gmatter2012 wrote:How many 4 digit even numbers do not use any digit more than once
A. 1720
B. 2160
C. 2240
D. 2460
E. 2520
Take the task and break it into stages, beginning with the most restrictive stage
Stage 1: Select last (units) digit
Stage 2: Select tens digit
Stage 3: Select hundreds digit
Stage 4: Select thousands digit
Stage 1: The digit can be 0, 2, 4, 6, or 8, so there are 5 ways to accomplish stage 1.
Stage 2: Once a digit has been selected, there are 9 digits left to choose from. So there are 9 ways to accomplish stage 2.
Stage 3: 2 digits have been used, so that are now 8 ways to accomplish stage 3.
Stage 4: 3 digits have been used, so that are now 7 ways to accomplish stage 7.
The number of ways to accomplish all 4 stages = 5x9x8x7 = 2520
Important: In the above calculation, we have allowed for the possibility that a zero is selected for the thousands position (stage 4). Since numbers beginning with 0 are not 4-digit numbers, we need to subtract from 2520 all even numbers that begin with a zero. How many such numbers are there? Let's break this task into stages (beginning with the most restrictive stage).
Stage 1: Select 0 as thousands digit.
Stage 2: Select last (units) digit
Stage 3: Select tens digit
Stage 4: Select hundreds digit
Stage 1: Can be accomplished in 1 way
Stage 2: Can be accomplished in 4 ways (2, 4, 6 or 8)
Stage 3: Can be accomplished in 8 ways
Stage 4: Can be accomplished in 7 ways
The number of ways to accomplish all 4 stages = 1x4x8x7 = 224
So, total number of 4-digit even numbers do not use any digit more than once = 2520 - 224 = 2296
Hmmm, this isn't one of the options.
Cheers,
Brent
