Answer: I'm pretty sure it would be either A or C but I'm leading toward C. C is your final answer
Step-by-step explanation:
The given expression are just three examples of the many possiblecombinations that can add up to 800.
To find three different ways in which two numbers can be added to equal 800, we can explore different combinations. Here are three examples:
1. Combination 1:
600 + 200 = 800
In this combination, the numbers 600 and 200 are added together to equal 800.
2. Combination 2:
400 + 400 = 800
In this combination, the numbers 400 and 400 are added together to equal 800.
3. Combination 3:
350 + 450 = 800
In this combination, the numbers 350 and 450 are added together to equal 800.
The key is to find two numbers whose sum equals 800. You can experiment with different pairs of numbers and add them together to find other valid combinations.
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Answer:
31, 33, and 35
Step-by-step explanation:
31, 33, and 35 are consecutive odd integers and they add up to 99. So there isn't any other three consecutive odd intergers add up to greater than 99 and less than 100.
To find the greatest possible values of three consecutive odd integers whose sum is less than 100, we can set up an equation and solve it for the variable representing the largest odd integer.
To find the greatest possible values of three consecutive odd integers whose sum is less than 100, we can start by considering the largest odd integer that is less than 100, which is 99. Let's represent this as x.
The next two consecutive odd integers would be (x+2) and (x+4). The sum of these three integers can now be expressed as:
x + (x+2) + (x+4) = 3x + 6
Since the sum must be less than 100, we can set up the following inequality:
3x + 6 < 100
Solving this inequality, we get:
3x < 94
x < 31.333
Therefore, the greatest possible value for x would be 31. This means the three consecutive odd integers would be 31, 33, and 35.
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