- Three consecutive even integers can be represented by x, x+2, x+4. The sum is 3x+6, which is equal to 108. Thus, 3x+6=108. Solving for x yields x=34. However, the question asks for the largest number, which is x+4 or 38. Please make sure to answer what the question asks for! You could have also plugged in the answer choices.
- 3. Explanation: The consecutive numbers are ⇒ 24, 25, 26 (A set of 3). arr[] = { -8, 9 , -1, -6, -5} 2. Explanation: The consecutive numbers are ⇒ -6, -5 (A set of 2). Algorithm 1. Declare a set. 2. Do traversing of the array, and insert all the values of array into the Set. 3. Set output to 0. 4. Traverse the array from i=0, to i<n(length of the array). 1.

- Here we will use algebra to find three consecutive integers whose sum is 42. We start by assigning X to the first integer. Since they are consecutive, it means that the 2nd number will be X + 1 and the 3rd number will be X + 2 and they should all add up to 42. Therefore, you can write the equation as follows:
- Equation True for Any Three Consecutive Numbers Date: 02/14/2003 at 00:13:46 From: Beverly Subject: Word problems Find three consecutive odd numbers, such that 6 less than 2 times the larger number is equal to the sum of the other two numbers. Please help! I came up with: 2(x+4)-6 = x + x+2 I always end up with 2x + 2 = 2x + 2

- Johanna Davidson's fascination with randomness dated back to her first course in probability and statistics. What she found most intriguing was the fact that the teacher could not provide a satisfactory definition of "random" (or of "probability," for that matter), even though the notions such as "random variable" and "random sample" lie at the heart of the theory.
- Jul 29, 2016 · 17 = 2 + 3 + 5 + 7 41 = 2 + 3 + 5 + 7 + 11 + 13 Your task is to find out how many prime numbers which satisfy this property are present in the range 3 to N subject to a constraint that summation should always start with number 2. Write code to find out number of prime numbers that satisfy the above mentioned property in a given range.
- Apr 27, 2014 · The requirements that three digits are in ascending and consecutive order are be satisfied if the permutation contains any of the following: 123, 124, 134, and 234. Treat the mentioned permutations as one object and the remaining number as one. Three slots has the group 123, 124, 134, and 234. The corresponding last digit for each of the group ...