1999
4000 - 4999: same as 2000 - 2999
...

Notice that you will have 125 different numbers that fit to our criteria in a section of 1000 numbers that begins with an even digit und 0 numbers in a section of 1000 numbers that begins with an odd digit:
2000 - 2999; 4000 - 4999; 6000 - 6999; 8000 - 8999
4 sections * 125 different numbers: 500 different numbers
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How many 4-digit positive integers are there in which all 4 digits are 09 Dec 2021, 05:58
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Is 0 even or odd?
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PROPERTIES OF ZERO:

1. Zero is an INTEGER.

2. Zero is an EVEN integer. An even number is an integer that is "evenly divisible" by 2, i.e., divisible by 2 without a remainder and as zero is evenly divisible by 2 then it must be even.

3. Zero is neither positive nor negative (the only one of this kind)

4. Zero is divisible by EVERY integer except 0 itself (x/0 = 0, so 0 is a divisible by every number, x).

5. Zero is a multiple of EVERY integer (x*0 = 0, so 0 is a multiple of any number, x)

6. Zero is NOT a prime number (neither is 1 by the way; the smallest prime number is 2).

7. Division by zero is NOT allowed: anything/0 is undefined.

8. Any non-zero number to the power of 0 equals 1 (x^0 = 1)

9. 0^0 case is NOT tested on the GMAT.

10. If the exponent n is positive (n > 0), 0^n = 0.

11. If the exponent n is negative (n < 0), 0^n is undefined, because 0^n = 1/0^(-n) = 1/0. You CANNOT take 0 to the negative power.

12. 0! = 1! = 1.
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How many 4-digit positive integers are there in which all 4 digits are 18 May 2025, 00:27
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Bunuel why do we consider 0 when the question clearly states
"POSITIVE INTEGERS" so doesn't that mean 2/4/6/8

so 4*4*4*4 = 256
Bunuel
How many 4-digit positive integers are there in which all 4 digits are even?

A. 625
B. 600
C. 500
D. 400
E. 256
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How many 4-digit positive integers are there in which all 4 digits are 18 May 2025, 01:46
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rak08
Bunuel why do we consider 0 when the question clearly states
"POSITIVE INTEGERS" so doesn't that mean 2/4/6/8

so 4*4*4*4 = 256
Bunuel
How many 4-digit positive integers are there in which all 4 digits are even?

A. 625
B. 600
C. 500
D. 400
E. 256
Show more
The question clearly says that the integer is positive, not that all its digit are positive.
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