If X is the sum of first 50 positive even integers and Y is the sum of first 50 positive odd integers, what is the value of x - y ?
A. 0
B. 25
C. 50
D. 75
E. 100
OA C
Source: GMAT Prep
If X is the sum of first 50 positive even integers and Y is the sum of first 50 positive odd integers, what is the value
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Solution:BTGmoderatorDC wrote: ↑Thu Feb 16, 2023 10:28 pmIf X is the sum of first 50 positive even integers and Y is the sum of first 50 positive odd integers, what is the value of x - y ?
A. 0
B. 25
C. 50
D. 75
E. 100
OA C
Source: GMAT Prep
The sum of the first 50 positive even integers is:
sum = average x quantity
sum = (100 + 2)/2 x 50 = 51 x 50
The sum of the first 50 positive odd integers is:
sum = (99 + 1)/2 x 50 = 50 x 50
Thus, x - y is 51 x 50 - 50 x 50 = 50(51 - 50) = 50.
Alternate solution:
The first 50 positive even integers are: 2, 4, 6, 8, …, 98, 100.
The first 50 positive odd integers are: 1, 3, 5, 7, …, 97, 99.
We see that each even integer is 1 more than its odd counterpart (2 is 1 more than 1, 4 is 1 more than 3, etc). Since there are 50 numbers in each set, the sum of the even integers will be 50 x 1 = 50 more than the sum of the odd integers.
Answer: C
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